diff --git "a/https:/huggingface.co/datasets/iamgroot42/mimir/tree/main/test/dm_mathematics_ngram_13_0.2.jsonl" "b/https:/huggingface.co/datasets/iamgroot42/mimir/tree/main/test/dm_mathematics_ngram_13_0.2.jsonl" new file mode 100644--- /dev/null +++ "b/https:/huggingface.co/datasets/iamgroot42/mimir/tree/main/test/dm_mathematics_ngram_13_0.2.jsonl" @@ -0,0 +1,777 @@ +"n - 9. Suppose -30 = h*i - 48. Solve -s - i = 4*p, u*s + 3*s = 15 for p.\n-2\nLet m(r) = r**3 - r - 32. Let w be m(0). Let j be (3/(-6))/(4/w). Suppose 2*d - 5*s = 9, -j*d + 0 = 4*s - 4. Solve -2*v = 3*b - 2, 2*v = 4*b + 4*v - d for b.\n0\nLet p = 10692 - 10688. Solve -4*h - 8*q - p = -6*q, -5*q = -h - 23 for h.\n-3\nSuppose -3*g = 2*v, 0*v = 4*v + 3*g - 6. Suppose 4*a - 32 = -3*s, 2*s + 19 = v*a - 5. Suppose -a*o + 36 = 28. Solve 3*h + 5 = -3*n + 2, 5*h - o = n for n.\n-1\nSuppose -55*u + 27*u = 0. Suppose u = 31*i - 22*i - 18. Solve 5*z - i*b - 17 = 0, -z = -2*z - b + 9 for z.\n5\nLet i be (-101)/(-35) + 6/(-21) + (-18)/(-45). Solve 2*c + 2*r = -0*r - 8, 2*c - i*r = 12 for c.\n0\nSuppose 56 = 25*w + 11*w - 8*w." +"= 7 for l.\n5\nLet v(c) = -c + 2. Let k be v(-6). Let n be -4*(1 + (-18)/k). Solve p = 2*p + n for p.\n-5\nLet h = 19 - 16. Solve -3*p = -6 - h for p.\n3\nLet h = 3 - -2. Suppose -z = -h*z + 12. Suppose 8*c - z*c = 20. Solve -3*y + y = c for y.\n-2\nLet j(l) be the first derivative of l**2 - 8*l - 2. Let s be j(6). Suppose 2*t - 18 = 2*v, -t + 18 = t - 4*v. Solve o + t = s*o for o.\n3\nLet r = 4 - 0. Let w be 5/(2/(2/1)). Suppose 4*c - 28 = -2*k, 2*c = -w*k - 0*c + 70. Solve -r*x = 6 + k for x.\n-5\nSuppose 5*c = 4 + 6. Suppose 4*b - 3*o - 1 = 0, 3*b + 2*o = 17 + 5. Suppose 2*t = 4*s - 6, -3*s + 0 = -b*t + 3. Solve -r + c = -s*r for r.\n-1\nSuppose 5*u = 2*u. Let z be (-2)/(-8) - 11/(-4). Solve g = -u +" +"(-12). Suppose 52 + 44 = 4*g. What is the highest common divisor of z and g?\n12\nSuppose -2*t = -48*t + 1656. What is the greatest common factor of 16 and t?\n4\nSuppose 0 = 5*w + 2*u - u - 1075, -w + 215 = u. What is the highest common divisor of 43 and w?\n43\nSuppose t + 4 = 1. Let r be 2*t/(-6)*5. Suppose -2*x = x - r*d - 2, -4*x = -3*d - 21. Calculate the highest common divisor of 18 and x.\n9\nLet v(p) be the first derivative of 7*p**2 - p + 72. Let w = -3 - -5. Let g be v(w). What is the highest common factor of 18 and g?\n9\nLet s be ((14 - 11)/((-3)/886))/2. Let w = -290 - s. What is the highest common divisor of 17 and w?\n17\nLet n = 1226 - 874. Calculate the highest common factor of 11 and n.\n11\nLet p(i) = 57*i**3 + i + 1. Let w be p(-1). Let f be -1 + 0 - w/3. Let k(d) = 8*d**2 - d. Let s be k(-1). What is the highest" +"+ 157. Let w be a(r). Solve 0 = w*m - 2*z - 33, -6*m + 3*m = 2*z - 7 for m.\n5\nSuppose 18*a = 7*a - 165. Let k = a - -21. Let u(m) = 6*m - 29. Let w be u(k). Solve 4*c + 11 = -f, -f = -0*c + 3*c + w for c.\n-4\nLet g(o) = -34*o - 6. Let q be g(-3). Let j = 319 + -315. Suppose 16*u - q = j*u. Solve -5*d + 3*z + 1 = -2, 0 = 2*z - u for d.\n3\nLet l be -10*((-23)/(-2))/23 - (-4 + -1). Solve -4*j + 2*a + 2 = l, 8*a = 3*j + 4*a + 1 for j.\n1\nLet b(d) = 10*d - 35. Let s be b(13). Suppose -100 = -13*t + s. Solve -2*v - 2*p = v - 16, 3*p - t = 0 for v.\n2\nLet o = -62 - -66. Suppose n - 4*u + o = -2, 3*u = -2*n + 32. Solve -5*c - 20 = -5*m - n*c, 10 = -5*m + 5*c for m.\n1\nLet d(z) = -z**3 + 37*z**2 +" +"se 3*p + 71 = b, 0*b = 4*p - 2*b + 92. Let v be (10/p)/((-2)/5). Suppose 4*u + v - 5 = 0. Solve -u = -2*i + 5 for i.\n3\nLet d be 2 + 2 + -4 - 0. Let s(i) = i**3 - i**2 + i + 6. Let p be s(d). Let q be ((-8)/6)/(p/(-18)). Solve -q*m - 20 = m for m.\n-4\nLet j = 12 + -24. Let r = 1 + j. Let t = -7 - r. Solve -4*c + 12 = t for c.\n2\nLet b = 62 - 61. Solve -9 + b = 2*q for q.\n-4\nLet d(y) = 4*y**3 - 3*y**2 - y - 3. Let h be d(3). Suppose -2*o + h = 3*o. Solve i = 4*i - o for i.\n5\nLet i be ((-1)/((-1)/2))/(-2). Let z be 42/9 - i/3. Let g(n) = 2*n + 2. Let y be g(z). Solve 3*o = 6*o + y for o.\n-4\nLet x(n) = -2*n**3 + 24*n**2 + 2*n - 8. Let f be x(12). Let p = 7 - 4. Solve 1 = -p*r + f for r.\n5" +"e\nLet x(k) = -3*k + 4. Suppose 8 = -12*c + 14*c. Let h be x(c). Let y(f) = f**3 + 7*f**2 - 12*f - 6. Is y(h) a multiple of 13?\nTrue\nLet u = 2477 - 1633. Is u a multiple of 40?\nFalse\nSuppose 0 = 2*b + 5*j + 14365, 3*j + j = -4*b - 28736. Is 8/16 - (b/(-6))/(-5) a multiple of 23?\nFalse\nLet o = -7 + 10. Suppose 112 = -4*y + s, o*y = -0*s - s - 84. Is 7 a factor of (-28)/1*24/y?\nFalse\nLet f = 4366 + -3006. Does 16 divide f?\nTrue\nLet d be 3 - (-61 - (-1 - 2)). Let i = 102 - d. Let m = i - 29. Does 5 divide m?\nFalse\nLet w(m) = -3*m - 1. Let z be w(4). Let v = z - -7. Is -2*48/(v + 2) a multiple of 8?\nTrue\nLet q = 173 + -110. Let b be (-8)/(7/(q/(-6))). Suppose 3*x - b = -0. Is 2 a factor of x?\nTrue\nSuppose 2*h + 1381 = 3*h - 5*x, -5*x + 2792 = 2*h. Suppose -7*a = 6*a" +"ommon divisor of 31 and b.\n31\nLet h = -278 + -108. Let r = h - -573. Calculate the greatest common factor of r and 17.\n17\nLet v(q) = 94*q + 312. Let n be v(4). Calculate the greatest common factor of n and 43.\n43\nSuppose 0 = 54*h + 372 - 3072. Calculate the highest common factor of h and 2.\n2\nLet u be (-28)/(-6) - 7/(-21). Suppose -3*j = 4*i + 4 - 18, -u*j = -4*i + 30. Suppose -r + i + 18 = 0. What is the highest common factor of 92 and r?\n23\nSuppose a = 5*g - 22, 0 - 9 = -3*g + 2*a. Suppose 2*k = -4*s + 70, g*s - 2*k + 29 = 121. Calculate the greatest common divisor of 9 and s.\n9\nLet v = -1458 + 1461. Calculate the greatest common factor of v and 51.\n3\nLet z(u) = u**2 - 12*u - 42. Let f be z(15). Suppose 0*v - 20 = 5*v, 0 = -3*n - f*v + 60. What is the greatest common divisor of 168 and n?\n24\nSuppose -5 = u, 3*u = 4*p" +"r j.\n6\nSolve -4*m + 25 = 5 for m.\n5\nSolve 84*v + 48*v = 21*v + 555 for v.\n5\nSolve 5*p + 32*p - 7*p - 210 = 0 for p.\n7\nSolve -68*b + 19*b - 490 = 0 for b.\n-10\nSolve 1699*t - 38 = 1661*t for t.\n1\nSolve 42*y + 232 = 71*y for y.\n8\nSolve -29*t = -20*t + 23*t + 224 for t.\n-7\nSolve 4*d - 276 + 161 = -143 for d.\n-7\nSolve 12 = -2764*k + 2776*k for k.\n1\nSolve 176*n = -14*n - 56*n + 3690 for n.\n15\nSolve 26 + 44 = -444*n + 458*n for n.\n5\nSolve -10044*n + 3 - 315 = -10032*n for n.\n-26\nSolve -14*t - 13437 = -13143 for t.\n-21\nSolve -125 + 94 = -31*z for z.\n1\nSolve 2909 = -295*b - 1516 for b.\n-15\nSolve -113 - 134 - 853 = 55*k for k.\n-20\nSolve 325*v - 341*v = 320 for v.\n-20\nSolve 137*u - 1071 - 1413 = -277*u for u.\n6\nSolve -384*c = -406*c - 44 for c.\n-2\nSolve 0 = -57*w" +"99281. Let c = g + 163.6. Round c to 6 decimal places.\n-0.000007\nLet h = 28 - 27.7. Let a = h + -0.29999875. Round a to 7 dps.\n0.0000013\nSuppose -3*z - 165026 + 22641 = 2*m, -25 = -5*z. What is m rounded to the nearest ten thousand?\n-70000\nLet w = -1.381 - -1.44. Let x = -0.139 - w. Round x to one decimal place.\n-0.2\nLet o = 109697382 + -109691745.810008. Let s = o - 5621.19. Let z = s + -15. What is z rounded to 6 decimal places?\n-0.000008\nLet o = 2495.93908 + -2496. Round o to 2 dps.\n-0.06\nSuppose 5*u + 6 = -3*l + 2, 3*l = -u + 4. Suppose 0 = s + a - 3*a + 698, -2*s - 1392 = -l*a. What is s rounded to the nearest one hundred?\n-700\nLet g = -26.8 - 0.2. Let a = g + 26.985. Round a to two decimal places.\n-0.02\nLet o = 557.99997104 - 558. Round o to 6 decimal places.\n-0.000029\nLet s = -4 + 3.93. Let k = 0.07 + s. Let x = -0.15 - k. Round" +"base 16) to base 13.\n224b9a3\nConvert -1189a5 (base 11) to base 13.\n-67496\nWhat is 4c0dd (base 15) in base 7?\n2032030\n-1101000101001100100 (base 2) to base 10\n-428644\nConvert -a82a6 (base 13) to base 14.\n-7c940\n2222212120 (base 3) to base 13\n20ab1\nConvert -9791a (base 13) to base 12.\n-112670\nWhat is -1232103100 (base 5) in base 12?\n-100a199\nConvert 108b20 (base 14) to base 7.\n4530240\nConvert -10111010001101111101 (base 2) to base 11.\n-481079\n260046 (base 8) to base 7\n523554\nConvert -481406 (base 15) to base 6.\n-201513153\nWhat is 3550986 (base 11) in base 12?\n20a881a\n14322557 (base 8) to base 2\n1100011010010101101111\nConvert -43021142 (base 5) to base 6.\n-11422205\n-13003131221 (base 4) to base 3\n-10110221121122\nConvert -22032001331 (base 4) to base 14.\n-4da3c9\nConvert 10011011010111010011 (base 2) to base 5.\n130330441\nWhat is 1130462 (base 10) in base 7?\n12415544\n2be94 (base 15) to base 6\n3011504\nConvert 1080872 (base 9) to base 11.\n36a283\n4342410121 (base 5) to base 11\n5300279\nConvert -100111101110010100011 (base 2) to base 13.\n-367623\n-26c532 (base 14) to base 13\n-37bc74\nConvert 3242424404 (base 5) to base 16.\n6acac9\n2311434031 (base 5) to base 13" +"ommon multiple of 27 and 87.\n783\nCalculate the common denominator of 93/280 and 73/15.\n840\nCalculate the lowest common multiple of 28 and 105.\n420\nCalculate the least common multiple of 160 and 320.\n320\nWhat is the smallest common multiple of 9 and 45?\n45\nCalculate the least common multiple of 2 and 116.\n116\nWhat is the lowest common multiple of 1431 and 1749?\n15741\nFind the common denominator of -79/20 and 9/445.\n1780\nCalculate the common denominator of 93/2200 and -57/4400.\n4400\nFind the common denominator of -7/36 and 121/114.\n684\nFind the common denominator of 71/2088 and -133/36.\n2088\nWhat is the least common multiple of 1699 and 6?\n10194\nFind the common denominator of -81/8 and -42/5.\n40\nWhat is the least common multiple of 87 and 8?\n696\nFind the common denominator of 49/60 and -121/730.\n4380\nWhat is the common denominator of -65/34 and 41/1142?\n19414\nWhat is the smallest common multiple of 3 and 15?\n15\nWhat is the common denominator of -41/168 and 41/140?\n840\nWhat is the common denominator of 3/10 and 77/13894?\n69470\nWhat is the least common multiple of 70 and 70?\n70\nCalculate the least common" +"3/6 + m**2 - 6*m. Let i be d(-11). Sort i, -4, -3.\n-4, -3, i\nLet o be (-10)/9*45/(-75). Let d be (-1)/(62/(-63) - -1). Let r = -314/5 - d. Sort -4, o, r.\n-4, r, o\nLet c(z) = 7*z - 60. Let y be c(9). Put 2, -2, -6, y in ascending order.\n-6, -2, 2, y\nSuppose -70 - 8 = -5*g + 2*u, u = -4*g + 65. Let m(p) = -p**2 + 17*p - 18. Let z be m(g). Sort 0, -1, z, -17.\n-17, z, -1, 0\nLet w = 63.8 - 7.8. Let r = w - 55.9. Let i = -7.04 + 7. Put i, r, -4 in increasing order.\n-4, i, r\nLet b = 2/43409 + -18535655/260454. Let s(r) = r**2 + 5*r - 13. Let l be s(7). Let f = b + l. Put f, -1, -0.1 in decreasing order.\n-0.1, f, -1\nLet o = -0.1 - 1.9. Suppose 5 = -5*f - 5. Let m be f*(-5)/(-20)*-2. Sort m, -0.2, o.\no, -0.2, m\nSuppose 0 = -5*k + 5*p - 20, -6*k + 2*p = -2*k + 8. Sort 1.9, -5, -0.2, k" +"True\nIs 126 a multiple of 5?\nFalse\nIs 85843 a multiple of 11?\nFalse\nIs 20 a factor of 2260?\nTrue\nIs 29 a factor of 343?\nFalse\nIs 1258 a multiple of 37?\nTrue\nIs 46 a multiple of 23?\nTrue\nDoes 26 divide 20766?\nFalse\nIs 31 a factor of 26064?\nFalse\nIs 23 a factor of 2277?\nTrue\nIs 35 a factor of 9678?\nFalse\nDoes 56 divide 3808?\nTrue\nIs 544 a multiple of 12?\nFalse\nDoes 27 divide 73?\nFalse\nIs 1568 a multiple of 26?\nFalse\nDoes 3 divide 345?\nTrue\nDoes 6 divide 25364?\nFalse\nIs 1381 a multiple of 24?\nFalse\nDoes 31 divide 389?\nFalse\nIs 15 a factor of 555?\nTrue\nIs 19 a factor of 15118?\nFalse\nDoes 68 divide 272?\nTrue\nDoes 74 divide 962?\nTrue\nDoes 16 divide 286?\nFalse\nIs 256 a multiple of 4?\nTrue\nIs 20 a factor of 150840?\nTrue\nIs 445 a multiple of 4?\nFalse\nDoes 12 divide 7464?\nTrue\nIs 3768 a multiple of 12?\nTrue\nDoes 2 divide 1222?\nTrue\nIs 140 a factor of 60675?\nFalse\nIs 89 a factor of 50540?\nFalse\nDoes 69 divide 1104?" +"+ 3*b for t.\n-4\nLet o(x) = -x + 1. Let s be o(1). Solve 2*b + 5*p - 3 + 1 = s, 0 = 5*b - 2*p - 5 for b.\n1\nLet u be ((-6)/(-4))/((-27)/(-360)). Solve 2*a - j = 8, 5*a + 7*j - 4*j = u for a.\n4\nLet w(p) = p + 3. Let n be w(1). Solve -a = -n*a + 5*v + 31, -5*a - 4*v = 10 for a.\n2\nSuppose -7*c + 15 = -2*c. Suppose s + c*s = 20. Suppose -6*q = -4*b - q + 23, -14 = -b + 4*q. Solve b*h = 3*x - 0*h + 7, s = -5*h for x.\n-3\nLet h(r) = r + 2. Let b be h(0). Solve 5*d = -5*o - 40, -5*o - b*d = -d + 28 for o.\n-5\nSuppose 4*t - 2*q = -0*t + 4, 2*q = -3*t + 10. Let d = 10 + -2. Suppose -5*x = -34 - 76. Solve -s = 4*v + v - x, -t*s = v - d for v.\n4\nSuppose -4*b = 3*x - 11, -3*b + 1 = 4*x - 2." +"vided by 49.\n46\nCalculate the remainder when 331872 is divided by 29.\n25\nWhat is the remainder when 884 is divided by 411?\n62\nCalculate the remainder when 8833 is divided by 443.\n416\nCalculate the remainder when 251717 is divided by 28.\n25\nWhat is the remainder when 151673 is divided by 63?\n32\nWhat is the remainder when 7835 is divided by 600?\n35\nWhat is the remainder when 43261 is divided by 239?\n2\nCalculate the remainder when 143392 is divided by 11.\n7\nCalculate the remainder when 465628 is divided by 330.\n328\nCalculate the remainder when 14529 is divided by 246.\n15\nWhat is the remainder when 505 is divided by 63?\n1\nWhat is the remainder when 2680 is divided by 64?\n56\nWhat is the remainder when 14809 is divided by 463?\n456\nWhat is the remainder when 56171 is divided by 162?\n119\nWhat is the remainder when 1750 is divided by 116?\n10\nWhat is the remainder when 40155 is divided by 13318?\n201\nCalculate the remainder when 3105 is divided by 338.\n63\nCalculate the remainder when 8202 is divided by 104.\n90\nCalculate the remainder when 25466 is" +"1. Is 28 bigger than t?\nTrue\nSuppose -3*t = -b + 119, b = t - b + 33. Let x = 489.2 - 489. Are t and x non-equal?\nTrue\nSuppose -36 - 124 = -62*w + 336. Is w less than -262?\nFalse\nLet i = 259.379 + -261.2. Which is smaller: 0.1 or i?\ni\nLet k = -41525 + 9010985/217. Which is smaller: 0 or k?\n0\nSuppose -4*b - h - 348 + 1247 = 0, 215 = b - 3*h. Let t = 237 - b. Are 8 and t unequal?\nTrue\nLet x = -0.803 + 36.513. Let t = -0.71 + x. Is 1 greater than t?\nFalse\nLet g = -1679015/21 + 79953. Let p = -22 - -13. Which is bigger: g or p?\ng\nLet d be 170/51*(-6)/(-4). Let k(l) = -6*l + 34. Let f be k(d). Let p = 6 - f. Are p and 1/2 unequal?\nTrue\nLet z = 35391/34 - 1041. Let k(r) = r**3 + 22*r**2 + 19*r - 41. Let q be k(-21). Is q >= z?\nTrue\nLet c = 0.1 + 8.9. Let r = -0.174 - 8.826. Let" +" 2 = -i*m + 146*m. Suppose -m*z - 3*k - 11 = -8*k, -k = 4*z - 11. Solve 0 = -3*c, z*w = -2*w - 2*c - 12 for w.\n-3\nSuppose 2*r + 812 = g, 21*r - 26*r - 25 = 0. Suppose -g*h = -808*h + 24. Solve h*j = -n - 7, n + 5*j = 4*j + 2 for n.\n5\nSuppose 0 = -110*z + 21 + 268 + 41. Solve 23*x - 12 = 19*x, z*s - 12 = -3*x for s.\n1\nLet t(c) = -50*c + 53. Let n be t(-4). Let p = n - 244. Solve -3*i = 2*l - p, l - i - 3 = -6 for l.\n0\nLet p(i) = i**2 - 560*i - 3378. Let b be p(-6). Let x(v) = -v + 3. Let c be x(-3). Solve -c*t + b = -4*w - t, -3*t + 10 = -2*w for w.\n-2\nLet l = 45 + -42. Suppose 0 = -l*f - 13 + 82. Let z = f - 18. Solve 6 = -4*k - 2*i + 16, 0 = k + z*i - 16 for k.\n1\nLet" +"*r = -240, n - 90 = -0*n + r. Suppose 4*j = -j + n. Calculate the remainder when 49 is divided by j.\n15\nSuppose 5*m = 10*m - 265. Calculate the remainder when m is divided by 14.\n11\nLet h be 2/(-6) - (-30)/9. Suppose 3*c + 5*i = 64, 2*i + 31 = 2*c + h*i. What is the remainder when c is divided by 4?\n1\nLet q = -5 - -4. Let g = 0 - q. Suppose 5*y = 6 - g. Calculate the remainder when 2 is divided by y.\n0\nLet x be (-282)/8 + (-3)/(-12). Let y = x - -54. What is the remainder when y is divided by 7?\n5\nLet g = -175 + -27. Let j = g - -305. Calculate the remainder when j is divided by 35.\n33\nSuppose -16*j + 47 = -1233. What is the remainder when j is divided by 27?\n26\nCalculate the remainder when 75 is divided by (-3)/(-5) + 561/15.\n37\nLet o be 2/1 + 1 + -2. What is the remainder when ((-8)/20)/(4/(-10)) is divided by o*((-2)/(-2) - 0)?\n0\nLet q(k) = 31*k**2 -" +"Solve 4*d = -5*a + 17, -11 = -2*a + v*d + 7 for a.\n5\nLet p = -403 - -418. Solve 5*c + p = 5*v, 2*v + 3*c - 20 = -2*c for v.\n5\nSuppose 5*o - 6*z - 19 = -2*z, 2*z = -5*o + 43. Let j(d) = d - 2. Let v be j(o). Solve -h + 5*i + 9 + 3 = 0, 0 = -2*h - v*i - 21 for h.\n-3\nLet j = -1308 - -1313. Solve -3 = o - 2*o - k, 6 = -j*o + 2*k for o.\n0\nLet c(k) = k**2 - 9*k - 5. Let j be c(10). Suppose 1 = 2*s - j. Solve -5*v + 0*l = -s*l + 7, v + 6 = -4*l for v.\n-2\nLet f be (-4)/((-8)/1)*10. Suppose -20 = -10*u + f*u. Suppose 6*v + 0*v = 24. Solve -3*s + 5*r = -27, u*s + v*r - 2 = 2 for s.\n4\nLet o = 112 - 110. Let f be (-31)/(-3) + 2/(-6). Suppose -o*x - f = -36. Solve -2*c = 3*g + x, 3*c + 7 = -g - 9" +"= 5*r - 11. Suppose -4*s = r*w - 12, 7*s - 5*w = 2*s + 45. List the prime factors of (s - 4)/(2/13).\n13\nLet z(v) = 543*v**2 + 9*v + 19. What are the prime factors of z(-2)?\n41, 53\nLet m(z) = -z - 4. Let y be m(-7). Suppose -i - y*o + 10 = i, 3*o - 25 = -5*i. Suppose -2*n + 4*n - 119 = i*s, s = 5*n - 240. List the prime factors of n.\n47\nLet u(g) = -9*g + 1. Let t be u(1). Suppose 19 = 4*o - 5*b, -13 = -o + 3*b - 3. Let w = o - t. What are the prime factors of w?\n3\nSuppose 6 = 5*v - x - 76, 2*v = -x + 30. Suppose 2 = 3*q - v. What are the prime factors of (9/1)/(q/8)?\n2, 3\nLet y(q) = -2*q. Let c(o) = -o**3 - o**2 + 6*o - 1. Let z(m) = -3*c(m) - 8*y(m). Let g be -2 + 8 + -1 + -3. What are the prime factors of z(g)?\n5, 7\nLet a(z) be the first derivative of z**3/3 + 4*z" +"t ten thousand?\n-740000\nWhat is 0.000914602 rounded to five decimal places?\n0.00091\nWhat is 942.433446 rounded to the nearest one hundred?\n900\nRound -440.600557 to 1 decimal place.\n-440.6\nRound -3209965.9 to the nearest one hundred thousand.\n-3200000\nRound -0.0028542709 to 6 dps.\n-0.002854\nWhat is 102828672600 rounded to the nearest one million?\n102829000000\nWhat is -1.785733431 rounded to 2 dps?\n-1.79\nRound 3290799.9 to the nearest ten thousand.\n3290000\nWhat is 4130.152 rounded to the nearest integer?\n4130\nWhat is 0.0032317694 rounded to 6 dps?\n0.003232\nRound -0.015620317802 to 3 dps.\n-0.016\nWhat is 2101542400 rounded to the nearest 100000?\n2101500000\nWhat is 0.04098555269 rounded to two decimal places?\n0.04\nRound 20908.5091 to the nearest ten thousand.\n20000\nWhat is -0.6317834901 rounded to 3 dps?\n-0.632\nRound -2339184670 to the nearest 100000.\n-2339200000\nRound 23.87787967 to 2 decimal places.\n23.88\nRound -2621.63299 to the nearest ten.\n-2620\nWhat is 0.813092349 rounded to 4 decimal places?\n0.8131\nWhat is 362249879 rounded to the nearest one hundred thousand?\n362200000\nWhat is 4.8989413 rounded to three dps?\n4.899\nRound 0.000357820728 to six decimal places.\n0.000358\nRound 0.9146575763 to 5 decimal places.\n0.91466\nWhat is -0.01705971811 rounded to four decimal places?\n-0.0171" +"01 = 4*y - i. Let d be (-42)/(-5)*(-3 - 1497982). Let n = d - y. What is n rounded to the nearest 1000000?\n-6000000\nSuppose -9 - 63 = 6*b. Let x(n) = -5*n - 3*n**3 - 10*n**2 - 5 - 3 + 4. Let m be x(b). Round m to the nearest one thousand.\n4000\nLet f = -2954317.99999936 + 2954317. Let j = f + 1. What is j rounded to 7 decimal places?\n0.0000006\nLet m = 0.0171 + -0.017100898. Round m to seven decimal places.\n-0.0000009\nLet g = 4245 + -4245.000005907. Round g to six dps.\n-0.000006\nLet a = -0.5 + 2.5. Let i = -23432606.4 - -23432604.40000017. Let p = i + a. What is p rounded to 7 decimal places?\n0.0000002\nLet z = 197 + -196.68. Let a = 6 + -6.4. Let d = a + z. Round d to 1 decimal place.\n-0.1\nLet v(o) be the first derivative of -3448*o**2 + 12*o + 15. Let g be v(-3). What is g rounded to the nearest one thousand?\n21000\nSuppose 0 = -2*v - 8, -2*t - v + 281 = -241. What is t rounded to" +"when 11 is divided by z?\n2\nLet w = 65 - -22. What is the remainder when w is divided by 22?\n21\nLet a(q) = 3*q**2 + 14*q. What is the remainder when a(-7) is divided by 13?\n10\nSuppose 0 = 2*g + 2, -5*o + 5*g = -8*o + 1. Suppose o*n - 29 - 19 = 0. Calculate the remainder when n is divided by 13.\n11\nSuppose -11 = -2*c + 2*r - 7*r, 0 = -4*r + 4. Suppose 5*z = 2*l - 18, 0 = -z - z + 3*l - 16. Let b = 7 + z. Calculate the remainder when b is divided by c.\n2\nSuppose 0 = 5*q - 4*j - 6 + 20, -5*q = 3*j + 42. Calculate the remainder when ((-26)/q)/(2/12) is divided by 14.\n12\nLet o be (-3)/(0/1 - 1). Let b(x) = x - 1. Let c be b(o). Suppose -10 = -j - 2*p - c*p, 40 = 4*j - 2*p. What is the remainder when 28 is divided by j?\n8\nCalculate the remainder when 32 is divided by (39/9 - 4)/(2/102).\n15\nLet n(x) = -x**3 - 6*x**2 -" +"le of 381876 and 15830496.\n174135456\nWhat is the common denominator of 1/1383866 and -109/1258060?\n13838660\nCalculate the common denominator of 41/10602 and -81/135470.\n1219230\nCalculate the common denominator of -31/20214 and -89/54.\n60642\nCalculate the smallest common multiple of 63382 and 389873.\n33529078\nFind the common denominator of 1/151956 and -47/59832.\n84183624\nCalculate the smallest common multiple of 15179200 and 332045.\n106254400\nFind the common denominator of -20/710309 and -28/979.\n7813399\nCalculate the lowest common multiple of 14076 and 19090575.\n76362300\nCalculate the lowest common multiple of 10270 and 5253027.\n4149891330\nCalculate the common denominator of -69/92214080 and 99/320.\n92214080\nFind the common denominator of 74/27 and 46/15159243.\n136433187\nCalculate the common denominator of -37/272 and 53/1827408.\n31065936\nCalculate the smallest common multiple of 700420 and 6503900.\n45527300\nFind the common denominator of -48/165485 and 40/33097.\n165485\nWhat is the smallest common multiple of 21708790 and 238796690?\n238796690\nWhat is the common denominator of 47/3016496 and 45/61838168?\n123676336\nCalculate the least common multiple of 804950 and 47350.\n804950\nCalculate the lowest common multiple of 336700 and 174135.\n902019300\nWhat is the lowest common multiple of 40320 and 23430?\n31489920\nCalculate the smallest common multiple of 200187 and 117.\n200187" +"-0.28 + -6.72. Let j = 24 - d. Let l = j + -31.0054. Round l to three dps.\n-0.005\nLet o = -0.3852 - -0.388779. What is o rounded to 3 dps?\n0.004\nLet r be (3 - 0)/(21/(-28))*-3. Suppose s + 10 = r. Suppose d - 5*j = -5499995, 11000005 = -s*d - j - 4*j. What is d rounded to the nearest one million?\n-6000000\nLet m = 0.2792 + 4154.3208. Round m to the nearest 1000.\n4000\nLet z = -0.165 + 2.975. Let v = -2.79218 + z. Round v to 3 decimal places.\n0.018\nLet s = 30867 + -30747.711. What is s rounded to the nearest 10?\n120\nSuppose -5*x - 5 - 15 = 0, -t + 2330392 = 3*x. Suppose 6*r - 8*r = -t. Suppose -265202 = q - r. Round q to the nearest 1000000.\n1000000\nLet s = -106268021.16 + 106268035.959999491. Let b = 14.8 - s. Round b to seven decimal places.\n0.0000005\nLet p = 520.778 + -520. Round p to 1 dp.\n0.8\nSuppose 4*y = 4*h - 134588, 72*y = h + 69*y - 33641. What is h rounded to the nearest" +"50 = 19*k + 16*k. Solve 22*h - k = 17*h for h.\n2\nLet r(h) = 22 - 62 - 50*h + 53*h. Let q be r(14). Solve -4 + q = 2*o for o.\n-1\nLet w(j) be the second derivative of 1/12*j**4 - 7/6*j**3 + 2*j**2 + 6*j + 0. Let u be w(7). Solve -7 = -u*v + 5 for v.\n3\nSuppose -111 = -3*c + 4*d, -4*c + 51*d - 53*d = -148. Solve -32*t + c*t = -20 for t.\n-4\nSuppose -1210 = -8*a - 1114. Solve -30*p = 72 - a for p.\n-2\nLet j be (-20)/(4 - -9 - 15). Suppose -2*p + 9 = 2*p - k, -4*p + 21 = 3*k. Solve -p*y - j = -y for y.\n-5\nLet x(c) = 16 + 3 - 14*c - 2*c**2 - 1 - 2. Let p be x(-8). Solve p*r - 3*r = 9 for r.\n-3\nSuppose 0 = 5*o + 50 + 40. Let j be (22/66)/(1 - (-16)/o). Solve -2 = j*n - 5*n for n.\n1\nLet x be (-4 + 0 - -2) + 36. Let k = x - 33. Solve" +"Let w be ((-4)/(-6))/((-2)/(-9)). Suppose w*d + 5*c + 94 = 6*d, -3*d + c = -74. Is d prime?\nTrue\nLet j = -1602 + 3505. Is j prime?\nFalse\nLet h(m) = -15*m + 4. Let z be -2 + ((-2)/(-2) - 2). Let j be h(z). Suppose 5*w - 3*u - j = 157, 2*w = -5*u + 101. Is w prime?\nTrue\nLet b = 10 + -5. Suppose 0 = 5*w - w + 12, m = -b*w - 11. Is (1270/15)/(m/6) prime?\nTrue\nLet r = -3 + 6. Let d(q) = 3*q - 3 - q**r + 0*q**2 - q**2 + 0. Is d(-3) composite?\nTrue\nLet a(w) = 506*w - 9. Is a(1) a composite number?\nTrue\nSuppose -3*y + y = -12. Suppose -5*g + 5*t = 10, -2*t = -0*g - 5*g + 2. Suppose 0 = -g*o - 5*k - 3, -3*k = -2*o - 5*k + y. Is o prime?\nFalse\nIs -10 + 6 - (-227)/1 a prime number?\nTrue\nLet h(a) = -a**2 - 4*a - 3. Let m be h(-3). Suppose 32 = -m*j + 4*j. Suppose -j = -k - k. Is k composite?" +"3940?\n2, 5, 17, 17041\nWhat are the prime factors of 18849?\n3, 61, 103\nList the prime factors of 154597.\n31, 4987\nList the prime factors of 6693286.\n2, 61, 83, 661\nWhat are the prime factors of 2248973?\n19, 41, 2887\nList the prime factors of 188254.\n2, 11, 43, 199\nList the prime factors of 2085636.\n2, 3, 7, 3547\nWhat are the prime factors of 248413?\n11, 2053\nWhat are the prime factors of 298676?\n2, 7, 10667\nWhat are the prime factors of 831165?\n3, 5, 55411\nWhat are the prime factors of 19305801?\n3, 2145089\nWhat are the prime factors of 2927274?\n2, 3, 7, 69697\nWhat are the prime factors of 1395293?\n1395293\nWhat are the prime factors of 333214?\n2, 7, 23801\nWhat are the prime factors of 3376883?\n23, 41, 3581\nList the prime factors of 495277.\n495277\nList the prime factors of 156972.\n2, 3, 103, 127\nWhat are the prime factors of 223108?\n2, 17, 193\nList the prime factors of 2120194.\n2, 1060097\nList the prime factors of 3214970.\n2, 5, 11, 2657\nWhat are the prime factors of 425341?\n7, 60763\nList the prime factors of 5877254." +"er of 1/8, to the nearest integer?\n14\nWhat is 1391106153 to the power of 1/9, to the nearest integer?\n10\nWhat is 91633107 to the power of 1/2, to the nearest integer?\n9573\nWhat is the fourth root of 96396732 to the nearest integer?\n99\nWhat is the square root of 195013626 to the nearest integer?\n13965\nWhat is 43229242 to the power of 1/2, to the nearest integer?\n6575\nWhat is the ninth root of 22109364 to the nearest integer?\n7\nWhat is 69304787 to the power of 1/9, to the nearest integer?\n7\nWhat is 477724302 to the power of 1/2, to the nearest integer?\n21857\nWhat is 3387468651 to the power of 1/2, to the nearest integer?\n58202\nWhat is 73228437 to the power of 1/2, to the nearest integer?\n8557\nWhat is the square root of 7705714772 to the nearest integer?\n87782\nWhat is the fifth root of 690246178 to the nearest integer?\n59\nWhat is the square root of 184073908 to the nearest integer?\n13567\nWhat is 1590764074 to the power of 1/2, to the nearest integer?\n39884\nWhat is 156936455 to the power of 1/2, to the nearest integer?\n12527\nWhat is the" +"8) a multiple of 33?\nFalse\nSuppose 0*m - 25 = -5*m. Suppose 0 = -5*y + y + m*g - 4, 8 = -2*y + 4*g. Suppose y*f = 2*b + 118, 0*f = 3*f - 5*b - 92. Does 10 divide f?\nFalse\nSuppose -5*m + 11 = h, -h + 6*h = 4*m - 3. Let b = 4 + h. Suppose -128 = -b*t + t. Is t a multiple of 12?\nFalse\nLet r(w) = w - 15. Suppose 20 = h - 3*c, 4*c = -5*h - 0*c + 24. Let l be r(h). Let u(t) = t**3 + 9*t**2 + 10*t. Does 16 divide u(l)?\nFalse\nLet s(a) = a - 1. Let y be s(3). Suppose 4*f - 7 = -z, 5*f - 7 = y*z - 3*z. Let i(m) = -m**2 + 8*m + 5. Does 6 divide i(z)?\nTrue\nSuppose 0*b = 3*b + 30. Let k = 14 + b. Suppose 0 = i + k*i - 80. Is 16 a factor of i?\nTrue\nSuppose -5*c = -7*c - 84. Is c/2*100/(-30) a multiple of 12?\nFalse\nLet b be 2/7 + (-78)/(-21). Let w = 9 -" +" prob of sequence wrrq?\n1/378\nWhat is prob of sequence uram when four letters picked without replacement from mruoa?\n1/120\nWhat is prob of sequence xiio when four letters picked without replacement from {o: 2, x: 4, p: 12, i: 2}?\n2/14535\nCalculate prob of sequence bl when two letters picked without replacement from uurturluutbrrrr.\n1/210\nCalculate prob of sequence ax when two letters picked without replacement from xxtppptstvta.\n1/66\nWhat is prob of sequence wn when two letters picked without replacement from {z: 6, n: 4, s: 1, w: 1, m: 1}?\n1/39\nCalculate prob of sequence ozx when three letters picked without replacement from xlxxzuluoozluoxz.\n3/280\nThree letters picked without replacement from xcxxrcxxxffcxxqffff. What is prob of sequence rcf?\n1/323\nCalculate prob of sequence hrh when three letters picked without replacement from rrrhhhrrrrrhrrrhrrrr.\n5/114\nTwo letters picked without replacement from mmmqmmmumzuumzqqqm. What is prob of sequence qz?\n4/153\nThree letters picked without replacement from {b: 2, e: 6}. Give prob of sequence eeb.\n5/28\nCalculate prob of sequence tggg when four letters picked without replacement from {t: 3, g: 11}.\n45/364\nThree letters picked without replacement from auuuaaaauauuau. Give prob of sequence uuu.\n5/52\nTwo letters picked without" +"million?\n-10000000\nLet j = 4 - 7. Let w be ((-426)/(-7))/j + (-32)/(-112). Let q be (75/w)/((-1)/504). Round q to the nearest one hundred.\n1900\nLet z = -0.1708105 - -0.17776. What is z rounded to three dps?\n0.007\nLet u = -4510432819.998773 - -4510435118. Let f = 2298 - u. What is f rounded to four dps?\n-0.0012\nSuppose q = 6, 101517 = 4*d + 2*q - 672655. Round d to the nearest ten thousand.\n190000\nLet i = 259.27526221702 + 3.72473723598. Let t = 263 - i. Round t to seven dps.\n0.0000005\nLet j = 2268 + -2268.6351. What is j rounded to one decimal place?\n-0.6\nLet h = -0.203402238 - -0.2034. What is h rounded to seven dps?\n-0.0000022\nLet v = -54763888915155.0000245 + 54763918757289. Let f = -29842127 + v. Let c = f + -7. What is c rounded to six decimal places?\n-0.000025\nSuppose -17 = -4*c + 7. Let j be 8/(-12)*9/(3 - c). Suppose 0*a = -j*a - 4*x + 16680, -4*a - x = -33360. What is a rounded to the nearest one thousand?\n8000\nLet r = -555.613 - -0.613. Let z = r + 555.000611." +"r 20?\n20\nAre 3432370 and 3432288 unequal?\nTrue\nWhich is smaller: 208 or 42014?\n208\nDoes 37018146 = 37018146?\nTrue\nWhich is smaller: 123949159 or 123949169?\n123949159\nIs -591298/19 less than -31121?\nFalse\nWhich is smaller: -421710 or -422854?\n-422854\nWhich is bigger: 0 or -125/411441?\n0\nIs 40849553 greater than 40849558?\nFalse\nWhich is smaller: 13590495 or 13590496?\n13590495\nWhich is greater: -1 or 115/125188?\n115/125188\nWhich is smaller: -303564 or -303539?\n-303564\nIs 3661248/5 equal to 732249?\nFalse\nIs 833829 <= 833761?\nFalse\nIs 46/3 bigger than -16/10067?\nTrue\nWhich is smaller: 1 or 60/3649451?\n60/3649451\nIs 817480 greater than or equal to 30246708/37?\nTrue\nWhich is bigger: 235 or 24879?\n24879\nWhich is greater: -14/9107011 or 0?\n0\nIs -1061432 != -1061445?\nTrue\nAre -115395790 and -115395791 nonequal?\nTrue\nWhich is bigger: -1323 or 5/10116?\n5/10116\nWhich is bigger: -9/109196462 or 1?\n1\nAre -29698 and 23412 unequal?\nTrue\nAre -33752 and -2261428/67 equal?\nFalse\nWhich is smaller: -28765842 or -9?\n-28765842\nWhich is bigger: -2/1751 or 162?\n162\nWhich is smaller: -2047089 or 0.17?\n-2047089\nWhich is smaller: -7864288/9 or -873811?\n-873811\nIs -417238 <= -2920665/7?\nTrue\nWhich is bigger: 4/60791841 or 0.1?\n0.1\nWhich" +"when 244 is divided by 24.\n4\nCalculate the remainder when 145 is divided by 9.\n1\nWhat is the remainder when 104 is divided by 104?\n0\nCalculate the remainder when 425 is divided by 43.\n38\nCalculate the remainder when 2154 is divided by 212.\n34\nWhat is the remainder when 9888 is divided by 29?\n28\nWhat is the remainder when 643 is divided by 17?\n14\nCalculate the remainder when 20943 is divided by 11.\n10\nCalculate the remainder when 378 is divided by 183.\n12\nCalculate the remainder when 1581 is divided by 18.\n15\nWhat is the remainder when 1503 is divided by 32?\n31\nWhat is the remainder when 675 is divided by 235?\n205\nCalculate the remainder when 15839 is divided by 120.\n119\nWhat is the remainder when 29 is divided by 22?\n7\nWhat is the remainder when 57 is divided by 24?\n9\nWhat is the remainder when 63 is divided by 8?\n7\nWhat is the remainder when 642 is divided by 76?\n34\nCalculate the remainder when 93 is divided by 54.\n39\nWhat is the remainder when 424 is divided by 120?\n64\nWhat is the" +" + -1241?\n-1242\nIn base 9, what is 2 - -50?\n52\nIn base 8, what is 2 - -5634?\n5636\nIn base 15, what is -1 - -34?\n33\nIn base 6, what is 2 - -142?\n144\nIn base 7, what is 16 - -13?\n32\nIn base 7, what is -4 + 54?\n50\nIn base 11, what is -4 - 561?\n-565\nIn base 11, what is -10 - 3a?\n-4a\nIn base 7, what is -12 + 4?\n-5\nIn base 6, what is 15314 + -10?\n15304\nIn base 14, what is -94 - 67?\n-11b\nIn base 12, what is -5 + 146?\n141\nIn base 10, what is 4 - 3540?\n-3536\nIn base 3, what is 12 + 2102110?\n2102122\nIn base 10, what is -388 + -4?\n-392\nIn base 4, what is -1133302 - -11?\n-1133231\nIn base 3, what is -1 - -10?\n2\nIn base 6, what is -1045 - -11?\n-1034\nIn base 9, what is -407 + -2?\n-410\nIn base 14, what is 3 + 37?\n3a\nIn base 13, what is -1623 - 2?\n-1625\nIn base 10, what is 0 + -2227?" +"= -0*r + 2*r - 12. Let v be (-441721)/42*r/(-16). Let q = 3949 - v. Find the common denominator of q and 103/18.\n144\nCalculate the common denominator of 27/35 and ((-11)/(495/6))/((-42)/(-132)).\n105\nSuppose 5*j - 11 - 4 = 0. Calculate the common denominator of 16/(-88) + 70*21/(-264) and 2 - (-158)/8 - j.\n4\nLet z be (560/1)/4 - (4 - 2). Let y = 150 - z. What is the lowest common multiple of y and 12?\n12\nSuppose 600*g = 578*g + 4620. Calculate the least common multiple of g and 10.\n210\nSuppose -2*b + 18 = 4*p, -p - 45 = -5*b - 2*p. Let h be (-6)/b*(-634)/(-4). Let i = -937/6 - h. Calculate the common denominator of i and 95/2.\n2\nLet r(w) = -61*w - 636. Calculate the least common multiple of r(-11) and 110.\n770\nLet u(b) = -2*b**2 + 29*b - 9. What is the smallest common multiple of u(13) and 15?\n30\nLet p(z) = -z**3 + 5*z**2 + z - 1. Let x be p(5). Suppose 4*o - c - c + 64 = 0, 0 = -4*o + x*c - 72. What is the common" +"9 + 41) - 72258/(-24)?\n3\nSuppose -5*p + 8*p - 7756 = -4*b, 0 = p - 4*b - 2580. What is the units digit of p?\n4\nSuppose 0 = 5*w + 5*h - 20, -5*w = 3*h - 1 - 21. Suppose -w*i = u - 145, -289 = -2*u - i + 10. What is the units digit of u?\n0\nSuppose 3*k = -2*r + 26, 3*r - 6 - 15 = -3*k. Let m = 12 + k. Suppose -h + m = 4*p, -1 = -2*p - h + 9. What is the units digit of p?\n7\nSuppose 10 = 2*j + 2*a, 4*j + 2*a + 5 - 19 = 0. What is the tens digit of (225/10)/(j/12)?\n3\nLet t(r) = 8*r + 6. Suppose 2*d = -7 + 5. Let g(b) = -b. Let p(x) = d*t(x) - 3*g(x). What is the tens digit of p(-4)?\n1\nSuppose 25*l - 23*l = 1564. What is the units digit of l?\n2\nSuppose 292*b = 282*b + 13080. What is the thousands digit of b?\n1\nLet s(q) = q**3 + 6*q**2 + 3*q + 5. Let p be s(-4)." +"m = 7*m - x - 20 for m.\n4\nSolve 3*v + 3 = -0*v, 489 = 2*l + 38*v + 469 for l.\n29\nSolve -3*p + 62028 = 3*s + 61941, 0*s = -23*p - s - 15 for p.\n-2\nSolve -7*n + 3*n = 11*m - 12, -5*m - 9 = 4340*n - 4343*n for m.\n0\nSolve 0 = -459*u + 463*u - 4*a - 8, 2*a = 5*a - 3 for u.\n3\nSolve -3*n = -2*m - 6*n - 39, n + 134 - 123 = 0 for m.\n-3\nSolve -3*s - 145*p - 195 = -2*s + 4*s - 142*p, 0 = -4*p - 13*p for s.\n-39\nSolve -3*t + w - 8 = 14, -2*t - 248 = 2*t - 3*t - 13*w for t.\n-1\nSolve 0 = 2*c + 3*a - 17, 943*a + 7 = 4*c + 940*a for c.\n4\nSolve -h = 9061*l - 9048*l + 205, -4*h + 3*l = -60 for h.\n3\nSolve -q + 2*q - 44 = 2*s, 2*s + 70*q - 19 = -63 for s.\n-22\nSolve -3*p - 48 = 5*n, 0 = -3*p -" +"rue\nIs 1026966823 prime?\nTrue\nIs 6615821 composite?\nTrue\nIs 44534639 a prime number?\nTrue\nIs 2316736211 a composite number?\nFalse\nIs 267168169 a composite number?\nTrue\nIs 877860233 a prime number?\nFalse\nIs 16509452353 a prime number?\nFalse\nIs 690411763 a composite number?\nFalse\nIs 40628991629 a composite number?\nFalse\nIs 140510923 a composite number?\nTrue\nIs 6890793373 composite?\nFalse\nIs 3566798819 a composite number?\nTrue\nIs 4977065627 a prime number?\nTrue\nIs 2859679811 a prime number?\nTrue\nIs 2317986257 composite?\nTrue\nIs 603144029365 a composite number?\nTrue\nIs 156925871 a composite number?\nFalse\nIs 13795789727 prime?\nFalse\nIs 137299321 composite?\nTrue\nIs 730336927 prime?\nTrue\nIs 3591847859 composite?\nFalse\nIs 14667732479 a composite number?\nFalse\nIs 4599525169 a prime number?\nFalse\nIs 1905879961 prime?\nFalse\nIs 5407711241 a composite number?\nFalse\nIs 638130665 a composite number?\nTrue\nIs 759231653 a composite number?\nFalse\nIs 3414658561 a prime number?\nTrue\nIs 787994123 prime?\nFalse\nIs 1594080457 composite?\nFalse\nIs 1422473009 prime?\nFalse\nIs 2702570257 composite?\nTrue\nIs 296866561001 a composite number?\nFalse\nIs 82699751 a prime number?\nTrue\nIs 52395966697 prime?\nTrue\nIs 1291500097 composite?\nFalse\nIs 23019417821 composite?\nFalse\nIs 6292109087 composite?\nTrue\nIs 1523827307 a composite number?" +"\n-10000\nLet i = -32193 - -32192.69062. What is i rounded to 2 dps?\n-0.31\nSuppose 5*d + 125129 - 160241 = 181673. What is d rounded to the nearest ten thousand?\n40000\nLet k = -2357.4 - -2351.1912. What is k rounded to two decimal places?\n-6.21\nLet i = 0.1175 + -0.1376. Round i to 3 dps.\n-0.02\nLet h = -3960 - -3977.608. Let o = 34 - 52. Let b = o + h. What is b rounded to 2 dps?\n-0.39\nSuppose -4*c - 5*q + 148 = -327, -3*c - q + 348 = 0. Suppose -c*j + 3855000 = -114*j. What is j rounded to the nearest 1000000?\n4000000\nLet a = 40.9 - 87. Let k = a + 46. Let f = k + 0.172. What is f rounded to 2 decimal places?\n0.07\nLet k = -0.226 + 0.197. Let c = -1491.889 + 1491. Let q = c - k. What is q rounded to 1 dp?\n-0.9\nLet i = -95.58 + -0.42. Let o = i - -96.00001034. Round o to 7 dps.\n0.0000103\nLet f be 0 - 12 - (2169 - 14). Round f to" +"q, 0.4\nLet u = -1885 + 1895. Sort 4, 1/2, u, 2.\n1/2, 2, 4, u\nSuppose -1 + 0 = -g. Suppose -2*t - u + 0 = -4, -5*t - 3*u = -12. Suppose 2*p = -t*p. Sort -5, p, g in increasing order.\n-5, p, g\nLet u be 2 + 6 - 4 - 144/27. Sort -2/5, u, 12/7, 1/4.\nu, -2/5, 1/4, 12/7\nSuppose 0 = -3*v - 2 + 5. Suppose -5*u = -x - 105, u = 5*u - 5*x - 84. Suppose 0 = -t + 25 - u. Put t, 2, v in descending order.\nt, 2, v\nLet n = 47 - 127. Let w = n - -64. Put w, 1, 0, 2/13 in descending order.\n1, 2/13, 0, w\nLet k(p) be the second derivative of -p**5/20 + p**4/6 - p**3/6 - p**2 - 2*p. Let u be k(2). Let n be (-1 + -5)*3/(-9). Put -3, n, u in descending order.\nn, -3, u\nLet a = 5 + -3. Suppose 0 = -4*n - 315 + 287. Sort -2, n, -3, a in increasing order.\nn, -3, -2, a\nLet p be 34/(-8) - 2/(-8)." +"0\nFind the common denominator of -24/14695 and 67/217486.\n1087430\nCalculate the common denominator of 59/22380 and -121/55950.\n111900\nWhat is the lowest common multiple of 9 and 122639?\n1103751\nCalculate the least common multiple of 398655 and 81.\n1195965\nCalculate the smallest common multiple of 31482 and 54.\n31482\nWhat is the common denominator of -69/2204 and 77/18?\n19836\nFind the common denominator of -18/154517 and 35/14047.\n154517\nWhat is the common denominator of -79/66 and -109/8778?\n8778\nWhat is the smallest common multiple of 219948 and 183290?\n1099740\nFind the common denominator of -193/22680 and 73/360.\n22680\nCalculate the least common multiple of 35800 and 1324600.\n1324600\nWhat is the common denominator of 16/9 and 40/34641?\n34641\nWhat is the lowest common multiple of 1130 and 1171584?\n5857920\nFind the common denominator of 37/486 and 179/12852.\n115668\nWhat is the lowest common multiple of 924 and 12144?\n85008\nWhat is the lowest common multiple of 17625 and 75?\n17625\nCalculate the smallest common multiple of 13920 and 32.\n13920\nFind the common denominator of -31/3564 and 47/352.\n28512\nCalculate the smallest common multiple of 64040 and 25616.\n128080\nCalculate the common denominator of 49/10670 and -29/53350.\n53350\nCalculate" +"d.\n1900000\nLet b(k) be the third derivative of 425*k**6/24 - k**4/8 - k**3 - 7*k**2 + 1. Let a be b(-2). Round a to the nearest one thousand.\n-17000\nLet v = 767 + -314. Let z = -0.60416 + -450.50584. Let u = v + z. Round u to 1 decimal place.\n1.9\nLet z = -156 + 35. Let t = 1.46502488 + 119.53496532. Let k = t + z. Round k to 6 decimal places.\n-0.00001\nLet y be (-6)/4 - ((-1575)/14)/1. Suppose 3*k + b + y + 277 = 0, 2*k - 5*b = -253. What is k rounded to the nearest 10?\n-130\nLet h = -0.2427 + 1.6837. Let z = 2.752 - h. Round z to one dp.\n1.3\nLet y(i) = -1083*i**2 - 5*i + 34. Let b(o) = -2165*o**2 - 12*o + 67. Let u(v) = -4*b(v) + 7*y(v). Let z be u(10). What is z rounded to the nearest 100000?\n100000\nLet q(w) = 3*w - 13. Let a be q(3). Let f be (-3)/(-6) + ((-99570)/a - -3). Suppose -y = 3*m - f, -4*y + 24880 = 3*m + y. Round m to the nearest one" +"\nLet l = 11 - 16. Let p be 14 - -1 - (-7 - -6). Let z = -13 + p. Sort 5, z, l in increasing order.\nl, z, 5\nLet f = 9.56 + -12.4. Let c = 0.84 + f. Let i = -0.1 - -0.1. Sort c, 2, i in increasing order.\nc, i, 2\nLet g = 102 + -97. Put g, -3, 3, -5 in increasing order.\n-5, -3, 3, g\nLet l(n) = -6 - 5 - 2 + n. Let m be l(15). Suppose -5*s + a = 9, m*a + 3*a = -4*s + 16. Sort -0.3, s, 2/7.\ns, -0.3, 2/7\nLet l = 913 + -909. Put -5, -1, 0, l in decreasing order.\nl, 0, -1, -5\nSuppose 9 = 3*d - 6. Suppose d*x = 3*x. Put x, 2/7, -6, -1 in descending order.\n2/7, x, -1, -6\nLet y = -155/4 + 157/4. Sort 14/9, -5, y in increasing order.\n-5, y, 14/9\nLet v = 530 - 535. Let s be (3 - 1) + 2 + -8. Put 3, v, 0, s in ascending order.\nv, s, 0, 3\nLet t be (-25)/(-9)" +"7*f + 3*w, 672 = -34*f + 4*w for f.\n-20\nSolve 0 = -d + 4*v + 12 + 14, -13*d + 0*v - 30 = -13*d - 15*v for d.\n34\nSolve 0 = 2*z + 4*v + 88, 325*v = z - 43801 + 35997 for z.\n4\nSolve 9*d + 4*a = 178, 4*d - 2081500 + 2081444 = 4*a for d.\n18\nSolve -2*y = 2*q - 0*q + 82, 15203*q + 16*y + 656 = 15205*q for q.\n0\nSolve p - 2 = 0, 107 = -7*x + p + 270 - 137 for x.\n4\nSolve 0 = -g - 4*h + 17735 - 17856, 102 = 3*g - 3*h for g.\n3\nSolve 1691*h - 73 = -5*j + 1690*h, -29*h = j - 101 for j.\n14\nSolve -5*o - 39 + 16 = -19*h, -h + 2*h + 0*o = -2*h + 2*o for h.\n2\nSolve m = 5*m + 3*f + 9, 66*m - 5*f + 16 + 405 = 0 for m.\n-6\nSolve 0 = 3*d + 3*z + 15, 19*z - 31 = -d + 27*z for d.\n-1\nSolve -2*y - 3*p =" +"a multiple of 37?\nFalse\nLet i be (-67 - -7)*1/2. Let j(b) = -3*b - 62. Let f be j(-35). Let k = f - i. Is k a multiple of 14?\nFalse\nSuppose -17*g + 12*g - 4*x + 8075 = 0, -2*x = -2*g + 3230. Does 85 divide g?\nTrue\nLet k = 48 + -48. Let l = 5 - 22. Is 13 a factor of (-1 + k - l) + 7 + -8?\nFalse\nLet w(y) = y**2 + 9*y + 8. Let l be w(-8). Suppose 2*f + 3*p = -p + 354, -2*f + 4*p + 394 = l. Suppose 2*s - 58 = -m, 5*s = 4*m - 29 + f. Does 5 divide s?\nTrue\nSuppose 0 = -o + 99*w - 102*w + 2344, -6920 = -3*o + 5*w. Is 20 a factor of o?\nTrue\nLet j(s) = -s**3 + 9*s**2 + s - 7. Let c be j(9). Suppose -c*w + 5*w - 171 = 0. Let z = w + -27. Is 4 a factor of z?\nFalse\nLet a(g) = 2*g**2 - 4 - 5*g + 3*g**2 - 6*g**2. Suppose -33*y = -37*y -" +"= -83*q - 588 for q.\n-21\nSolve -94*v - 301 = 451 for v.\n-8\nSolve 61 = -83*g + 1573 + 480 for g.\n24\nSolve -67 = -18*p + 81 + 68 for p.\n12\nSolve -41 = 30*o + 222 + 547 for o.\n-27\nSolve 385 - 38 = 71*u - 150 for u.\n7\nSolve -19*n - 687 = -459 for n.\n-12\nSolve 1496 - 1317 + 4886 = 1013*b for b.\n5\nSolve 563 = 22*q + 145 for q.\n19\nSolve 3*a = -13 - 1 - 25 for a.\n-13\nSolve -19*x + x + 0 + 18 = 0 for x.\n1\nSolve -245*r = -176*r for r.\n0\nSolve -100204*c = -100242*c - 494 for c.\n-13\nSolve 163*o - 1488 = -458 + 763 for o.\n11\nSolve 128 + 260 = 97*s for s.\n4\nSolve 66*y + 1035 = -29*y - 105 for y.\n-12\nSolve -24*r - 509 = 433 - 1398 for r.\n19\nSolve 93*k - 384 = -35*k for k.\n3\nSolve -997*j - 4301 = 3675 for j.\n-8\nSolve 9*v - 21*v + 363 = 21*v for v.\n11" +"2112111\nConvert -459 (base 16) to base 14.\n-597\n10110000001 (base 2) to base 14\n729\nConvert 9412 (base 13) to base 10.\n20464\n23012 (base 4) to base 7\n2033\nConvert 18 (base 12) to base 14.\n16\nWhat is 1280b (base 12) in base 4?\n12030023\nConvert 10320 (base 6) to base 13.\n84c\nConvert 545 (base 6) to base 3.\n21202\nWhat is -3715 (base 16) in base 14?\n-51d3\n-20012 (base 7) to base 13\n-2261\nConvert 2653 (base 8) to base 3.\n1222202\nWhat is -1023 (base 8) in base 10?\n-531\nConvert 8c12 (base 16) to base 14.\nd0d4\nWhat is -1074 (base 15) in base 2?\n-110110011100\n2212 (base 5) to base 3\n102101\nConvert -36993 (base 10) to base 13.\n-13ab8\n174 (base 14) to base 2\n100101010\nWhat is 991 (base 14) in base 8?\n3543\nConvert 439 (base 14) to base 13.\n4c3\nConvert -433 (base 13) to base 7.\n-2044\n11000101 (base 2) to base 5\n1242\nConvert 166 (base 7) to base 14.\n6d\nWhat is 1302210 (base 5) in base 6?\n313053\nConvert e9a (base 15) to base 10.\n3295\nWhat is 101110000110 (base 2) in base" +"ing order.\np, -2, -3, d\nLet v be 22/(-99)*9 - -7. Suppose 7*j = 2*j. Put 2, v, j, -3 in ascending order.\n-3, j, 2, v\nLet c = 3.07 - 0.07. Let n = -2.2 + 5.1. Let w = c - n. Sort 3, -5, w in increasing order.\n-5, w, 3\nLet p be ((-3)/4)/((-5)/(-240)). Let w = -33 - p. Put 2, -3, w in decreasing order.\nw, 2, -3\nLet l = -0.04 - -0.03. Let s = 16.99 - l. Let z = s + -13. Sort -1/4, z, 0.4 in decreasing order.\nz, 0.4, -1/4\nLet a = 2 - 2. Suppose 7 = k + 48. Let y = k + 39. Sort y, a, 1 in ascending order.\ny, a, 1\nLet a be 2/(-3) - (-100)/15. Let z = a + -26. Let i be ((-6)/(-8))/(5/z). Sort i, -5, 4.\n-5, i, 4\nLet l = 2 - 5. Let u(r) = 2*r**3 - 51*r + 8. Let k be u(5). Sort l, -2, k in increasing order.\nl, -2, k\nLet u(z) = z + 23. Let v be u(-18). Suppose -g = v - 8. Suppose" +" highest common divisor of 792117 and 6573807.\n2547\nCalculate the greatest common divisor of 1242927 and 26397.\n63\nWhat is the greatest common factor of 36 and 3603120?\n12\nWhat is the highest common divisor of 1746 and 11012798?\n194\nCalculate the greatest common factor of 831493 and 2171.\n2171\nCalculate the greatest common factor of 580 and 28885160.\n580\nCalculate the greatest common divisor of 42260751 and 27.\n27\nCalculate the greatest common factor of 212896509 and 1498.\n749\nCalculate the highest common factor of 23265800 and 2.\n2\nCalculate the highest common factor of 672 and 3762276.\n84\nWhat is the greatest common divisor of 6340 and 17988799?\n317\nWhat is the greatest common factor of 3036 and 24464847?\n759\nCalculate the greatest common divisor of 31 and 14791619.\n31\nWhat is the highest common divisor of 133 and 6837131?\n133\nCalculate the greatest common factor of 13653 and 10392967.\n1517\nWhat is the highest common factor of 20752 and 118997156?\n5188\nWhat is the greatest common factor of 27036555 and 2262?\n1131\nCalculate the highest common factor of 16125 and 51661125.\n375\nWhat is the greatest common divisor of 65651858 and 34?\n34\nWhat is the highest" +"*s + b*p - 5 = 6*p, -3*s - 5*p = 40 for s.\n-5\nLet q(y) = -3*y**3 + 3*y**2 - y. Let h be q(3). Let f = h + 66. Solve -5*z + 9*u - 4*u - 25 = 0, -5*z + u - f = 0 for z.\n-1\nSuppose -2*x - 16*x = -18. Solve p = -5*h - x, -7*h = -4*h + 4*p - 13 for h.\n-1\nLet s(n) = -n + 15. Let w be s(6). Suppose -w + 6 = -a. Suppose -3*v = 3*h - a, 0 = -v - 4*v - 4*h + 9. Solve j = -v*m + 3*m - 8, 0 = j - 5*m - 13 for j.\n-2\nLet i = 4 + -1. Suppose 5*q + 5*n - 15 = -0*q, i*q - 9 = 5*n. Suppose 0*v - 12 = -q*v. Solve 5*f - 21 = -4*u, 2*f = 4*u + v*f - 6 for u.\n-1\nLet f be 1833/117 - 2/(-6). Solve -3*k = -o + 12, -3*o + 3*k + f = -2*k for o.\n-3\nLet p be (27/6)/(3/(16 + 2)). Suppose 0*x - 3*x + 3*d =" +"4, l in decreasing order.\nl, t, -4\nLet c be (1/(-6))/((-1)/1). Let h = 1/25 + -57/175. Let d be 5/(-3)*25/(-125). Sort h, c, d in decreasing order.\nd, c, h\nLet l(j) = j**3 + 0*j**3 - 10 + j - 2*j**2 + 0*j. Let v be l(3). Suppose 0 = 4*w - v*n - 30, -3*n - 7 = -3*w + 14. Put 5, -5, w in descending order.\nw, 5, -5\nLet y(n) = -735*n + 5140. Let o be y(7). Let d = 3 - 2.9. Let v = -0.08 - -0.1. Sort o, v, d in increasing order.\no, v, d\nLet j = 3 - 3. Let d = j + -0.5. Let o = -2/33 + -7/66. Put o, d, 0.3 in increasing order.\nd, o, 0.3\nLet r be (2/10)/(2/10). Let l(c) = -c**3 + 6*c**2 - 4*c. Let p be l(5). Suppose 4*t + 4*x = -36, 51 = -5*t - 2*x - 0*x. Sort p, t, r in increasing order.\nt, r, p\nLet o be 2/3*(696/(-56) + 12). Sort 5, 1/4, o in increasing order.\no, 1/4, 5\nLet v = -916 + 921. Let h be (-4)/10" +"1.\n65\nCalculate the remainder when 183461 is divided by 323.\n320\nWhat is the remainder when 19641 is divided by 982?\n1\nWhat is the remainder when 32495 is divided by 6494?\n25\nWhat is the remainder when 2085 is divided by 130?\n5\nWhat is the remainder when 9395 is divided by 99?\n89\nCalculate the remainder when 4259 is divided by 3661.\n598\nCalculate the remainder when 1820 is divided by 59.\n50\nWhat is the remainder when 36857 is divided by 1317?\n1298\nWhat is the remainder when 128868 is divided by 16?\n4\nWhat is the remainder when 41650 is divided by 1388?\n10\nWhat is the remainder when 4153 is divided by 150?\n103\nWhat is the remainder when 1404 is divided by 392?\n228\nCalculate the remainder when 9217 is divided by 10.\n7\nWhat is the remainder when 14946 is divided by 21?\n15\nCalculate the remainder when 781 is divided by 81.\n52\nWhat is the remainder when 42897 is divided by 3823?\n844\nWhat is the remainder when 59772 is divided by 636?\n624\nCalculate the remainder when 2790 is divided by 133.\n130\nCalculate the remainder when 3115 is" +"62))/(-818 + 821)?\n248\nSuppose 4*j + f = 75, 47 = 3*j - f - 18. What is the least common multiple of 66 and j?\n660\nLet q(u) = -6 - 1 - 6 - 3 + 15*u. Let b be q(10). Let h = 141 - b. What is the lowest common multiple of 7 and h?\n7\nLet m(u) = -2*u**2 - 10*u + 28. Let k be m(-6). Suppose 22*v + k = 24*v. Let d = 28 + -11. What is the lowest common multiple of v and d?\n136\nSuppose -3*v + w - 4*w + 114 = 0, w - 82 = -2*v. Calculate the lowest common multiple of v and 1564.\n17204\nLet h(p) = p**3 + 3*p**2 - 5*p - 1. Let j be h(-5). Let o = j - -26. Suppose o*s - 4*s = -4. Calculate the lowest common multiple of 5 and s.\n5\nLet b = 1972 - 63097/32. Let n = -6323 + 151777/24. Calculate the common denominator of b and n.\n96\nLet d = -2540871/693292 + 1820/491. What is the common denominator of d and 67/6?\n4236\nLet m(q) = -q**2 - 14*q" +"6. Let x be i(-12). Let l be 3/5 + (x/105)/8. Do 0 and l have the same value?\nFalse\nSuppose 1 = -5*x - 9. Let a(j) = j**2 - 2*j - 1. Let n be a(-1). Are n and x unequal?\nTrue\nLet o = -1192 + 1119. Which is smaller: -77 or o?\n-77\nSuppose -f + 2*u + 262 = 0, u + 300 - 43 = f. Suppose -2*n + j - f = 0, 3*n - 6*n - j - 368 = 0. Let o = n - -870/7. Which is bigger: 1 or o?\n1\nSuppose -20*s - 3968 = 9712. Is -685 at least s?\nFalse\nLet n = 8 + -5. Suppose 5*l = 2*m + n*m, 0 = -5*l. Let d = 2/9319 - 9337/83871. Which is greater: m or d?\nm\nLet x(j) = j**2 - j + 1. Let k(a) = a**3 - 11*a**2 - 10. Let r(t) = -k(t) - 6*x(t). Let h be r(6). Suppose -g = 3*b - 5, 0 = -4*b + g + 4 + 5. Is b less than h?\nTrue\nLet b = 380 + -379.2. Is -16 > b?\nFalse" +"ase 6?\n-223211\nConvert 104031 (base 5) to base 16.\ne39\n-66 (base 8) to base 5\n-204\nConvert 14010 (base 5) to base 3.\n1112212\nWhat is 10042 (base 8) in base 15?\n1355\n-3666 (base 7) to base 16\n-55b\n-1460 (base 8) to base 6\n-3440\n-253a (base 14) to base 11\n-4998\n-69 (base 10) to base 3\n-2120\nConvert 10111111000100 (base 2) to base 14.\n4656\n-8837 (base 10) to base 4\n-2022011\nWhat is -130300 (base 5) in base 16?\n-13d3\nWhat is -8227 (base 15) in base 10?\n-27487\nConvert -3a9 (base 15) to base 10.\n-834\nConvert 349 (base 10) to base 16.\n15d\n13827 (base 14) to base 7\n260450\nWhat is -6250 (base 9) in base 4?\n-1013211\n13120332 (base 4) to base 15\n8e80\nWhat is 323400 (base 5) in base 6?\n123220\n-46b (base 16) to base 11\n-939\n12118 (base 12) to base 14\n8c3a\nc0 (base 16) to base 15\ncc\n-f97 (base 16) to base 5\n-111431\nWhat is -71740 (base 10) in base 5?\n-4243430\nConvert -133011 (base 4) to base 15.\n-8c9\nWhat is 7a4 (base 13) in base 11?\na98\nWhat is" +"77360\nWhat is the lowest common multiple of 323440 and 7800?\n4851600\nWhat is the common denominator of -143/90 and -65/1891839?\n56755170\nCalculate the smallest common multiple of 23896 and 88952860.\n177905720\nWhat is the smallest common multiple of 29087 and 4543?\n2239699\nWhat is the lowest common multiple of 13920 and 1652640?\n47926560\nWhat is the lowest common multiple of 3978 and 376978?\n749809242\nWhat is the least common multiple of 2395265 and 1030?\n4790530\nWhat is the common denominator of -101/678970 and 121/678970?\n678970\nCalculate the common denominator of -149/1218888 and -125/1152.\n19502208\nCalculate the least common multiple of 2 and 1503725.\n3007450\nWhat is the smallest common multiple of 132 and 8201171?\n98414052\nCalculate the least common multiple of 12054588 and 309092.\n12054588\nWhat is the smallest common multiple of 5144280 and 220?\n56587080\nCalculate the least common multiple of 1531411 and 140.\n30628220\nWhat is the smallest common multiple of 168 and 3049452?\n6098904\nCalculate the lowest common multiple of 29616750 and 1200.\n236934000\nWhat is the smallest common multiple of 198044872 and 28?\n1386314104\nWhat is the least common multiple of 630 and 4448?\n1401120\nWhat is the common denominator of -121/3390 and 119/111498?\n62996370" +"58*c + 147*c + 236 for c.\n59\nSolve -15928 = -281*c - 141*c + 60*c for c.\n44\nSolve 161380*m = 161560*m - 4500 for m.\n25\nSolve -185209 + 167884 = 225*g for g.\n-77\nSolve 3754350*r - 3754329*r = 1113 for r.\n53\nSolve -264*h - 32*h - 23463 = 301*h - 3165 for h.\n-34\nSolve -1353 = 3775*l - 88178 for l.\n23\nSolve 7073*i - 469*i - 19314 + 530213 = -76857 for i.\n-89\nSolve 4462*m - 947*m = -2112*m - 416398 for m.\n-74\nSolve -145809 = -3533*u + 2577 for u.\n42\nSolve -57537164*n = -57537058*n - 318 for n.\n3\nSolve 192*w - 76*w - 65*w = 80*w + 638 for w.\n-22\nSolve 4764652*o - 4764630*o + 2684 = 0 for o.\n-122\nSolve 0 = 440*x - 314*x + 558*x - 18468 for x.\n27\nSolve 988*c + 240*c - 43112 = -40*c for c.\n34\nSolve -421*y - 1018*y = 156*y - 9570 for y.\n6\nSolve 53376 - 54804 = -42*y for y.\n34\nSolve -w = -39*w - 39 + 246 + 135 for w.\n9\nSolve 928*o - 2855 = -19559 for o.\n-18" +" 3) to base 7\n-400\n-2358 (base 12) to base 11\n-2a77\nConvert -4814 (base 10) to base 15.\n-165e\nConvert 105541 (base 6) to base 8.\n21545\nConvert 19711 (base 10) to base 2.\n100110011111111\nConvert -1012012 (base 3) to base 7.\n-2351\nConvert -67 (base 9) to base 5.\n-221\nWhat is 200020211 (base 3) in base 4?\n3033322\nConvert 6809 (base 11) to base 16.\n2303\n45000 (base 6) to base 15\n1cc9\nWhat is -38709 (base 10) in base 4?\n-21130311\n7e5 (base 16) to base 10\n2021\n-2501 (base 8) to base 3\n-1211211\nWhat is 112 (base 7) in base 6?\n134\nWhat is 122043 (base 6) in base 2?\n10101001001011\nWhat is 160 (base 15) in base 16?\n13b\nConvert -30311 (base 4) to base 3.\n-1010102\n-1556 (base 8) to base 15\n-3d8\nConvert -474 (base 11) to base 9.\n-687\n23322 (base 9) to base 2\n11110011010100\na5 (base 13) to base 5\n1020\nWhat is 1001110011100 (base 2) in base 13?\n2392\nConvert 250462 (base 7) to base 11.\n31500\nWhat is 101101100010011 (base 2) in base 6?\n255535\nWhat is 423 (base 15) in base 14?\n4a9\nWhat is" +"e sixth biggest value in 1177, -3, -3/11, -34/5, 1, -11?\n-11\nWhat is the sixth smallest value in -0.203, -9, -2/15, 2.8, -5, 2?\n2.8\nWhat is the sixth biggest value in -5, 0.1, -1/2, -8, -12/97, 0?\n-8\nWhich is the second biggest value? (a) -1360 (b) -3 (c) -7.2884\nc\nWhat is the smallest value in 5, 3025, 229?\n5\nWhat is the second smallest value in 5, 0.4, -0.4, -1, 2/3, 0.5, -596445?\n-1\nWhat is the second biggest value in 2, -8262/13, 0.4, -9/4, 1/4?\n0.4\nWhat is the second smallest value in -333, 4/7, 0.5, -4, 0.3, 0.03, 14.8?\n-4\nWhat is the fifth smallest value in -0.389, 28, -2, -0.2, -3, 0, 17?\n0\nWhat is the second smallest value in 17, 4, -16264, -0.76?\n-0.76\nWhat is the second smallest value in -5798/5, -5, 4684?\n-5\nWhat is the smallest value in 1/14, -0.39, -191, 19, -0.5?\n-191\nWhich is the smallest value? (a) -1/20 (b) -0.4 (c) 1157131 (d) -0.2\nb\nWhat is the biggest value in -2/6475, -81.47, 2?\n2\nWhich is the fourth smallest value? (a) 3 (b) -4 (c) -0.2 (d) 203.3 (e) -619\na\nWhich is the" +"ilitres to litres.\n80.13104\nWhat is 11/2 of a micrometer in nanometers?\n5500\nHow many micrograms are there in 147.9801mg?\n147980.1\nHow many minutes are there in 10/9 of a day?\n1600\nWhat is 25975051.2 minutes in weeks?\n2576.89\nHow many millimeters are there in 850386.9 nanometers?\n0.8503869\nHow many millilitres are there in seventeen quarters of a litre?\n4250\nWhat is 4.927517l in millilitres?\n4927.517\nWhat is three fifths of a litre in millilitres?\n600\nWhat is 1/4 of a meter in millimeters?\n250\nHow many weeks are there in 164.8693116us?\n0.000000000272601375\nWhat is 3/40 of a day in seconds?\n6480\nConvert 79.72298ml to litres.\n0.07972298\nConvert 4409.692mm to centimeters.\n440.9692\nWhat is 0.3904181 tonnes in grams?\n390418.1\nConvert 0.8088746 centuries to millennia.\n0.08088746\nWhat is 41.46521 years in centuries?\n0.4146521\nWhat is 483261.4 millilitres in litres?\n483.2614\nHow many months are there in 0.3752608 years?\n4.5031296\nWhat is 1214.211 years in millennia?\n1.214211\nHow many micrograms are there in 64698.36ng?\n64.69836\nHow many grams are there in 277.6592kg?\n277659.2\nHow many hours are there in fourty-three sixths of a week?\n1204\nWhat is 1/10 of a century in years?\n10\nWhat is 26/5 of a gram in milligrams?" +"m. Let k = -5.7 + 1.7. Which is the biggest value? (a) -0.1 (b) 0.5 (c) k (d) z\nb\nLet x = -5978 - -5978.07. Let u = -13 - -12.7. What is the fourth smallest value in u, 1/2, x, 3/5?\n3/5\nLet t be 1/(-2) + (-2695)/98. Let f be (164/t + 6)/(-1). Which is the third biggest value? (a) -31 (b) -0.1 (c) f (d) -3/2\nd\nSuppose 0 = b + 2*g - 5, -52*b + 48*b + 2*g + 10 = 0. Let k = -218899/11 - -19925. Let d = -3566/143 + k. What is the third biggest value in b, d, 0.1, -2?\n0.1\nLet u(w) = 10*w - 57. Let j be u(1). Which is the third biggest value? (a) j (b) -2 (c) -0.1 (d) -1/6 (e) 2/3\nd\nLet f(k) = -k**2 + 3*k + 21. Let m be f(-3). Let z = 20 + -22. What is the biggest value in z, 2, m?\nm\nLet n = -12.1 + 12.148. Let g(l) = l**2 + 1. Let h be g(0). Which is the second smallest value? (a) -0.1 (b) n (c) -2/11 (d) h\na\nLet" +"of 2434427893 to the nearest integer?\n49340\nWhat is 785142552 to the power of 1/3, to the nearest integer?\n923\nWhat is the cube root of 61783056 to the nearest integer?\n395\nWhat is 205641219 to the power of 1/5, to the nearest integer?\n46\nWhat is 56695182 to the power of 1/7, to the nearest integer?\n13\nWhat is the cube root of 39488061 to the nearest integer?\n341\nWhat is the sixth root of 5206125 to the nearest integer?\n13\nWhat is 213954519 to the power of 1/2, to the nearest integer?\n14627\nWhat is the cube root of 101577703 to the nearest integer?\n467\nWhat is the square root of 3901283 to the nearest integer?\n1975\nWhat is the cube root of 668761464 to the nearest integer?\n874\nWhat is 145175627 to the power of 1/4, to the nearest integer?\n110\nWhat is the square root of 5944661029 to the nearest integer?\n77102\nWhat is 57026234 to the power of 1/2, to the nearest integer?\n7552\nWhat is 593338163 to the power of 1/2, to the nearest integer?\n24359\nWhat is 849192476 to the power of 1/4, to the nearest integer?\n171\nWhat is the sixth root" +"ded by 59\n-2953\n6114 divided by -10\n-3057/5\nCalculate 1 divided by 624714.\n1/624714\n1265730 divided by -6\n-210955\nCalculate -44068 divided by 14.\n-22034/7\nCalculate -1217 divided by 15.\n-1217/15\nCalculate -406 divided by -645.\n406/645\nWhat is 211 divided by -3356?\n-211/3356\nWhat is 4396736 divided by -1099184?\n-4\nDivide -283272 by -12876.\n22\n-33156 divided by 12\n-2763\n-5 divided by 162215\n-1/32443\nDivide 459272 by 5.\n459272/5\nDivide 4 by 5200.\n1/1300\nWhat is 14964 divided by -6?\n-2494\nDivide 122460 by -3140.\n-39\nCalculate -20 divided by -3393.\n20/3393\nWhat is 86 divided by -1188?\n-43/594\nWhat is -85 divided by 1748?\n-85/1748\n916980 divided by -348\n-2635\nCalculate -147990 divided by -6.\n24665\nWhat is 1777542 divided by -26?\n-68367\n151086 divided by -1937\n-78\n63000 divided by -70\n-900\nDivide -665804 by 5.\n-665804/5\nWhat is 103 divided by 6010?\n103/6010\nWhat is -88 divided by 13210?\n-44/6605\nCalculate 0 divided by 28662.\n0\nDivide 255 by -46.\n-255/46\nWhat is -895392 divided by -74616?\n12\nDivide -64944 by 64944.\n-1\nCalculate 1 divided by 18410.\n1/18410\nWhat is 852 divided by 852?\n1\nDivide -2060 by 6.\n-1030/3\nCalculate -162434 divided" +"Suppose i - 3*o = -i + 21, -5*i - o = -10. Let g be (-63)/60 - -1 - i/12. Let y = g + 433/1510. Are y and -1 equal?\nFalse\nLet x = 664 - 388. Let j = 307 - x. Is 2 greater than j?\nFalse\nLet t(g) = 10*g - 93. Let v(a) = 5*a - 47. Suppose -16 - 39 = -11*x. Let o(n) = x*v(n) - 3*t(n). Let m be o(9). Is m greater than or equal to -2/7?\nFalse\nLet d = 82/1827 - 852626/19159749. Which is bigger: -1 or d?\nd\nLet b = -41 + -6. Let d be (b/(-4)*2*4)/(-2). Let k = d + 48. Which is smaller: 2/221 or k?\n2/221\nLet n(m) = -8*m**2 + 2*m - 2. Let k be n(3). Suppose -19*c + 23 = 5*d - 20*c, 4*c - 23 = -3*d. Suppose -27 = d*a + 308. Is a equal to k?\nFalse\nLet o(s) = 127*s**2 - 62*s + 62. Let r be o(1). Is 108 < r?\nTrue\nSuppose 4*o + 5*v - v - 20 = 0, o - 2*v = -1. Suppose -k - 6 = -o*k. Suppose" +" -334*l for l.\n-90\nSolve -108818 = 245*l + 2023*l - 21939*l - 521909 for l.\n-21\nSolve 212*y + 347*y = -117 - 442 for y.\n-1\nSolve -7361583*a = -7361587*a for a.\n0\nSolve 1082 - 1903 = 45*s - 3881 for s.\n68\nSolve -13*o = 15*o + 47*o - 56636 + 51686 for o.\n66\nSolve -159*j - 116*j = -28*j - 1121 + 15694 for j.\n-59\nSolve 3237 = -170*u - 5093 for u.\n-49\nSolve -914*x - 964*x + 468049 = -26078*x - 2242351 for x.\n-112\nSolve -36396 = -4856*a - 12116 for a.\n5\nSolve -10899*i - 24 = -10875*i for i.\n-1\nSolve 7206*j - 555780 - 151238 = 236035 - 121569 for j.\n114\nSolve 0 = 292*k - 289 + 11161 + 16295 - 1179 for k.\n-89\nSolve -3800 = 23234*o - 23434*o for o.\n19\nSolve -492*u + 10333 = -16235 for u.\n54\nSolve 361*o + 346*o + 5*o + 33*o - 25330 = 0 for o.\n34\nSolve 19*j - 58 = -620 + 201 for j.\n-19\nSolve -140*p - 3340 = -104*p + 131*p for p.\n-20\nSolve -1121 = 180*z -" +"the lowest common multiple of 210 and 6888?\n34440\nWhat is the least common multiple of 52996 and 6?\n158988\nCalculate the least common multiple of 285975 and 381300.\n1143900\nFind the common denominator of -47/3 and -88/440925.\n440925\nCalculate the least common multiple of 7190 and 58.\n208510\nWhat is the common denominator of 97/164502 and 34/20007?\n1480518\nWhat is the lowest common multiple of 2059 and 4118?\n4118\nCalculate the lowest common multiple of 4 and 670788.\n670788\nCalculate the common denominator of -55/914292 and 38/233.\n914292\nWhat is the least common multiple of 1503 and 30227?\n272043\nFind the common denominator of -7/4 and 85/58054.\n116108\nCalculate the lowest common multiple of 92 and 9016.\n9016\nCalculate the lowest common multiple of 17732 and 88908.\n12713844\nWhat is the lowest common multiple of 33 and 33?\n33\nCalculate the common denominator of 105/52 and -97/838.\n21788\nWhat is the lowest common multiple of 13448 and 164?\n13448\nCalculate the lowest common multiple of 7848 and 300.\n196200\nWhat is the smallest common multiple of 2 and 113858?\n113858\nWhat is the least common multiple of 870317 and 1118979?\n7832853\nWhat is the smallest common multiple of 114920" +"hat is 250 + 2?\n252\nIn base 9, what is -54 - -1?\n-53\nIn base 7, what is -502 + -1?\n-503\nIn base 11, what is -3a + -12?\n-51\nIn base 12, what is -1092 - 2?\n-1094\nIn base 14, what is 795 - -3?\n798\nIn base 9, what is -17 - 2?\n-20\nIn base 3, what is 0 - 10022?\n-10022\nIn base 7, what is 555 - 44?\n511\nIn base 8, what is 47 + -24?\n23\nIn base 9, what is 42 - 118?\n-66\nIn base 16, what is 1d8b - 0?\n1d8b\nIn base 2, what is 1101011 + 10100100?\n100001111\nIn base 10, what is -3 + 505?\n502\nIn base 2, what is -100 - -11010?\n10110\nIn base 15, what is 5 - 13?\n-d\nIn base 7, what is 23 - 1242?\n-1216\nIn base 15, what is -15 - 238?\n-24d\nIn base 10, what is 5 - -811?\n816\nIn base 5, what is -1122 + -2?\n-1124\nIn base 11, what is -2 + -70?\n-72\nIn base 3, what is 102100211 - -10?\n102100221\nIn base 8, what is" +"et z be (-1)/(-2 + (-3 - -6)) + 89. Does 16 divide 22/z - (-319)/4?\nTrue\nLet n(t) = -5*t**3 + 2*t**2 + 3*t - 4. Let x be n(3). Let b = x - -189. Does 16 divide b?\nFalse\nSuppose 3*q - 2 = 2*u + 23, -2*u - 37 = q. Let g = 25 + u. Does 8 divide g?\nTrue\nLet w = 21 + -16. Suppose -2*c + 47 - 17 = 5*o, w*c - 5*o = 5. Let t(l) = 15*l + 2. Is t(c) a multiple of 17?\nFalse\nLet i = 675 - 379. Is i a multiple of 8?\nTrue\nSuppose 2*r - 131 = 43. Suppose -r = 2*j + j. Let g = -23 - j. Is g a multiple of 3?\nTrue\nLet k = -26 + 18. Let a be (k/(-4))/((-3)/(-6)). Suppose 10*d - 18 = a*d. Does 3 divide d?\nTrue\nIs -151 + 143 - (-1428 - 1) a multiple of 29?\nTrue\nLet h be ((-32)/10)/((-3)/15). Suppose -h*t + 180 = -11*t. Let i = 56 - t. Is i a multiple of 8?\nFalse\nIs 12 a factor of 8 +" +"3*b = -6*b + w. Let k = 20 + b. Does 11 divide k?\nFalse\nLet i(j) = 3*j**3 + j**2 - 3*j - 3. Is 13 a factor of i(3)?\nTrue\nLet u = 237 - 167. Suppose -u = 3*y - 346. Is 24 a factor of y?\nFalse\nIs 26 a factor of -1 - (22/4)/((-4)/152)?\nTrue\nLet t be (-1 + (-9)/(-4))*4. Suppose -i - 10 + 39 = -5*k, 2*i - t*k - 58 = 0. Suppose i + 46 = 5*n. Is 6 a factor of n?\nFalse\nLet u(k) = 2*k + 5. Is u(0) a multiple of 3?\nFalse\nSuppose o - g - 43 = -2*g, 0 = 2*o - 5*g - 86. Let f = o + -25. Is f a multiple of 9?\nTrue\nLet t = 118 - 43. Suppose -2*u = 11 + 59. Let a = t + u. Is a a multiple of 15?\nFalse\nLet i be -24*(-1)/(9/12). Is (-238)/(-16) - (-4)/i even?\nFalse\nLet h(d) = 5*d + 3. Does 14 divide h(5)?\nTrue\nDoes 12 divide 156 - 1 - -4*6/8?\nFalse\nSuppose 3*p - 4 = 4*p. Let s =" +"246 and -26/15?\n1230\nCalculate the lowest common multiple of 146 and 4.\n292\nWhat is the lowest common multiple of 252 and 56?\n504\nCalculate the smallest common multiple of 5 and 2.\n10\nCalculate the least common multiple of 1460 and 6.\n4380\nWhat is the common denominator of 5/171 and 5/152?\n1368\nWhat is the common denominator of -82/15 and 61/108?\n540\nWhat is the least common multiple of 11696 and 119?\n81872\nWhat is the common denominator of -71/57 and -95/1212?\n23028\nFind the common denominator of 33/4 and -22/6205.\n24820\nWhat is the common denominator of -61/9 and 1/921?\n2763\nWhat is the common denominator of -173/210 and 143/90?\n630\nCalculate the least common multiple of 5 and 3102.\n15510\nFind the common denominator of 9/314 and 59/21.\n6594\nFind the common denominator of -79/1452 and -74/231.\n10164\nCalculate the common denominator of 12/6181 and 49/2.\n12362\nCalculate the lowest common multiple of 77 and 49.\n539\nWhat is the common denominator of -5/24 and -101/6636?\n13272\nFind the common denominator of 37/12 and -37/59.\n708\nWhat is the common denominator of 109/2852 and -107/14?\n19964\nFind the common denominator of 29/48 and 51/1634.\n39216" +"-1701/310. Let t be (1 + -3)*(-10818)/(-132). Let v = 164 + t. What is the common denominator of u and v?\n22\nLet a = 6611/5 + -1330. Find the common denominator of 14/13 and a.\n65\nSuppose 0 = -3*b + 5*s + 3514 + 1623, -5*b - 2*s = -8572. Calculate the least common multiple of b and 12.\n10284\nLet b = 20 + -29. Let l(f) = -f + 11. Let j = 2 - -24. What is the least common multiple of l(b) and j?\n260\nLet r = -478 - -523. What is the least common multiple of 85 and r?\n765\nLet g(c) = -2*c - 50. Let i be g(0). Calculate the smallest common multiple of (-20)/i*30/1 and 6.\n12\nLet x = 135977/105 + -3887/3. Let z = 1/21 + x. Let g = 2620 + -20921/8. What is the common denominator of z and g?\n40\nWhat is the least common multiple of 16*((1 - -11) + -5) and 56?\n112\nLet g = 15 - 11. Let h(y) = y**2 - 4*y - 3. Let t be h(6). Suppose -18 = 6*w - t*w. What is the smallest" +"14*m. Solve -m*k = 6, t + 3*t + 5*k + 15 = 0 for t.\n0\nLet j = -6 - -14. Suppose j*v = -4*v + 24. Solve -4*t = 7 + 5, -g - t - v = 0 for g.\n1\nLet q(c) = -c**2 + 11*c - 4. Let z be q(10). Let m be z*((-15)/(-9) - 1). Solve 5*h = t + 16, -m*t - 13 = -2*h - h for h.\n3\nSuppose 11 - 2 = 3*s. Let w(z) = 1 + 40*z + 11*z**2 - 9*z - z**3 - 16*z. Let a be w(12). Solve -a + 9 = 5*p + 4*f, 3*f = -s*p - 18 for p.\n-4\nSuppose -13*l = -y - 10*l + 20, -2*y + 4*l = -30. Solve -d = s - 2, -y*d - 4*s + 14 = 1 for d.\n5\nLet x = -28 + 31. Suppose 4*p + x*p - 21 = 0. Solve -8 = -5*v - 4*b, -v + p*b + 2*b - 10 = 0 for v.\n0\nLet o = -20 + 22. Suppose -4*k - 2*t + 20 = 0, 13 = o*k + 5*t -" +"5 + (-30)/50. Let a be (-12)/(-9)*(-9)/(-6). Suppose y*b = -a*b. Is b less than -4/9?\nFalse\nLet k = 167 - 73. Let q = k + -119. Let i be 5 - (2 + 4) - q. Which is smaller: 0 or i?\n0\nLet m be (4/((-8)/(-33)) - 2)/((-1851)/(-1234)). Is 6 equal to m?\nFalse\nLet f = 3031 + -2840. Is f at least as big as 1?\nTrue\nSuppose -2*p - 4*g - 2212 = 0, 0 = -65*p + 70*p - 3*g + 5595. Is -1114 != p?\nTrue\nSuppose 6*x = -3*y, -24 = 4*y + 38*x - 33*x. Which is smaller: -565/33 or y?\n-565/33\nSuppose -z + 3 = 4*r + 4*z, -3*z - 13 = -5*r. Let l(w) = w**3 - 2*w**2 - 1. Let j be l(r). Is j != -1/12?\nTrue\nLet z be 68/42*3 + 16/112. Let f be (-22 - (-20 - -3)) + -2 + 5. Is f < z?\nTrue\nLet s be (172/301)/((-4)/14). Let r be -62 + s + -2 + (7 - 7). Which is bigger: -65 or r?\n-65\nLet k = 16 - 23. Suppose 0 = 82*o -" +"is -11130211200 + 0?\n-11130211200\nIn base 11, what is 3909 - 12a46?\n-a138\nIn base 14, what is -98503 - b88?\n-9928b\nIn base 8, what is 75 - -1142067?\n1142164\nIn base 6, what is -5 - -10520301251?\n10520301242\nIn base 7, what is -113662 + 34261?\n-46401\nIn base 11, what is -1045a4 - -2112?\n-102492\nIn base 16, what is -6482a - -2f?\n-647fb\nIn base 7, what is -211 - -1010032?\n1006521\nIn base 4, what is 1023312212 - -212?\n1023313030\nIn base 4, what is -1002311 - 13002032?\n-20011003\nIn base 2, what is -11001011110100 + 10111101101?\n-10110100000111\nIn base 14, what is -4 + 12d6338?\n12d6334\nIn base 16, what is 1c5 + e5b?\n1020\nIn base 12, what is aa61654 - 3?\naa61651\nIn base 8, what is 0 - -7600124?\n7600124\nIn base 13, what is -412b - -6ba?\n-3741\nIn base 4, what is 3221 - -12022023?\n12031310\nIn base 15, what is 1338683 - -a?\n133868d\nIn base 11, what is -294a11a - 157?\n-294a276\nIn base 2, what is 10110 - 101001101001111011010?\n-101001101001111000100\nIn base 4, what is 1 + -1323311220333?\n-1323311220332\nIn base 14, what is c" +"7 for r.\n2\nLet o be 0/(20*(-10)/(-50)). Solve o = 6*j - 0*j - q - 30, -4*q = -4*j + 20 for j.\n5\nLet l(b) = b**2 - 91*b + 2003. Let y be l(54). Solve -5 = -5*p - y*t + 10, -3*p = -2*t + 11 for p.\n-1\nSuppose 208 = 164*a - 112*a. Solve a*t - 16 = -4*v - 8, 6 = 3*v + 4*t for v.\n2\nSuppose 3*h + 5*n - 7 - 35 = 0, 0 = 5*h - 2*n - 39. Solve 0 = 3*w + 3*z - 4*z - h, -2*z = 2*w - 14 for w.\n4\nLet n(a) = -31*a - 337. Let z be n(-11). Solve -2*k + 4 + 2 = 0, z*k - 20 = 2*m for m.\n-4\nSuppose -2*j - 4 = 0, k = j - 2*j + 10. Suppose -4 - k = -4*q. Suppose y - 10 = -m, -10*m + 14*m - 15 = y. Solve v - 16 - 1 = 5*s, 31 = -q*s - m*v for s.\n-4\nLet o be 12/(-15)*(-5)/(-7)*(-168)/48. Solve 5*x + 71*t - 72*t = 5, -o*t - 10" +"26. Let i(s) = 12*l(s) + y(s). Suppose 8*r = 15*r - 7. Calculate i(r).\n-2\nLet v = -73 - -73. Suppose 3*s - 9 = 10*x - 9*x, 4*x - 5*s + 1 = v. Let i(f) = -f**3 + 6*f**2 + 4*f - 1. Give i(x).\n23\nLet r = -37 + 41. Let v(x) = 13*x**2 - 4. Let j be v(r). Let u(n) = -99*n**3 + j*n**3 - n**2 - 108*n**3 + 1. Calculate u(-1).\n3\nLet x = -7912 + 7898. Let v(f) = 8*f + 27. Give v(x).\n-85\nLet l be (-414)/(-161)*140/60. Let q(w) = -w**3 + w**2 + 29*w - 15. What is q(l)?\n-21\nLet i(s) be the second derivative of -s**3 + 25*s**2/2 + s - 51. What is i(3)?\n7\nLet c(a) be the second derivative of -69*a + 1/20*a**5 - 1/12*a**4 + 0 + 1/6*a**3 - 1/2*a**2. Suppose f = -0*f + 5*p + 12, -18 = -5*f + 4*p. Give c(f).\n5\nLet u(f) = -7*f**2 + f + 4. Let a(b) = -22*b + 152. Let p be a(7). Give u(p).\n-26\nLet v = 52 + -57. Let x be (-24)/(-10)*v/(-2). Let q(b) =" +"alse\nWhich is bigger: 7050 or 7044?\n7050\nWhich is greater: 313 or 404?\n404\nWhich is bigger: 12971 or 12975?\n12975\nIs -9 not equal to -1162/125?\nTrue\nIs -402218 bigger than -402217?\nFalse\nWhich is greater: 148 or -260?\n148\nDoes 0 = -3/7844?\nFalse\nWhich is smaller: -1076 or -1182?\n-1182\nAre 24071 and -130 nonequal?\nTrue\nIs 357/40 at most 3/17?\nFalse\nIs -233024 < -233024?\nFalse\nWhich is smaller: -5640.1 or -1?\n-5640.1\nWhich is smaller: -2/41807 or 2.2?\n-2/41807\nWhich is bigger: 7460 or 7465?\n7465\nIs 3.9 < -7?\nFalse\nIs 1 > 5/13723?\nTrue\nIs 2337285 less than 2337285?\nFalse\nWhich is smaller: -2/30507 or 7?\n-2/30507\nIs -656/9 at most -482?\nFalse\nWhich is bigger: 12249 or 12248?\n12249\nWhich is smaller: -5249589 or -5249588?\n-5249589\nWhich is smaller: 0 or -33/47561?\n-33/47561\nAre 44.66 and 0 unequal?\nTrue\nWhich is smaller: -1.44402 or 2.8?\n-1.44402\nWhich is bigger: 425/48 or 9?\n9\nWhich is greater: 2 or -2/9031?\n2\nIs -2002/701 smaller than -4?\nFalse\nIs -418532/15 at most as big as -27903?\nFalse\nIs -92555 greater than 0.13?\nFalse\nIs -1476 at least as big as -1511?\nTrue\nIs" +", -2*b + r = 3*k + 6 for b.\n-2\nSuppose -6*t + 13 = 1. Let a be t + (5 - 16) - -1. Let n be a/((-6)/(-3)) - -23. Solve -4*x - n + 8 = -z, -z + 3 = -2*x for x.\n-4\nSuppose -5*b - t = -28 + 15, -3*b - 4*t + 1 = 0. Suppose -3*g + 36 = -b*p, -6*g + 8 = -2*g + 4*p. Solve -5*y = 4*s - g, 0 = 2*y - 3*y + 3 for s.\n-2\nSuppose 108 - 185 = -7*n. Solve n*s - 3*l = 8*s + 15, s = -l + 5 for s.\n5\nSuppose 0 = 2*v - v. Suppose -2*c + c - 104 = v. Let x = c - -107. Solve 0 = -3*y + d - x - 2, -3*d = -4*y for y.\n-3\nSuppose -66 = -3*w + 117. Suppose 54*x = w*x - 42. Solve -4*j + r - 2 = -r, -3*j - x = 3*r for j.\n-1\nLet b(s) = -6*s**3 + 2*s**2 + s - 4. Let u be b(2). Let y = u - -47. Solve" +"h - 763 = 704. Suppose 3*o + 542 = -t + h, 2*t - 8 = 0. Let n = -176 + o. Is n composite?\nFalse\nSuppose -27 + 3 = -6*c. Suppose -l - c*d = 12, d - 16 = l + 11. Is (-25236)/l*(-4)/(-6) composite?\nFalse\nIs ((-2)/(-3))/((-64)/(-672)) - -75954 a prime number?\nFalse\nSuppose -3*t - 27 = -2*u, -22 = 23*t - 19*t + 2*u. Let x(n) = -611*n - 12. Is x(t) prime?\nFalse\nLet p(i) = -3*i**2 - 164*i - 354. Is p(-35) a prime number?\nFalse\nLet v = 14060 + -24390. Let l = -5175 - v. Is 1/((-10305)/l + 2) composite?\nFalse\nLet u = 5537 + -3566. Suppose 0 = -2*r + 4*n + 450 + 528, -u = -4*r + 5*n. Is r composite?\nFalse\nLet t(m) = 5*m**2 - 3*m + 82. Let i be t(-11). Suppose -b + 3157 + i = 0. Is b a composite number?\nFalse\nLet l(s) = -s**3 - 2*s + 241. Let m be l(0). Suppose -4*w + 1329 - m = 0. Let z = w + -105. Is z prime?\nTrue\nLet w = -181 +" +"he next term in -144, -279, -414?\n-549\nWhat comes next: -2, -16, -40, -74, -118?\n-172\nWhat comes next: 141, 287, 437, 591, 749?\n911\nWhat is the next term in 53, 207, 463, 821?\n1281\nWhat is next in 8, 29, 86, 197, 380, 653, 1034, 1541?\n2192\nWhat comes next: 289, 595, 901, 1207, 1513, 1819?\n2125\nWhat is the next term in 37, 52, 91, 166, 289?\n472\nWhat comes next: 60, 87, 114, 141, 168?\n195\nWhat is next in -6686, -6687, -6688, -6689, -6690, -6691?\n-6692\nWhat is the next term in 54, 31, 6, -21, -50?\n-81\nWhat is next in -21, -77, -171, -303, -473, -681?\n-927\nWhat is next in 8, 45, 106, 191, 300?\n433\nWhat comes next: -7, -34, -103, -232, -439?\n-742\nWhat is next in 120, 242, 364, 486?\n608\nWhat is next in 542, 540, 536, 530, 522, 512, 500?\n486\nWhat comes next: 47, 88, 129, 170, 211, 252?\n293\nWhat is next in -101, -202, -317, -452, -613, -806, -1037?\n-1312\nWhat is next in 231, 228, 223, 216, 207, 196?\n183\nWhat is the next term in -42, -131, -220?\n-309\nWhat is" +" 21917 - 482261/22. Find the common denominator of w and m.\n176\nLet i = -29 + 51. Let q(k) = k**2 - 7. Calculate the lowest common multiple of i and q(-3).\n22\nLet o = 96 + -37. Suppose 4*a = 29 + o. Suppose -52 + 12 = -5*t. What is the lowest common multiple of a and t?\n88\nWhat is the common denominator of 305/(-55) - (-1)/2 and 21/4?\n44\nLet s = -261239/30 + 8714. Calculate the common denominator of s and -35/18.\n90\nLet q be 16/4 + -2 + -50. Let b = q - -68. Calculate the smallest common multiple of (-8 + 0)/(1 - 2) and b.\n40\nFind the common denominator of 29/11 and 28/(-154) + -1 + 1318/(-132).\n66\nLet y(n) = 2*n + 9. Let a be y(-6). Find the common denominator of 21/8 and (-1194)/(-288) + (-2)/a.\n16\nLet t be (1 - 0) + 0 + 2. Let s(x) = 2*x**2 - 5 - 11*x + 9*x + t. Find the common denominator of s(-3) and 77/6.\n6\nSuppose -5*y - 455 = -70. What is the common denominator of 2/(-7)*y/(-33) and -24?\n3\nLet" +"\nWhat is 846.8588 hours in microseconds?\n3048691680000\nHow many micrometers are there in 26/5 of a centimeter?\n52000\nHow many months are there in 55050.03 years?\n660600.36\nWhat is thirteen fifths of a century in years?\n260\nConvert 3531.764 litres to millilitres.\n3531764\nWhat is 7434.317m in micrometers?\n7434317000\nWhat is 732697.2 minutes in days?\n508.8175\nWhat is one tenth of a kilometer in centimeters?\n10000\nHow many centimeters are there in 0.4360322m?\n43.60322\nHow many years are there in fourty-five halves of a decade?\n225\nHow many nanoseconds are there in 45/4 of a microsecond?\n11250\nConvert 2054.926 kilometers to meters.\n2054926\nHow many months are there in 13/8 of a decade?\n195\nWhat is 11/4 of a meter in millimeters?\n2750\nWhat is 2240.877ml in litres?\n2.240877\nConvert 0.0741464 grams to nanograms.\n74146400\nConvert 27.05735 centimeters to nanometers.\n270573500\nWhat is 64.71118 minutes in milliseconds?\n3882670.8\nHow many tonnes are there in 5500.613 kilograms?\n5.500613\nWhat is 668433.4um in centimeters?\n66.84334\nHow many grams are there in 47.8216 micrograms?\n0.0000478216\nConvert 2813.81ug to milligrams.\n2.81381\nWhat is 57/2 of a decade in months?\n3420\nWhat is 6/5 of a litre in millilitres?\n1200\nConvert 643156.4 centuries to months." +" the greatest common factor of c and 10?\n5\nLet t be (-40)/(-5 + (-1290)/(-260)). Calculate the highest common divisor of t and 40.\n40\nSuppose 5*j - 4*j = 6. Suppose 72 = j*w - 4*w. Suppose -4*t = 2*t - 72. What is the highest common factor of t and w?\n12\nSuppose -10*z + 299 = 59. What is the greatest common factor of 168 and z?\n24\nLet g = -404 + 422. Calculate the greatest common factor of 45 and g.\n9\nLet m(b) = -b**2 + 7*b - 4. Let c be m(6). Suppose -3*l = c*l + 985. Let a = 302 + l. Calculate the highest common divisor of a and 42.\n21\nLet r be ((-11)/(165/(-190)))/((-2)/(-3)). Let s = 23 - r. Calculate the greatest common divisor of 36 and s.\n4\nSuppose 4*x = 4*a + 384 + 20, x - 2*a = 100. Let p = -22 + x. Suppose 0 = 5*o + z - p, z + 27 + 13 = 3*o. What is the greatest common factor of 75 and o?\n15\nSuppose -5*v = -25, 4*v = 5*j - 37 + 2. What is the" +". Let n = 705 + l. Is n composite?\nFalse\nLet p = 29940 - -10661. Is p a prime number?\nFalse\nLet s = -27 - -31. Suppose -3*k - 15 = s*g + 34, 0 = 2*k + 4*g + 26. Let j = k - -54. Is j a prime number?\nTrue\nSuppose -28*q = -141366 - 173326. Is q composite?\nFalse\nLet h(b) = 12*b**2 + 16*b + 35. Is h(9) prime?\nTrue\nLet p(d) = -1183*d + 32. Is p(-11) a composite number?\nTrue\nSuppose -12 = 16*m - 20*m. Suppose -2*p + 3*s = -0*s - 1586, 0 = -m*s - 12. Is p a composite number?\nFalse\nSuppose -2*x + 3*x + 12 = -k, 3*k + 5*x = -36. Let u(g) = -42*g - 15. Let q be u(k). Let n = q + -340. Is n composite?\nFalse\nSuppose -t - 5*u - 13 = -2*t, 0 = 5*u + 5. Let v(i) = 114*i + 1. Is v(t) a prime number?\nFalse\nLet g = -37 + 32. Let u be (2/g)/((-2)/10). Suppose -3*c + 1252 = -u*c - 5*n, 4*c = -5*n + 5033. Is c composite?\nTrue" +" = 43 - 13. Let o = 137 + -67. Suppose 2*m - 565 = -3*y - o, -y - 1195 = -5*m. Calculate the highest common factor of m and h.\n30\nLet s = -557 + 825. Calculate the greatest common divisor of 335 and s.\n67\nLet f = -228 - -294. Calculate the greatest common divisor of f and 110.\n22\nLet o = -27 + 30. Suppose 0 = l + o, 3*y = y - 5*l + 77. Let x = y - 27. Calculate the highest common factor of x and 209.\n19\nSuppose 17*q + 4 = 19*q. Let z = 1 - 1. Suppose b - 5*o + 3 + z = 0, -30 = -2*b - q*o. What is the greatest common divisor of b and 132?\n12\nSuppose 4 = -5*w - 4*u - 0, -4*w + 1 = -u. Suppose 5*k + n - 53 = -w*k, -k = 3*n - 5. What is the greatest common factor of 44 and k?\n11\nSuppose -3*u + 2 = -2*u, -i - 2*u = -224. Let a = 86 + -42. What is the highest common divisor of a" +"ue? (a) 0.2 (b) i (c) 264\nb\nLet u = 71/78 + -14/13. Let w = -14 + 16. What is the fourth smallest value in w, 4, u, 2/11?\n4\nLet k = 2/41 - -37/82. What is the biggest value in 0.1, 1/9, 0.3, k?\nk\nLet r be (-69)/(-23) - (-34)/(-12). Which is the second biggest value? (a) r (b) 11 (c) -0.4\na\nLet b = -0.9 + 5.9. Let x = -85 - -85.1. What is the third smallest value in 1/7, b, x?\nb\nLet v = 3133/5 - 626. Which is the biggest value? (a) v (b) -2/15 (c) -4\na\nLet r = 994 + -993. Which is the smallest value? (a) 89 (b) -0.4 (c) r (d) -0.2\nb\nLet l = -990 - -988. What is the smallest value in 3, l, -5?\n-5\nLet f = -8.6 - -16.7. Let p = f + -8. Let n = -17 - -19. What is the third smallest value in p, -0.2, n?\nn\nSuppose -2*o - 8 = 4*x, 0 = o - x + 3 - 2. Let l be 4*(-3)/6 - (1 - o). What is the" +"y 2.\n120170\nDivide -719438 by 2.\n-359719\nCalculate -105500 divided by -2.\n52750\n252 divided by 21\n12\n34000 divided by -1\n-34000\nWhat is 352084 divided by -46?\n-7654\nDivide 83 by 287.\n83/287\nWhat is 210820 divided by -42164?\n-5\nCalculate -667819 divided by 5.\n-667819/5\n405 divided by 1071\n45/119\n9942 divided by -72\n-1657/12\nDivide -74 by -1234.\n37/617\nDivide 129800 by 2.\n64900\n3 divided by 5301\n1/1767\nDivide 86358 by 20.\n43179/10\n4 divided by -26983\n-4/26983\nCalculate 202 divided by 544.\n101/272\n-1545 divided by 20\n-309/4\n-5 divided by -6012\n5/6012\n1995071 divided by -5\n-1995071/5\nDivide -1481 by 362.\n-1481/362\nWhat is 3151 divided by -145?\n-3151/145\n333216 divided by 6942\n48\n3448 divided by 204\n862/51\nWhat is 4 divided by 8303?\n4/8303\nCalculate 10626 divided by -22.\n-483\nWhat is -45681 divided by 4?\n-45681/4\nWhat is 3563376 divided by 74237?\n48\nWhat is -15433 divided by 5?\n-15433/5\n-59908 divided by -4\n14977\n18583 divided by 18583\n1\n-1026498 divided by -4\n513249/2\nCalculate 98649 divided by -97.\n-1017\n3626526 divided by 982\n3693\nDivide 1511215 by 17779.\n85\nWhat is -2366 divided by -2?\n1183\n46146" +"ve w*x - 18 - 4 = 0 for x.\n2\nSuppose -3*g - 4*w + 132 = 0, -103 - 42 = -4*g + 5*w. Let j be 3*(-1 + g/12). Solve 15 - 15 = j*x for x.\n0\nSuppose -24 = -2*i - 2*p, 24*i - 11 = 23*i - 2*p. Solve i*v = 21*v - 16 for v.\n2\nLet s(q) = q**2 - 5*q + 4. Let k be (-5)/4*(-20)/5. Let z be s(k). Let p be 3 + 7/((-91)/13). Solve 0 = -p*d + z*d - 10 for d.\n5\nLet h be (0 - 8/12) + 2/(-6). Let v be (-3)/2*(-1 + h*1). Suppose -2*z - v*z = p - 16, 5*z - 36 = 4*p. Solve -z*x - x = -20 for x.\n4\nLet k be -18 + 12 + (0 - -5). Let b be 64/14 - (k + (-8)/(-14)). Solve -b*m = -8*m - 12 for m.\n-4\nLet v(m) = -70*m + 6884. Let s be v(98). Solve s*j + 2*j - 156 = 0 for j.\n6\nLet h = 123 + 52. Let k = 177 - h. Solve k = -s + 3 for s." +"e v(7).\n2\nLet h(v) = -3639*v + 25514. Give h(7).\n41\nLet u(r) = -r**2 - 25*r + 10. Calculate u(-26).\n-16\nLet n(f) = -f + 30. Calculate n(29).\n1\nLet b(v) = v**2 - 41*v - 567. What is b(53)?\n69\nLet c(q) = -2*q**2 + 206*q + 1802. Calculate c(112).\n-214\nLet b(h) = -356*h - 2171. Calculate b(-6).\n-35\nLet j(d) = -33*d + 39. What is j(3)?\n-60\nLet k(d) = d**3 + 85*d**2 + 1674*d + 2. Calculate k(-54).\n2\nLet v(y) = -y**3 + 5*y**2 - 35*y + 79. Give v(3).\n-8\nLet b(n) = n**3 + 39*n**2 - 56*n - 650. Calculate b(-40).\n-10\nLet v(k) = 478*k - 2778. Determine v(6).\n90\nLet o(p) = p**3 - 9*p**2 - 23*p - 4. Give o(11).\n-15\nLet u(o) = -49*o - 275. What is u(-6)?\n19\nLet p(w) = w**3 - 72*w**2 - 150*w - 4. Calculate p(74).\n-152\nLet m(g) = -19*g**3 - 4*g. Determine m(-2).\n160\nLet g(o) = -2*o**2 - 15*o - 57. Give g(-12).\n-165\nLet a(l) = -l**3 - 27*l**2 + 140*l + 17. Determine a(5).\n-83\nLet h(j) = -2*j**3 - 25*j**2 - 38*j -" +"n base 16?\n1c30a3\n21c8a (base 14) to base 13\n2b467\n32110213 (base 4) to base 9\n88421\nConvert 6424612 (base 7) to base 16.\nbe54f\nWhat is -5a174 (base 12) in base 7?\n-1013221\nWhat is -162611 (base 10) in base 14?\n-43391\nWhat is 127771 (base 8) in base 4?\n22333321\nWhat is 102621 (base 11) in base 6?\n3305222\nConvert a24 (base 13) to base 10.\n1720\n-1110000110011011 (base 2) to base 16\n-e19b\nConvert -25ca8c (base 13) to base 16.\n-df099\n412337 (base 8) to base 11\n93544\nWhat is -256300 (base 12) in base 7?\n-5126451\nConvert -100103 (base 7) to base 16.\n-41db\n17ab4b (base 12) to base 8\n1446353\nConvert -37242035 (base 8) to base 16.\n-7d441d\nConvert -232033301 (base 4) to base 6.\n-4020545\nWhat is 231113203 (base 5) in base 11?\n647a29\nWhat is 110201012 (base 4) in base 5?\n10142123\nWhat is -233322222 (base 4) in base 5?\n-22240031\n-ece7a (base 15) to base 7\n-6252631\n22334020 (base 5) to base 9\n333300\nWhat is -5c741 (base 13) in base 9?\n-278668\nConvert 1110131242 (base 6) to base 4.\n231331231022\nConvert 100111020 (base 3) to base 11.\n521a\nWhat is" +"ose -d*u = -u + 1320. What is u rounded to the nearest 100?\n-300\nLet f be 33 + 2/(-2)*-3. Let r = 70 + f. Suppose r = 3*o + 2026. What is o rounded to the nearest 100?\n-600\nLet s = 19.04 + -19.039999609. What is s rounded to six decimal places?\n0\nLet a = -0.0355 - -111.5355. What is a rounded to the nearest ten?\n110\nLet w = 1.296000893 + -1.296. Round w to 7 dps.\n0.0000009\nLet x = 24.24 - 27.1. Let p = x - -3. Let u = -0.078 + p. What is u rounded to two dps?\n0.06\nLet j = -9194 + -28796. What is j rounded to the nearest 1000?\n-38000\nLet o = -852.8458351 + 959.84584. Let v = o + -107. Round v to 6 dps.\n0.000005\nSuppose o - 28909995 = -5*l, 28910015 = 5*l - 8*o + 5*o. What is l rounded to the nearest one hundred thousand?\n5800000\nLet g = 979189 - -663717. Let f = g - 1642834.9829. Let i = f + -71. Round i to 3 decimal places.\n0.017\nLet a(r) = -8699999*r**3 - 2*r**2 + 2*r" +"?\n-18*w + 9300\nWhat is the s'th term of 133, 518, 1195, 2164, 3425, 4978?\n146*s**2 - 53*s + 40\nWhat is the c'th term of 652, 671, 706, 757, 824, 907?\n8*c**2 - 5*c + 649\nWhat is the c'th term of -78091, -156214, -234337, -312460, -390583, -468706?\n-78123*c + 32\nWhat is the k'th term of 31, 86, 167, 280, 431, 626, 871?\nk**3 + 7*k**2 + 27*k - 4\nWhat is the k'th term of 681, 699, 729, 771, 825, 891?\n6*k**2 + 675\nWhat is the a'th term of 637, 4955, 16633, 39349, 76781, 132607, 210505, 314153?\n613*a**3 + 2*a**2 + 21*a + 1\nWhat is the y'th term of 10, -155, -428, -809, -1298?\n-54*y**2 - 3*y + 67\nWhat is the y'th term of 378310, 378315, 378320?\n5*y + 378305\nWhat is the v'th term of 435, 766, 1031, 1224, 1339?\n-v**3 - 27*v**2 + 419*v + 44\nWhat is the x'th term of -1108, -1117, -1128, -1147, -1180, -1233, -1312, -1423?\n-x**3 + 5*x**2 - 17*x - 1095\nWhat is the u'th term of -3765, -3756, -3747?\n9*u - 3774\nWhat is the f'th term of 11599, 11517, 11289, 10843, 10107, 9009?" +"+ 29 - (3 - -2).\n20\nWhat is the value of -1888 + 1888 - ((3 - 8) + -1 + 2)?\n4\nWhat is the value of -1 - (-7 + (3 - -5)) - 9?\n-11\n-9 + 7 + -11 + 14\n1\nCalculate 8 + -6 + 3 + 4 - 26.\n-17\nWhat is the value of -161 + 163 - (2 + (1 - 1) - 7)?\n7\nWhat is -2 + -15 + 3 + (-42 + 17 - -36)?\n-3\nEvaluate -3 - (-9 - (-8 - 10) - 5).\n-7\n33 + 18 - (-3 + 39)\n15\nWhat is -5 - (2 + (-13 - -6) + 9)?\n-9\nWhat is 11 - (4 - 18 - -15)?\n10\nWhat is -12 + (34 + -1 - (-1 - 15))?\n37\nWhat is 5 - (7 - 5 - 4) - 4?\n3\n-2 + 0 + -14 + -22 + (5 - -20)\n-13\n-7 - (-7 + (4 - (-6 + 9)))\n-1\n13 - ((13 - -12) + -15)\n3\nWhat is the value of (-63 - 13 - -25) + 33?\n-18\nEvaluate 5 -" +". Let f be b(i). Calculate the least common multiple of 10 and f - (-66)/(5 - 2).\n20\nLet w = 1/588 + -25295/6468. Calculate the common denominator of w and 2 - (-1 + 91/(-10)).\n110\nLet l = -6391/20 - -318. Let p = 152 + -329/2. Find the common denominator of p and l.\n20\nCalculate the common denominator of -101/2 and 2/9 + (-261)/54.\n18\nLet y(z) = -88*z + 7. Let h be y(-8). Let f be (12999/(-9) + -2)/2. Let a = f + h. Find the common denominator of 25/2 and a.\n6\nLet j be (-12)/12488*(-10)/12. Let y = 500871416285329/59700827576124 - 11/1062367919. Let h = y - j. Calculate the common denominator of h and 83/4.\n36\nLet n = -416/9 - -979/18. What is the common denominator of n and -3 - -5 - 190/28?\n42\nLet b = -1945680995/4194408 - 2/524301. Let n = b + 460. Calculate the common denominator of 56/5 and n.\n40\nSuppose -3*l = -1 + 13. Calculate the lowest common multiple of 2 and 3 - (l - -3)/1.\n4\nFind the common denominator of 124/6*(-27)/(-48) and -23/8.\n8\nLet g(o) = -2" +"es 743 divide 10180586?\nTrue\nIs 270686 a multiple of 13?\nTrue\nDoes 37 divide 2328623?\nFalse\nIs 609130 a multiple of 23?\nFalse\nDoes 32 divide 1063296?\nTrue\nDoes 18 divide 222318?\nTrue\nIs 409344 a multiple of 106?\nFalse\nIs 4 a factor of 376461?\nFalse\nIs 37 a factor of 321547?\nFalse\nDoes 7 divide 1758109?\nFalse\nIs 11361525 a multiple of 57?\nTrue\nIs 4364908 a multiple of 94?\nFalse\nIs 32 a factor of 290336?\nTrue\nDoes 73 divide 10152402?\nTrue\nIs 1967637 a multiple of 244?\nFalse\nDoes 518 divide 2928987?\nFalse\nIs 271 a factor of 281840?\nTrue\nIs 14785100 a multiple of 50?\nTrue\nDoes 38 divide 49226?\nFalse\nIs 293922 a multiple of 2?\nTrue\nDoes 579 divide 8767218?\nTrue\nIs 134912 a multiple of 256?\nTrue\nIs 10 a factor of 66568?\nFalse\nIs 722496 a multiple of 284?\nTrue\nIs 2 a factor of 613043?\nFalse\nIs 25 a factor of 11439?\nFalse\nDoes 237 divide 378071?\nFalse\nIs 5 a factor of 1632989?\nFalse\nDoes 197 divide 254017?\nFalse\nIs 897528 a multiple of 7?\nFalse\nDoes 466 divide 3859258?\nFalse\nIs 537433 a multiple of 8?\nFalse" +"pose b*t - 30 = 5*t. Solve -2 = -h, 2*h - t*h - 2 = -4*u for u.\n1\nLet f be (-1*(3 + -5))/(1/2). Suppose 2*y + f*y = 24. Solve -30 = -y*p - 2*v - 8, 4*v + 16 = 4*p for p.\n5\nLet t = -32 - -35. Suppose -4*r + t = -3*r. Solve -r*x + 6 = 0, -4*w - x - 1 = -3 for w.\n0\nLet z be 4/(-6) - (-60)/9. Suppose -z = -j - j. Solve -f + 2 = 2*l - j*l, -l = -2*f + 7 for f.\n5\nLet h = 7 + -2. Suppose h*u - 32 = u. Solve u = -4*j, 2*b - b + 5 = -2*j for b.\n-1\nSuppose 5*j - 2*u - u = 16, 3*j + u - 18 = 0. Let o(h) = -2*h**2 + 11*h + 3. Let b be o(j). Solve 5*g + l + 2 = 0, -5*l + l = 3*g + b for g.\n0\nSuppose -186*v = -158*v - 84. Let k(n) = -n - 2. Let q be (-2)/(-8) - 27/12. Let r be k(q). Solve v*w -" +"1 - -1 - 3) a composite number?\nFalse\nLet u(f) = -580*f + 14. Let p be u(-5). Suppose 6*w + 37 - 8755 = 0. Let l = p - w. Is l a prime number?\nFalse\nLet m(p) = -3*p + 2. Suppose s + 4*s + 22 = 4*t, -5*s - 13 = -t. Let u be m(s). Let j(k) = 15*k + 1. Is j(u) a composite number?\nTrue\nIs 9/(99/(-767822))*2/(-4) a prime number?\nFalse\nLet u(f) = 988*f - 1 - 2 + 6. Let x = -200 - -202. Is u(x) composite?\nFalse\nSuppose -2*q - 8209 = -3*x, 8207 = 3*x - 4*q + 3*q. Is x a prime number?\nFalse\nSuppose -5*j + 995767 = -3*x, 82*x = 5*j + 84*x - 995747. Is j prime?\nTrue\nLet u(a) = a**2 - 13*a - 11. Let f be u(14). Is (-583)/22*(f - (-338)/(-2)) a composite number?\nTrue\nLet t(c) = 57 - 3*c + 47 - 29 + 44. Is t(-25) a composite number?\nTrue\nLet a = 51 + -49. Suppose 2 = -a*l + l. Let d(c) = -498*c + 7. Is d(l) prime?\nFalse\nIs (23/(-46))/((-1)/10) - -461202" +" number?\nTrue\nIs 51289230203 prime?\nTrue\nIs 65608548251 a prime number?\nFalse\nIs 9845149243 prime?\nFalse\nIs 3951179261 a prime number?\nTrue\nIs 707876245 a prime number?\nFalse\nIs 37086672089 a composite number?\nTrue\nIs 13653696521 composite?\nTrue\nIs 9086784683 prime?\nFalse\nIs 27712894249 composite?\nTrue\nIs 1853355187 prime?\nTrue\nIs 19395936613 prime?\nTrue\nIs 5948118353 a composite number?\nFalse\nIs 2912364326 composite?\nTrue\nIs 3960583453 a composite number?\nTrue\nIs 49562037349 prime?\nFalse\nIs 7934290943 prime?\nTrue\nIs 1661497867 a composite number?\nFalse\nIs 18139586611 prime?\nFalse\nIs 537561923 composite?\nFalse\nIs 53776192591 composite?\nTrue\nIs 2574832453 composite?\nFalse\nIs 44445309211 a prime number?\nFalse\nIs 708087433 a composite number?\nFalse\nIs 6523256959 prime?\nFalse\nIs 82293053 a composite number?\nFalse\nIs 538138811 composite?\nTrue\nIs 74648862283 composite?\nFalse\nIs 13661709619 composite?\nTrue\nIs 1161913681 a composite number?\nTrue\nIs 4301477903 a prime number?\nTrue\nIs 4172349 prime?\nFalse\nIs 1217880661 composite?\nFalse\nIs 143755789834 composite?\nTrue\nIs 286329433283 prime?\nTrue\nIs 1742338631 a composite number?\nTrue\nIs 75395662883 a composite number?\nTrue\nIs 442158715 prime?\nFalse\nIs 264996811 a prime number?\nFalse\nIs 5345884693 a prime number?\nTrue\nIs 48354596627 composite?\nTrue\nIs 27447828929 prime?\nFalse\nIs 25266171131" +"u be g(-4). What is the units digit of -14*26/(-16) + u/24?\n2\nLet q(d) = -3*d**3 - 121*d**2 - 43*d - 100. Let h be q(-40). Suppose h*j = 50*j - 39120. What is the tens digit of j?\n0\nLet s = 3384 - 1938. Let r = -933 + s. What is the hundreds digit of r?\n5\nSuppose 0 = -6*s + 2483 + 1453. Suppose -x + f + 625 = 0, -4*x + 2*f + 1854 + s = 0. What is the hundreds digit of x?\n6\nWhat is the thousands digit of ((-325812)/18 + 15)/(3/(-9))?\n4\nLet j(f) = -1388*f + 66. Let x be j(-23). What is the units digit of 2/(-12) + (11 - x/(-60))?\n4\nSuppose -2*h = 14*h + h - 141032. What is the units digit of h?\n6\nLet n(z) = -3*z**3 - 11*z**2 + 95*z - 18. What is the units digit of n(-17)?\n7\nSuppose -24*l + 22*l = 2*w - 13550, 0 = l - 5. What is the units digit of w?\n0\nLet a(z) = -z**3 - 4*z**2 + 12*z - 4. Let o be a(-6). Let l = o -" +" is smaller: 8462/3575 or 1?\n1\nIs -80/595837 greater than -1?\nTrue\nAre -10854.024 and 1/22 nonequal?\nTrue\nWhich is bigger: 1 or -3483/28538?\n1\nWhich is smaller: -6362 or 10/357?\n-6362\nWhich is smaller: -12626601 or -12626597?\n-12626601\nWhich is smaller: 124371249/26 or 4783511?\n124371249/26\nWhich is bigger: 34.425602 or 1?\n34.425602\nWhich is smaller: 29211679 or 29211678?\n29211678\nAre -18 and -6234/349 nonequal?\nTrue\nWhich is bigger: 2.6448251 or 3?\n3\nWhich is smaller: -4569 or -22.2156?\n-4569\nWhich is bigger: -19/2 or -21662169?\n-19/2\nDo 549 and 977282 have different values?\nTrue\nIs -1 bigger than 1296/362573?\nFalse\nWhich is greater: 1 or 389/19488?\n1\nWhich is smaller: 13610303 or 13610302?\n13610302\nIs 29824764 >= 29824758?\nTrue\nWhich is greater: 1 or 1/1349554853?\n1\nWhich is bigger: 0 or -1/363251946?\n0\nIs 76826 at least as big as 77247?\nFalse\nWhich is smaller: 80 or 654287/7?\n80\nDoes 4080763 = 4080763?\nTrue\nAre 0.1 and -2129/567 equal?\nFalse\nAre 313/68023 and -0.2 nonequal?\nTrue\nIs 1784939 <= 19634344/11?\nTrue\nWhich is smaller: -1249 or -79252?\n-79252\nWhich is smaller: 60769 or 60866?\n60769\nIs 6027163 >= 6027156?\nTrue\nIs -24974259.5 bigger than -1?\nFalse\nWhich is smaller:" +"7, 29\nList the prime factors of 264445.\n5, 52889\nList the prime factors of 17447901.\n3, 227, 25621\nList the prime factors of 316314.\n2, 3, 17573\nWhat are the prime factors of 204373?\n13, 79, 199\nWhat are the prime factors of 169744?\n2, 103\nWhat are the prime factors of 75770?\n2, 5, 7577\nWhat are the prime factors of 2491276?\n2, 157, 3967\nList the prime factors of 28492597.\n7, 4070371\nList the prime factors of 160364.\n2, 47, 853\nWhat are the prime factors of 298950?\n2, 3, 5, 1993\nWhat are the prime factors of 542077?\n547, 991\nWhat are the prime factors of 122387?\n122387\nList the prime factors of 5995886.\n2, 13, 230611\nList the prime factors of 2530085.\n5, 71, 7127\nList the prime factors of 959050.\n2, 5, 19181\nList the prime factors of 9720375.\n3, 5, 7, 23\nList the prime factors of 919795.\n5, 183959\nWhat are the prime factors of 91855?\n5, 18371\nList the prime factors of 6926922.\n2, 3, 17, 22637\nWhat are the prime factors of 252057?\n3, 13, 23, 281\nWhat are the prime factors of 306035?\n5, 97, 631\nList the prime" +"rm of -3, 17, 25, 15, -19?\n-r**3 + 27*r - 29\nWhat is the l'th term of 24, 37, 46, 51, 52?\n-2*l**2 + 19*l + 7\nWhat is the h'th term of -16, -25, -22, -1, 44, 119, 230, 383?\nh**3 - 16*h - 1\nWhat is the m'th term of -6745, -6740, -6733, -6724, -6713, -6700, -6685?\nm**2 + 2*m - 6748\nWhat is the b'th term of -3, 1, 9, 21, 37, 57, 81?\n2*b**2 - 2*b - 3\nWhat is the d'th term of -18, -16, -14?\n2*d - 20\nWhat is the b'th term of -170, -169, -168?\nb - 171\nWhat is the g'th term of 40, 149, 336, 607, 968?\ng**3 + 33*g**2 + 3*g + 3\nWhat is the n'th term of -45, -34, -23, -12, -1, 10?\n11*n - 56\nWhat is the d'th term of -37, -73, -169, -355, -661, -1117, -1753, -2599?\n-5*d**3 - d - 31\nWhat is the h'th term of -115, -138, -189, -280, -423, -630, -913, -1284?\n-2*h**3 - 2*h**2 - 3*h - 108\nWhat is the j'th term of -76, -72, -66, -58?\nj**2 + j - 78\nWhat is the z'th term" +"of 58/167733 and 50/11.\n1845063\nCalculate the common denominator of 67/8799 and -61/72906.\n510342\nCalculate the common denominator of 54/791 and -87/199784.\n1398488\nWhat is the common denominator of 46/962777 and 49/296?\n7702216\nWhat is the least common multiple of 396125 and 237675?\n1188375\nWhat is the least common multiple of 40554 and 20?\n405540\nFind the common denominator of 27/2 and 131/17922.\n17922\nWhat is the smallest common multiple of 381744 and 36?\n381744\nFind the common denominator of -52/68849 and -14/3993.\n2272017\nCalculate the common denominator of 25/662528 and 101/496896.\n1987584\nWhat is the common denominator of -47/57744 and -139/43308?\n173232\nWhat is the lowest common multiple of 2046 and 4030?\n132990\nWhat is the common denominator of 167/8430 and 73/4496?\n67440\nWhat is the common denominator of -139/432 and 49/35640?\n71280\nCalculate the least common multiple of 13030 and 28666.\n143330\nWhat is the common denominator of 23/1527 and -37/123?\n62607\nCalculate the lowest common multiple of 795 and 67865.\n10790535\nWhat is the common denominator of 25/24 and -38/66817?\n1603608\nFind the common denominator of -83/89694 and -77/81540.\n896940\nCalculate the least common multiple of 89936 and 89936.\n89936\nFind the common denominator of -47/2064 and" +"n**2 - 2*n - 42. Calculate h(0).\n-42\nLet x(t) = 75*t + 6. What is x(1)?\n81\nLet n(j) = j**2 + 6*j - 27. Calculate n(4).\n13\nLet g(a) = -9*a + 5. Determine g(-4).\n41\nLet a(d) = 4*d**2 + 23*d - 9. Determine a(-7).\n26\nLet z(p) = p + 21. Calculate z(-6).\n15\nLet v(d) = -6*d**2 + d - 2. Give v(-2).\n-28\nLet h(v) = 8*v - 120. What is h(16)?\n8\nLet i(n) = 10*n + 10. Determine i(2).\n30\nLet c(l) = -30*l**2 + l - 1. Give c(-1).\n-32\nLet p(w) = 7*w + 10. What is p(-4)?\n-18\nLet b(f) = 11*f**2 - 2*f. Give b(-1).\n13\nLet g(d) = -28*d + 8. Calculate g(2).\n-48\nLet l(m) = -m + 46. Determine l(16).\n30\nLet y(j) = -j**2 + 8*j - 4. Give y(8).\n-4\nLet q(o) = o**3 + 7*o**2 + 6*o. Give q(-6).\n0\nLet j(z) = 8*z - 23. Determine j(12).\n73\nLet x(u) = u**3 - 5*u**2 + 7*u + 1. What is x(3)?\n4\nLet n(t) = -50*t + 2. Calculate n(1).\n-48\nLet n(u) = -5*u - 2. Give n(4).\n-22\nLet" +"is 1a (base 13) in base 4?\n113\nWhat is 2122 (base 3) in base 10?\n71\nWhat is -6 (base 9) in base 8?\n-6\n32 (base 11) to base 3\n1022\nConvert -4 (base 14) to base 6.\n-4\nWhat is -1 (base 11) in base 15?\n-1\n-4 (base 9) to base 2\n-100\n-252 (base 7) to base 2\n-10000111\nWhat is 11 (base 2) in base 3?\n10\nWhat is 7b (base 16) in base 8?\n173\nWhat is 62 (base 7) in base 10?\n44\nWhat is a1 (base 13) in base 14?\n95\nConvert 13 (base 14) to base 4.\n101\nConvert -11 (base 2) to base 7.\n-3\nWhat is -1001 (base 2) in base 11?\n-9\nWhat is -1002 (base 4) in base 10?\n-66\nWhat is 11 (base 4) in base 11?\n5\nWhat is -4 (base 9) in base 6?\n-4\n-4 (base 8) to base 7\n-4\nWhat is 233 (base 5) in base 8?\n104\n-1010 (base 2) to base 9\n-11\nConvert 122 (base 6) to base 14.\n38\nConvert 0 (base 10) to base 4.\n0\nConvert 23 (base 5) to base 16.\nd\n-21" +". What is the closest to f in 2/5, 2/37, -2/249, 2?\n2/5\nLet y(r) = -r**3 - 16*r**2 + 37*r + 20. Let t be y(-18). Let l be (3 - (5 + t)) + 15/4. Which is the closest to l? (a) -0.3 (b) -5 (c) -3/4\na\nLet f = -480.4 + 542. Let z = -56.6 + f. What is the nearest to -5 in -1/7, -0.2, z, 4/9?\n-0.2\nLet q = 82.05 + -85.05. What is the nearest to 0 in -1.9, q, 0.08, -2?\n0.08\nSuppose 0 = b + b. Suppose -2*t - 9 = t. Let g = -64 - -67. What is the closest to 0.1 in t, g, b?\nb\nLet l = 34053.9 - 34054. Let t be 32/(-66) - 8/(-12). What is the closest to -1/2 in -2, t, l?\nl\nSuppose -18*f + 23*f = 105. Let u be ((f - 14) + -9)*(-2)/(-18). What is the closest to 0.9 in -0.4, 1/2, u, -3/8?\n1/2\nLet n = -15.3 + 2.3. Let k = 6.8355 + -6.4355. Which is the closest to 0.3? (a) -1/5 (b) k (c) n\nb\nLet j = -7677 -" +" of 318368894?\n8\nWhat is the hundred thousands digit of 1590704602?\n7\nWhat is the hundred millions digit of 394268945?\n3\nWhat is the ten millions digit of 465185967?\n6\nWhat is the thousands digit of 50060529?\n0\nWhat is the millions digit of 59992777?\n9\nWhat is the millions digit of 24810886?\n4\nWhat is the thousands digit of 280134016?\n4\nWhat is the ten millions digit of 707408084?\n0\nWhat is the tens digit of 72207141?\n4\nWhat is the hundreds digit of 281658798?\n7\nWhat is the hundred thousands digit of 36555724?\n5\nWhat is the thousands digit of 1336588?\n6\nWhat is the ten millions digit of 256362068?\n5\nWhat is the hundreds digit of 2485736109?\n1\nWhat is the hundred thousands digit of 1074933770?\n9\nWhat is the units digit of 208991556?\n6\nWhat is the hundred thousands digit of 675387606?\n3\nWhat is the units digit of 123299905?\n5\nWhat is the hundred millions digit of 144018234?\n1\nWhat is the thousands digit of 57131054?\n1\nWhat is the units digit of 152461351?\n1\nWhat is the hundreds digit of 21852337?\n3\nWhat is the thousands digit of 45733723?\n3\nWhat is the hundred" +"be t(20). Does z = -905?\nFalse\nLet z be (-5)/20 + 29266/8 + (2 - -5). Is 1 != z?\nTrue\nLet q be ((-2)/3)/(2 + 2552/(-1287)). Suppose -3*u = 68 + 145. Let v = 31 + u. Which is smaller: v or q?\nv\nLet b = -0.48962 - -0.18962. Let n = -3562/3 + 1271. Let m = 83 - n. Which is smaller: m or b?\nm\nLet w = -88/245 - 2/49. Let p = -10979.4 + 10977.65. Which is smaller: p or w?\np\nLet c = -4576 - -4576. Is c equal to -1/427?\nFalse\nLet j = -35 - -133. Let k = 199/2 - j. Which is smaller: 30 or k?\nk\nLet s be (22604/(-22))/((-26)/143). Is 5651 smaller than s?\nFalse\nLet n be 178/3 + (-10)/(-15). Suppose -6*j = -3*j + n. Let a be -48 + j/30 + (-16)/(-6). Which is greater: -47 or a?\na\nLet p = -54 + 62. Suppose -2*i + 5*i = 9, 2*v - p = -2*i. Let j be 80/(-129) - 2/(-3). Is v > j?\nTrue\nLet p be 72/2133*(-135)/(-6). Which is smaller: p or 1?\np\nLet g" +"s 63029 a prime number?\nTrue\nIs 242713873 composite?\nFalse\nIs 756589 prime?\nFalse\nIs 816493 composite?\nTrue\nIs 877530597 a composite number?\nTrue\nIs 98731366 prime?\nFalse\nIs 129836507 composite?\nTrue\nIs 63121123 a prime number?\nFalse\nIs 72132329 a prime number?\nTrue\nIs 625129 prime?\nTrue\nIs 5067511 a composite number?\nFalse\nIs 25085279 a prime number?\nTrue\nIs 2140223 a composite number?\nFalse\nIs 33773689 prime?\nTrue\nIs 87917399 a prime number?\nTrue\nIs 3866855 prime?\nFalse\nIs 835039 composite?\nFalse\nIs 55766803 composite?\nTrue\nIs 3091523 prime?\nFalse\nIs 1728919 a prime number?\nFalse\nIs 16766891 composite?\nFalse\nIs 58368757 a prime number?\nTrue\nIs 19195333 a prime number?\nFalse\nIs 8458202 a prime number?\nFalse\nIs 1521089 prime?\nTrue\nIs 59085211 a prime number?\nFalse\nIs 179352331 prime?\nTrue\nIs 988516015 prime?\nFalse\nIs 4840921 prime?\nTrue\nIs 49775179 prime?\nTrue\nIs 66067663 prime?\nFalse\nIs 143139577 a prime number?\nFalse\nIs 1787371 composite?\nTrue\nIs 17562137 a prime number?\nFalse\nIs 3112859 a prime number?\nTrue\nIs 48583 prime?\nFalse\nIs 59909783 a composite number?\nTrue\nIs 10975834 a prime number?\nFalse\nIs 20859341 composite?\nFalse\nIs 285779887 prime?\nTrue\nIs 491039 prime?\nTrue" +" - 3*v - 35\nLet u(z) = -37*z**2 - 37*z - 12. Let t(j) = -37*j**2 - 36*j - 18. Calculate 2*t(q) - 3*u(q).\n37*q**2 + 39*q\nLet u(s) = 191844*s**3 + 511*s. Let t(v) = -2257*v**3 - 6*v. What is 511*t(n) + 6*u(n)?\n-2263*n**3\nSuppose -2*y - 217 = -4*q - 205, 2*q = 2*y + 12. Let c(a) = -3*a + 7. Let z(b) = b - 4. Calculate y*c(l) - 11*z(l).\n7*l + 2\nLet r(j) = j**3 - 4*j**2 - 8*j - 4. Let u(h) = -3*h**2 - 8*h - 3. Let w(b) = b**2 + 82*b + 85. Let f be w(-81). Calculate f*u(a) - 3*r(a).\n-3*a**3 - 8*a\nLet j(w) = -15*w**2 - 4*w + 3. Let p(h) = -h**2 + h - 1. Let o be (3*40/300)/(4/50). Determine o*p(d) + j(d).\n-20*d**2 + d - 2\nLet f(o) = 3*o - 15. Let d(w) = -6*w + 19. Let h(k) = 2*d(k) + 3*f(k). Let z(l) = 9 + 5*l + 6 - 4. Give -8*h(x) - 5*z(x).\n-x + 1\nLet h(a) = 3*a + 3. Let i(x) = 18. Determine 2*h(c) + i(c).\n6*c + 24\nLet t(c) = -168*c**2 +" +" 1075 = -123*u for u.\n-11\nSolve 289 + 401 = -46*y for y.\n-15\nSolve -6*x + 129 - 141 = 0 for x.\n-2\nSolve -565*u = -22*u - 6437 - 622 for u.\n13\nSolve -1792*u + 1319 - 3051 = 5436 for u.\n-4\nSolve 105*x + 814 = 265 - 396 for x.\n-9\nSolve 217*b - 118*b = -693 for b.\n-7\nSolve 16389 = 1081*w - 474*w for w.\n27\nSolve 26 - 126 = 100*o for o.\n-1\nSolve -8*t - 124 = -32*t + 68 for t.\n8\nSolve -26*s + 142*s = 0 for s.\n0\nSolve -4*p - 4*p + 374 = -30*p for p.\n-17\nSolve 91*r - 822 = 907 for r.\n19\nSolve 252 = 23334*r - 23306*r for r.\n9\nSolve -31383 = -218*g + 1169*g for g.\n-33\nSolve 1213 = -106*h + 259 for h.\n-9\nSolve 26*t + 7348 - 7764 = 0 for t.\n16\nSolve 13*l + 4*l - 2*l = 3*l for l.\n0\nSolve -704*m + 717*m = 52 for m.\n4\nSolve -11*t - 50*t = -29*t + 288 for t.\n-9\nSolve 36*a + 10 -" +" -1814 less than or equal to 313?\nTrue\nDo -749915/3 and -249972 have the same value?\nFalse\nWhich is greater: 637 or 19?\n637\nIs -1462 less than 123?\nTrue\nWhich is smaller: 31917 or 31925?\n31917\nIs 1 greater than or equal to 2/449843?\nTrue\nWhich is smaller: 168 or 386?\n168\nWhich is smaller: 166886 or 166859?\n166859\nWhich is bigger: 493 or 436?\n493\nIs 0 != 1/284478?\nTrue\nWhich is greater: -35708 or -249964/7?\n-35708\nWhich is greater: 2/16143 or 0.042?\n0.042\nIs -1/213750 bigger than 2?\nFalse\nWhich is bigger: -50384 or -50380?\n-50380\nWhich is bigger: -1037 or -524?\n-524\nWhich is bigger: 0 or 46/327?\n46/327\nWhich is smaller: -2257 or -3?\n-2257\nAre 3023 and 1.3 equal?\nFalse\nIs 53187 != -0.1?\nTrue\nWhich is bigger: -2/7 or -1/591670?\n-1/591670\nWhich is bigger: 161109 or 161114?\n161114\nDo -7 and -450/77 have different values?\nTrue\nDoes 51421 = 51400?\nFalse\nIs 13 < -1465?\nFalse\nIs 72328 bigger than 72325?\nTrue\nWhich is smaller: -223412 or -223415?\n-223415\nIs -143 at least 152?\nFalse\nIs -7517489 at least as big as -7517490?\nTrue\nWhich is smaller: -44311/4 or -11078?\n-11078\nWhich is" +"o base 8.\n10505\nWhat is 3b2 (base 16) in base 10?\n946\nConvert -211111 (base 3) to base 4.\n-21133\nConvert -65416 (base 9) to base 12.\n-21106\n322 (base 4) to base 13\n46\nWhat is -35655 (base 9) in base 3?\n-1012201212\nWhat is -11da4 (base 16) in base 2?\n-10001110110100100\n-3032002 (base 4) to base 15\n-3d91\nConvert 28da (base 16) to base 6.\n120230\nWhat is -a (base 15) in base 11?\n-a\n-10010110001101 (base 2) to base 11\n-724a\n816 (base 11) to base 12\n6a1\nWhat is 21011020 (base 3) in base 11?\n3a13\n550 (base 11) to base 10\n660\nWhat is -111010 (base 3) in base 2?\n-101100010\n-a00 (base 11) to base 16\n-4ba\nWhat is -47a22 (base 11) in base 6?\n-1251551\nConvert 2303 (base 4) to base 12.\n12b\n-1101011011101 (base 2) to base 15\n-2087\nWhat is 100101110001 (base 2) in base 3?\n10022112\nConvert -3130302 (base 4) to base 7.\n-56124\nConvert 18722 (base 9) to base 3.\n122210202\n-1012101 (base 3) to base 2\n-1101101010\n11000021002 (base 3) to base 15\n185b8\nWhat is -6044 (base 10) in base 4?\n-1132130\nWhat is -13414 (base" +"o base 8.\n-412603\n1123043 (base 7) to base 8\n422036\nConvert -30221345 (base 8) to base 16.\n-6122e5\nConvert -122121332 (base 4) to base 10.\n-108158\nWhat is 10000110100111111111 (base 2) in base 11?\n347324\n112102102001 (base 3) to base 7\n2261431\nConvert -556244 (base 7) to base 13.\n-35930\n-45200023 (base 6) to base 2\n-101001110001000001111\nWhat is -26029 (base 10) in base 4?\n-12112231\nWhat is -1000110011100110111000 (base 2) in base 15?\n-309026\n-1400505541 (base 6) to base 11\n-955a420\n-3a8953 (base 12) to base 4\n-3230211033\nConvert 14023a (base 12) to base 15.\n6860a\n825810 (base 16) to base 8\n40454020\n-62b990 (base 12) to base 9\n-2828800\nWhat is -447551 (base 9) in base 8?\n-1013332\nConvert 34523053 (base 6) to base 3.\n2000021211020\n4523542 (base 7) to base 4\n2020321201\nWhat is -10111100110000011 (base 2) in base 15?\n-1d97d\nConvert -222cac (base 14) to base 16.\n-11b518\nConvert 88043 (base 11) to base 9.\n214305\n5204331 (base 7) to base 2\n10011000001100101000\nConvert 18422460 (base 9) to base 3.\n122110202112000\nConvert -200100200221 (base 3) to base 9.\n-610627\nWhat is 206001 (base 7) in base 2?\n1000101101011001\nWhat is -213b7 (base 12) in base" +" -18)) + 44.\n33\nCalculate (321 - 363) + (47 - (-5 + 7)).\n3\nCalculate -8 + (47 - (61 + -23 - 13)) - (1 + 57).\n-44\nWhat is the value of (-50 - ((-8 - -3 - -5) + 2 + 1)) + 12?\n-41\nCalculate 25 + 5 - (52 + -31) - (20 - 114).\n103\nCalculate -15 + -37 + 25 + (-44 - -32).\n-39\nEvaluate (1 - -1) + -2 + 33 + 25.\n58\n(3 - 3) + (5 - 6) - (-21 + 0 - -68)\n-48\n(98 - 165) + -80 - -114\n-33\nWhat is 2 + -6 + 3 + (-474 - -471)?\n-4\nEvaluate -1516 + 1479 - (-68 - 1).\n32\nWhat is 13 + 6 + -2 + 190 + -194?\n13\nWhat is -4 + 19 + -24 + (1 - 46) + 55 + -49?\n-48\nCalculate -25 + -1 + -75 + 52 + 25.\n-24\n10 + (-40 - -18 - -29) + -2\n15\nEvaluate -22 + 3 + -19 + (-139 - -135).\n-42\nWhat is 26 + (-3 - (-13 + 9) - -11 - -1)?" +"q = 269 - j. Is q a composite number?\nFalse\nSuppose 380*j - 378*j - 3072 = 0. Let z = j - 998. Is z prime?\nFalse\nLet b be 10 + 18/6 + -1. Suppose -b*t + 6421 + 2831 = 0. Is t a prime number?\nFalse\nLet m(w) = 5*w**2 - 4*w - 11. Let z be m(0). Is (-40636)/z + (-20)/110 a composite number?\nTrue\nLet c be 4/(-22) + 2/11. Let x be (10*1)/(12/2256). Suppose 9*o + 5*r - x = 4*o, c = -2*o - 5*r + 767. Is o composite?\nTrue\nLet u = -36 + 30. Let y be (u - -52)/(2/4). Suppose 2*v + y = 1890. Is v a composite number?\nTrue\nLet n(h) = -4*h + 1089*h**2 + 8*h - 1080*h**2 - 1 - 4*h**3. Is n(-8) a prime number?\nTrue\nLet c(a) = -163 - 693*a + 1300*a - 695*a. Is c(-9) a composite number?\nTrue\nLet l be (3/4)/((-113646)/(-22728) - 5). Let k = 4780 - l. Is k a prime number?\nFalse\nIs 201/603 + 1202136/9 prime?\nTrue\nSuppose 0 = r - 16 - 11. Let u be 6*(-73284)/(-162) - 6/r. Is u/2" +"y = 11 + -7. Suppose -4*r = -3*n - 41, -y*r + 3*n + 55 = r. Let m = r - 11. Solve 4*x = -4*h + 20, m*h - 4 + 1 = 3*x for h.\n3\nLet v(a) = 11*a**3 - 2 + 3 - 7*a - 5*a**2 - 12*a**3. Let h be v(-3). Solve w - 1 - 2 = 0, 2*f + 2*w = -h for f.\n-5\nSuppose 7*z - 2*z = 4*x + 7, 4*z + 7 = -x. Let n be (3 - z)*(-6)/(-24) + 1. Solve -4*u - 17 = -d, -d = -2*u - n*d - 1 for u.\n-3\nLet v(q) = -q**2 - 4*q + 34. Let k be v(4). Solve 0 = 4*p + 3*r + 32, -6*p = -k*p - 5*r for p.\n-5\nLet f be (-28)/(-42)*13*3. Solve 29 = -5*q + c, -4*c + f = -4*q - 10 for q.\n-5\nSuppose 0 = 2*i - i. Let q(h) = h**2 + 3*h + 2. Let c be q(-3). Suppose 2*k = 5*l + 7 + 36, -l = c*k - 37. Solve i = y - 1, -4*g - 4*y =" +"*s, 0 = 5*b - b + s + 6 for b.\n-3\nSolve 2*l - 3*l + 5*a - 8 = 0, 5*l - 3*a = -18 for l.\n-3\nSolve -2*d = -5*j + 24 + 11, 0 = d + 5 for j.\n5\nSolve -p + q = 0, 2*p - 6*q - 5 = -3*q for p.\n-5\nSolve 0 = 3*g + 3*s + 9, -19 = 5*g - 0*g + 3*s for g.\n-5\nSolve o + 8 = -3*h, -28 = -63*o + 68*o + 3*h for o.\n-5\nSolve 3*r = 4*g - 8, -5*r - 29*g - 5 = -34*g for r.\n4\nSolve -3*o - 3*a = -2*o - 10, 2*o + 2*a = 0 for o.\n-5\nSolve 4*q = 2*t - 0*t + 8, -5*t + 4 = -2*q for t.\n2\nSolve 2*r + 10 = 5*r + 2*u, 5*r - 19 = -u for r.\n4\nSolve 5*y + 5*v + 25 = 0, -5*y + 4*v - 10 = -3*y for y.\n-5\nSolve 0 = -u, -134*u - 2 = -s - 135*u for s.\n2\nSolve -i = s, 10 = i" +"19\nEvaluate 198 + -92 + -88 - -33.\n51\nWhat is the value of -389 - -363 - (1 + -7) - 3?\n-23\nWhat is 6 + -100 + 10 + 13 + -40 + 2?\n-109\nEvaluate -2 + 11 - (57 + (-9 + 26 - 2)).\n-63\nWhat is the value of (412 - 414 - (1 + 122)) + (28 - 8)?\n-105\nWhat is the value of -84 - -39 - 13 - (19 - 0)?\n-77\nWhat is 2 + -2 + (0 - 0) + -2 + (40 - -1)?\n39\nEvaluate ((1 - (3 - 1)) + 2 - 8) + -6998 + 7045.\n40\nEvaluate 233 + -212 - (0 - -50).\n-29\nWhat is the value of 9 + 0 + (-14 + 15 - -1)?\n11\nEvaluate 261 + -202 + 4 + -37.\n26\n2 + (4 - 1 - 7) + (32 + 41 - 133)\n-62\nWhat is -1072 + 1073 - ((1 - (-3 + -1 - -3)) + 0)?\n-1\nWhat is -30 + (24 - 18) - (5 - -6)?\n-35\nCalculate -1 + -24 + 0 + -33 + (-8" +" d be n(0). Let c = d + 19. Let u be g(c). Solve -2*w + x - 2 = u, -x - 3 = w for w.\n-3\nLet p(n) = n + 8. Let g be 0/2 - (-7 - -4). Suppose 3*j + g = 2*j. Let w be p(j). Solve -5*x = w*r - 36 - 9, 0 = x - 5 for r.\n4\nLet q be 517/66 + 3/18. Suppose 4*n = k - 19, -4*n + 2*n = k + 5. Solve 2*s + 5 - 12 = 3*t, 0 = -s + k*t + q for s.\n-1\nLet c = 166 - 141. Solve 2*s + 13 = -5*n, s - 5*n + 9 = c for s.\n1\nLet n = -31 + 29. Let x be (-2)/3*n*30/20. Solve 2*s + 5*m - 12 = 0, -3*s = s + x*m - 8 for s.\n1\nSuppose 2*m - 36 = 5*m + 2*g, -5*m - 60 = 3*g. Let r be (2/6*4)/((-8)/m). Solve i + 5*p = -7, -i = r*p - 6*p - 11 for i.\n3\nLet o be 14/(-63) + (-114)/(-27). Suppose -2*d + d =" +"nd 25965.0097 to the nearest ten thousand.\n30000\nWhat is 0.00146753147 rounded to 4 dps?\n0.0015\nRound -0.0004924307 to 4 decimal places.\n-0.0005\nRound -319126557 to the nearest 100000.\n-319100000\nRound -0.00588905176 to 4 decimal places.\n-0.0059\nRound 11.1103454 to 0 decimal places.\n11\nRound -879.845094 to the nearest integer.\n-880\nRound -7.711177 to two decimal places.\n-7.71\nWhat is -34548031.51 rounded to the nearest one hundred thousand?\n-34500000\nRound -599.8532714 to the nearest 100.\n-600\nWhat is -90777243.96 rounded to the nearest one hundred thousand?\n-90800000\nWhat is -0.00048045077 rounded to 6 decimal places?\n-0.00048\nWhat is 88.7862052 rounded to the nearest integer?\n89\nRound -4195.24483 to the nearest one hundred.\n-4200\nRound -2953.067997 to the nearest one thousand.\n-3000\nWhat is 0.0583269242 rounded to 3 dps?\n0.058\nRound -0.01787864619 to 4 decimal places.\n-0.0179\nWhat is -0.0053550573 rounded to six decimal places?\n-0.005355\nRound 45830.3348 to the nearest one hundred.\n45800\nRound 0.0001040011319 to five decimal places.\n0.0001\nWhat is -617.4143212 rounded to 2 decimal places?\n-617.41\nRound 107.74777 to 1 dp.\n107.7\nWhat is -2977255.941 rounded to the nearest one hundred?\n-2977300\nRound -0.11231345132 to 6 dps.\n-0.112313\nRound 0.3184564862 to three dps.\n0.318\nWhat is -380602.67" +"er when 42/(-9)*(-15)/v is divided by 10.\n5\nLet l = 14 - -44. Let b = 320 + -294. What is the remainder when l is divided by b?\n6\nLet v(y) = -26*y + 58. Calculate the remainder when v(0) is divided by 13.\n6\nLet p(c) = -2*c - 6. Let l be p(4). Let f be 1 + 1 + (-196)/l. Let z = f + -6. What is the remainder when z is divided by 4?\n2\nLet x(z) = -2*z + 1. Let i be -32 - (4 - 5)*(2 - 1). Let t = i - -32. What is the remainder when x(-1) is divided by t?\n0\nSuppose -64 + 10 = -9*u. Let m = 145 - 79. Suppose -i = -3*i + m. What is the remainder when i is divided by u?\n3\nSuppose -d = 2*v - 5, d + 2*v - 31 = -2*d. Suppose -2*h - 187 = -d*h. What is the remainder when 42 is divided by h?\n8\nLet a(s) be the third derivative of 7*s**4/24 - s**3/3 - 7*s**2 - 2. Let x = 6 + -1. Calculate the remainder when a(x) is" +"cimal places?\n0.00724\nWhat is 1.0275 rounded to two dps?\n1.03\nWhat is 0.000827 rounded to four decimal places?\n0.0008\nRound -46774000 to the nearest one hundred thousand.\n-46800000\nRound -9.391 to one dp.\n-9.4\nRound -18.9234 to 1 dp.\n-18.9\nWhat is -681.5 rounded to the nearest 10?\n-680\nWhat is 1.347 rounded to zero decimal places?\n1\nWhat is -0.00845 rounded to one decimal place?\n0\nRound -46350 to the nearest 1000.\n-46000\nRound -23380000 to the nearest 1000000.\n-23000000\nWhat is -0.2895 rounded to two decimal places?\n-0.29\nRound 0.00250012 to 5 decimal places.\n0.0025\nRound 0.018195 to 3 decimal places.\n0.018\nWhat is -6821700 rounded to the nearest one million?\n-7000000\nRound -0.04107 to three dps.\n-0.041\nRound -425.18 to the nearest ten.\n-430\nRound 2.57738 to 2 dps.\n2.58\nRound -0.000021767 to seven decimal places.\n-0.0000218\nWhat is -1.157 rounded to one decimal place?\n-1.2\nRound -0.0005 to three decimal places.\n-0.001\nWhat is -0.059595 rounded to 3 decimal places?\n-0.06\nRound -0.006943 to four decimal places.\n-0.0069\nWhat is -0.0000236 rounded to 5 decimal places?\n-0.00002\nWhat is -0.0113544 rounded to three decimal places?\n-0.011\nWhat is -0.001169 rounded to five decimal places?\n-0.00117" +"be -21*(1 + 2)/(-3). Let l be ((-14)/t)/(1/(-66)). Suppose 5*g = -3*n + 56 + 10, 2*n = -2*g + l. Does 14 divide n?\nFalse\nSuppose 0 = -o + 6*o - 100. Let p = o + -18. Suppose 7*x = p*x + 80. Is x a multiple of 4?\nTrue\nSuppose -12*f + 9*f = 3*y - 5649, -2*f + 3772 = -y. Is 42 a factor of f?\nFalse\nLet v(q) = -q**2 - 12*q - 7. Let l be v(-9). Let i = -17 + l. Does 12 divide 48/3*i/4?\nTrue\nLet c = 6 + -2. Suppose 0 = 2*n - c*n + 4. Suppose -42 = -n*s - s. Is s a multiple of 14?\nTrue\nSuppose 0 = f - 5*q + 16, 3*f - q + 15 = 3*q. Let y be 163 - f/((-4)/(-16)). Suppose -11 - y = -2*j. Is 14 a factor of j?\nFalse\nLet q = 1144 + -264. Suppose c + q = 3*z, -8 = -3*c - 2. Does 42 divide z?\nTrue\nLet d = -75 + 109. Suppose -4*i + 98 = -d. Is 3 a factor of i?\nTrue\nIs (-690)/(-45)*282/4" +" is 11 - -113?\n130\nIn base 2, what is 1110010100 + -1000?\n1110001100\nIn base 16, what is 0 + 1e?\n1e\nIn base 4, what is 10 - 1012?\n-1002\nIn base 15, what is 15 + 5?\n1a\nIn base 13, what is 1 + -5a5?\n-5a4\nIn base 5, what is -1 + 24?\n23\nIn base 12, what is -82 - 3?\n-85\nIn base 8, what is -20351 + 1?\n-20350\nIn base 15, what is -4 - 412?\n-416\nIn base 15, what is -32be + -1?\n-32c0\nIn base 7, what is 4 + 364?\n401\nIn base 2, what is -10000 + 10?\n-1110\nIn base 15, what is -2 + 520?\n51d\nIn base 3, what is 2211 + 1?\n2212\nIn base 3, what is -11220212 + -12?\n-11221001\nIn base 15, what is 17 - 14?\n3\nIn base 16, what is 33f - -3?\n342\nIn base 5, what is -403 + -241?\n-1144\nIn base 15, what is -1b57 - -1?\n-1b56\nIn base 7, what is -5 + 1120?\n1112\nIn base 15, what is 0 + 1121?\n1121\nIn base 11, what is 455" +"dreds digit of w?\n4\nSuppose 8*z + 1922 = 7*z + 15924. What is the units digit of z?\n2\nLet n = -587 - -971. What is the hundreds digit of n/(((-3)/14)/(15/(-20)))?\n3\nLet l(c) = c + 1. Let r(j) = j**2 - 19*j + 136. Let g(y) = -2*l(y) + r(y). What is the hundreds digit of g(23)?\n1\nSuppose 0 = -113*p + 438*p - 24474409 + 169609. What is the ten thousands digit of p?\n7\nWhat is the thousands digit of (-1)/10 + (-16 - (-190982)/20)?\n9\nLet h = 989 - -26885. What is the units digit of h?\n4\nLet t(q) = 6 - 16 - 19*q + 14*q**2 + q**3 - 11. Suppose 47*d = 157*d + 1408 + 242. What is the tens digit of t(d)?\n3\nLet g = -45 - -20. Let u(f) = -4*f - 56. Let h be u(g). Suppose 2*y = -2*i + h, -3*i - y - 25 = -89. What is the tens digit of i?\n2\nLet q be -2*(-2)/(4/22). What is the tens digit of (-8)/(-44) + 810/q?\n3\nSuppose b + q - 6248 = 0, -18*b = -12*b" +"False\nIs 6161369 a prime number?\nFalse\nIs 52414001 prime?\nTrue\nIs 97450373 a prime number?\nFalse\nIs 26006947 a prime number?\nTrue\nIs 2110081 a composite number?\nTrue\nIs 70003981 a composite number?\nFalse\nIs 2894483 composite?\nFalse\nIs 175789 prime?\nFalse\nIs 25568819 a prime number?\nTrue\nIs 9197 prime?\nFalse\nIs 18885287 prime?\nTrue\nIs 1142371 a prime number?\nFalse\nIs 178993 prime?\nFalse\nIs 18215051 composite?\nFalse\nIs 117802897 a composite number?\nTrue\nIs 1225459 a composite number?\nFalse\nIs 32670917 a composite number?\nFalse\nIs 228049247 a composite number?\nFalse\nIs 3358633 prime?\nFalse\nIs 9734797 prime?\nTrue\nIs 43927229 composite?\nFalse\nIs 17450291 a prime number?\nFalse\nIs 7701059 a prime number?\nFalse\nIs 8407681 composite?\nTrue\nIs 257947 a prime number?\nTrue\nIs 1305449 prime?\nTrue\nIs 3420367 composite?\nFalse\nIs 2407247 a composite number?\nFalse\nIs 88919741 composite?\nTrue\nIs 8532591 prime?\nFalse\nIs 22092842 prime?\nFalse\nIs 40810481 a composite number?\nFalse\nIs 5797747 a composite number?\nTrue\nIs 10774927 prime?\nTrue\nIs 347086477 a composite number?\nTrue\nIs 16602589 prime?\nTrue\nIs 2286589 composite?\nFalse\nIs 2858551 a prime number?\nFalse\nIs 183769757 a composite number?\nTrue\nIs 267540079 a" +"hat is the common denominator of j and s?\n9\nLet o(w) = -w**2 + w + 1. Let d be o(-1). Let j be 1 + (d - (-1268)/810). Let c = 4/405 - j. What is the common denominator of -2/7 and c?\n63\nLet b be -3*(2 - 222 - 2). Calculate the common denominator of 2 - 1 - 35/(-8) and -1 - -1 - b/60.\n40\nLet r(k) = 2*k - 6. Suppose -2 = -2*n - 2*t - 0, -4 = t. What is the lowest common multiple of r(6) and n?\n30\nLet y(h) = -h**3 + 2*h - 4. Let q be y(4). Let j = -539/9 - q. Let v = 18/331 + -10405/2648. Calculate the common denominator of v and j.\n72\nCalculate the lowest common multiple of 150 and 8 + -5 - -7 - 0/2.\n150\nSuppose 5*x = 3*x - 5*f + 4, 3*x + f - 19 = 0. Suppose 5*s - 23 = w, 3*s - 5*w = 8*s - 35. What is the lowest common multiple of x and s?\n35\nFind the common denominator of (-3)/(-63)*(-582)/4 and 2/7 + (-852)/(-56).\n14\nLet j" +"r p.\n-4\nSolve -14*m = -16*m + 4 for m.\n2\nSolve 4*r + 16 = 16 for r.\n0\nSolve -4263*j + 4267*j = 24 for j.\n6\nSolve 40*a - 31 + 151 = 0 for a.\n-3\nSolve 0 = 7*t + 21*t + 28 for t.\n-1\nSolve 8*q = 42 - 10 for q.\n4\nSolve 106*k = 110*k - 8 for k.\n2\nSolve -8*h + 13*h = -20 for h.\n-4\nSolve 14 = -7*d + 42 for d.\n4\nSolve -67*g = -76*g - 27 for g.\n-3\nSolve -78 = 140*p - 101*p for p.\n-2\nSolve 5*n = 1 + 9 for n.\n2\nSolve -32*w + 15*w - 119 = 0 for w.\n-7\nSolve 5*i = 1864 - 1869 for i.\n-1\nSolve 21 = -7*b - 7 for b.\n-4\nSolve -d - 212 = -216 for d.\n4\nSolve -368*x + 376*x - 16 = 0 for x.\n2\nSolve 0 = -20*r + 8*r + 36 for r.\n3\nSolve 0 = -33*c + 63*c + 90 for c.\n-3\nSolve 54*g = -24*g + 390 for g.\n5\nSolve 9*b + 0*b +" +"Round u to six decimal places.\n-0.000009\nLet f = -31 - -31.07. Let g = f + 0.01. Let p = g + -2.01. What is p rounded to one dp?\n-1.9\nSuppose -9*x = 2*x + 33. Let z be (-660)/1*2/x. Round z to the nearest 100.\n400\nSuppose 7*b + 2000 = -3*b. Let y = -367 + b. Round y to the nearest 100.\n-600\nSuppose 5 = -5*m - 3*q, -4*m + 6 + 22 = -4*q. Suppose 3*g - 16335 - 76080 = -m*v, -4*g - 138580 = -3*v. What is v rounded to the nearest 1000?\n46000\nLet s = -18.3 - -18.0403. What is s rounded to two decimal places?\n-0.26\nLet m = 17.33 + -0.33. Let t = 183.369 - 200.3777. Let y = m + t. What is y rounded to 3 decimal places?\n-0.009\nLet h = 4.057 - 4.1. Let i = h - -0.04368. Round i to four decimal places.\n0.0007\nLet s be -225*(-80)/(-3)*(0 - -165). Round s to the nearest 100000.\n-1000000\nLet c = 0.08288 + -0.0836347. Round c to four decimal places.\n-0.0008\nLet m(i) = 4548*i - 11. Let k be" +" - 4*o - 3. Let k(t) = t**2 - 4*t - 2. Let p(u) = 6*k(u) - 5*l(u). Let x be p(4). Is 2 less than or equal to x?\nTrue\nSuppose -2*r = j + 5, 0 = -3*j - 0*r + r + 20. Suppose 5*s - 5*v + j = s, 4*s - 2 = -2*v. Let n = 26/3 + -9. Is n at most s?\nTrue\nLet v be 2 - 90/22 - -2. Let c = 4/57 + -14/19. Is c at least as big as v?\nFalse\nLet p = -69085/19 - -3635. Do p and -2 have the same value?\nFalse\nLet s be (-14)/10 + 4/10. Suppose -3*p + 16 = 5*v, -2*v - 3 = -1. Let i = p - 10. Which is smaller: s or i?\ni\nSuppose -5*m = -4*m + 5. Let y be (8 + m)/(6/(-4)). Suppose 0 = -0*s + 2*s + 6. Is s at least y?\nFalse\nLet j be (-1)/((-3)/12*2). Suppose -9 = -3*w - 0*n - n, -3*n = -3*w - 3. Let q(o) = o**3 - 3*o**2 + 3*o - 1. Let f be q(w). Which is smaller: f" +"56.5 rounded to the nearest 1000?\n112000\nRound 0.000014026 to 7 decimal places.\n0.000014\nWhat is 2798108 rounded to the nearest one hundred thousand?\n2800000\nRound 10.059282 to one decimal place.\n10.1\nRound 0.1146035 to three dps.\n0.115\nRound -104758.9 to the nearest one hundred.\n-104800\nWhat is 0.42409 rounded to 1 dp?\n0.4\nWhat is -0.00782902 rounded to four dps?\n-0.0078\nRound 0.008224271 to 3 decimal places.\n0.008\nWhat is 0.01808901 rounded to 5 decimal places?\n0.01809\nWhat is 121.30368 rounded to the nearest 10?\n120\nRound -4.265409 to 1 dp.\n-4.3\nRound 0.0000003578673 to seven decimal places.\n0.0000004\nWhat is -0.02309211 rounded to 2 decimal places?\n-0.02\nWhat is 2.23012 rounded to 0 dps?\n2\nRound -1062.52 to the nearest 100.\n-1100\nRound -0.0001295735 to 5 decimal places.\n-0.00013\nWhat is 0.00001583817 rounded to six dps?\n0.000016\nWhat is 621572.6 rounded to the nearest 100000?\n600000\nRound 349964 to the nearest one thousand.\n350000\nWhat is -26618546 rounded to the nearest ten thousand?\n-26620000\nWhat is 14136890 rounded to the nearest 100000?\n14100000\nRound -30709.298 to the nearest ten thousand.\n-30000\nWhat is -0.06600196 rounded to 4 decimal places?\n-0.066\nRound -0.035723353 to five dps.\n-0.03572\nRound -657.5388" +"e f(-9). Suppose i = 1 + u. Calculate the smallest common multiple of i and 8.\n40\nCalculate the common denominator of -13/5 and (-118)/(-36)*84/(-140).\n30\nLet f be (-12)/(-4) - 1/(-1). Suppose -2*y = 8*u - f*u - 60, -66 = -4*u - 5*y. Calculate the smallest common multiple of u and (0 - 12)*2/(-4).\n42\nLet q = 16465 - 197471/12. Suppose 24 + 81 = -3*f. What is the common denominator of (f/18 + 2)*13 and q?\n36\nLet f = 18 + 4. What is the lowest common multiple of 14 and f?\n154\nLet v = -20 + 34. Suppose -5*k + 37 = -23. What is the smallest common multiple of k and v?\n84\nLet s = 5/66 - -38/33. Let f = -23/202 + 1358/6161. Let a = 3723/305 - f. Find the common denominator of s and a.\n110\nCalculate the common denominator of (-3)/(-9)*78/(-40) and -55/48.\n240\nLet j be 2/(-6) + 404/(-3). What is the common denominator of -26 and j/8*2/6?\n8\nSuppose 0 = 5*q - 3*q. Suppose -3*h = -q*h + 4*v - 3, v = 4*h - 4. Suppose j - h = -0. Calculate" +"982*s**2 + 315980*s**2 - 631960*s**2.\n2*s**2\nCollect the terms in -2690846 + 2*t**2 + 2690846.\n2*t**2\nCollect the terms in 11 - 39 + 13 + 15 - 946*i**2.\n-946*i**2\nCollect the terms in 592*o - 36 - 31 + 93 - 26.\n592*o\nCollect the terms in -498 - 3*i - 8*i + i.\n-10*i - 498\nCollect the terms in 78 + 4*h**2 - 24 + 4*h**2 - 9*h**2.\n-h**2 + 54\nCollect the terms in 14*u**2 - u - 9*u**2 + 134 - 67 - 67.\n5*u**2 - u\nCollect the terms in 45391*o + 45390*o - 136173*o + 45394*o.\n2*o\nCollect the terms in 4404 + 771*l - 4404.\n771*l\nCollect the terms in -103 - x + 601 - 1095 + 597.\n-x\nCollect the terms in -25717*k**2 - 9*k**3 + 25719*k**2 + 8*k**3.\n-k**3 + 2*k**2\nCollect the terms in 932*z + 370*z + 2 + 576*z - 479*z.\n1399*z + 2\nCollect the terms in -26*r - 22*r - 22*r - 141*r + 212*r.\nr\nCollect the terms in -2468*m**2 + 825*m**2 + 825*m**2 + 825*m**2.\n7*m**2\nCollect the terms in -59*n**2 + 199*n**2 - 64*n**2 - 79*n**2.\n-3*n**2\nCollect the terms in" +"\n3\nSuppose -5*q - 69 = 2*g - 130, -9 = -3*g. Solve 12*b - b = q for b.\n1\nSuppose 2*o - 466 = -314. Suppose 3*x + 3*k - o = -22, -4*x + 3*k = -107. Solve 4*n = -x + 11 for n.\n-3\nSuppose 2*m + 335 = 333. Let n be (-34)/238 - ((-29)/7 - m). Solve 0 = -n*j + 5*j + 4 for j.\n-2\nLet l = 151 + -101. Solve 63*p = l*p + 65 for p.\n5\nLet d be (-3 - -10) + (-2 - 2/2). Suppose -d*i + 2*m = -2*i - 22, -3*i + 47 = 4*m. Solve -3*c + 2 = -i for c.\n5\nLet b = -259 + 541. Let a = b + -276. Solve -j - j = a for j.\n-3\nLet l(k) = 127*k**2 + 887*k - 6. Let z be l(-7). Solve -6*q = -z*q - 14 for q.\n-7\nLet p(k) = 55*k**2 - 2*k + 3. Let c be p(2). Let g = -214 + c. Solve g*l - 14 = 12*l for l.\n-2\nSuppose -19*x = 61 + 623. Let t be (0" +"actors of 246994083.\n3, 7, 263, 4969\nList the prime factors of 563376771.\n3, 19, 263, 12527\nWhat are the prime factors of 18394492?\n2, 4598623\nList the prime factors of 419367784.\n2, 11, 4765543\nWhat are the prime factors of 1685914237?\n7, 23, 173, 8647\nList the prime factors of 203389332.\n2, 3, 16949111\nList the prime factors of 237746778.\n2, 3, 541, 73243\nList the prime factors of 17866867.\n17866867\nWhat are the prime factors of 62640399?\n3, 20880133\nList the prime factors of 216543251.\n216543251\nWhat are the prime factors of 77128943?\n1471, 52433\nWhat are the prime factors of 94961888?\n2, 7, 43, 9859\nList the prime factors of 335668774.\n2, 7, 17, 1410373\nWhat are the prime factors of 125956173?\n3, 7, 1733, 3461\nList the prime factors of 1283615671.\n13, 23, 330233\nWhat are the prime factors of 217910708?\n2, 54477677\nList the prime factors of 657471856.\n2, 4967, 8273\nWhat are the prime factors of 421041967?\n2543, 165569\nList the prime factors of 4141853265.\n3, 5, 11, 25102141\nList the prime factors of 408002861.\n7, 8326589\nWhat are the prime factors of 628965104?\n2, 39310319\nWhat are the prime factors of 5510929515?\n3," +"g = -3800.2909 + 3781.29. Let u = o - g. Round u to three dps.\n0.001\nLet l = -298.3 - -298.2999859. Round l to 7 dps.\n-0.0000141\nLet k(h) = 134614*h**2 - 14*h + 416. Let m be k(13). What is m rounded to the nearest one hundred thousand?\n22800000\nLet y(g) = -219001*g + 1. Let a(k) = -1. Let t(b) = 3*a(b) + y(b). Let z be t(-2). Round z to the nearest 10000.\n440000\nLet h = 1832.28 + -1870. Round h to the nearest integer.\n-38\nLet m = 48 + -51. Let x be 0 + 6/m - (1129998 + 0). What is x rounded to the nearest 100000?\n-1100000\nLet l = 0.09 + 0.07. Let x = 0.1435 - l. Round x to 3 decimal places.\n-0.017\nLet z = -4.2 + 27.2. Let b = -22.984 + z. What is b rounded to three decimal places?\n0.016\nSuppose 4*h - 2*h + 2*x = 0, 5*x + 18 = 4*h. Suppose 0 = 2*a + 5*v + 7, 0 = -4*a + h*a + v - 13. Let q be 1380*1*4/a. Round q to the nearest one hundred.\n-900\nLet" +"\nHow many nanoseconds are there in 4.175113 days?\n360729763200000\nHow many kilometers are there in 66.89677um?\n0.00000006689677\nHow many millimeters are there in 0.3751695km?\n375169.5\nConvert 797.9616kg to milligrams.\n797961600\nHow many millilitres are there in nine tenths of a litre?\n900\nConvert 9709.817 years to decades.\n970.9817\nHow many grams are there in 19.75167 kilograms?\n19751.67\nConvert 824.4402 centimeters to nanometers.\n8244402000\nWhat is 6/25 of a milligram in micrograms?\n240\nHow many milligrams are there in three eighths of a gram?\n375\nWhat is 36.30313ml in litres?\n0.03630313\nWhat is fourty-three halves of a millennium in centuries?\n215\nHow many minutes are there in 2/9 of a day?\n320\nWhat is 1/4 of a gram in milligrams?\n250\nConvert 86234.3 centuries to months.\n103481160\nWhat is 680.1848 years in months?\n8162.2176\nWhat is 164679.5 decades in years?\n1646795\nConvert 0.0966933 years to months.\n1.1603196\nConvert 9222.789nm to kilometers.\n0.000000009222789\nHow many nanograms are there in seventeen halves of a microgram?\n8500\nWhat is seventeen quarters of a gram in milligrams?\n4250\nWhat is five quarters of a microgram in nanograms?\n1250\nHow many microseconds are there in 9.889972 hours?\n35603899200\nHow many minutes are there in 7/2 of" +"4?\nFalse\nIs 2179459 >= 2179460?\nFalse\nWhich is smaller: -1 or 3/621154?\n-1\nWhich is bigger: 3/68557 or -1?\n3/68557\nIs -8826 greater than -8862?\nTrue\nIs -21250 > -21250?\nFalse\nWhich is greater: 0.0308 or 154?\n154\nWhich is bigger: -8223460 or -8223459?\n-8223459\nWhich is smaller: -2 or 4562863?\n-2\nIs -107859 equal to -107860?\nFalse\nAre -368314 and -1473259/4 equal?\nFalse\nIs -1 less than or equal to 1/837090?\nTrue\nIs -486564 less than -486564?\nFalse\nAre -3/6980083 and 1 non-equal?\nTrue\nWhich is smaller: -27626 or -27625?\n-27626\nIs 3584 at least 3541?\nTrue\nWhich is smaller: 195745 or 195744?\n195744\nWhich is smaller: 27.644 or 1/47?\n1/47\nAre -255/22 and -13 non-equal?\nTrue\nWhich is smaller: -58202 or -58200?\n-58202\nWhich is greater: -147 or -277?\n-147\nWhich is bigger: 2189 or 15318/7?\n2189\nIs -15531 less than -15530?\nTrue\nAre -621 and -810 equal?\nFalse\nIs -13265 bigger than -225502/17?\nFalse\nWhich is smaller: -8 or -1219/187?\n-8\nAre 0 and -4/50047 unequal?\nTrue\nIs 10866 at least as big as 1.7?\nTrue\nWhich is bigger: -255.6 or -88?\n-88\nIs 1 at most 3/56308?\nFalse\nWhich is bigger: 0 or -136507?\n0" +"11, -1/3, -0.5.\n-14, -0.5, -1/3, 0.11\nSort -1/7, 0.38, -47/5.\n-47/5, -1/7, 0.38\nSort 0, -8, 3, 4 in increasing order.\n-8, 0, 3, 4\nPut -1, 1, -13, -5 in ascending order.\n-13, -5, -1, 1\nSort 8, -4, 69 in decreasing order.\n69, 8, -4\nSort -13, 9, 5, -5 in increasing order.\n-13, -5, 5, 9\nSort 1/4, -4/5, -538, 0.\n-538, -4/5, 0, 1/4\nSort -0.71, -0.5, 2/7.\n-0.71, -0.5, 2/7\nPut 0.3, -2.8, 4 in decreasing order.\n4, 0.3, -2.8\nSort -5, -87, 1, 3 in ascending order.\n-87, -5, 1, 3\nSort 1, -8, -13.\n-13, -8, 1\nSort -1, 120, -2, 2 in ascending order.\n-2, -1, 2, 120\nSort 7, 1, -18, 2 in ascending order.\n-18, 1, 2, 7\nSort 13, 25, 3 in ascending order.\n3, 13, 25\nPut 8, -7/5, 5, 2/21, 3 in decreasing order.\n8, 5, 3, 2/21, -7/5\nSort -0.4, 4, 0.663.\n-0.4, 0.663, 4\nPut -12, 15, -9 in increasing order.\n-12, -9, 15\nPut 21, 0.1, -0.4, -2 in increasing order.\n-2, -0.4, 0.1, 21\nSort -2, -105, -3 in increasing order.\n-105, -3, -2\nPut 8, -22, 11 in descending order.\n11," +"23173\nWhat is 70356 divided by 3327?\n23452/1109\nCalculate 793800 divided by 196.\n4050\nWhat is 15944256 divided by 5314752?\n3\n2 divided by -38104740\n-1/19052370\nWhat is -68051192 divided by -1?\n68051192\nCalculate -325 divided by -63754.\n325/63754\nDivide 2 by 117369.\n2/117369\nWhat is -286 divided by 523?\n-286/523\nDivide -3461964 by 45.\n-1153988/15\n-35989 divided by 1341\n-35989/1341\nDivide 0 by -25511901.\n0\nCalculate 14 divided by -696219.\n-14/696219\nWhat is -21 divided by 7846692?\n-1/373652\nCalculate 39828822 divided by -1.\n-39828822\nDivide 2115811 by -29.\n-72959\nCalculate 350301837 divided by 3.\n116767279\n69909522 divided by 34954761\n2\n11765 divided by 1528\n11765/1528\nCalculate 269533821 divided by -692889.\n-389\n-19610 divided by -26\n9805/13\n-3 divided by 67313392\n-3/67313392\n4549649 divided by 22\n4549649/22\nWhat is -165277760 divided by -20659720?\n8\nWhat is -9845553 divided by -518187?\n19\nDivide 4348924 by -1087231.\n-4\n-56108280 divided by 467569\n-120\nWhat is -2354 divided by 3989?\n-2354/3989\nCalculate -334848384 divided by 20046.\n-16704\nCalculate -3244368 divided by 1028.\n-3156\n-131640960 divided by -498640\n264\n-205551536 divided by 12846971\n-16\nCalculate -29075499 divided by 9.\n-3230611\nDivide 10441989 by 9.\n1160221\n0 divided by -30589546\n0\nDivide 13371360 by 2504." +"-43)/7?\nTrue\nLet v(n) be the second derivative of -11*n**3/3 + 15*n**2/2 - 24*n. Is v(-7) a multiple of 13?\nTrue\nLet t = 16 + -16. Suppose -3*j - j + 2*x - 26 = 0, t = 5*j + 3*x + 38. Let f(i) = -i**2 - 12*i - 17. Is f(j) a multiple of 6?\nTrue\nSuppose 12 = 3*j - 51. Let c be j/2*(-12)/18. Does 12 divide 6/14 - 305/c?\nFalse\nLet s = -277 + 160. Let t = 173 + s. Does 8 divide t?\nTrue\nDoes 6 divide 526 + (-14)/(-28) + (-18)/4?\nTrue\nSuppose -v - 3*w + 89 = -2*w, 0 = w - 5. Let k = v + -72. Is k a multiple of 3?\nTrue\nIs (-1512)/(-3 + -1) + -2 + -1 a multiple of 50?\nFalse\nLet i be 75/(-10)*4/(-5). Let u be (-30)/(-8) + i/24. Suppose -u*q - 48 = -8*q. Is 8 a factor of q?\nFalse\nLet h(p) = -p**3 - 12*p**2 - 12*p - 11. Let m be h(-11). Let t = m - -7. Is 7 a factor of t - (-3)/12*0?\nTrue\nLet g = 3 + -3. Suppose" +" (-10)/15 + (-8)/(-3). Suppose -3*a - v + 14 = 0. Suppose 0 = -2*j - c - 103997, -5*c + 261928 = -a*j + 53913. Round j to the nearest 10000.\n-50000\nLet y = -687 - 813. Let k be (y/(-9))/((-1)/(-1500)). Round k to the nearest 100000.\n300000\nLet d = -0.846 + -0.224. Let v = 8516954 + -8516955.0699869. Let t = v - d. What is t rounded to six decimal places?\n0.000013\nLet l = 93.1 + -82. What is l rounded to the nearest integer?\n11\nLet t = 0.0336 - 0.05. What is t rounded to three decimal places?\n-0.016\nLet w = 108.79 + -0.79. Let r = -1350.970737 - -1458.9707323. Let y = w - r. Round y to six dps.\n0.000005\nLet f = 0.2 + 27.8. Let b = 23 + f. Let r = 50.999918 - b. Round r to five dps.\n-0.00008\nSuppose -6*c + 3 = -5*c. Suppose 3*x + 606 = -0*o + c*o, 5*o + 15 = 0. What is x rounded to the nearest 10?\n-210\nSuppose 1740 + 8948 = 3*m - 2*r, r - 17822 = -5*m. Suppose -u = 264" +"- y = -3*y - d. Let s = -255 + 252. Sort s, q, 1.\ns, 1, q\nSuppose 2*x - 52 = -11*x. Let t = 0.88 + -0.08. Let q = t - 1.1. Sort x, -3, q in descending order.\nx, q, -3\nLet r be ((-72)/90)/((-6)/(-15)). Sort -1/21, r, 3/4, 0.1 in increasing order.\nr, -1/21, 0.1, 3/4\nLet d be (-45)/(-75) + 24/10. Let o be ((-162)/135)/(3/(-5)). Put d, o, -5 in decreasing order.\nd, o, -5\nLet q be 10/6 + 2/(-3). Suppose -2*r = -p + 3*r + q, 3*p + 2*r - 3 = 0. Let x = -55 + 50. Put x, p, 2 in decreasing order.\n2, p, x\nLet x = -4 + 7. Let a be 3 - (x/(-3))/(-1). Let y be 27/5 - (-6)/(-15). Put a, y, -4 in descending order.\ny, a, -4\nSuppose f - 4 = 3*l, 2*f + l = -15 + 2. Suppose 8 = 2*r + 4. Sort f, 5, r in ascending order.\nf, r, 5\nLet x be 24/15*5/(-2). Put x, 4, -1, 1 in decreasing order.\n4, 1, -1, x\nSuppose -5*k - 3 = 4*m, 2*m" +"e second smallest value in -0.2, 16, 4/11445, -1/4?\n-0.2\nWhich is the fourth biggest value? (a) 223833 (b) 24 (c) -5 (d) -0.2\nc\nWhat is the fifth biggest value in 31, -2/9, 4, -0.06, -6, -0.3, 878?\n-2/9\nWhat is the biggest value in 5, 1, 202421792?\n202421792\nWhat is the fifth biggest value in -5/3, -385, -0.1, 3, 2/15?\n-385\nWhat is the fifth smallest value in -5347.63, -1/3, -0.1, -1, -2?\n-0.1\nWhat is the sixth biggest value in 0.2, 1/8, -8, -0.002, 2/9, -1, 11?\n-1\nWhat is the smallest value in 3.4, 8.25, 48, -4?\n-4\nWhat is the fifth biggest value in -6/11, 0, 3, -363, -1.55, 0.5, -0.4?\n-6/11\nWhich is the fourth smallest value? (a) 3/31 (b) -475 (c) -0.3 (d) -0.8 (e) 0.26 (f) -1 (g) -4\nd\nWhich is the third smallest value? (a) 0 (b) 6/11 (c) -0.1 (d) 4.5 (e) -29/5 (f) -3/4\nc\nWhat is the second biggest value in -374, 4, -0.3, 1947?\n4\nWhat is the smallest value in -3, -2/5, 2/7, -135, -0.51, 3/2?\n-135\nWhat is the second smallest value in 0.5, -429.8, 2/11, -10, 0, 13/3?\n-10\nWhich is the third" +"et g = -1226 + 7357/6. Which is the biggest value? (a) -0.3 (b) g (c) y\nb\nLet f(x) = x**3 + 12*x**2 - x - 1. Let v be f(-12). Let i = -4 + v. Suppose 2*z - 7 - i = 3*y, -4*z = 4*y + 12. What is the second biggest value in z, 2, -0.5?\nz\nLet v = 4.0299 - 0.0299. What is the second smallest value in -4, -3/16, 0.1, v?\n-3/16\nLet v = -20.5 - -22.5. What is the second smallest value in -0.1, v, 22?\nv\nLet s = -124 + 123.48. Let v = -3.48 + s. What is the second biggest value in -0.19, v, 4?\n-0.19\nLet z be (-1660)/(-275) + (1 + -2)*6. Which is the biggest value? (a) -2/5 (b) z (c) -3\nb\nLet g = -24.5 - -25. Suppose 0 = 2*n, 2*t - 1 = -3*n + 3. Which is the third biggest value? (a) -0.4 (b) g (c) -1 (d) t\na\nSuppose 5*u = 10*u + 55. Let v = u - -9. What is the third biggest value in -0.3, -2/7, v?\nv\nLet o = -2203/33 -" +"570. Suppose -3*g = -p + u. Solve -n - g*n - 15 = 0 for n.\n-5\nSuppose -235 = 2*n - 7*n. Let u = 48 - n. Suppose 8*m - u = 15. Solve -h = -m*h - 1 for h.\n-1\nSuppose -4 = -x - 7. Let m be (-65)/x - 11/(-33). Suppose 3*a - 3*z = 54, 7*z = -2*a + 2*z + m. Solve 7 = -3*f + a for f.\n3\nSuppose -4*j - 10 = 5*v, -v - 10 + 27 = -3*j. Suppose v*t + 3*s = 21, 10*t - 13*t + 34 = 2*s. Let l be (3 - 2) + 2 + 0. Solve l*i + i = -t for i.\n-3\nLet n be (33/3)/(3/9). Solve -27*k + n*k = 6 for k.\n1\nLet r = -323 - -367. Suppose 2 = -2*u, 4*q + r*u - 23 = 43*u. Solve 0 = -q*t + 2*t + 4 for t.\n1\nLet n(g) = g**3 - 43*g**2 + 353*g - 24. Let b be n(32). Solve -29*c - b = -27*c for c.\n-4\nSuppose -18*i + 702 = -5*i. Suppose i*p - 11 = 97." +"be k(4). Suppose a = 2*z + 2*m, 3*z = -z + m + 1389. Is z a multiple of 13?\nFalse\nLet s(i) = -2096*i + 36. Is 7 a factor of s(-2)?\nTrue\nSuppose -2*c - 3*a = -13230, -3*c + 5515 + 14333 = 4*a. Is 32 a factor of c?\nTrue\nSuppose -7 - 3 = -5*t + 3*h, h - 4 = -2*t. Suppose -3*j = 3*g + 2*j - 1195, t*j = -g + 399. Is 11 a factor of g?\nFalse\nSuppose -4*q = 4*v - 20, 4 = 2*q - 0*q. Suppose -v*u = -5*m + 3*m + 430, 0 = 3*m - u - 659. Is m a multiple of 12?\nFalse\nLet f(n) = 2*n + 6 + 8*n - 16*n + n. Is f(-12) a multiple of 22?\nTrue\nSuppose 30*j + 3837792 = 133*j - 47*j. Does 9 divide j?\nFalse\nLet y(g) be the second derivative of -g**4/12 + 3*g**3 - 25*g**2/2 + 13*g. Let w be y(16). Let d = 3 + w. Is 6 a factor of d?\nFalse\nSuppose 4*h - 6 = 2. Suppose -w + 45 = h. Suppose -t = 4*x" +" l, -124*y + 4*i - 33 = -121*y for y.\n-3\nSuppose o - 6 = -3. Suppose -t + 4 + 2 = 0. Let m = 12366 + -12363. Solve 3*a + 6 = -o*r - 2*r, 4*r = -m*a - t for r.\n0\nSuppose 5*d + 4*k = 1044, -d - 5*k = -143 - 70. Let l = 212 - d. Solve 0 = j + 2, -l*j = -x + 2 + 6 for x.\n0\nLet m = 13 + -55. Let u be (126/15)/(10/(-50)). Let v = u - m. Solve y - z + 5 = v, -3*z + 2 = 3*y - 1 for y.\n-2\nSuppose -5*g + 16 = 4*z, 5*z + 3*g - 6*g - 20 = 0. Suppose -490 = 4*c - 18*c. Let d = -32 + c. Solve 0 = 2*h + d*a + 9, z*a + 0*a = 2*h - 12 for h.\n0\nSuppose r = -s + 5, -s = -3*s - 4*r + 14. Solve 4*l - v = 9*l + 7, s = v for l.\n-2\nLet n = 234 - 230. Suppose -n*q + 13 = 5." +"-28.975 + 29.075. Which is the nearest to 2/3? (a) 2/111 (b) -1/2 (c) o\nc\nSuppose -2*p = 3 + 33. Let g be p/15*2/(-3). Let h = -1885 + 1890. Which is the nearest to -1/2? (a) h (b) g (c) -5\nb\nLet w = -233.83 + 234. What is the nearest to -2 in 5, w, 4/3?\nw\nLet q = 0.967 - 0.867. What is the closest to -1/169 in -4, 2/13, 3, q?\nq\nLet f = -52.27 + -0.73. Let p = 0.05 + -58.05. Let y = p - f. What is the nearest to y in 5/2, -0.1, 4/7?\n-0.1\nLet q(k) = 48*k - 1607. Let v be q(34). Which is the closest to v? (a) 11 (b) 4 (c) 0.5 (d) 2/23\na\nLet u = 1742 + -5225/3. What is the closest to u in -15, 1/3, 1.3?\n1/3\nLet h = 22591/44 - 2053/4. What is the closest to 1/5 in 3/5, 32, 1, h?\nh\nSuppose -q = -3*j + 218, 3*j + 2*q = -0*q + 212. Suppose 12*b = 6*b + j. What is the nearest to 1 in 5, 2/7, b?\n2/7\nLet" +"False\nIs 327 a factor of 729236?\nFalse\nDoes 14 divide 270025?\nFalse\nIs 813763 a multiple of 246?\nFalse\nDoes 89 divide 24161542?\nTrue\nDoes 14 divide 4857888?\nTrue\nDoes 384 divide 6329399?\nFalse\nIs 8 a factor of 76720?\nTrue\nDoes 95 divide 2067098?\nFalse\nDoes 53 divide 3696951?\nFalse\nDoes 4 divide 543788?\nTrue\nDoes 221 divide 2924356?\nFalse\nDoes 13 divide 651534?\nTrue\nIs 2560895 a multiple of 16?\nFalse\nDoes 621 divide 1020932?\nFalse\nIs 163350 a multiple of 22?\nTrue\nDoes 20 divide 39440?\nTrue\nIs 2648154 a multiple of 42?\nFalse\nIs 154 a factor of 2294270?\nFalse\nDoes 29 divide 38570?\nTrue\nIs 211130 a multiple of 25?\nFalse\nIs 473082 a multiple of 190?\nFalse\nIs 51 a factor of 106455?\nFalse\nIs 202741 a multiple of 10?\nFalse\nDoes 135 divide 302562?\nFalse\nIs 5391592 a multiple of 449?\nTrue\nIs 2571702 a multiple of 497?\nFalse\nDoes 16 divide 470080?\nTrue\nDoes 22 divide 131890?\nTrue\nIs 112172 a multiple of 29?\nTrue\nIs 9570378 a multiple of 1113?\nFalse\nDoes 492 divide 2008836?\nTrue\nDoes 41 divide 70725?\nTrue\nDoes 115 divide 5920625?\nFalse\nIs 5 a factor" +"tor of -55/67318 and 137/42.\n1413678\nWhat is the common denominator of 173/61152 and 83/40768?\n122304\nCalculate the least common multiple of 8636 and 44.\n94996\nCalculate the smallest common multiple of 48442 and 1371.\n145326\nWhat is the lowest common multiple of 363468 and 966?\n8359764\nFind the common denominator of -65/280443 and -47/9.\n841329\nWhat is the common denominator of -27/117008 and -3/16?\n117008\nWhat is the smallest common multiple of 114 and 44274?\n841206\nWhat is the common denominator of -41/2 and -3/1339628?\n1339628\nFind the common denominator of 179/3300 and -79/414.\n227700\nWhat is the common denominator of 61/1242160 and 36/5?\n1242160\nWhat is the least common multiple of 28 and 1988516?\n13919612\nWhat is the least common multiple of 14694 and 42966?\n3394314\nCalculate the common denominator of -71/3420 and -55/52706.\n4743540\nWhat is the least common multiple of 4269 and 2846?\n8538\nWhat is the common denominator of -25/14976 and -137/192?\n14976\nCalculate the common denominator of -37/7396 and 63/946.\n81356\nCalculate the common denominator of 25/18552 and -89/72.\n55656\nFind the common denominator of 15/549424 and -7/92.\n549424\nWhat is the common denominator of 11/2088 and -41/754?\n27144\nFind the common denominator of" +"09. Let l(o) = 2*o**2 - o - 5. Calculate the remainder when b is divided by l(4).\n21\nSuppose -12*q + 1465 - 205 = 0. Calculate the remainder when 418 is divided by q.\n103\nWhat is the remainder when (-2732)/(-21) - 4/42 is divided by 19?\n16\nSuppose 203*o = 192*o + 44. Let n = 44 + -16. Suppose -w - w = -n. What is the remainder when w is divided by o?\n2\nSuppose -7 = 5*d - 17. Suppose -d*h - 2 = 0, 4*x - 2*h - 15 = -3*h. Calculate the remainder when 30 is divided by x.\n2\nSuppose 4*s + 2 = 10. Let q = s + 1. Suppose x + 4*h + 14 = 0, -q*x - h + 6 + 7 = 0. Calculate the remainder when 15 is divided by x.\n3\nSuppose m - 59 = -3*x, 0 = -5*x + 46 - 21. Let d(p) = -p**2 + 5*p + 3. Let k be d(4). Suppose 2*s + 45 = k*s. Calculate the remainder when m is divided by s.\n8\nLet z be ((-33)/(-6) + -5)*1*-134. Calculate the remainder when 47 is" +"/(-52)). Which is smaller: 125/9 or w?\nw\nLet t be 62/4*12470/335. Let l = 577 - t. Let r = -1593.1 - -1593. Is r at most l?\nTrue\nLet q = -0.038 + -2.762. Let f = q + 2.6. Is f greater than 2/99?\nFalse\nSuppose 6 = -p + 4*k, 4*p + 11*k = 6*k + 18. Let z = -78 - -55. Let o = -22 - z. Is o <= p?\nTrue\nLet p = -258/349 - -54165/74686. Suppose -3*c - 3*k = -4*k - 2, -4 = -4*c + 2*k. Which is bigger: p or c?\nc\nLet b = 1.5664 + -1.5664. Which is smaller: -299.8 or b?\n-299.8\nLet p(u) = 2*u**2 + 2*u + 6. Let s be p(-3). Suppose -h - s = 5*h. Let y(j) = -5*j - 14. Let k be y(h). Which is smaller: k or 7/5?\nk\nLet s(d) = -d**2 + 11*d + 4. Let b be s(11). Let u be 23/(-7*b/16 + 2). Let f = u + -92. Is f less than or equal to 0?\nTrue\nLet l = 772 - 1232. Let r = l + 459. Which is smaller:" +"qual to 5?\nTrue\nLet p = 2.733 + -2.83. Let x = -0.097 - p. Which is smaller: -0.2 or x?\n-0.2\nSuppose 3*o = -0*o + 3. Let m be 4534/18 - (-17)/(1836/12). Let y be (o/(-3))/((-7)/m). Which is smaller: y or 13?\ny\nSuppose 5*l - 4404 + 16195 = -3*h, 3*h - 5*l + 11741 = 0. Let r = h + 43094/11. Which is smaller: -3 or r?\nr\nLet u be (88/10)/((-14)/10). Suppose -4*c = -8, -52*g + 54*g - 2*c - 12 = 0. Let n be (g - 1)*(2 + -2 - 1). Are u and n equal?\nFalse\nSuppose 4*y + 4 = -3*b + 8*b, 0 = -5*b + 5*y. Suppose l - 6*l = -o - 2, 2*l - b = 2*o. Which is smaller: l or -2/113?\n-2/113\nSuppose -66 = -18*f - 174. Let c be f*224/(-222) - 6. Which is greater: 1 or c?\n1\nLet k = 46847 + -46851. Let z(a) = -a**3 - 3*a**2 - 3*a - 1. Let l be z(-3). Is l <= k?\nFalse\nLet p(y) = -5*y**2 - y - 1346. Let q be p(0). Let t = -160176/119" +"3 - 10*v**2 - 8*v + 6. Let a(n) = 16*n - 308. What is the remainder when a(26) is divided by y(11)?\n30\nSuppose -1200 = -8*o - 1120. Let x(l) = -l**2 - 10*l - 5. Let r be x(-4). Suppose -3*t - o + r = 0. Calculate the remainder when 7 is divided by t.\n1\nSuppose 10*n + 152 = 592. What is the remainder when n is divided by 0 - (-2 - -3)*-10?\n4\nSuppose -145 = -4*w + 5*b, -108 = -3*w - 0*b + 4*b. Suppose -4*t + w = -32. What is the remainder when 21 is divided by t?\n3\nLet d = -30 - -20. Let b be 1 + (-404)/d + (-4)/10. Suppose -39*a - 152 = -b*a. Calculate the remainder when a is divided by 13.\n11\nLet y(q) = -472*q + 2955. What is the remainder when 493 is divided by y(6)?\n1\nLet j = 164 - 132. Suppose -33*u = -j*u - 140. Calculate the remainder when u is divided by 31.\n16\nLet j(h) = 23*h**3 - 3 + 2 + h**2 - 7*h**3 + h. Suppose 5*g + 27*q - 30*q" +"= v. Round p to the nearest 1000.\n10000\nLet b = 8.904 - 8.9270135. Let n = 0.023 + b. What is n rounded to 6 dps?\n-0.000014\nLet l = -112.0000039 - -112. Round l to 7 decimal places.\n-0.0000039\nLet b = -0.2445 + 0.0235. Round b to 2 dps.\n-0.22\nLet q = 44.94848354 + 0.05230646. Let u = q + -45. What is u rounded to 4 decimal places?\n0.0008\nLet m be 0/2 + 18300/3. What is m rounded to the nearest 1000?\n6000\nLet w = 528 - 743. Let y = -215.0097 - w. Round y to 3 decimal places.\n-0.01\nLet d be 0/(2 + -2 + 1). Suppose d = 4*q - 3*q - 5. Suppose 0*m - 2*z = -3*m - 54000, -q*m - 90000 = -5*z. What is m rounded to the nearest ten thousand?\n-20000\nLet i = -14 + 27.1. Round i to the nearest integer.\n13\nSuppose -4*n + 0*n - 2*w = 2399998, -n - 3*w = 599997. What is n rounded to the nearest one million?\n-1000000\nLet z = 0.01 - -11.39. What is z rounded to the nearest integer?\n11\nLet" +"- 5 = 2*x. Suppose -5*q - 2*n + 72 = 21, x = 5*q + 4*n - 47. Does 6 divide q?\nFalse\nSuppose -m = -4*m - 5*h - 18, 7 = -4*m - h. Let k(t) = -2 - 3107*t**2 + 3107*t**2 - 165*t**3 - 2*t. Is 33 a factor of k(m)?\nTrue\nSuppose -5*d - 2*l + 51767 = 0, -4*d + l + 41407 = -4*l. Does 29 divide d?\nTrue\nSuppose 3*l + 2868 = 2*k, 4*k - 3656 = -6*l + 2128. Does 4 divide k?\nTrue\nLet i(n) = -459*n**2 + 53*n + 94. Let g(q) = -689*q**2 + 79*q + 142. Let x(o) = -5*g(o) + 7*i(o). Is 77 a factor of x(-2)?\nTrue\nLet s(h) = 8*h - 24. Let n = 47 + -46. Let w(k) = 3*k + 5. Let y be w(n). Is s(y) a multiple of 20?\nTrue\nSuppose -15 + 7 = 4*d. Let i be (-3*(-33)/(-9))/(d/96). Suppose -i = 3*c - 11*c. Is 6 a factor of c?\nTrue\nLet h(t) = 8*t + 66. Let m be h(-7). Is 28 a factor of (132/m)/(42/105)?\nFalse\nSuppose -8*r - 48 = 1072. Let k" +" 98*l**3 + 194*l**3.\n-31*l**3\nCollect the terms in 304*i**2 - 155*i**2 - 2068*i**3 + 1960*i**3 - 153*i**2.\n-108*i**3 - 4*i**2\nCollect the terms in 10095*c**2 + 2*c + c + 1114 - 1113.\n10095*c**2 + 3*c + 1\nCollect the terms in -6465 - 6472 - 6461 - 6472 - 6473 + 32339 + 20*f.\n20*f - 4\nCollect the terms in -11711*n**3 - 11726*n**3 - 11728*n**3 + 35173*n**3.\n8*n**3\nCollect the terms in -3 + 1 - 15768*i - 17706*i - 6110*i.\n-39584*i - 2\nCollect the terms in 2*i**2 + 5*i + 171 - 4*i + 249 - 531 - i.\n2*i**2 - 111\nCollect the terms in -35793*j**2 + 20853*j - 20853*j.\n-35793*j**2\nCollect the terms in -1818*u - 110*u**3 - 9 - 6*u**2 + 11 + 1818*u.\n-110*u**3 - 6*u**2 + 2\nCollect the terms in 3*n**2 - 39 - 4*n**2 + 39 - 28171*n**3.\n-28171*n**3 - n**2\nCollect the terms in 1 - 2 + 172081*l**2 - 1735526*l**2.\n-1563445*l**2 - 1\nCollect the terms in -3 + 114*o + 37*o + 5 - 37*o + 6.\n114*o + 8\nCollect the terms in -2400745*a**3 - 12 + 7 + 2400739*a**3.\n-6*a**3 - 5\nCollect the" +"f 98447382?\nFalse\nIs 254040248 a multiple of 4157?\nFalse\nIs 410968 a multiple of 92?\nFalse\nIs 135 a factor of 127403354?\nFalse\nIs 501528254 a multiple of 1102?\nFalse\nIs 745 a factor of 1156154134?\nFalse\nDoes 217 divide 2594647?\nFalse\nDoes 24 divide 2605530768?\nTrue\nDoes 197 divide 2430792926?\nFalse\nIs 74976291 a multiple of 113?\nTrue\nDoes 396 divide 113041626?\nFalse\nDoes 13 divide 2084973?\nFalse\nDoes 37 divide 306021154?\nTrue\nDoes 288 divide 4816512?\nTrue\nDoes 770 divide 4768939?\nFalse\nIs 35384843 a multiple of 77?\nFalse\nIs 37 a factor of 108318647?\nTrue\nIs 8 a factor of 80177034?\nFalse\nIs 204 a factor of 943347666?\nFalse\nIs 91 a factor of 10266893?\nTrue\nDoes 37 divide 132803582?\nTrue\nIs 285 a factor of 36744195?\nTrue\nIs 134902512 a multiple of 18?\nTrue\nIs 1986530133 a multiple of 37?\nFalse\nIs 78759072 a multiple of 1008?\nTrue\nDoes 39 divide 787861772?\nFalse\nIs 8 a factor of 115200415?\nFalse\nIs 59 a factor of 161341486?\nFalse\nIs 89 a factor of 31667203?\nFalse\nIs 9355048 a multiple of 8?\nTrue\nIs 18 a factor of 1210608?\nTrue\nIs 262 a factor of 125360974?\nTrue" +") = 4*i + 1. Calculate the smallest common multiple of w and o(2).\n855\nLet k = -10427/5 - -5130029/2460. Calculate the common denominator of k and -103/36.\n1476\nWhat is the common denominator of 13/136 and (-400)/(-700) - (-293)/(-2142)?\n1224\nLet b = 110567/10 - 11060. Let l(o) = -657*o. Let j be l(-1). Let z = j + -6601/10. Calculate the common denominator of z and b.\n10\nSuppose -4*c = y - 96, 37 - 13 = c - 2*y. Calculate the smallest common multiple of c and 699/(-466)*(1 - 27).\n312\nSuppose -1248 = -u - 19*u - 6*u. What is the smallest common multiple of u and 408?\n816\nLet l = -42784 + 1240894/29. Let g = 2817/203 - l. Find the common denominator of g and -44/7.\n7\nCalculate the smallest common multiple of 17/136 + 17157/24 and 143.\n715\nLet c = 16 + -7. Suppose -2*o = -5*q - 83, 269*o - 2*q - 152 = 266*o. Suppose o*l + 161 = 1133. What is the least common multiple of l and c?\n18\nSuppose -440*z = -5*g - 436*z + 594, 438 = 4*g + 3*z. What is the" +"ve 0 = 2*k - u + 7, j = -5*k - 2*u - 14 - 8 for k.\n-4\nSuppose 0 = q - 2*q. Suppose -7*h = -3*h - 2*f - 14, 0 = 2*h - 3*f - 9. Solve h*i + 13 = -k, q*k - k + 3*i = -5 for k.\n-4\nLet t = 371 + -366. Solve v - 4*v - 9 = -4*n, -5*n - 15 = t*v for n.\n0\nLet b(n) = -23*n + 106. Let u be b(4). Solve 0 = i - 5*s - 4, -u*s + 15*s - 2 = 3*i for i.\n-1\nSuppose -17*q = -13*q + 80. Let v = q + 22. Solve -1 = -v*h - 5*m, -2*h + 4*m - 7 = m for h.\n-2\nLet c = 46 - 46. Suppose 2*i - y - 6 = c, -28 = -4*i - y - 10. Solve 2*v = 4*g, -i*v - 26 = 8*g - 3*g for g.\n-2\nLet a be 4/(8/(-34))*-1. Suppose -4*q - x = 9, -2*q - 4*x = -x + a. Let n be ((-3)/6)/(q/6). Solve 4*f = -k + 4*k + n, 2*f" +"o?\nTrue\nSuppose 5*f - 20 = 0, 3*p - f - 46 = -2*f. Is 7 a factor of p?\nTrue\nSuppose 0 = i + 4*i. Suppose -2*l = -i*l - 56. Is 14 a factor of l?\nTrue\nIs (1 - 0)/(((-20)/344)/(-5)) a multiple of 43?\nTrue\nLet m(o) = o + 13. Let b be m(-7). Suppose j = b*j. Is 7 - (0 - j - 1) a multiple of 8?\nTrue\nSuppose 3*r - 206 - 244 = 0. Is 13 a factor of r?\nFalse\nLet h = -7 + 8. Let u(x) = 7*x + 2. Is 9 a factor of u(h)?\nTrue\nSuppose 0 = -2*k - 3*d + d + 14, -2*k = 4*d - 10. Suppose 5*y + 3*x - 51 = k, 0 = x. Let f(p) = -p**3 + 13*p**2 - 12*p + 12. Does 6 divide f(y)?\nTrue\nLet s = 93 + -63. Is s a multiple of 19?\nFalse\nLet z(x) = -6*x + 4. Let m be z(-9). Let b(t) = -5*t - 5. Let y be b(6). Let a = y + m. Is a a multiple of 14?\nFalse\nLet x" +"der when m is divided by 33?\n31\nCalculate the remainder when 153 is divided by (-83)/(-83)*(51 - (2 - 4)).\n47\nSuppose 3*j - 2*j = 6. Suppose -10 = u - j*u. Calculate the remainder when 1/u*6 - -43 is divided by 16.\n14\nLet w(d) = d**3 + 9*d**2 + 4*d + 2. Let b be w(-5). Suppose -b = -3*x - 22. Calculate the remainder when 79 + -3*8/12 is divided by x.\n17\nSuppose -12*a = -11*a + 2. What is the remainder when a/(12/(-2))*18 is divided by 2?\n0\nCalculate the remainder when 349 is divided by (-2)/24*4*(1 + -97).\n29\nSuppose -5*t = 0, 5*p + 440 - 130 = 4*t. Calculate the remainder when (1 + (-7 + 1 - -4))*p is divided by 11.\n7\nLet p(x) = -7*x + 15. Let q be 99/21 + 2/7. What is the remainder when 0 + q/((-10)/(-4)) is divided by p(2)?\n0\nLet w = 15 - 11. Suppose 5*t - 170 = -3*p - 42, -2*t + w*p + 72 = 0. What is the remainder when 223 is divided by t?\n27\nLet a = 1 + 4. Suppose 4*s -" +".\n6\nCalculate the lowest common multiple of 12 and 8 + (-4 + 2)*-1.\n60\nSuppose -4*y = -6*y + 60. Suppose 0 = c - 4*c + y. Calculate the smallest common multiple of c and 3.\n30\nLet a(r) = -9*r**3 - r. Let k = 0 + -1. Calculate the smallest common multiple of 2 and a(k).\n10\nLet a = 28/92262447 + -716090584547305/369049788. Let j = -1939161 - a. Let p = -1204 + j. Find the common denominator of 71/22 and p.\n132\nLet s be (-278)/(-548) + (-2)/4. Let a = s + -8089/822. Let d = 120 - 603/5. Find the common denominator of d and a.\n30\nLet h(v) = -v**2 - 12*v + 4. What is the lowest common multiple of h(-12) and 10?\n20\nLet q(t) = -2*t - 6. Calculate the least common multiple of q(-8) and 6.\n30\nLet s = 9650 - -728. Let z be s/(-5208) + (-4)/(-14). Let r = z - 4/93. What is the common denominator of r and 1/8?\n8\nSuppose 0*c - 5*c + 60 = 0. Calculate the smallest common multiple of c and 33.\n132\nLet d(o) =" +" -109, -223, -409, -685?\n-3*k**3 - 3*k - 19\nWhat is the q'th term of -33, -72, -119, -174, -237, -308, -387?\n-4*q**2 - 27*q - 2\nWhat is the g'th term of -62, -136, -212, -290?\n-g**2 - 71*g + 10\nWhat is the t'th term of 45, 129, 275, 489, 777, 1145, 1599, 2145?\nt**3 + 25*t**2 + 2*t + 17\nWhat is the p'th term of -96, -83, -60, -21, 40, 129?\np**3 - p**2 + 9*p - 105\nWhat is the d'th term of -12166, -24334, -36502, -48670?\n-12168*d + 2\nWhat is the u'th term of 41, 60, 105, 188, 321?\n2*u**3 + u**2 + 2*u + 36\nWhat is the m'th term of -6, -14, -36, -78, -146?\n-m**3 - m**2 + 2*m - 6\nWhat is the x'th term of -426, -414, -388, -342, -270, -166, -24?\nx**3 + x**2 + 2*x - 430\nWhat is the h'th term of 24, 29, 28, 15, -16, -71, -156?\n-h**3 + 3*h**2 + 3*h + 19\nWhat is the n'th term of 402, 807, 1212, 1617, 2022, 2427?\n405*n - 3\nWhat is the p'th term of 18, 11, -2, -21, -46, -77?\n-3*p**2 +" +"derivative of -y**2 - 25*y + y**2 - y**4 - 1214*y**3 + 797*y + 1106*y + y**5 wrt y?\n20*y**3 - 12*y**2 - 7284*y\nWhat is the third derivative of -32*g + 14*g**2 - 131*g**4 + 12*g**3 - 348*g**4 - 12*g**3 wrt g?\n-11496*g\nLet i(w) = w**3 + 13*w**2 - 34*w - 1. Let q be i(-15). Find the third derivative of 53*u**2 + 163*u**3 - 47*u**3 - q*u**3 - 30*u**3 wrt u.\n162\nLet n(f) be the third derivative of 1 + 99/20*f**5 - 86*f**2 - 12*f**3 + 0*f + 0*f**4. What is the first derivative of n(y) wrt y?\n594*y\nWhat is the second derivative of 434 - 1793*a**2 - 152 + 295 + 244*a**2 - a + 226*a**2 wrt a?\n-2646\nSuppose 3*i = 2*o - 7, 21*i - 17*i - 4 = o. What is the third derivative of 3*m**2 - 3 + 158*m**3 - m**2 - 12 - o + 1 wrt m?\n948\nLet l(v) be the third derivative of 0*v + 0*v**4 - 18*v**2 + 23/20*v**5 + 0 - 15*v**3. What is the derivative of l(h) wrt h?\n138*h\nLet i(m) be the first derivative of 23*m**6/120 - 37*m**3/6 - 73*m**2/2 -" +"multiple of 27876 and 621?\n250884\nWhat is the common denominator of 51/5956 and 17/2978?\n5956\nFind the common denominator of -141/6380 and 91/540.\n172260\nFind the common denominator of -15/107 and 51/9362.\n1001734\nWhat is the common denominator of 133/108 and 64/2727?\n10908\nWhat is the common denominator of -55/43608 and 61/138?\n43608\nCalculate the common denominator of -89/932 and -17/400.\n93200\nCalculate the lowest common multiple of 325422 and 3222.\n325422\nWhat is the lowest common multiple of 629468 and 629468?\n629468\nCalculate the common denominator of -89/71535 and 23/786885.\n786885\nCalculate the lowest common multiple of 43590 and 79915.\n479490\nFind the common denominator of 53/39440 and 149/144.\n354960\nFind the common denominator of -89/51446 and -37/8870.\n257230\nWhat is the least common multiple of 504 and 25492?\n3211992\nCalculate the common denominator of -29/138556 and -21/4288.\n2216896\nCalculate the least common multiple of 411 and 6213.\n851181\nWhat is the smallest common multiple of 119136 and 5984?\n1310496\nCalculate the lowest common multiple of 11529 and 549.\n11529\nCalculate the lowest common multiple of 4356 and 2244.\n74052\nWhat is the common denominator of 55/14584 and -37/440?\n802120\nFind the common denominator of -125/284466 and -32/7." +"t one million?\n-3000000\nLet g = 195065 - 134432. Round g to the nearest ten thousand.\n60000\nLet t be (159/3)/((-28)/(-25732)). Suppose 0 = -5*k + 25993 + t. Round k to the nearest 1000.\n15000\nLet u = 773.424488 - 760.42448682. Let f = -12.2 - 0.8. Let a = u + f. What is a rounded to seven dps?\n0.0000012\nLet d = -6073 - -6310.45. Round d to the nearest 100.\n200\nLet j = -8345.1016 - -2.6016. What is j rounded to the nearest one hundred?\n-8300\nLet a be (-6)/4*(-264)/99. Suppose 4*t = 12, -5*s + 20 - 3 = -t. Suppose -1 = 5*z + s, -a*h + 3*z - 5197 = 0. Round h to the nearest 1000.\n-1000\nLet k = 322.64 - -2.36. Let t = k - 324.9999686. Round t to 5 decimal places.\n0.00003\nLet n = -1803402974.8000781 + 1803404707.8. Let u = n + -1733. What is u rounded to 6 decimal places?\n-0.000078\nLet s = 69.11 - -0.89. Let t = s - 10. Let c = t - 59.99971. What is c rounded to 4 decimal places?\n0.0003\nLet u = -37 + 40." +"of 4849?\n8\nWhat is the thousands digit of 6065?\n6\nWhat is the units digit of 76180?\n0\nWhat is the units digit of 45?\n5\nWhat is the hundreds digit of 51470?\n4\nWhat is the hundreds digit of 1819?\n8\nWhat is the units digit of 58104?\n4\nWhat is the thousands digit of 16752?\n6\nWhat is the units digit of 4697?\n7\nWhat is the tens digit of 17434?\n3\nWhat is the tens digit of 632?\n3\nWhat is the hundreds digit of 42035?\n0\nWhat is the units digit of 64953?\n3\nWhat is the tens digit of 18239?\n3\nWhat is the tens digit of 29592?\n9\nWhat is the units digit of 41630?\n0\nWhat is the thousands digit of 54411?\n4\nWhat is the hundreds digit of 21035?\n0\nWhat is the tens digit of 81375?\n7\nWhat is the hundreds digit of 70537?\n5\nWhat is the tens digit of 34932?\n3\nWhat is the tens digit of 14143?\n4\nWhat is the thousands digit of 9162?\n9\nWhat is the hundreds digit of 1377?\n3\nWhat is the units digit of 27959?\n9\nWhat is the hundreds digit" +"47.19 rounded to the nearest integer?\n47\nRound -11176000 to the nearest 1000000.\n-11000000\nRound 87.75 to the nearest 10.\n90\nWhat is -0.040102 rounded to 4 decimal places?\n-0.0401\nRound 62 to the nearest one hundred.\n100\nRound -642.73 to the nearest ten.\n-640\nRound 0.04041 to 2 decimal places.\n0.04\nWhat is -86868000 rounded to the nearest 1000000?\n-87000000\nWhat is -109608 rounded to the nearest 1000?\n-110000\nWhat is -1.6708 rounded to 1 dp?\n-1.7\nRound 26.914 to 0 dps.\n27\nRound -0.0002921 to 5 decimal places.\n-0.00029\nRound 25427300 to the nearest one million.\n25000000\nWhat is -95060000 rounded to the nearest 1000000?\n-95000000\nRound 1397000 to the nearest 100000.\n1400000\nWhat is -18980000 rounded to the nearest one million?\n-19000000\nRound -289.5 to the nearest ten.\n-290\nWhat is 1509 rounded to the nearest 100?\n1500\nRound 0.0000038877 to seven decimal places.\n0.0000039\nRound -8.62 to the nearest integer.\n-9\nRound 3.96 to 1 dp.\n4\nRound -83.96 to the nearest 10.\n-80\nWhat is -0.00000099014 rounded to seven dps?\n-0.000001\nWhat is -0.000006925 rounded to seven decimal places?\n-0.0000069\nRound -0.0000012614 to seven dps.\n-0.0000013\nWhat is -2751100 rounded to the nearest ten thousand?" +"What is -297.98 rounded to the nearest ten?\n-300\nRound -0.01379 to two decimal places.\n-0.01\nRound 85811000 to the nearest one hundred thousand.\n85800000\nRound -0.007509 to three decimal places.\n-0.008\nRound -0.00382401 to three decimal places.\n-0.004\nWhat is 0.000000248 rounded to 7 decimal places?\n0.0000002\nWhat is -0.2321 rounded to 2 decimal places?\n-0.23\nRound -54.34 to the nearest ten.\n-50\nRound 158240 to the nearest 10000.\n160000\nRound 0.0000017669 to seven decimal places.\n0.0000018\nWhat is 0.000000042 rounded to 7 decimal places?\n0\nRound 0.03954 to 3 dps.\n0.04\nRound -5300 to the nearest one thousand.\n-5000\nWhat is 0.0000058975 rounded to six dps?\n0.000006\nRound -0.059003 to three dps.\n-0.059\nRound 0.13312 to three dps.\n0.133\nRound 0.5672 to 1 dp.\n0.6\nRound -0.00008657 to 5 decimal places.\n-0.00009\nRound -0.000005937 to seven dps.\n-0.0000059\nRound 37100 to the nearest ten thousand.\n40000\nRound 0.009939 to three dps.\n0.01\nWhat is -881660 rounded to the nearest one hundred thousand?\n-900000\nWhat is -0.00052703 rounded to five dps?\n-0.00053\nWhat is -28363000 rounded to the nearest 1000000?\n-28000000\nWhat is -0.003122 rounded to four decimal places?\n-0.0031\nRound 397220000 to the nearest 1000000.\n397000000\nRound -0.0000037815" +"o and p.\n880\nLet w(z) = 218*z**3 + 7*z**2 + 7*z + 5. Let m be w(-2). Let j = m - -3535/2. Let r = -38505/286 - -1713/13. Calculate the common denominator of j and r.\n22\nLet h be (-6)/(-27) - 212/(-18). Suppose 3*n = 6*n - h. Find the common denominator of -40/29 and ((-1356)/180)/(n/(-10)).\n174\nLet r = 498 + -476. Calculate the smallest common multiple of r and 55.\n110\nSuppose -4*d - 52 - 272 = -3*m, 0 = -d + 4*m - 94. Calculate the common denominator of (22/363)/((-8)/d) and 35/6.\n66\nSuppose -2*m - 3 = 1, -4*l + 214 = 5*m. What is the least common multiple of l and 7?\n56\nSuppose 204 = 4*m - 5*x, -5*x - 32 = -m + 4. What is the smallest common multiple of 88 and m?\n616\nLet c = -5 + 2. Let p(u) = -u**2 - 5*u - 2. Let y(j) = -j**3 - 22*j**2 + 25*j + 54. Calculate the smallest common multiple of y(-23) and p(c).\n8\nCalculate the common denominator of -2 + 10239/804 + -11 and -21/22.\n2948\nLet h = -10744/3 - -1085279/303. What" +"31887, 47829?\n63771\nWhat is next in -6, 60, 246, 612, 1218?\n2124\nWhat is the next term in -2242, -4450, -6660, -8872, -11086, -13302, -15520?\n-17740\nWhat is next in -4414, -4448, -4542, -4726, -5030, -5484, -6118, -6962?\n-8046\nWhat is the next term in 203, 328, 453, 578, 703, 828?\n953\nWhat is next in 1277299, 2554599, 3831899, 5109199?\n6386499\nWhat is the next term in 1961, 2002, 2043, 2084?\n2125\nWhat comes next: 160, 266, 372?\n478\nWhat is next in -1085, -1484, -1881, -2276?\n-2669\nWhat is next in 52, 130, 226, 328, 424?\n502\nWhat is next in 127, 66, -127, -524, -1197, -2218, -3659, -5592?\n-8089\nWhat comes next: 828, 684, 278, -522, -1848?\n-3832\nWhat is next in 1581, 3274, 4967, 6660?\n8353\nWhat comes next: -96, -168, -284, -444, -648, -896, -1188?\n-1524\nWhat is the next term in 245, 441, 637?\n833\nWhat is next in 143, 12, -119, -250, -381?\n-512\nWhat comes next: 2250143, 2250145, 2250147, 2250149, 2250151, 2250153?\n2250155\nWhat is next in -6401, -6403, -6405?\n-6407\nWhat comes next: -27, -146, -347, -630?\n-995\nWhat is next in -2364, -9474, -21332, -37944, -59316?\n-85454\nWhat is the" +"s 210001222000100101 - 11?\n210001222000100020\nIn base 16, what is -1437d77 - -3?\n-1437d74\nIn base 6, what is 32045210 + 253?\n32045503\nIn base 12, what is 3 + -1bb786a?\n-1bb7867\nIn base 3, what is -10111010 + 110212121?\n100101111\nIn base 8, what is -24 - 262663?\n-262707\nIn base 4, what is 13323213 + 21023?\n20010302\nIn base 4, what is 1000203 + -11033021?\n-10032212\nIn base 8, what is 247120 - 3313?\n243605\nIn base 8, what is -1153 - -142506?\n141333\nIn base 6, what is 3 - 5110150322?\n-5110150315\nIn base 2, what is -1 - 1101001011111111011010101?\n-1101001011111111011010110\nIn base 6, what is 133002 + 20?\n133022\nIn base 8, what is -2 - -57727051?\n57727047\nIn base 2, what is 1101011100 + -10110100?\n1010101000\nIn base 5, what is -1200400 + 11034?\n-1134311\nIn base 8, what is 10 - 366012532?\n-366012522\nIn base 4, what is -10 + -313132330133?\n-313132330203\nIn base 13, what is 931 + 967c?\na2b0\nIn base 16, what is -51 + -5eddf6?\n-5ede47\nIn base 15, what is a4 + 9009e?\n90153\nIn base 8, what is -31 - -4305324?\n4305273\nIn base 11, what is -273" +"-2\nLet l(x) = 2*x**2 - 148*x - 741. Let v be l(-5). Put -3, 2, -4, -1, v in increasing order.\n-4, -3, -1, 2, v\nLet d = -7 - -11. Let f = -3327.6 - -3328. Sort f, d, 6.5 in ascending order.\nf, d, 6.5\nSuppose -b + 2*g = 0, -b + 0*g + 3 = g. Sort 0, -34, b, 22, 3 in decreasing order.\n22, 3, b, 0, -34\nLet y = -0.0444 - 100.0556. Let d = -110.17 - y. Let a = 10 + d. Sort 0, a, 0.1 in descending order.\n0.1, 0, a\nLet w be (-1)/2*(-9 - 171/(-18))*-4. Sort w, 17, 11 in increasing order.\nw, 11, 17\nLet i(p) = 193*p**2 - 576*p. Let t be i(3). Sort -0.08, t, -1/8 in decreasing order.\nt, -0.08, -1/8\nLet o(z) = z**2 - 46*z - 1497. Let j be o(-22). Put 2, 1, j, -6, 5 in ascending order.\n-6, j, 1, 2, 5\nLet f = -61.78 + -1.22. Let y = f - -64.6. Sort y, -1, -4 in descending order.\ny, -1, -4\nLet n = 604 + -604.0613. Sort n, 1/3, 0 in decreasing" +"me factors of s(-6).\n103\nSuppose -5*a - 303 = 2*g - g, -5*a + 3*g - 311 = 0. Let k = 180 + a. What are the prime factors of k?\n7, 17\nLet n = 101 + -57. Let k be (-154)/12 + (-25)/(-30) + -1. Let x = n - k. What are the prime factors of x?\n3, 19\nSuppose 9*l + 3*n = 7*l + 309, -800 = -5*l - 2*n. What are the prime factors of l?\n2, 3\nLet z be -2 - 3/(-1) - -1. Suppose -3*u + 43 = 4*x, -x + 8 = -z*u - 0. What are the prime factors of x?\n2, 5\nLet s = -2486 - -3535. List the prime factors of s.\n1049\nSuppose -4*i = -23 + 3, -100 = -5*o - 5*i. Let n be 162/5 + (-6)/o. List the prime factors of n + (2 - 0) + 1.\n5, 7\nSuppose 4*k = 2*x + 16, 0 = x - 3*x + 5*k - 21. Let l(h) = h**x + 3 + 4*h + h - 3*h - 1. What are the prime factors of l(-5)?\n17\nLet i =" +"*a = b. What is the least common multiple of r and i?\n2\nFind the common denominator of ((-40)/(-42))/10*(-917)/(-12) and -8/9.\n18\nLet t = -26850/11 - -2443. Calculate the common denominator of 69/10 and t.\n110\nLet r = -743/8 - -93. Find the common denominator of r and -48/7.\n56\nLet x(w) = -w**3 + 6*w**2 + 1. Let s be x(6). Let h = s + -13. What is the common denominator of -103/6 and (58/30)/(h/50)?\n18\nLet t be ((-4)/(-24)*-341)/(4/(-1058)). Let f(p) = -3009*p - 3. Let z be f(-5). Let w = z - t. Find the common denominator of w and 79/6.\n12\nSuppose -11 - 21 = -2*b. Calculate the least common multiple of 8 and b.\n16\nLet h = 1468495/51 - 28795. Let o = h - -1361/816. Calculate the common denominator of o and 49/6.\n48\nSuppose 14 = 3*a - 2*g, 0 = 4*a + 2*g - 8 - 20. Calculate the least common multiple of a and 76.\n228\nSuppose -n + 5 = 3*d, n + 0*d = -5*d + 3. Calculate the common denominator of ((-2)/n*-3)/1 and (-2)/(-9) - (-907)/90.\n20\nSuppose h + 51" +"0000.\n-61000000\nRound -0.3061642 to three decimal places.\n-0.306\nRound 363.8141 to zero decimal places.\n364\nWhat is -0.00022651 rounded to four dps?\n-0.0002\nRound 586.8006 to zero dps.\n587\nRound -5.7676 to one decimal place.\n-5.8\nRound -32417.2 to the nearest 10000.\n-30000\nWhat is -0.02155587 rounded to 2 dps?\n-0.02\nRound 165909940 to the nearest one million.\n166000000\nRound 718.8657 to the nearest integer.\n719\nWhat is 73997800 rounded to the nearest one million?\n74000000\nRound 0.0000544498 to seven dps.\n0.0000544\nRound 3162.512 to the nearest 1000.\n3000\nWhat is 24.4139 rounded to 1 dp?\n24.4\nWhat is -0.0000004866336 rounded to 7 dps?\n-0.0000005\nRound 0.028805 to 3 decimal places.\n0.029\nWhat is -130.91965 rounded to 2 decimal places?\n-130.92\nRound -420.99 to the nearest ten.\n-420\nWhat is -0.000382635 rounded to five dps?\n-0.00038\nWhat is -46097.525 rounded to the nearest 100?\n-46100\nRound 0.000000176076 to 7 decimal places.\n0.0000002\nWhat is 82564.07 rounded to the nearest 10000?\n80000\nWhat is -54942753 rounded to the nearest one hundred thousand?\n-54900000\nWhat is -0.00001182554 rounded to 5 dps?\n-0.00001\nWhat is 12131260 rounded to the nearest one million?\n12000000\nWhat is -1789.958 rounded to the nearest one hundred?" +"6)/(36/(-21)).\n564\nLet s = 6088243/7339464 - -2/83403. Calculate the common denominator of s and 3/32.\n352\nLet f = 16618 - 398887/24. Find the common denominator of f and -101/112.\n336\nWhat is the lowest common multiple of 2*(7/2 + (-2)/(-2)) and (2 + -1)*(52 + -1)?\n153\nSuppose 19*c + 120 = 25*c. What is the smallest common multiple of 100 and c?\n100\nLet w(s) = -s**3 - s**2 + 2*s - 6. Let p be (-18)/6*(1 + 0). What is the lowest common multiple of w(p) and 21?\n42\nLet n = 6 + -4. Suppose 0 = -n*s - 6. Calculate the common denominator of 37/10 and 38*(s - (-34)/8).\n10\nLet v = -85 + 87. What is the common denominator of 37/12 and v*((-4)/((-144)/67) - -1)?\n36\nLet v = -272 - -1643/6. Calculate the common denominator of 66/15*(7 + (-1413)/204) and v.\n102\nLet t = 15 + -9. Let s(g) = -2*g + 16. What is the smallest common multiple of s(t) and 5?\n20\nSuppose 4 = 3*d - 5. Let j be (1/d)/(10/(-150)). Let c = 2 - j. What is the lowest common multiple of c and 11?" +"uct of -4 and -0.035?\n0.14\nMultiply -14 and -2.8.\n39.2\nWork out -1.98 * -0.5.\n0.99\n-264*-0.08\n21.12\nWhat is -1927 times 0.5?\n-963.5\nProduct of 5 and 8.72.\n43.6\nMultiply 0.3 and 15.91.\n4.773\n0.04 * 7.1\n0.284\n-2*0.0215\n-0.043\n1.1*-76\n-83.6\nMultiply -1927 and 2.\n-3854\n0.2*-0.1282\n-0.02564\nCalculate -0.3*-26.1.\n7.83\n0.9 times -86\n-77.4\nWhat is -249 times 2?\n-498\n0.029*-50\n-1.45\nProduct of 0.4 and -6.\n-2.4\n0.1 * 0.12\n0.012\nWhat is the product of 13 and 568?\n7384\nMultiply 15633 and -0.1.\n-1563.3\nCalculate 0.0955*-2.\n-0.191\nWork out 26 * 0.5.\n13\nWhat is the product of 830 and -5?\n-4150\n-0.6*27\n-16.2\nWhat is 0.317 times -0.2?\n-0.0634\n-4 times 0.36\n-1.44\nMultiply -0.3 and -17.84.\n5.352\nWhat is the product of 0.1 and -0.65?\n-0.065\nWhat is 1981.3 times 0.4?\n792.52\nWork out -994.7 * -0.3.\n298.41\nCalculate 407.4*-0.2.\n-81.48\nWhat is the product of -1.01 and 4?\n-4.04\nWhat is the product of -1165 and 5?\n-5825\nMultiply -16 and -104.\n1664\n-257*0.1\n-25.7\n-301 times -5\n1505\nMultiply 10 and -16.\n-160\nMultiply -4 and 86.\n-344\n16511 times -0.5\n-8255.5\nMultiply -0.1 and 102.\n-10.2\n0.224 times 0.3" +"valuate (9 - (6 - -14)) + -4.\n-15\n-2 - 9 - 4 - (5 - (6 - 9))\n-23\nWhat is (6 - (7 + 3 + -4)) + 4 + 11?\n15\nWhat is the value of -2 - (-1 + -2) - (146 - 131)?\n-14\nWhat is the value of (-6 - (-21 - (1 - 14))) + -25?\n-23\nEvaluate (2 - (-8 + (-3 - -7))) + (3 - 8).\n1\nWhat is -28 - (9 + -18 + 0) - -7?\n-12\nWhat is the value of 7 - ((9 - -1) + 35 + -44)?\n6\n3 + -9 - -17 - 0\n11\nCalculate -7 - (2 + -10 - (0 + 16 + -2)).\n15\nEvaluate 42 + -32 + -2 + (-7 - (1 - 3)).\n3\nWhat is (-12 - -1) + 5 + (-6 - -20)?\n8\n(-8 - (0 - 7)) + 19 + -23\n-5\n(8 - -6) + (3 + -9 - 0)\n8\n(24 - 18) + (0 - (3 + -2 + -2))\n7\nCalculate 15 + -10 - (-62 + 57).\n10\nWhat is the value of -6 - (3" +"c**2 - 23*c - 1656. Let g be t(-31). Solve -20*f + g*f - s + 1 = 0, f - s = 2 for f.\n1\nLet g = 4818 - 4814. Solve 6 = -r + 3*r + g*x, 5*r = -5*x + 15 for r.\n3\nLet w = -4134 - -4155. Solve 3*p - b = -7, -p + 23*b + w = 18*b for p.\n-4\nLet f(a) = 2*a**2 + 5*a + 4. Let y be f(-2). Let o be (-24)/(-14)*(-357)/6. Let c be (-1 + y)*o*1/(-3). Solve 5*q + c = -5*t + 2*t, 15 = -3*q for t.\n-3\nLet c(r) = -r**3 - 7*r**2 - 2*r - 12. Let y be c(-7). Suppose -y*s = -3*x + 11, -5*s - 3*x = -22 - 3. Solve 2*z = 4*z + 2*m - 2, s*m + 23 = 3*z for z.\n5\nSuppose 3*c - 108 + 119 = k, 0 = k - 4*c - 13. Solve 3*i - 19 + 1 = -3*n, 24 = 2*i + k*n for i.\n2\nSuppose 4*d = -2*v + 9*d - 9, 4*v + d + 7 = 0. Let r be v*((-15)/(-2))/(-3)." +" the prime factors of 107130266.\n2, 479, 111827\nList the prime factors of 293863609.\n13, 22604893\nList the prime factors of 17555048.\n2, 7, 131, 2393\nWhat are the prime factors of 9346903570?\n2, 5, 934690357\nWhat are the prime factors of 258474992?\n2, 3229, 5003\nWhat are the prime factors of 1523917475?\n5, 4027, 15137\nList the prime factors of 40811820.\n2, 3, 5, 7, 97171\nList the prime factors of 431629752.\n2, 3, 17984573\nWhat are the prime factors of 361357481?\n361357481\nList the prime factors of 1216655436.\n2, 3, 4877, 20789\nList the prime factors of 895820660.\n2, 5, 7, 83, 77093\nList the prime factors of 57781305.\n3, 5, 193, 6653\nWhat are the prime factors of 39593225?\n5, 7, 32321\nWhat are the prime factors of 160249833?\n3, 1978393\nList the prime factors of 516972120.\n2, 3, 5, 7, 31, 19853\nList the prime factors of 2657010843.\n3, 10934201\nList the prime factors of 19652960.\n2, 5, 113, 1087\nWhat are the prime factors of 46870043?\n11, 43, 197, 503\nWhat are the prime factors of 48995566?\n2, 19, 23, 61, 919\nList the prime factors of 43075520.\n2, 5, 227, 593\nList the prime" +"es?\n-29\nLet m = 111.2 + -101. Let c = 9 - m. Round c to the nearest integer.\n-1\nLet g = 9585475.999969 - 9585485. Let o = g - -9. What is o rounded to 5 decimal places?\n-0.00003\nLet g be -3 - -1 - (3 - 16). Let v(x) = x**3 - 9*x**2 + 9*x + 15. Let d be v(g). Suppose -d = -2*p + 124. What is p rounded to the nearest one hundred?\n200\nLet o = 843.54 - 835. Let s = o - 8. Round s to 1 decimal place.\n0.5\nLet a = -42.99344 - -43. Round a to 3 decimal places.\n0.007\nLet b = 425237 + -425237.693342. Let v = b - -0.76442. Let i = v - 0.071. Round i to 5 decimal places.\n0.00008\nLet x = 20393 + -36193. What is x rounded to the nearest 1000?\n-16000\nLet a = -61.76849852 + 61.7785. Let i = a + -0.01. What is i rounded to seven dps?\n0.0000015\nSuppose -662 = -5*h + 26788. What is h rounded to the nearest 1000?\n5000\nLet z = -43.9993 - -44. What is z rounded to" +"hat is the tens digit of 3000156?\n5\nWhat is the ten thousands digit of 6597267?\n9\nWhat is the units digit of 96016?\n6\nWhat is the units digit of 13064756?\n6\nWhat is the ten thousands digit of 30128?\n3\nWhat is the thousands digit of 885492?\n5\nWhat is the hundred thousands digit of 2652063?\n6\nWhat is the units digit of 18188567?\n7\nWhat is the hundreds digit of 19616482?\n4\nWhat is the hundred thousands digit of 325164?\n3\nWhat is the thousands digit of 2004558?\n4\nWhat is the hundred thousands digit of 246589?\n2\nWhat is the hundreds digit of 11839749?\n7\nWhat is the hundred thousands digit of 4282291?\n2\nWhat is the units digit of 390885?\n5\nWhat is the ten thousands digit of 312236?\n1\nWhat is the thousands digit of 15149447?\n9\nWhat is the ten thousands digit of 153879?\n5\nWhat is the thousands digit of 311742?\n1\nWhat is the ten millions digit of 34617450?\n3\nWhat is the tens digit of 565206?\n0\nWhat is the tens digit of 3550150?\n5\nWhat is the tens digit of 5045749?\n4\nWhat is the tens digit of 25048581?" +"or of 2/3711 and 7/18.\n22266\nFind the common denominator of 29/1320 and -46/165.\n1320\nCalculate the lowest common multiple of 32 and 24.\n96\nFind the common denominator of -22/477 and -68/99.\n5247\nWhat is the common denominator of -83/315 and 13/159?\n16695\nWhat is the common denominator of 77/8 and 35/113?\n904\nFind the common denominator of -91/1500 and -23/40.\n3000\nWhat is the least common multiple of 45 and 520?\n4680\nCalculate the common denominator of 99/1664 and 145/1248.\n4992\nFind the common denominator of -73/1395 and -1/2635.\n23715\nCalculate the common denominator of -75/184 and -19/552.\n552\nWhat is the common denominator of 143/72 and -125/1788?\n10728\nCalculate the lowest common multiple of 8 and 3402.\n13608\nWhat is the lowest common multiple of 15 and 5460?\n5460\nCalculate the least common multiple of 12 and 60.\n60\nCalculate the common denominator of 48/1783 and 59/5.\n8915\nWhat is the smallest common multiple of 11 and 113?\n1243\nWhat is the lowest common multiple of 40 and 80?\n80\nFind the common denominator of 89/2 and 50/7.\n14\nCalculate the smallest common multiple of 54 and 72.\n216\nFind the common denominator of -25/66 and -31/12." +"pose 5*x = 4*y - 20, -5*y + 0*x + 25 = 4*x. Is y not equal to p?\nTrue\nLet t(b) = 571*b - 3426. Let n be t(6). Which is smaller: -2/47657 or n?\n-2/47657\nLet y = 17 + 20. Suppose -8*n = 29*n + y. Which is smaller: -7/25 or n?\nn\nLet m(b) be the second derivative of 4*b**3/3 + 43*b**2 + 59*b. Let i be m(-10). Which is greater: -5 or i?\ni\nSuppose r + 2*r + 4*l - 144 = 0, -l - 41 = -r. Let i be (-6)/(((-11)/r)/(3/8)). Suppose i*g = 7*g - 96. Is -49 > g?\nFalse\nSuppose 4*i - 22 = -3*m, -i + 24 = 3*i + 2*m. Let h(q) be the second derivative of q**3/6 + 21*q**2/2 - 5*q. Let y be h(i). Is 28 less than or equal to y?\nTrue\nLet k be (50/(-775))/((-1)/3*-2). Let n = -145787/8 + 4521219/248. Let v = k + n. Which is smaller: 8 or v?\nv\nLet u = -36 + 20. Let o = -149 + -26. Let s = 175.1 + o. Is s greater than u?\nTrue\nLet k = 3502 - 3581." +"/3\n50 divided by 50\n1\nDivide -18802 by 1.\n-18802\nDivide 564 by -6.\n-94\nWhat is 2 divided by -305?\n-2/305\n-14 divided by -303\n14/303\n7612 divided by 1903\n4\nWhat is 5 divided by -1005?\n-1/201\nCalculate -6 divided by -4517.\n6/4517\nWhat is -124 divided by -124?\n1\n4021 divided by 2\n4021/2\nDivide -17992 by 4.\n-4498\nDivide 16 by 131.\n16/131\nCalculate -738 divided by -18.\n41\nCalculate -1118 divided by -1.\n1118\n120 divided by -8\n-15\nCalculate -300 divided by -60.\n5\n-3 divided by 25\n-3/25\nDivide -10 by 172.\n-5/86\nDivide -3 by -142.\n3/142\nWhat is 357 divided by -76?\n-357/76\n7 divided by 325\n7/325\nWhat is -2 divided by 1000?\n-1/500\nDivide -1428 by -51.\n28\nDivide -1 by 3679.\n-1/3679\nWhat is -331 divided by 2?\n-331/2\n-2620 divided by -5\n524\nDivide 1788 by -149.\n-12\n-934 divided by 2\n-467\nWhat is -3 divided by -1015?\n3/1015\nWhat is -12644 divided by 4?\n-3161\nWhat is -368 divided by 4?\n-92\nDivide 340 by 68.\n5\nWhat is 8976 divided by -1122?\n-8\nWhat is -30 divided by 9?\n-10/3\n1816 divided by" +"62. Is 866 not equal to f?\nFalse\nLet g be 56/(-26) + (-2)/(-13). Let h = 0 - g. Suppose -2*v - h = -b, 2*v - 4*v = -5*b + 18. Which is smaller: 4 or v?\nv\nLet r be (-14 + 7)/(5/20*4). Which is bigger: r or 28?\n28\nLet c = 6 - 2. Suppose 0 = 3*g - g - c. Suppose 5 = 3*l - 4*o, -g*l + 4*o = o - 5. Is l >= -7/2?\nFalse\nSuppose -9*p + 10*p = -5, -5*s + 85 = 2*p. Which is smaller: s or 252/13?\ns\nSuppose 5*k + 197 - 47 = 0. Let q be k/(-7) - 4 - 25/14. Is 2 less than q?\nFalse\nLet f(i) = -i**3 + 6*i**2 - 2*i - 1. Let r be f(3). Suppose -r = -z + 5*c, 3*c + 12 = -z + 2*z. Does 3/11 = z?\nFalse\nLet b = 7040 - 12373. Let d = b - -810619/152. Let l = d - -2/19. Which is smaller: -1 or l?\n-1\nLet h be (-22)/5 + (-3)/(30/(-4)). Let m = -47777/4 - -11882. Let x = m - -62." +"of 4 and 235502.\n471004\nWhat is the lowest common multiple of 5512 and 24804?\n49608\nWhat is the common denominator of 29/36198 and 85/54?\n108594\nWhat is the lowest common multiple of 8140 and 14652?\n73260\nWhat is the common denominator of 4/2779 and 69/5558?\n5558\nWhat is the lowest common multiple of 72 and 19960?\n179640\nCalculate the lowest common multiple of 467704 and 147696.\n2806224\nWhat is the least common multiple of 80 and 56340?\n225360\nCalculate the lowest common multiple of 184728 and 36.\n554184\nWhat is the lowest common multiple of 1964 and 2946?\n5892\nFind the common denominator of 5/97396 and 17/206030.\n5356780\nCalculate the common denominator of 41/5 and 52/21655.\n21655\nFind the common denominator of -97/50610 and 163/43380.\n303660\nWhat is the common denominator of -89/11352 and -29/35088?\n385968\nFind the common denominator of -85/22 and -11/860.\n9460\nWhat is the common denominator of -77/36 and 27/63280?\n569520\nWhat is the smallest common multiple of 17960 and 425652?\n4256520\nWhat is the least common multiple of 314762 and 12?\n1888572\nFind the common denominator of 9/430 and 28/1297.\n557710\nFind the common denominator of -41/232348 and 41/580870.\n1161740\nWhat is the lowest" +" places?\n-6.21\nWhat is 3.8813 rounded to 1 dp?\n3.9\nRound -20293000 to the nearest one hundred thousand.\n-20300000\nWhat is -2644100 rounded to the nearest 10000?\n-2640000\nRound 0.00215684 to 5 decimal places.\n0.00216\nRound 0.01075 to three decimal places.\n0.011\nRound -0.000001331 to seven decimal places.\n-0.0000013\nRound -0.000049933 to six decimal places.\n-0.00005\nRound -12 to the nearest 10.\n-10\nRound -0.000075127 to 6 dps.\n-0.000075\nWhat is -0.00146 rounded to four decimal places?\n-0.0015\nWhat is -0.000008796 rounded to seven dps?\n-0.0000088\nRound -0.00023152 to 4 dps.\n-0.0002\nRound 8232 to the nearest one hundred.\n8200\nWhat is -3696000 rounded to the nearest one hundred thousand?\n-3700000\nRound -802100 to the nearest 100000.\n-800000\nWhat is -0.00057 rounded to 4 dps?\n-0.0006\nRound 0.292402 to one dp.\n0.3\nWhat is 0.000761 rounded to five dps?\n0.00076\nRound 5.99 to 0 dps.\n6\nRound -2.301 to 1 decimal place.\n-2.3\nWhat is 142.4 rounded to the nearest 10?\n140\nRound 0.000009445 to 7 dps.\n0.0000094\nWhat is 0.35717 rounded to two decimal places?\n0.36\nRound -7405.2 to the nearest 1000.\n-7000\nWhat is 1689030 rounded to the nearest one hundred thousand?\n1700000\nRound 0.000000827 to seven decimal" +"digit of 279783?\n2\nWhat is the hundreds digit of 128433?\n4\nWhat is the hundreds digit of 1181663?\n6\nWhat is the thousands digit of 20235380?\n5\nWhat is the ten thousands digit of 4494722?\n9\nWhat is the units digit of 250327?\n7\nWhat is the hundred thousands digit of 1213664?\n2\nWhat is the hundred thousands digit of 6500058?\n5\nWhat is the tens digit of 8468442?\n4\nWhat is the thousands digit of 310992?\n0\nWhat is the tens digit of 879577?\n7\nWhat is the thousands digit of 1462798?\n2\nWhat is the ten thousands digit of 8815967?\n1\nWhat is the thousands digit of 1032766?\n2\nWhat is the tens digit of 148344?\n4\nWhat is the ten thousands digit of 11191275?\n9\nWhat is the tens digit of 44934?\n3\nWhat is the thousands digit of 326020?\n6\nWhat is the units digit of 490679?\n9\nWhat is the hundred thousands digit of 2511215?\n5\nWhat is the units digit of 1121923?\n3\nWhat is the units digit of 75891?\n1\nWhat is the hundred thousands digit of 7090792?\n0\nWhat is the ten thousands digit of 146860?\n4\nWhat is the units" +" = -114*b, 5*i - 781 = -5*b - 521 for b.\n55\nSolve 0 = -12*g + 7*g + 3*g - 4*u + 12, -3*g + 15 = 5*u for g.\n0\nSolve -4*c - 8*w - 36 = -9*w, -53*w = -5*c - 49*w - 25 - 20 for c.\n-9\nSolve 5*m = d + 214, 26*m - 54*d - 1121 = -57*d for m.\n43\nSolve -j + 4*u - 105 = 78, j + 2*u = 93 for j.\n1\nSolve -8*p + 63 = 5*w, -14738*w + 16 = -14739*w + p for w.\n-5\nSolve -40*w + 4*x + 34 + 16 = -39*w - 0, 4*x = 4*w - 200 for w.\n50\nSolve 0 = 3*z - 5*y - 87, 5*y = -67*z + 68*z - 29 for z.\n29\nSolve 4*x = 184, 2*p + 5*p - 4*p = p + 9*x - x - 374 for p.\n-3\nSolve 0*o + 4 = o - 1 - 2, -5*r = -33*o + 231 for r.\n0\nSolve 3*w - h + 5915 = 5908, -2*w = -3*h + 7 for w.\n-2\nSolve 5*f - 49*p + 666 = 0," +"49 and 43031.\n1163\nCalculate the greatest common factor of 2046 and 6291318.\n66\nWhat is the highest common divisor of 30456 and 166530024?\n3384\nCalculate the highest common divisor of 108 and 6022890.\n54\nWhat is the highest common divisor of 66149946 and 486?\n486\nCalculate the highest common factor of 29381582 and 87.\n29\nWhat is the highest common factor of 101 and 534970?\n1\nWhat is the highest common factor of 1350652 and 18952?\n92\nWhat is the highest common factor of 9915 and 432885?\n15\nWhat is the highest common divisor of 3013 and 260912?\n23\nCalculate the highest common factor of 1127346 and 3971.\n209\nCalculate the greatest common factor of 12288 and 1785984.\n384\nWhat is the greatest common factor of 3628512 and 1116?\n36\nCalculate the greatest common divisor of 11118218 and 218.\n218\nWhat is the highest common divisor of 1228 and 29163158?\n614\nCalculate the highest common divisor of 1060 and 13823725.\n265\nWhat is the greatest common divisor of 215025 and 45496?\n47\nWhat is the greatest common divisor of 313252 and 132131?\n71\nWhat is the highest common factor of 8517952 and 11968?\n1088\nWhat is the highest common" +"3).\n3\nWhat is -1 - 2 - (0 + -7)?\n4\nWhat is the value of (5 - 1) + (-22 - -9) + 6?\n-3\n(-51 - -38) + 3 + 0 + 1\n-9\n-4 - (2 - 10) - 0\n4\nEvaluate (3 - -1) + -2 + 1.\n3\nWhat is 2 - -5 - ((5 - 14) + 13)?\n3\nEvaluate -3 + 5 + (-1 - 7) + 4.\n-2\nWhat is the value of 6 - (12 + -4) - 3 - 5?\n-10\nEvaluate (1 + -1 - -1) + 5 - 4.\n2\nCalculate (4 - (3 + -3) - 11) + 4.\n-3\nWhat is 5 + -1 - (-18 - (-33 + 15))?\n4\nWhat is -2 + (6 - (6 - 3))?\n1\nWhat is the value of (-3 - (4 + 1 + -4)) + 4?\n0\nEvaluate 1 - (-4 + -4 + 5).\n4\nWhat is -4 + 5 - (-6 - -2)?\n5\n0 + 0 + 2 + -1 + 1\n2\nWhat is the value of (4 - 2) + -20 + -2 + 20?\n0\nCalculate -5 + (-1 -" +" w = 35 + -33. Find the third derivative of -11*a**5 + 24*a**2 - 66*a**2 + 20*a**w wrt a.\n-660*a**2\nFind the second derivative of -2829*s**4 - 295*s - 99*s + 2828*s**4 - 26*s**3 - 120*s - 75*s wrt s.\n-12*s**2 - 156*s\nSuppose 2*q = 4*q - 8. Let l(w) = -q*w + 2 - 3*w + 10. Let c(b) = 7*b - 13. Let s(g) = 6*c(g) + 7*l(g). Differentiate s(n) wrt n.\n-7\nSuppose -3*i = -2*i - 3. Let k(t) = t + 2. Let m be k(i). Find the second derivative of -6*n**3 + 39 + m*n - 39 wrt n.\n-36*n\nSuppose 132 = 50*s - 268. Let j(q) be the first derivative of 10*q + 0*q**2 + 2/3*q**3 + s. Find the first derivative of j(w) wrt w.\n4*w\nFind the first derivative of 3 - 440*j**2 - 224 + 218*j**2 + 222*j**2 - 231*j**4 wrt j.\n-924*j**3\nLet o(c) be the third derivative of 0*c - 1/10*c**6 + 0 - 11/3*c**3 + 0*c**5 + 6*c**2 + 0*c**4. What is the derivative of o(a) wrt a?\n-36*a**2\nLet c(j) be the second derivative of 49*j**5/20 + 61*j**4/6 - 136*j. Find the third derivative" +"mon divisor of 207295 and 5775?\n55\nCalculate the highest common divisor of 9842 and 3779846.\n518\nWhat is the highest common factor of 28760 and 62240?\n40\nCalculate the greatest common divisor of 941985 and 12629.\n173\nCalculate the highest common factor of 5509735 and 2585.\n55\nWhat is the greatest common divisor of 1288 and 426188?\n28\nWhat is the greatest common factor of 71834174 and 38?\n38\nCalculate the highest common divisor of 41431 and 3677798.\n3187\nCalculate the greatest common factor of 8184592 and 19184.\n1744\nCalculate the highest common factor of 346415491 and 177.\n59\nWhat is the greatest common factor of 4522 and 3264485?\n133\nWhat is the highest common divisor of 1986376 and 136?\n8\nWhat is the greatest common divisor of 9453 and 1311090?\n411\nWhat is the highest common factor of 7938 and 1789641?\n189\nCalculate the highest common divisor of 383545950 and 4650.\n4650\nWhat is the greatest common factor of 17848102 and 7264?\n454\nCalculate the greatest common divisor of 597370 and 1395806.\n2914\nCalculate the highest common factor of 10705 and 24362439.\n2141\nCalculate the greatest common divisor of 41608 and 10997.\n7\nWhat is the highest common" +"Solve 5*j - j + 20 = d for j.\n-5\nLet n = 4 + -2. Suppose -1 = -m + n*d - 5, 4*m - 2*d = -4. Suppose -3*v + 3 + 3 = m. Solve 0 = -0*i + v*i for i.\n0\nLet l be 22/4 + (-3)/6. Let r be l/(-10) - 1/(-2). Solve -2*c + 3*c = r for c.\n0\nLet d = -12 - -16. Solve -2 = -d*w - 14 for w.\n-3\nLet a be 1*(2 - 0) - -2. Suppose -3*i = -0*x + 5*x - 31, -5*x + 2*i + 21 = 0. Solve a*m + x = -11 for m.\n-4\nLet o = 14 - 10. Solve y - o = -1 for y.\n3\nSuppose 0*s - 5*s + 40 = 0. Suppose -s*j - 4 = -9*j. Solve -5*f + 16 = -j for f.\n4\nLet u be -2 + (1 - 1*-4). Solve 3*j + 0*j - u = 0 for j.\n1\nLet c(m) = -2*m + 4. Let l be c(0). Solve -2 = -l*z - 6 for z.\n-1\nLet i = 17 - 11. Solve -4 =" +".2184 - r. Round p to 3 dps.\n0.019\nSuppose -3*f = -0*f + 25884441. Let s = f + 1928147. Round s to the nearest one million.\n-7000000\nLet k be 1/3 - 66/9. Let j = k + 11. Suppose 0 = j*b + 202222 - 82222. What is b rounded to the nearest one hundred thousand?\n0\nLet y = 21 + -13. Let q = 8.0000037 - y. What is q rounded to six dps?\n0.000004\nSuppose 7*k + 517 = 139. What is k rounded to the nearest ten?\n-50\nLet x be 15/(-1)*536000/6. Round x to the nearest one hundred thousand.\n-1300000\nLet t = -9688.63259826 + 9678.7326. Let b = -9.9 - t. What is b rounded to seven dps?\n-0.0000017\nSuppose 0*u + 8 = 2*u. Suppose -u*y - 88000 = -0*y. Round y to the nearest ten thousand.\n-20000\nSuppose -4*k = k - 4364580. Let f = 1322916 - k. What is f rounded to the nearest one hundred thousand?\n500000\nSuppose 0 = o - 0*o + 5200000. Round o to the nearest one million.\n-5000000\nSuppose -5*g - 5*j - 4755 = -3*g, -4*j + 7098 = -3*g." +"4)) + -18?\n-21\nWhat is -8 + 29 + 5 + -11 + -6 + 15?\n24\nCalculate (-9 - 22) + 11 + (9 - 8).\n-19\nWhat is -5 + 1 + 10 + (0 - 1)?\n5\nCalculate -420 + 396 - (-32 + -2).\n10\nEvaluate (14 - -1) + (-14 - 0).\n1\nCalculate 11 + -3 - (6 + (-11 - -14)).\n-1\nWhat is 3 + -3 + 4 + 1 + -4 + -3?\n-2\nEvaluate (14 - -1 - -13) + -23.\n5\nWhat is -5 - (-1 - (-17 + (9 - 1) - -7))?\n-6\nCalculate 1 + -2 + 1 - (-15 + 28 + -14).\n1\n(11 - -1) + -13 + 16 + -9 - -7\n13\n-2 - (40 + -37 + 3 + 1 + -15)\n6\nCalculate -11 + 11 - 8 - 4.\n-12\nWhat is the value of -8 + (-1 - 0 - -2) - -21?\n14\nCalculate 3 + 0 - (11 + (10 + 2 - -1)).\n-21\nCalculate -10 - (-38 - -45 - (3 - 0) - -4).\n-18\nEvaluate -36 + 9 - (-17" +"he remainder when 15 is divided by g.\n3\nSuppose 3*i = 6*i - 4*d - 79, 85 = 3*i - d. Let f = 17 - i. Calculate the remainder when (-5)/30 - 446/f is divided by 13.\n11\nLet d = -51 - -102. What is the remainder when d is divided by 11?\n7\nLet a = -14 + 31. Let j(k) = 3*k + 4. Let t be j(-8). Let b = -11 - t. Calculate the remainder when a is divided by b.\n8\nSuppose 4*d + 3*d - 105 = 0. Calculate the remainder when d is divided by 9.\n6\nSuppose 0 = 3*d - 0*d + 3, -3*h + 68 = 4*d. Let l(y) = -10*y - 7. What is the remainder when h is divided by l(-2)?\n11\nSuppose 4*i - 4*g = 0, 3 = -2*i + 3*g - 2*g. Calculate the remainder when 47 is divided by 1/(i*(-3)/144).\n15\nLet c(s) = 63*s - 1. Let m be c(3). Suppose -4*x + m = 5*d, 2*d = -d. What is the remainder when x is divided by 16?\n15\nSuppose -3*d = 4*n - 7, -4*n - 16 =" +"git of 3040526938?\n0\nWhat is the ten thousands digit of 163032772?\n3\nWhat is the ten millions digit of 636946286?\n3\nWhat is the thousands digit of 420086341?\n6\nWhat is the hundred thousands digit of 1227865448?\n8\nWhat is the ten thousands digit of 3638587005?\n8\nWhat is the tens digit of 63308414?\n1\nWhat is the hundreds digit of 638739403?\n4\nWhat is the tens digit of 672498456?\n5\nWhat is the hundreds digit of 50924619?\n6\nWhat is the units digit of 4345147518?\n8\nWhat is the thousands digit of 939100939?\n0\nWhat is the tens digit of 70018057?\n5\nWhat is the ten thousands digit of 5082373?\n8\nWhat is the thousands digit of 2684704732?\n4\nWhat is the hundred millions digit of 1867195029?\n8\nWhat is the ten millions digit of 30816940?\n3\nWhat is the hundreds digit of 6554037420?\n4\nWhat is the thousands digit of 1456956673?\n6\nWhat is the thousands digit of 165950417?\n0\nWhat is the thousands digit of 2616576290?\n6\nWhat is the tens digit of 772721481?\n8\nWhat is the thousands digit of 1488004?\n8\nWhat is the hundred millions digit of 942778920?\n9\nWhat is the hundred" +"5\nCalculate 0 - -1435504.\n1435504\nPut together -2.16 and 0.05.\n-2.11\n-127+-2794\n-2921\n0.05 + 192\n192.05\n-0.4 - -1600\n1599.6\nWhat is 0.05 plus -294.756?\n-294.706\n-0.1496 - 0.074\n-0.2236\nWhat is -0.636 less than -2.8?\n-2.164\nTotal of 7.9 and -0.041.\n7.859\nWhat is 0 take away -0.14873?\n0.14873\nAdd together -3248585 and 0.5.\n-3248584.5\nAdd together -137624 and -3.\n-137627\nSubtract 339.681 from -6.\n-345.681\nAdd -1.3 and -1044544.\n-1044545.3\n5349.092 + -0.2\n5348.892\nWhat is the difference between 1.564 and -0.93?\n2.494\nWhat is -0.0527 less than -0.098?\n-0.0453\nWhat is 5 - -395?\n400\nTotal of -5 and -1.136.\n-6.136\nWhat is 1.117 minus -1.5?\n2.617\nCalculate 97 - 3.417.\n93.583\nWork out 4 - -7725.\n7729\nWhat is -254 + 0.4?\n-253.6\nWhat is 222986 plus -0.4?\n222985.6\nTotal of 0.1 and -179.\n-178.9\nWork out -442 + 1865.\n1423\nAdd together -1055 and -7987.\n-9042\nWhat is -1033 - -2?\n-1031\nWhat is the difference between 188431 and 0.2?\n188430.8\nAdd together -0.4 and -796.\n-796.4\nWhat is -2648 + 4?\n-2644\nAdd -0.5 and 0.02282.\n-0.47718\nWhat is -23 plus -0.25?\n-23.25\nWhat is -0.12 take away 686?\n-686.12\nWhat is" +"t ten.\n110\nWhat is -4277738 rounded to the nearest ten thousand?\n-4280000\nRound 0.000778617 to four decimal places.\n0.0008\nRound 0.00007995294 to 7 dps.\n0.00008\nRound -332196000 to the nearest 1000000.\n-332000000\nWhat is -1461.82 rounded to the nearest ten?\n-1460\nWhat is -0.337248 rounded to 2 decimal places?\n-0.34\nWhat is 294.5522 rounded to one decimal place?\n294.6\nRound -5812900 to the nearest one million.\n-6000000\nRound 0.07437744 to 4 dps.\n0.0744\nWhat is -1168.881 rounded to the nearest ten?\n-1170\nWhat is -2711.495 rounded to the nearest integer?\n-2711\nWhat is -9571611 rounded to the nearest one million?\n-10000000\nRound -0.00000512782 to six decimal places.\n-0.000005\nRound 106.093 to 0 dps.\n106\nWhat is 3273433.5 rounded to the nearest 10000?\n3270000\nRound 0.0002275055 to 6 dps.\n0.000228\nWhat is 3225147000 rounded to the nearest 1000000?\n3225000000\nWhat is -5031.325 rounded to the nearest 10?\n-5030\nRound -1003240 to the nearest one million.\n-1000000\nWhat is -451124 rounded to the nearest 10000?\n-450000\nRound -0.00317288 to 3 dps.\n-0.003\nWhat is 59097.9 rounded to the nearest ten?\n59100\nRound -0.0000010448471 to seven dps.\n-0.000001\nRound -0.00437212 to four dps.\n-0.0044\nWhat is -266269.9 rounded to the nearest one" +"+ -2 + (-1)/1. Let q = j - 70. List the prime factors of q.\n101\nSuppose 0*k - 16 = -4*k. Suppose 5*x + 4*d = 619, -2*x - d - 245 = -k*x. What are the prime factors of x?\n3, 41\nSuppose 21*m - 6492 = -1305. List the prime factors of m.\n13, 19\nSuppose -74*k = -77*k + 1260. What are the prime factors of k?\n2, 3, 5, 7\nLet x = 19 + -14. Suppose 4*g = -5*o + 137, -4*o = -4*g - x*o + 149. Suppose h - 7 = -0*h - 5*v, 2*h - g = -2*v. List the prime factors of h.\n2, 11\nLet d(b) = b**3 - 4*b**2 - 5*b - 4. Let t be d(5). Let l be 2*(t/(-1) + -3). Let h(v) = 9*v**2 + 4*v - 4. List the prime factors of h(l).\n2, 5\nLet x = 225 - 89. List the prime factors of x.\n2, 17\nSuppose 3*y + 2*y - 155 = 0. Let j = 42 - y. List the prime factors of j.\n11\nLet d(r) = 34*r**3 - 2*r**2 + 3*r - 2. Let h be" +"))*(-2)/6. Solve 0 = o*m + 6 - a for m.\n-3\nSuppose -5*q + 25 = 0, 3*k = 2*k + 4*q - 7. Let g(l) = -2*l + 27. Let a be g(k). Solve a = -v - 0*v for v.\n-1\nLet f(s) = -6*s + 108. Let m be f(18). Solve m = -33*b + 28*b - 15 for b.\n-3\nSuppose 27*d - 182 = 13*d. Solve -d = -3*y - 28 for y.\n-5\nSuppose 0 = 13*u - 3 - 62. Suppose u*f - 39 = -4. Solve -3*z = -f*z - 20 for z.\n-5\nLet b be (-3)/(0 + (-4)/8). Let a = 8 - b. Suppose 0 = 4*h + g - a, 2*h - 4*g = 5 + 5. Solve -2 = -j - h for j.\n1\nSuppose 0 = 2*t + 2*b - 4, 4*b = -t - 2 + 1. Suppose -5*u = 4*v, 5*u = t*v + u. Solve v - 2 = -r for r.\n2\nLet s be (166/3)/(2/(-3)). Let p = -46 - s. Suppose 5*f - p = 38. Solve -8*j + f = -3*j for j.\n3\nSuppose -2*l =" +" equal to j?\nFalse\nSuppose 3*o + 5*z - 10 = -2*o, -z = -2*o + 1. Suppose -2*g + 2 = -4*g. Let y be (g/(-10)*4)/(-1). Is y at least as big as o?\nFalse\nLet u(o) = -o**2 - 12*o + 1. Let q be u(-15). Which is bigger: -43 or q?\n-43\nSuppose 0*w - 5*r = -3*w + 20, 2*r = 5*w - 8. Suppose -2*d + 5*d = w. Is 1 smaller than d?\nFalse\nLet y be ((-57)/15 - -2)/(6/(-60)). Which is smaller: y or 17?\n17\nLet r(z) = z**3 - 7*z**2 + 5*z + 5. Let q be r(6). Let f be q*(-1)/2 - 0. Suppose -3*a = -5 + 2. Which is smaller: a or f?\nf\nSuppose 6 = 5*l - 9, -2*v - 6 = -4*l. Suppose -3 = -v*g + 3. Is g >= 0?\nTrue\nLet w = 64 - 87. Are -28 and w non-equal?\nTrue\nLet t = 1879/20 - 94. Which is bigger: -1 or t?\nt\nSuppose 0 = -p + 5*p + 12. Let j = p + 6. Let c(w) = -w**3 + 8*w**2 - 6*w - 5. Let f be" +"*k + 4 + 0 = v, -5*n - 3*k - 31 = 0 for n.\n-5\nSuppose 5*q + 137 = -118. Let i = 57 + q. Solve 5*s + 15 = -3*v, -2*v = s + i + 4 for v.\n-5\nLet n(w) = -w**3 + 16*w**2 - w + 20. Let x be 98/6 + 7/(-21). Let c be n(x). Solve -5 = -2*z - c*p + 1, 0 = z + 3*p - 3 for z.\n3\nLet x = -15 - -23. Suppose 0 = f - 0 - x. Let w be (3 - (-14)/(-4))*-2*40. Solve 4*n - 4*k + f - w = 0, -5*k - 24 = -n for n.\n4\nLet y be 8*(1/2 + 3). Suppose -5*i - 57 = y. Let c = -17 - i. Solve c = -k - u - 2 - 1, -k + u = 1 for k.\n-2\nSuppose -2 = -y + 2*u + 7, 2*u = 2*y - 10. Let b = y - -8. Solve o - b = -4*m, 0*o - 4*o + 2*m = 0 for o.\n1\nLet q be ((-5)/(-2))/(2/4). Let u(x) = 2*x" +"4*t - n*l - 1. Solve w = -t*i + 5, 3*i - 4*w + 3 = -2*w for i.\n1\nLet q(c) = -362*c + 1814. Let i be q(5). Solve -2*z - 3*y = -i*z - 1, 5*z = -3*y + 29 for z.\n4\nLet j = -847 + 851. Suppose -17*r = -174 + j. Solve 3*g + r*x = 5*x - 27, -3*g = -4*x for g.\n-4\nSuppose -2*h + 3 = c + 5, -15 = 5*h. Let w(a) = a**3 - 9*a**2 + 24*a - 122. Let s be w(8). Solve 10 = -4*p + 2*q - c, p + s = q for p.\n-1\nLet s(w) = 7*w + 55. Let m be s(-9). Let i(c) = -10*c - 75. Let h be i(m). Solve 2*n + h*k = -19, -2*k + 6*k = -n - 14 for n.\n-2\nLet o = -6108 - -6113. Solve o*u - 3 - 2 = -5*q, 2*u = q - 13 for q.\n5\nLet y = 19456 - 19454. Solve -y*q - 10 = -2*c, 2*c - 6*q - 27 = -1 for c.\n1\nLet g(x) = -44*x - 1317." +"1010000111?\n101100011010000101\nIn base 3, what is -102121121 + -1000?\n-102122121\nIn base 8, what is 265 + -1775?\n-1510\nIn base 4, what is 33132 - 11?\n33121\nIn base 4, what is 1303231033 + 2?\n1303231101\nIn base 10, what is -51 - -4707?\n4656\nIn base 9, what is 11886 - 13?\n11873\nIn base 4, what is -231 - -230203?\n223312\nIn base 9, what is 5 - 663114?\n-663108\nIn base 13, what is 694 - -497?\nb5b\nIn base 3, what is -1 - -21002001?\n21002000\nIn base 12, what is -6b + -54?\n-103\nIn base 10, what is 6409 - -44?\n6453\nIn base 12, what is a6 + -3502?\n-3418\nIn base 5, what is -3 + 241402330?\n241402322\nIn base 16, what is -5f7 - 46?\n-63d\nIn base 5, what is 11324 - 32?\n11242\nIn base 9, what is 10418384 - -3?\n10418387\nIn base 15, what is 11 - -145c?\n146d\nIn base 7, what is -4244 - 11350?\n-15624\nIn base 10, what is 140581 - -5?\n140586\nIn base 14, what is -10 - 3046?\n-3056\nIn base 10, what is 13 - -49847?\n49860" +" 4.\n-112\n242 (base 7) to base 13\n9b\nConvert 1 (base 2) to base 9.\n1\nConvert 10 (base 5) to base 14.\n5\nConvert 16 (base 11) to base 6.\n25\nWhat is 7 (base 14) in base 15?\n7\nConvert 1030 (base 6) to base 14.\n12a\nConvert -2 (base 8) to base 2.\n-10\nWhat is -3 (base 8) in base 5?\n-3\nWhat is -a (base 12) in base 3?\n-101\nConvert 12 (base 7) to base 3.\n100\nWhat is 16 (base 7) in base 11?\n12\nWhat is 170 (base 14) in base 2?\n100100110\nConvert -3 (base 9) to base 4.\n-3\nConvert -5 (base 14) to base 13.\n-5\n-10001111 (base 2) to base 3\n-12022\nConvert -8a (base 16) to base 3.\n-12010\nWhat is 1 (base 2) in base 3?\n1\nConvert 3 (base 7) to base 9.\n3\nConvert 10101101 (base 2) to base 7.\n335\nConvert 3 (base 5) to base 16.\n3\n27 (base 15) to base 8\n45\nConvert 11 (base 8) to base 10.\n9\n-2 (base 15) to base 12\n-2\nConvert -1103 (base 7) to base 11.\n-32a\nWhat is 26 (base" +" + 7. Is x greater than 2?\nTrue\nLet u = 63 + -63. Which is greater: u or -1?\nu\nSuppose 2*c - 5*p = 7, -2*p - 1 = 5. Is c less than or equal to -4?\nTrue\nLet m = 121644/791 - 234/113. Let j = 152 - m. Do -1 and j have different values?\nTrue\nLet y be 77/(-175) - ((-64)/(-20) - 3). Are y and -2 unequal?\nTrue\nLet q = 0 - 4/3. Which is smaller: q or -3?\n-3\nLet w = 13 - 19. Let t be w/(-2)*(-2)/12. Which is smaller: t or 0.2?\nt\nSuppose -4*a - 4*n + 51 - 11 = 0, 0 = 4*n - 8. Suppose -4 = o + x, o - 5*x = 2*o + a. Is -2 at most o?\nFalse\nLet f be (-11 + 14)*2/(-6). Which is bigger: -2/5 or f?\n-2/5\nLet r = 86 - 77. Which is greater: r or -0.07?\nr\nLet o = 1 + -1. Let j = 7122573/35 + -203474. Let n = j + -144/5. Do o and n have the same value?\nFalse\nLet b = 16 - 12. Let c" +"6 = 21*v - 15 for v.\n1\nSolve 15*i = 3*i + 48 for i.\n4\nSolve 3*m + 0*m = 0 for m.\n0\nSolve -1461*m = -1470*m - 9 for m.\n-1\nSolve -2*c + 6 + 2 = 0 for c.\n4\nSolve 0 = -111*d + 42*d + 69 for d.\n1\nSolve 0 = 12*o - 9*o + 9 for o.\n-3\nSolve 16*p = -17*p + 165 for p.\n5\nSolve 0 = 3*b + 155 - 140 for b.\n-5\nSolve -10*z - 8 = -8*z for z.\n-4\nSolve -6 = 3*v - 9 for v.\n1\nSolve -q + 26 = 25 for q.\n1\nSolve -34 = 10*c - 4 for c.\n-3\nSolve 569*c - 576*c = -35 for c.\n5\nSolve -47 = -17*u + 21 for u.\n4\nSolve -3 = -54*d + 55*d for d.\n-3\nSolve -66*x + 112 = -82*x for x.\n-7\nSolve 21*t = -4*t for t.\n0\nSolve -29*b - 2 = -28*b for b.\n-2\nSolve 0*w + 2 = 2*w for w.\n1\nSolve 21*s - 34 = 4*s for s.\n2\nSolve -257 = 35*u - 12" +"al places?\n0.000028\nWhat is 1.246542 rounded to one dp?\n1.2\nWhat is 1.144491 rounded to 2 decimal places?\n1.14\nRound -551121 to the nearest one thousand.\n-551000\nWhat is 0.02427083 rounded to five decimal places?\n0.02427\nRound -32.8412 to 2 decimal places.\n-32.84\nWhat is 284148 rounded to the nearest 100000?\n300000\nRound -0.00824262 to four decimal places.\n-0.0082\nWhat is -890.3187 rounded to 0 dps?\n-890\nRound 73057070 to the nearest 10000.\n73060000\nRound 0.001139215 to 6 decimal places.\n0.001139\nRound 0.1484811 to four decimal places.\n0.1485\nWhat is 0.0033184391 rounded to 3 decimal places?\n0.003\nRound -44.6659 to the nearest 10.\n-40\nWhat is 0.0006203711 rounded to four decimal places?\n0.0006\nWhat is -36.7827 rounded to 0 dps?\n-37\nWhat is -0.1827249 rounded to four decimal places?\n-0.1827\nRound 216590.7 to the nearest one thousand.\n217000\nRound -760958.4 to the nearest one thousand.\n-761000\nWhat is 1.3324066 rounded to one dp?\n1.3\nRound 484.7029 to the nearest 10.\n480\nWhat is 0.1874745 rounded to two dps?\n0.19\nWhat is 1.0461262 rounded to two dps?\n1.05\nWhat is 162.8638 rounded to the nearest integer?\n163\nRound 0.4536847 to 4 dps.\n0.4537\nWhat is 0.000000224686 rounded to 7 dps?" +"e?\nTrue\nSuppose 0 = -2*n - 3*c + 1, 5*n - c - 14 = 3*c. Let m = n + -2. Is 11 + m/2*-1 prime?\nTrue\nSuppose -s = c - 3, -4*s = -3 + 7. Suppose 0 = -c*f + 31 + 29. Is f composite?\nTrue\nLet n(w) = w**3 + 4*w**2 + 3*w. Let z be n(-3). Suppose z*s = -2*s + 154. Is s a prime number?\nFalse\nLet a = 211 - 100. Let q = 6 + -5. Suppose -q = 5*p - a. Is p composite?\nTrue\nLet m = 26 + -11. Let s = -5 + m. Is s a composite number?\nTrue\nLet f be 2 - 0*(-4 - -5). Suppose f*c - 602 = 5*w, 0*c - w = c - 287. Is c prime?\nFalse\nIs 96 + (1 - 0/2) a composite number?\nFalse\nSuppose -5 = -4*n + 9*n, 46 = 4*v + 2*n. Let j be 1 + -3 - v/(-2). Suppose 4*s + 441 = -b + j*b, -2*b + 2*s + 292 = 0. Is b prime?\nFalse\nLet g = -34 - 8. Let l = g -" +"18247?\n3285*y**2 - 2*y - 1\nWhat is the i'th term of 27472, 27441, 27398, 27337, 27252, 27137?\n-i**3 - 24*i + 27497\nWhat is the p'th term of 12881, 12868, 12841, 12794, 12721?\n-p**3 - p**2 - 3*p + 12886\nWhat is the t'th term of 1840, 1838, 1836, 1834, 1832, 1830?\n-2*t + 1842\nWhat is the p'th term of -178, -199, -224, -253?\n-2*p**2 - 15*p - 161\nWhat is the g'th term of 653, 1230, 1777, 2294, 2781, 3238?\n-15*g**2 + 622*g + 46\nWhat is the h'th term of 85745, 171489, 257233, 342977, 428721?\n85744*h + 1\nWhat is the v'th term of -80, -294, -644, -1130, -1752?\n-68*v**2 - 10*v - 2\nWhat is the b'th term of 1766, 6580, 14440, 25346?\n1523*b**2 + 245*b - 2\nWhat is the u'th term of 1778, 1781, 1776, 1757, 1718, 1653, 1556, 1421?\n-u**3 + 2*u**2 + 4*u + 1773\nWhat is the i'th term of -250, -1244, -2912, -5260, -8294?\n-i**3 - 331*i**2 + 6*i + 76\nWhat is the r'th term of 25867, 26002, 26137, 26272?\n135*r + 25732\nWhat is the c'th term of 9806, 9781, 9756, 9731?\n-25*c + 9831\nWhat is" +"e 0 = 580*r + 2877 - 20857 for r.\n31\nSolve 6234*p - 69316 = -106856 - 18637 - 99673 for p.\n-25\nSolve 25894*f + 452532 - 1382445 + 219122 - 1930397 = 0 for f.\n102\nSolve 307*f = 2434 + 5804 + 358 for f.\n28\nSolve 0 = 13*z - 42*z + 213*z + 50*z + 18252 for z.\n-78\nSolve 4154*n + 108408 + 266474 = -152676 for n.\n-127\nSolve 0 = 502*t + 799*t + 5204 for t.\n-4\nSolve -10579*f + 119676 - 499917 = 783449 for f.\n-110\nSolve 3408*x + 39472 = -2148*x + 167196 + 333424 for x.\n83\nSolve 6653 + 10939 = -212*g + 5720 for g.\n-56\nSolve 767971*w = 767867*w - 4264 for w.\n-41\nSolve -52*o + 1260 + 1929 = -243 for o.\n66\nSolve -100634 = 98561*k - 100063*k for k.\n67\nSolve -62508 = 32*c - 62060 for c.\n-14\nSolve 52*l = 7430792 - 7430740 for l.\n1\nSolve 2041*g = -5711 - 16740 for g.\n-11\nSolve 0 = 75*m - 316*m + 86*m - 16430 for m.\n-106\nSolve -50*f - 186*f + 9512 = 100*f -" +"6, -v*s = 4*o + s - 8 for o.\n2\nSuppose -8*x = -1573 - 83. Suppose 0 = 3*b + c + 285, -x = 2*b - c - 4*c. Let q = -86 - b. Solve q = 2*g - u + 1, g = -u + 3 for g.\n4\nLet d be 4/(-3)*126/(-4). Suppose 0 = 40*v + 633 + 927. Let y = v + d. Solve 12 = y*b, -3*r - 5*b = -0*b - 5 for r.\n-5\nSuppose 0 = -q + 3*k - 10, 0 = -q - 192*k + 193*k + 2. Solve 3*t + q*g - 17 = 4*g, g = 4*t - 10 for t.\n3\nLet j(q) = 162*q - 968. Let w be j(6). Solve 7*b = 4*n + 12*b - 15, w*n = b - 3 for n.\n0\nSuppose -166 = -5*w + 49. Let v(i) = -6*i + 15. Let z be v(-4). Suppose -w + z = -r. Solve 3*x = -x - 3*h + 8, -r*h = 16 for x.\n5\nLet f(x) = x**2 + 22*x - 239. Let q be f(-30). Let p be (0/(q/(-5 - -4)))/(-2). Solve" +" is the u'th term of -246, -248, -250, -252?\n-2*u - 244\nWhat is the p'th term of -2, 44, 90?\n46*p - 48\nWhat is the k'th term of 7, 26, 55, 94?\n5*k**2 + 4*k - 2\nWhat is the a'th term of -206, -829, -1866, -3317, -5182?\n-207*a**2 - 2*a + 3\nWhat is the y'th term of 88, 333, 740, 1309, 2040, 2933, 3988?\n81*y**2 + 2*y + 5\nWhat is the h'th term of -253, -500, -759, -1036, -1337, -1668, -2035?\n-h**3 - 240*h - 12\nWhat is the d'th term of 226, 236, 244, 250?\n-d**2 + 13*d + 214\nWhat is the v'th term of -18, -43, -70, -99?\n-v**2 - 22*v + 5\nWhat is the n'th term of -148, -188, -254, -346, -464, -608, -778?\n-13*n**2 - n - 134\nWhat is the o'th term of 24, 42, 74, 126, 204?\no**3 + o**2 + 8*o + 14\nWhat is the b'th term of 688, 689, 690, 691, 692?\nb + 687\nWhat is the j'th term of -2738, -2737, -2736, -2735?\nj - 2739\nWhat is the g'th term of 19, 1, -21, -47?\n-2*g**2 - 12*g + 33\nWhat" +"2*g + 4. Suppose 12 = 7*c - 3*c. Let u be x(c). Is -10/3 at most u?\nTrue\nSuppose v - 6 = -v. Let c be 33/15 - v/1. Do 2/7 and c have the same value?\nFalse\nLet o = 112 - 112.53. Let i = 0.7 + o. Is i > 1?\nFalse\nLet d(k) = -k**2 - 16*k + 10. Let f be d(-5). Is f != 66?\nTrue\nLet c(m) = -3*m**2 - 53*m + 14. Let z be c(-21). Is z > -393/2?\nTrue\nLet q(k) = -k**2 - 4*k + 7. Let l be q(-5). Let j = l - -11. Which is smaller: 11 or j?\n11\nLet d = 284 - 152. Suppose -6*p + 258 + d = 0. Is 67 > p?\nTrue\nLet s be 8/6*126/84. Which is smaller: 1/18 or s?\n1/18\nLet w = 16.2 + -5.1. Let b = w - 11. Are b and -1/5 non-equal?\nTrue\nLet v(j) = j**2 + 4*j - 4. Let p be v(-4). Let n be (6/(-15))/(p/40). Let r be (30/5)/(6/4). Is n greater than or equal to r?\nTrue\nSuppose 5*y + 121 = 4*r, -5*y" +"f'th term of 24, 52, 80, 108, 136, 164?\n28*f - 4\nWhat is the z'th term of 7, -37, -103, -185, -277?\nz**3 - 17*z**2 + 23\nWhat is the f'th term of 7616, 7616, 7606, 7580, 7532, 7456?\n-f**3 + f**2 + 4*f + 7612\nWhat is the u'th term of -34, -128, -284, -502, -782, -1124, -1528?\n-31*u**2 - u - 2\nWhat is the i'th term of 413, 411, 409, 407, 405?\n-2*i + 415\nWhat is the f'th term of -522, -543, -584, -651, -750, -887, -1068, -1299?\n-f**3 - 4*f**2 - 2*f - 515\nWhat is the t'th term of -44, -35, -24, -11, 4?\nt**2 + 6*t - 51\nWhat is the b'th term of -12, -6, -18, -66, -168, -342?\n-3*b**3 + 9*b**2 - 18\nWhat is the o'th term of 309, 316, 321, 324, 325, 324?\n-o**2 + 10*o + 300\nWhat is the m'th term of 63, 66, 71, 78, 87, 98?\nm**2 + 62\nWhat is the q'th term of -21, -96, -215, -372, -561, -776, -1011?\nq**3 - 28*q**2 + 2*q + 4\nWhat is the x'th term of -28, -68, -110, -154, -200, -248, -298?\n-x**2 -" +" base 5, what is 142 + -1003?\n-311\nIn base 3, what is -12001021122 + 0?\n-12001021122\nIn base 6, what is 150434 + 2?\n150440\nIn base 14, what is -ccc38 + -5?\n-ccc3d\nIn base 7, what is 1 + -3401554?\n-3401553\nIn base 14, what is 3 + -c98a?\n-c987\nIn base 4, what is -20131031 - -21?\n-20131010\nIn base 4, what is -11112020332 + -3?\n-11112021001\nIn base 12, what is 3 - 16096?\n-16093\nIn base 10, what is 23 - -26218?\n26241\nIn base 13, what is -17c84 - -2?\n-17c82\nIn base 9, what is 222 - 3386?\n-3164\nIn base 4, what is 10313 + -12131?\n-1212\nIn base 3, what is 20212012212 - 2?\n20212012210\nIn base 3, what is -10220 - 1202012?\n-1220002\nIn base 9, what is -1747 - 8?\n-1756\nIn base 15, what is 631 + 86b?\ne9c\nIn base 10, what is -17952 + 4?\n-17948\nIn base 13, what is 1a - 75a?\n-740\nIn base 12, what is -2 + 32ba95?\n32ba93\nIn base 9, what is -16180 - 1?\n-16181\nIn base 8, what is -3 - -1300150?\n1300145\nIn base 5," +"\n1\nSolve 6 = -2*b + 5*b, 0 = -5*f + 5*b + 15 for f.\n5\nSolve -5*d - q - 17 = 0, 3*q + 19 = -5*d - 2 for d.\n-3\nSolve -4*n = 8*j - 10*j + 16, -n - 3*j + 3 = 0 for n.\n-3\nSolve 7*z = 6*z + m + 10, 4*m + 30 = 2*z for z.\n5\nSolve -4*z + 229*v + 32 = 231*v, v - 24 = -3*z for z.\n8\nSolve -4*b = 3*h - 6 - 10, -4 = -b - 5*h for b.\n4\nSolve -2*d = -2*o + 2, -4*o + 2 = -5*d - 3 for d.\n-1\nSolve 0*q - 5*a = -5*q - 30, -4*a = -8 for q.\n-4\nSolve 5*k - 3*x + 2*x - 10 = 0, 5*x + 26 = k for k.\n1\nSolve -4*s + 5 = 5*m, -m + 5 = 3*s + 4 for s.\n0\nSolve -3*k - 3*b = 2*k - 10, 2*k - 4 = 5*b for k.\n2\nSolve -3*h - 5*f - 16 = 0, -4*h + 2*f = -3*f - 37 for h.\n3\nSolve" +"0000\nRound 39744053.1 to the nearest 1000.\n39744000\nWhat is 128656.77292 rounded to 0 decimal places?\n128657\nRound 10356.211 to the nearest integer.\n10356\nWhat is -5927656.4 rounded to the nearest 10000?\n-5930000\nRound 0.000000076394 to 6 dps.\n0\nWhat is -6329.43095 rounded to the nearest one thousand?\n-6000\nWhat is -1672289390 rounded to the nearest 100000?\n-1672300000\nRound 0.00014771631076 to seven decimal places.\n0.0001477\nRound 225.07846 to the nearest 100.\n200\nWhat is -351016879 rounded to the nearest ten thousand?\n-351020000\nWhat is -10.790971948 rounded to one dp?\n-10.8\nRound -2231.10601 to the nearest ten.\n-2230\nWhat is 0.027555159772 rounded to 6 decimal places?\n0.027555\nWhat is 4875.1218 rounded to 1 decimal place?\n4875.1\nWhat is -58545500 rounded to the nearest one hundred thousand?\n-58500000\nWhat is 6056.798995 rounded to the nearest 10?\n6060\nWhat is -30924479.9 rounded to the nearest 10000?\n-30920000\nWhat is 7837702200 rounded to the nearest one million?\n7838000000\nRound 0.2216778539 to four decimal places.\n0.2217\nRound 2544783.7 to the nearest one thousand.\n2545000\nRound -247358.227 to the nearest 1000.\n-247000\nRound 8.34401409 to 2 dps.\n8.34\nWhat is 1522.939438 rounded to two dps?\n1522.94\nWhat is 0.00007601718004 rounded to 5 decimal places?\n0.00008\nWhat" +"+ 4\nCollect the terms in -5*m - 974 + 1948 - 974.\n-5*m\nCollect the terms in 1596006*a**3 + 3 - 1596010*a**3 + 3 - 4.\n-4*a**3 + 2\nCollect the terms in 5381811 - 5381811 - 26*r**2.\n-26*r**2\nCollect the terms in -58*j**3 - 23*j - 46*j + 1970*j**3.\n1912*j**3 - 69*j\nCollect the terms in -m - 14*m - 3 - m + 5*m - 24*m.\n-35*m - 3\nCollect the terms in 3 + 3 + 1 - 7 + 3148*f.\n3148*f\nCollect the terms in -5958742222 + 5958742222 + 2*z**2.\n2*z**2\nCollect the terms in 37*h**2 - 37*h**2 - 457*h**3 + 224*h**3 + 228*h**3.\n-5*h**3\nCollect the terms in -101 - 105 + 322 + 10*z - 116.\n10*z\nCollect the terms in 1051*u - 3160*u + 1057*u + 1051*u.\n-u\nCollect the terms in -62*i**3 - 52*i**3 - 63*i**3 + 246*i**3 + i**2 - 63*i**3.\n6*i**3 + i**2\nCollect the terms in -37*a**3 - 33*a**3 + 134*a**3 - 32*a**3 - 37*a**3.\n-5*a**3\nCollect the terms in 33865*z + 2*z**2 - 33865*z.\n2*z**2\nCollect the terms in 890*y**2 + 1168*y**2 + 671*y**2.\n2729*y**2\nCollect the terms in 2*h**2 + 1219 + 1218 - 2435 -" +"Product of -0.254 and -10.\n2.54\nMultiply 1 and -554.6.\n-554.6\nWhat is 0.057 times -0.7?\n-0.0399\nWhat is the product of -3.829 and 0.5?\n-1.9145\nCalculate -0.1*-24.\n2.4\nMultiply -1731 and 1.4.\n-2423.4\nCalculate -2*-152.\n304\n-86.03 * -5\n430.15\n-5*-11.14\n55.7\nProduct of 0.239 and 3.6.\n0.8604\nWhat is the product of 12 and 1195?\n14340\nWhat is the product of -49.4 and -0.4?\n19.76\nWhat is -509 times 6?\n-3054\n0.1 times -406\n-40.6\n0.3 times 77\n23.1\nWhat is the product of 0.13 and -0.047?\n-0.00611\n0.4 times 103\n41.2\nMultiply 0.3 and 424.\n127.2\n24*0.184\n4.416\n-37 * -0.035\n1.295\nWhat is the product of 151 and 0?\n0\nWhat is the product of 0.3 and 400?\n120\n5*-2362\n-11810\nCalculate -0.075*8.1.\n-0.6075\n-0.3 times -4.8\n1.44\n-16 times 1.7\n-27.2\n-0.3*-52\n15.6\n476*0.05\n23.8\nMultiply -11.6 and -32.\n371.2\nProduct of 0.1 and -0.1353.\n-0.01353\nCalculate -1.1*-29.\n31.9\nWork out 0.1 * 116.\n11.6\nWhat is 38.73 times 0.3?\n11.619\nWork out 0.1 * 222.\n22.2\nWork out -0.62 * -0.01.\n0.0062\nWhat is the product of -10758 and -2?\n21516\nCalculate 0.09*-1.7.\n-0.153\nCalculate 5*42.\n210\nWork out -0.2 * 71.\n-14.2\n-1.8*-0.3" +"e 25*p = -1091 + 1016 for p.\n-3\nSolve 0 = 24*f - 199 - 65 for f.\n11\nSolve 373*v = 365*v + 40 for v.\n5\nSolve 0*v = 31*v - 62 for v.\n2\nSolve -8*g = 34*g - 252 for g.\n6\nSolve 0 = 3*b - 14*b for b.\n0\nSolve 210*l - 4 = 211*l for l.\n-4\nSolve 12*j = 3291 - 3195 for j.\n8\nSolve -7*j - 90 = -55 for j.\n-5\nSolve -10*o - 955 = -955 for o.\n0\nSolve 0 = 33*t - 23*t + 10 for t.\n-1\nSolve 206 = -55*r - 234 for r.\n-8\nSolve -162 = -41*y + 14*y for y.\n6\nSolve -7*d - 1 = 6 for d.\n-1\nSolve 298 = -11*s + 331 for s.\n3\nSolve 3 = 44*i - 85 for i.\n2\nSolve -3*d + 5*d = -8 for d.\n-4\nSolve w = 8*w for w.\n0\nSolve -26 = -2*h - 20 for h.\n3\nSolve -7*a - 44 = -37 for a.\n-1\nSolve -2*t + 41 - 47 = 0 for t.\n-3\nSolve 8 + 32 = -8*u for" +" 3491 - 7877 for u.\n29\nSolve 884 + 439 - 2470 = -61*a - 720 for a.\n7\nSolve -1226*c + 38681 - 82612 = 95833 for c.\n-114\nSolve 1538*k + 59007 = 563 for k.\n-38\nSolve -489*n - 778*n = 17738 for n.\n-14\nSolve 337735*r + 5130 = 337621*r for r.\n-45\nSolve 3940*v - 1199*v = -183647 for v.\n-67\nSolve 10744 = 1522*o + 2717*o + 17*o + 1116*o for o.\n2\nSolve 1357 = 175*r + 144*r - 2790 for r.\n13\nSolve -2460*m - 19202 = 59337 - 120186 - 118253 for m.\n65\nSolve 220*m + 891*m - 49995 = 0 for m.\n45\nSolve 0 = 629*u + 7327 - 32487 for u.\n40\nSolve -33*c - 55459 = -57010 for c.\n47\nSolve -4908 + 69688 + 40312 - 21740 = 906*q for q.\n92\nSolve 44793 + 8722 = 31*a + 316*a + 348*a for a.\n77\nSolve 192*w - 1008*w = -105*w + 994*w + 80135 for w.\n-47\nSolve 341*a = -146*a - 134*a - 1863 for a.\n-3\nSolve 16089 + 135309 = 664*z + 1277*z for z.\n78\nSolve 0 = -22986*k +" +"vert 11584 (base 12) to base 11.\n16548\nWhat is 10231333222 (base 4) in base 15?\n19679a\n-20110413 (base 5) to base 11\n-aa323\nWhat is 1025334 (base 7) in base 14?\n33454\nWhat is -1355196 (base 10) in base 11?\n-8461a7\nWhat is -1926217 (base 12) in base 14?\n-9b548b\n11000101112 (base 3) to base 6\n1405452\nWhat is -1015544144 (base 6) in base 13?\n-2285146\nConvert 69d56a (base 16) to base 11.\n3a08067\nWhat is -100110001111010101110 (base 2) in base 15?\n-19b40d\nConvert -119823 (base 12) to base 6.\n-10045243\nConvert 6375 (base 8) to base 12.\n1b11\nWhat is 274b0a (base 13) in base 11?\n5a1149\n3611116 (base 8) to base 2\n11110001001001001110\nWhat is 32134204 (base 5) in base 3?\n111202222200\nConvert -121220012112 (base 3) to base 5.\n-41120243\n8513201 (base 10) to base 5\n4134410301\n-3333200 (base 4) to base 15\n-4ca2\nConvert 1752004 (base 11) to base 9.\n5533571\nConvert -9a846 (base 11) to base 9.\n-242360\nConvert -243352 (base 11) to base 16.\n-5e037\nConvert 183166 (base 10) to base 6.\n3531554\n173127 (base 10) to base 9\n283433\nWhat is -100433042 (base 5) in base 7?\n-3305626\n-8b4b6b (base 15) to base" +" p = 1367 + 733. Suppose -42*o + p = -7*o. Is o a multiple of 10?\nTrue\nLet h(n) = -n**2 + n + 3. Let g be h(-3). Let s be (-205)/g + 10/45. Is 4 a factor of (6 - 7)*2 + -1 + s?\nTrue\nLet a(j) = -10*j + 10. Let u = 21 + -23. Let v be a(u). Let w = -20 + v. Is w a multiple of 9?\nFalse\nLet o be (-134)/268*10*1. Let a be 3*(1 + (17 - 0)). Let y = a - o. Is 13 a factor of y?\nFalse\nLet o(h) = -19*h**3 - 31*h**2 - 49*h + 11. Is o(-7) a multiple of 8?\nTrue\nLet t be ((-1026)/95)/((-1)/5). Let a = 56 - t. Is 3192/27 - a/9 a multiple of 28?\nFalse\nIs 256/(-768)*771/(-1) a multiple of 18?\nFalse\nSuppose -4*d + 26 + 70 = 0. Suppose -d = -4*m - i, -3*i = 5*m - 10 - 27. Suppose -2*u - 295 = -m*w, -4*w - 4*u + 0*u = -236. Is w a multiple of 49?\nFalse\nSuppose -q - 6 = -3*q - 4*l, 0 = -2*q - l" +"461, -621, -763?\n9*k**2 - 205*k - 87\nWhat is the d'th term of -2765, -5471, -8117, -10703, -13229?\n30*d**2 - 2796*d + 1\nWhat is the a'th term of -30, -197, -504, -951, -1538, -2265?\n-70*a**2 + 43*a - 3\nWhat is the n'th term of -152681, -152679, -152677, -152675?\n2*n - 152683\nWhat is the u'th term of -1905, -3818, -5719, -7602, -9461?\nu**3 - 1920*u + 14\nWhat is the t'th term of -277154, -277153, -277152, -277151, -277150, -277149?\nt - 277155\nWhat is the f'th term of 475, 617, 749, 865, 959, 1025, 1057, 1049?\n-f**3 + f**2 + 146*f + 329\nWhat is the z'th term of -58, -180, -360, -604, -918, -1308?\n-z**3 - 23*z**2 - 46*z + 12\nWhat is the g'th term of -1686, -6758, -15220, -27078, -42338, -61006?\n-g**3 - 1689*g**2 + 2*g + 2\nWhat is the f'th term of -1825, -1828, -1841, -1870, -1921, -2000?\n-f**3 + f**2 + f - 1826\nWhat is the q'th term of 348, 694, 1040?\n346*q + 2\nWhat is the l'th term of 458, 970, 1528, 2132, 2782, 3478?\n23*l**2 + 443*l - 8\nWhat is the y'th term of 2679, 2625," +"7\n-7 - (30 - 22) - (-3 + 0 + -3)\n-9\nWhat is -62 + (-23 - (32 - (-21 + 73)))?\n-65\nWhat is the value of -15 + (-81 - (31 + -1 - (334 + -319)))?\n-111\nWhat is (-713 - -648) + 46 + -4?\n-23\nCalculate (2 - 43) + (-429 - -514).\n44\nWhat is the value of 11 - (80 + (-6 + -5 + 15 - -2))?\n-75\n(19 - ((19 - 54) + 54)) + (-1 - -119)\n118\n(15 - (-1 + -1)) + (143 - (-97 + 298))\n-41\nCalculate 9 - (73 - (83 - -76)).\n95\nWhat is -7 + (3 - (6 + -44)) + -4?\n30\nWhat is (-1 - ((-1 - 3) + 9)) + 2 - (431 + -404)?\n-31\nEvaluate 1837 + -1779 - (0 - -85).\n-27\nCalculate -2 + (5 + -1 - 3 - 3) - (-9425 - -9361).\n60\nCalculate 3 + 15 + (10 - (5 - 14) - 9).\n28\nWhat is 38 + 2 + (-37 - -34 - -6) + 4?\n47\nWhat is -4025 + 4023 + (0 - -2 -" +". Solve -h - 19 = -4*i, 4*h - s*i + 2*i = -28 for h.\n-3\nLet s(u) = u**2 + 2. Let a be s(0). Let h be 6 - (-1 + a - -1). Suppose -5*y + 0*l = -3*l - 25, 2*y - 2*l = 10. Solve -3*c - h*t - y = 0, -4 = -2*t - 2 for c.\n-3\nSuppose k = 2*k - 12. Suppose -2*y = 8 - k. Solve 0 = -y*g + u - 5, -5*g + 2*u = -2*u + 5 for g.\n-5\nLet s be (-3)/(-30) - 55/50. Let b be (s*1 - 3)*69/(-138). Solve 5*r - 4*q = -26, -b*r + 6*r = 2*q - 16 for r.\n-2\nLet c be 1*(-7)/6*-6. Let t = 7 - -1. Solve c = 5*n - 10*n + z, 0 = -4*z + t for n.\n-1\nLet t = 4 - 5. Let h be (5/(25/9))/(t/(-5)). Solve 3*d - 16 = 5*l, d - 3 = 5*l + h for d.\n2\nLet m = -41 + 45. Solve m*p + 0*b = 3*b - 10, 0 = -2*p + 4*b for p.\n-4\nLet s" +"- z - 32 + 9 + 24.\n-42850*z**2 - z + 1\nCollect the terms in -6778*f + 16763209 - 16763209.\n-6778*f\nCollect the terms in 109*x**2 + 71*x**2 + 72*x**2 - 38*x**2.\n214*x**2\nCollect the terms in 3350533*t**2 + 6 - 6 - 439850*t**2.\n2910683*t**2\nCollect the terms in 14476 + 14572 + 28*t**2 - 29048.\n28*t**2\nCollect the terms in 1464947*o - 5 + 4 - 582*o**2 - 1464947*o.\n-582*o**2 - 1\nCollect the terms in -1048*h - 776*h + 234*h + 3 - 3.\n-1590*h\nCollect the terms in -31835 + 73*y**3 + 15992 + 34*y**3 + 15843.\n107*y**3\nCollect the terms in -21045*h**3 + 951*h**2 + 4744*h**3 - 951*h**2.\n-16301*h**3\nCollect the terms in 1 - 3199*g**2 - 24 + 30 + 1 - 8.\n-3199*g**2\nCollect the terms in 29*m**2 + 149 + m**3 - 21*m**2 + m**3 - 25*m**2 - 149.\n2*m**3 - 17*m**2\nCollect the terms in -35538*h + 17968*h + 18729*h.\n1159*h\nCollect the terms in 17 + 9*a**3 - 93 + 39 + 12 + 21 + 4.\n9*a**3\nCollect the terms in 3592 - 38*f + 2276 - 1864 + 41*f.\n3*f + 4004\nCollect the terms in 334*k" +" base 5?\n-14142\nWhat is 3127 (base 9) in base 10?\n2293\n17682 (base 9) to base 13\n5744\nWhat is -367 (base 8) in base 11?\n-205\nConvert -3003111 (base 4) to base 9.\n-18130\nConvert 371 (base 10) to base 8.\n563\nConvert 15110 (base 12) to base 14.\naa96\nConvert -55073 (base 8) to base 4.\n-11220323\nConvert -318a (base 12) to base 6.\n-41054\n-13455 (base 6) to base 7\n-6122\n20535 (base 7) to base 6\n35253\n1238 (base 11) to base 4\n121032\nConvert -133210 (base 4) to base 6.\n-13204\n38c (base 14) to base 13\n42a\n-684 (base 12) to base 15\n-444\nConvert -12220100 (base 3) to base 4.\n-1003032\n532 (base 7) to base 15\n12d\n2241 (base 5) to base 15\n166\n131233 (base 4) to base 12\n1127\nWhat is -112456 (base 7) in base 10?\n-20131\nConvert 1546 (base 8) to base 2.\n1101100110\n296 (base 14) to base 13\n314\nConvert -1330203 (base 4) to base 15.\n-2566\n-45546 (base 9) to base 14\n-b0ac\nWhat is 376 (base 8) in base 12?\n192\nWhat is -20120 (base 4) in base 3?\n-201212\n-9d1 (base 14)" +"r when 82 is divided by (w/(-1))/(m/(-6)).\n19\nWhat is the remainder when (-16)/24*(-5)/(-2)*-51 is divided by 44?\n41\nSuppose 0*c + 43 = 4*x - 3*c, -3*x + 5*c + 35 = 0. Suppose -w - 3*b + 20 + 0 = 0, 2*b = x. Calculate the remainder when 6 is divided by w.\n1\nSuppose 7*m = 2*m + 2*c + 398, -5*m + 404 = 4*c. Calculate the remainder when m is divided by 14.\n10\nSuppose 0 = 5*s + v - 34, 3*s + s - 5*v - 33 = 0. Let n(b) = -b**3 - 3*b**2 - 2*b + 4. Calculate the remainder when (-2)/s*(-130 + -3) is divided by n(-3).\n8\nLet h = 256 - 158. Let v = 155 - h. What is the remainder when v is divided by 21?\n15\nLet x = 71 + -68. Let r(p) = 10*p - 2. What is the remainder when r(x) is divided by 15?\n13\nSuppose -2*o = -35 + 31. Suppose 195 = o*d + d. Suppose -4*m + 120 = 4*u, 2*u - 36 = 5*m + 45. Calculate the remainder when d is divided by u.\n32" +"605/(-360696) - 135/(-315)).\n2, 19, 113\nLet n(k) = 201*k - 300. Let o be n(8). Suppose 467*u - 464*u = o. What are the prime factors of u?\n2, 109\nLet d be 8/((2 + -3)/((-1)/2)). Suppose -2*b = -b - d. Suppose 2*t - 123 = -b*r - 3*t, 2*t = 5*r - 162. List the prime factors of r.\n2\nLet v be (-6)/(-6) + 24*-22. Let y = v + 1006. List the prime factors of y.\n479\nSuppose -4*p - 3*a + 39 = 0, -3*p + 23 = -0*a + a. Suppose -5*m + 21 = -4*g, -m - 15 = -2*g + p*g. What are the prime factors of (23 - m - 5) + -4?\n13\nSuppose 26301 = -134*d + 167*d. What are the prime factors of d?\n797\nSuppose -3*w = -2*x + 5, -2*x = 4*w + w - 13. Suppose 5*n = 21 + x. Suppose 2*q - 5*l + l - 150 = 0, n*q = l + 420. What are the prime factors of q?\n5, 17\nLet d(z) = 6*z**2 + 14*z - 85. Let l(a) = a**2 + 26*a + 9. Let o be" +"ng order.\n-3/5, p, k\nSuppose 65*d = 84*d - 98*d + 316. Sort 3, -6, 2, 1, d in descending order.\nd, 3, 2, 1, -6\nSuppose -24*x + 57*x + 264 = 0. Let r be (123/164)/(3/x). Sort -26, 0.1, 2/5, r in increasing order.\n-26, r, 0.1, 2/5\nLet c = -682 - -682.01. Let f = 35 - 38. Put f, c, -2, 0.3 in ascending order.\nf, -2, c, 0.3\nSuppose -5*b = -10*b - 15. Let p be (-60)/45*6/4. Let t be (15/(-15))/(0 + 1). Put t, p, b in ascending order.\nb, p, t\nLet a be ((24/(-12))/6)/(2/(-12)). Suppose -k = -0*k - 2*k. Put -3, 5, k, a in decreasing order.\n5, a, k, -3\nLet p = -5.12 - -5. Let i = p - -0.62. Let u = 182 + -551/3. Sort -1/4, u, i in decreasing order.\ni, -1/4, u\nLet k = 31838.98 + -31839. Let q = 20.68 + -21. Let l = 0.4 + q. Put k, 2, l in descending order.\n2, l, k\nLet h be (1425/(-4275))/(0 + (-2)/162). Sort -15, 3, h in decreasing order.\nh, 3, -15\nLet b(k) = k**2 -" +"= 56*z**2 + 5*z + 24. Is 27 a factor of m(l)?\nTrue\nSuppose 2*y + 3*y - 50 = 0. Suppose -5*d + 4*l = 112 - 38, 2*l - y = d. Is 37 a factor of (-1400)/d - 32/(-144)?\nFalse\nSuppose -t = -k + 6 - 2, 4*k - 4 = 0. Let m be (t/6)/(3/5400). Is 5 a factor of m/(-28) + 1/(-7)?\nFalse\nLet s = 10 - 9. Does 21 divide s - -2 - 6916/(-38)?\nFalse\nSuppose -2438*s + 2451*s - 56160 = 0. Does 10 divide s?\nTrue\nLet f = 3405 + 8250. Does 14 divide f?\nFalse\nLet l = -4699 + 6632. Suppose n - 4*g = 973, 5*g = -4*n + 2*n + l. Is n a multiple of 49?\nFalse\nLet d(h) = -h**3 + 10*h**2 + 37*h + 11. Let u be d(13). Is 35 a factor of (14 + u + (-90)/8)*-80?\nTrue\nLet i(b) = -6903*b**3 - 11*b - 7. Is 43 a factor of i(-1)?\nFalse\nSuppose 73*s - 1232490 + 56552 = 1811003. Does 14 divide s?\nFalse\nSuppose 3*n + 643 = 4*b - 0*b, 0 = 2*b + 2*n" +"j**3 + 6*j**2 - 7*j + 6. Let y be k(-7). Suppose -y*b + 3*b + 27 = 4*s, 2*s = -b + 13. Let o(t) = t - 3. What are the prime factors of o(s)?\n3\nLet x = 31 + -16. List the prime factors of x.\n3, 5\nLet m = 14 - 5. What are the prime factors of m?\n3\nLet v(p) = 13*p + 3. Let q be v(-2). Let w = q + 12. Let i = w + 14. What are the prime factors of i?\n3\nLet h be 14/49 - (-258)/(-21). List the prime factors of h/(-6) + 0 + 21.\n23\nLet j = 13 + -2. Suppose -t = -j - 2. List the prime factors of t.\n13\nLet m(o) = o - 4. Let s be m(8). Suppose -s = -b - 5. Let x = b - -6. What are the prime factors of x?\n5\nSuppose -i + 5*k - 2 = 8, 2*k + 35 = 3*i. Suppose 2*b - 4*b - n + i = 0, 3*n - 20 = -b. What are the prime factors of b?\n5\nLet g" +"\nFalse\nLet x = 8011 + -944. Is x prime?\nFalse\nSuppose x + w + 0 = 7, 4*x + 3*w = 31. Let d(o) = 6 - x*o**2 - 20*o - o**3 - 22 + 30*o**2. Is d(13) a prime number?\nTrue\nLet g(t) = 2*t + 6. Let d be g(0). Suppose d*x - 4376 = -404. Suppose -353 - x = -5*p. Is p a composite number?\nTrue\nIs 63278 + -3 + -13 + 0 + 2 + 3 prime?\nFalse\nLet v = 105434 - -20663. Is v prime?\nTrue\nLet x(q) = 150124*q + 3137. Is x(5) a composite number?\nTrue\nLet q(r) = -474*r**2 + 19. Let x be q(-6). Let f = -4584 - x. Is f a prime number?\nFalse\nLet l = 3264 + -2241. Suppose 16*y + l = 57455. Is y a prime number?\nTrue\nSuppose -633*u + 629*u + x + 24982 = 0, 0 = -2*x + 12. Is u a composite number?\nFalse\nSuppose 7*r - 11*r - 68 = -4*c, 5*r = -4*c + 23. Suppose 6*t + 117870 = c*t. Is t a composite number?\nTrue\nSuppose -4*i - 4*i = -88." +"-18\nSolve 4002 = -184*s - 3726 for s.\n-42\nSolve -1653*y + 28089 - 125616 = 0 for y.\n-59\nSolve 0 = 805*k - 91*k - 19816 + 5584 - 3618 for k.\n25\nSolve -659*b - 1513*b = -115996 - 14324 for b.\n60\nSolve 5431*g - 3053 = 5502*g for g.\n-43\nSolve 568*n - 272*n = 351*n - 5005 for n.\n91\nSolve -755*y - 21094 - 17541 - 22520 = 0 for y.\n-81\nSolve 1558712*m + 4736 = 1558840*m for m.\n37\nSolve -1209*t + 1929*t - 239653 = 5819*t for t.\n-47\nSolve 259088 + 41897 = 94*g + 6402*g - 296647 for g.\n92\nSolve -126*x - 2560 = 2012 - 1548 for x.\n-24\nSolve 0 = -360*f + 12440*f - 906000 for f.\n75\nSolve -1637*i + 3657 = -7802 for i.\n7\nSolve 126*p - 3875 + 551 + 392 = 848 for p.\n30\nSolve -41518 + 100414 = -3461*b - 13651 - 145496 for b.\n-63\nSolve -74*c - 4*c - 6823 - 1133 = 0 for c.\n-102\nSolve -91*h - 522*h + 28431 - 10749 = 650*h for h.\n14\nSolve -121*h = 60*h" +"\nc\nLet x = 3/20 - 141/140. Let z = -1081 - -1079. Which is smaller: x or z?\nz\nLet x = -1.52 - -1.56. Which is greater: -45 or x?\nx\nSuppose 91*a - 95*a + 8 = 0. Suppose -3*b - a*b = 65. Is 2/3 <= b?\nFalse\nLet g be 1/3 - (-62)/(-6). Let t = g + 20. Let k(y) = -y**3 + 3*y**2 + 3*y - 1. Let d be k(2). Is d <= t?\nTrue\nSuppose -57*n = -150 + 492. Let u be 2/8 + (-66)/8. Is n equal to u?\nFalse\nSuppose -65 = -19*i + 391. Are 91/4 and i equal?\nFalse\nLet c = -1 + -8. Let l be 21*2/c + (-3)/9. Is l not equal to -4?\nTrue\nLet j = -878/51 + 52/3. Suppose 0 = 6*i - 3*i - 5*g, 0 = 2*i - g. Suppose i = -4*m + 3*w - w - 8, 3*m = -3*w + 12. Which is greater: j or m?\nj\nLet v = 14568/1781 + 144/137. Do 8 and v have the same value?\nFalse\nSuppose 10*h = 2*o + 8*h - 36, -33 = -o +" +"\n53222\nWhat comes next: 1600, 3173, 4744, 6313, 7880, 9445?\n11008\nWhat is next in 163, 267, 407, 583, 795?\n1043\nWhat comes next: -3068, -3187, -3308, -3431, -3556?\n-3683\nWhat is next in 218, 115, 10, -97?\n-206\nWhat is next in -20375, -20395, -20437, -20507, -20611, -20755, -20945, -21187?\n-21487\nWhat comes next: 94, 293, 626, 1093, 1694, 2429?\n3298\nWhat is next in -39737, -39735, -39731, -39725, -39717?\n-39707\nWhat comes next: -187243, -187237, -187227, -187213?\n-187195\nWhat is the next term in -42491, -42494, -42497, -42500, -42503?\n-42506\nWhat is next in 108, 337, 518, 657, 760, 833, 882?\n913\nWhat is next in -404, -810, -1220, -1634, -2052, -2474, -2900?\n-3330\nWhat is the next term in 201, 323, 445, 567, 689, 811?\n933\nWhat is next in -14880, -29744, -44594, -59424, -74228, -89000, -103734?\n-118424\nWhat comes next: -9638, -18986, -28332, -37676?\n-47018\nWhat is next in -61, -178, -381, -712, -1213, -1926?\n-2893\nWhat is the next term in -1692, -1631, -1530, -1389, -1208?\n-987\nWhat is the next term in -148, -73, 4, 83, 164?\n247\nWhat is next in -84, -568, -1364, -2472, -3892, -5624?\n-7668\nWhat is the next term" +"r?\n10\nWhat is the square root of 21203806 to the nearest integer?\n4605\nWhat is the cube root of 578230907 to the nearest integer?\n833\nWhat is 4307058 to the power of 1/9, to the nearest integer?\n5\nWhat is the square root of 434335950 to the nearest integer?\n20841\nWhat is the third root of 8811918412 to the nearest integer?\n2065\nWhat is the seventh root of 1093430916 to the nearest integer?\n20\nWhat is the sixth root of 5455476 to the nearest integer?\n13\nWhat is 124007231 to the power of 1/2, to the nearest integer?\n11136\nWhat is the third root of 1310390705 to the nearest integer?\n1094\nWhat is the third root of 63882268 to the nearest integer?\n400\nWhat is 308278047 to the power of 1/3, to the nearest integer?\n676\nWhat is the square root of 30736680 to the nearest integer?\n5544\nWhat is the square root of 323059225 to the nearest integer?\n17974\nWhat is the third root of 101559151 to the nearest integer?\n467\nWhat is the seventh root of 95873461 to the nearest integer?\n14\nWhat is the square root of 326823433 to the nearest integer?\n18078\nWhat is 5013423327" +"z(f).\n2, 5, 7\nSuppose 0 = -3*l - 18 - 63. Suppose -5*s = -5*w + 170, -2*s = 3*w + 23 + 55. Let r = l - s. What are the prime factors of r?\n3\nSuppose 5*x + 5*b + 175 = 0, x = -x - b - 74. List the prime factors of -2 - 13/(x/270).\n2, 11\nLet v = 78 + -76. Suppose -v*x = 4*b - 318, -b - 4*b + 775 = 5*x. What are the prime factors of x?\n151\nSuppose 3*b - 1782 = 4*p, -3*p = -b - 85 + 679. What are the prime factors of b?\n2, 3, 11\nSuppose 2*h = h - g + 3, -h + g = -9. Let t(n) = 2*n**2 - n + 4. What are the prime factors of t(h)?\n2, 5, 7\nWhat are the prime factors of 102/(-9)*((-8811)/18 + 5)?\n17, 19\nSuppose 0 = -3*u - 3*k + 6, 2*u - 9 + 2 = -k. Suppose -4*t - 1 = 4*a - 9, -u*a = 2*t - 22. What are the prime factors of (705/a)/5*2?\n47\nLet u(g) be the third derivative of g**5/120" +"1856 = 3*d + 796, -2*d - 1779 = -3*f. Let l = -6 - 8. Let a = l - d. Is a a composite number?\nTrue\nSuppose -r = -f + 2*f, 2*r = -3*f. Suppose 3*i - 47 = 4*x, r = -0*i + 3*i - x - 50. Let d(h) = -h**3 + 23*h**2 - 6*h + 25. Is d(i) a prime number?\nTrue\nIs (4*(-9)/(-36))/(2/((-2325244)/(-2))) prime?\nTrue\nLet c be (9/(-2) - -3)/((-12)/464). Suppose 3*n = c + 32. Suppose -x - 19 = -r, -2*r + 5*x = x - n. Is r prime?\nTrue\nSuppose -995*d - 55 = -1000*d. Is d/110 - 4509/(-10) prime?\nFalse\nLet u(r) = 469*r - 45. Let q be u(5). Suppose 0 = -4*a - l - 11760, -a - q = -3*l + 653. Is (-5 + a + 4)*2/(-4) prime?\nTrue\nLet l(a) = 2*a**3 + 16*a**2 - 8*a + 5. Let v = 67 + -64. Let z be 34/v + (-8)/36*-3. Is l(z) prime?\nTrue\nLet p = 14 + -4. Suppose 0 = 4*u - 640 - 588. Suppose -p*t - u = -11*t. Is t prime?\nTrue\nLet s = 65" +"eger?\n21\nWhat is 401122 to the power of 1/2, to the nearest integer?\n633\nWhat is the third root of 1155141 to the nearest integer?\n105\nWhat is the third root of 698748 to the nearest integer?\n89\nWhat is 69777 to the power of 1/5, to the nearest integer?\n9\nWhat is the third root of 27459320 to the nearest integer?\n302\nWhat is the third root of 664260 to the nearest integer?\n87\nWhat is the eighth root of 371200 to the nearest integer?\n5\nWhat is the third root of 142532 to the nearest integer?\n52\nWhat is 6350459 to the power of 1/10, to the nearest integer?\n5\nWhat is 12443382 to the power of 1/5, to the nearest integer?\n26\nWhat is the third root of 291830 to the nearest integer?\n66\nWhat is the eighth root of 1346708 to the nearest integer?\n6\nWhat is the cube root of 494131 to the nearest integer?\n79\nWhat is 1598332 to the power of 1/3, to the nearest integer?\n117\nWhat is the square root of 573576 to the nearest integer?\n757\nWhat is the cube root of 190933 to the nearest integer?\n58\nWhat" +" 2340?\n2340\nCalculate the highest common divisor of 36420 and 805400985.\n9105\nCalculate the greatest common factor of 724 and 7361988.\n4\nWhat is the greatest common divisor of 116613140 and 20055?\n6685\nCalculate the highest common factor of 42390 and 72360.\n270\nCalculate the highest common divisor of 525 and 30325.\n25\nCalculate the greatest common divisor of 37 and 703434491.\n37\nWhat is the greatest common divisor of 1582 and 67158?\n14\nCalculate the greatest common factor of 2920 and 34332995.\n365\nCalculate the greatest common divisor of 54252 and 11422512.\n4932\nWhat is the highest common divisor of 597 and 22203?\n3\nWhat is the highest common factor of 143505 and 405?\n135\nWhat is the highest common divisor of 391 and 4078107?\n23\nWhat is the greatest common divisor of 16585657 and 814?\n407\nCalculate the greatest common factor of 158207 and 318511.\n233\nCalculate the highest common divisor of 407472677 and 51.\n17\nWhat is the greatest common divisor of 84 and 21001036?\n28\nWhat is the highest common divisor of 66200 and 2152162?\n662\nWhat is the greatest common divisor of 872 and 2387608?\n8\nWhat is the greatest common divisor of 361986150 and" +"he smallest value in -10, 4, p, 7/10?\n-10\nLet s = 23/21 + -10/7. Let b = -211211 - -211325. What is the biggest value in 1/8, s, b?\nb\nLet m = 190 - 189. Let j = -53.9 - -54. What is the third biggest value in m, 0, j?\n0\nLet p = 4.5 + 0.5. Let t = 86522 - 86522.3. What is the third smallest value in 1/3, t, p?\np\nLet h = -812.7 - -813. Let b = 0.01 + 1.99. What is the fourth biggest value in -3, b, 3, h?\n-3\nLet t = -164 - -134. Let f = t + 27. Which is the smallest value? (a) f (b) -2/3 (c) -2/15\na\nLet j = 119.6 + -118. Let m = 1.8 - j. What is the fourth smallest value in -5, m, -1/3, 0.1?\nm\nLet k = 0.18 + 0.007. Let n = k + 1.013. Which is the second smallest value? (a) n (b) -0.5 (c) -4/7\nb\nLet f = -2822 - -2817. Which is the smallest value? (a) f (b) 18.4 (c) 4 (d) -0.2\na\nLet l = 8 - 10." +"1. Put u, -1/3, d in increasing order.\nu, -1/3, d\nSuppose -14 = -a - j + 4*j, 26 = 2*a - 5*j. Let d be (-12)/2 + a/2. Let f(v) = v**3 + 7*v**2 + 9*v + 13. Let s be f(-6). Sort 4, d, s in descending order.\n4, d, s\nLet m = 6 - 6. Suppose 4*t = -m*t - 12. Let i = t + -5. Sort 3, 1, i in decreasing order.\n3, 1, i\nLet m be 42/(-630) + (-4)/(-6). Sort 2/11, m, 0.013 in descending order.\nm, 2/11, 0.013\nSuppose -4*n - 22 = -2*c, 0*n + 6 = c - n. Sort -10, 2, c.\n-10, c, 2\nLet y = -266 + 277. Put y, 6, 5 in descending order.\ny, 6, 5\nLet s = -0.623 - -1.623. Put -2, -1, s, 0.2 in descending order.\ns, 0.2, -1, -2\nLet p = -572.95 - -561. Let r = 8.1 + p. Let o = r - 0.15. Sort o, 3, 7 in ascending order.\no, 3, 7\nLet w(u) = -2*u - 2. Let z be w(0). Let d be (z/(-3))/((-16)/32). Put 0.4, d, -1.6, -5 in" +"92 is divided by 38630?\n2\nWhat is the remainder when 8196656 is divided by 353?\n349\nCalculate the remainder when 2127689 is divided by 531907.\n61\nWhat is the remainder when 24906425 is divided by 1485?\n5\nWhat is the remainder when 26101572 is divided by 157?\n8\nCalculate the remainder when 78548 is divided by 13016.\n452\nCalculate the remainder when 12738481 is divided by 292.\n273\nCalculate the remainder when 359624 is divided by 1175.\n74\nWhat is the remainder when 51445559 is divided by 1414?\n1411\nWhat is the remainder when 26376 is divided by 799?\n9\nWhat is the remainder when 8579633 is divided by 7?\n6\nWhat is the remainder when 28559 is divided by 535?\n204\nWhat is the remainder when 282761 is divided by 18837?\n206\nCalculate the remainder when 708204 is divided by 552.\n540\nWhat is the remainder when 654676 is divided by 15580?\n316\nWhat is the remainder when 3444090 is divided by 37033?\n21\nCalculate the remainder when 4995251 is divided by 344.\n27\nCalculate the remainder when 300456 is divided by 300445.\n11\nWhat is the remainder when 21038594 is divided by 18?\n14\nCalculate the remainder" +", 20, -12 in ascending order.\n-95, -12, -3, 20\nSort -1, -575, -267 in descending order.\n-1, -267, -575\nSort -0.0368, 1/2, 26 in decreasing order.\n26, 1/2, -0.0368\nSort 46135/4, 2/7, -0.4, 1/3 in decreasing order.\n46135/4, 1/3, 2/7, -0.4\nSort -1/56, -3, -13 in decreasing order.\n-1/56, -3, -13\nSort -8, -1.2, 9, 3, 5 in decreasing order.\n9, 5, 3, -1.2, -8\nSort -55, -2, -106, 2 in descending order.\n2, -2, -55, -106\nSort 3412, -4, 0, 3, -5, 20 in descending order.\n3412, 20, 3, 0, -4, -5\nPut 54, -328, -3, 2 in ascending order.\n-328, -3, 2, 54\nPut -2, 0.35, -1151, 1/2, 0.2 in decreasing order.\n1/2, 0.35, 0.2, -2, -1151\nPut -8, 3, 5, -907 in descending order.\n5, 3, -8, -907\nPut -5, 1, 346, -9 in descending order.\n346, 1, -5, -9\nSort 2447, 4, 0 in decreasing order.\n2447, 4, 0\nPut -3, 3, 1, 61 in ascending order.\n-3, 1, 3, 61\nPut -1, 55, -209, -12 in ascending order.\n-209, -12, -1, 55\nPut -1120, 0, -4180 in increasing order.\n-4180, -1120, 0\nSort 134, -98, -4 in descending order.\n134, -4, -98\nSort 288/5," +"nded to four dps?\n0.0002\nLet l(r) = -51388*r**2 + 12*r + 16. Suppose 0 = -5*o - 0*o - 60. Let a be l(o). Round a to the nearest one million.\n-7000000\nLet b(i) = 639*i - 2. Suppose o = -o + 4*q + 4, 0 = 2*o + 3*q + 10. Let x be b(o). Round x to the nearest 100.\n-1300\nLet m = 0.00021278 - 23.00015778. Let r = m - -23. What is r rounded to five dps?\n0.00006\nLet w = 173 - 119. Let k = w - 81. Let d = -27.0017 - k. What is d rounded to 3 decimal places?\n-0.002\nLet n = 0.00044817 + -3780967.00044817. Let x = n - -3780971.9999925. Let j = x + -5. Round j to 6 dps.\n-0.000008\nLet q = -57599.999944 + 57603. Let o = -3 + q. What is o rounded to five dps?\n0.00006\nLet m = -955623 - -37297. Let r = -918326.1500063 - m. Let s = -0.15 - r. What is s rounded to 6 dps?\n0.000006\nLet q(k) = -k**3 + 4*k**2 + 5*k - 1. Let d be q(5). Let h be -14*3/6" +" Suppose 37*r - s = 32*r. Calculate the greatest common divisor of 252 and r.\n28\nSuppose 54*y = -109*y - 69*y + 3712. What is the highest common factor of y and 8872?\n8\nSuppose 80 = -5*s + 5*m, -5*s - 74 = 11*m - 10*m. Let g be (s - 4)/(2/(-26)). What is the greatest common factor of g and 38?\n19\nSuppose 0*c + 2*d = c, 0 = 5*c - 3*d. Suppose c*k - 137 = -5*k - 2*o, o = -k + 28. Let i = 5 + k. What is the greatest common factor of 128 and i?\n32\nSuppose -7*p = 14, -5*l + 2*p + p + 15006 = 0. Calculate the greatest common factor of l and 42.\n6\nSuppose 2*l + 5*p = 490, 4*l + p - 757 = 241. Let o = -3546 + 3556. Calculate the greatest common divisor of l and o.\n10\nLet k(c) = -78*c + 129. Let z be k(0). What is the greatest common factor of 6579 and z?\n129\nLet o = 175 - 175. Suppose o = -2*v - 0*i - 2*i + 92, -3*i = 5*v - 220." +"nder when p is divided by 26?\n24\nLet z(q) = -514*q + 706. What is the remainder when z(0) is divided by 113?\n28\nLet c = -487 + 541. Suppose 2*v - c = 32. Calculate the remainder when 146 is divided by v.\n17\nSuppose -2*c + 3*p + 148 = 0, 0*c + 2*c = -p + 148. Let z = c + -89. Let x(w) = w**2 + 17*w + 67. What is the remainder when 147 is divided by x(z)?\n36\nSuppose -4*n + 17 = 5. Suppose -n*d + 46 = 13. Let g(r) = -28*r - 36. What is the remainder when g(-4) is divided by d?\n10\nLet u = 485 - 245. Suppose 0 = w + u - 279. Calculate the remainder when 310 is divided by w.\n37\nSuppose -3*o + 245 = 2*o. Let b = 155 - 150. Suppose -2*x - 90 = -7*x - b*c, 0 = 3*x - 2*c - 49. What is the remainder when o is divided by x?\n15\nWhat is the remainder when 201932/36 - 46/207 is divided by 17?\n16\nSuppose 0 = 5*c - 20, 5*v + c" +"order.\n-1, -2, -8\nSort 0.5, -1461.6, 3/4 in decreasing order.\n3/4, 0.5, -1461.6\nSort 1, -2, 21.\n-2, 1, 21\nSort -4/3, 189, -0.2 in decreasing order.\n189, -0.2, -4/3\nPut 0.4, -0.1, -0.2, -0.03, -5 in decreasing order.\n0.4, -0.03, -0.1, -0.2, -5\nPut 4/5, 0.5, 1/19, 2/7 in ascending order.\n1/19, 2/7, 0.5, 4/5\nPut 5, -3, 10, 8 in ascending order.\n-3, 5, 8, 10\nSort -77, -2, 3, -4 in increasing order.\n-77, -4, -2, 3\nSort -2/15, -156, -4, -8.\n-156, -8, -4, -2/15\nSort 5, -8, 2 in descending order.\n5, 2, -8\nPut 2, -5, 0 in descending order.\n2, 0, -5\nSort 7, 20, 0.5, 2/3 in decreasing order.\n20, 7, 2/3, 0.5\nSort -0.1, 45, -4 in ascending order.\n-4, -0.1, 45\nPut 497, -0.2, 0.3 in decreasing order.\n497, 0.3, -0.2\nPut -1, 5, -6 in descending order.\n5, -1, -6\nSort -2/29, -36, -1, -4.\n-36, -4, -1, -2/29\nSort -103, -5, 4, -18.\n-103, -18, -5, 4\nSort -13, 4, 27 in descending order.\n27, 4, -13\nSort 4, 45, -5, 0, 7 in decreasing order.\n45, 7, 4, 0, -5\nPut -8.9, -1, -0.4, 4 in" +" for l.\n-1\nSolve 1951 = -16*x + 1823 for x.\n-8\nSolve 0 = 39*k + 154 - 505 for k.\n9\nSolve -97*c + 102*c = 35 for c.\n7\nSolve -18*g = 94 - 40 for g.\n-3\nSolve -344 + 342 = -g for g.\n2\nSolve 36*s - 112 = 50*s for s.\n-8\nSolve -9*w - 2*w = -6*w for w.\n0\nSolve 363 - 327 = 9*t for t.\n4\nSolve 552*q = 556*q + 32 for q.\n-8\nSolve -11*w - 605 + 572 = 0 for w.\n-3\nSolve 2*q + 15 - 5 = 0 for q.\n-5\nSolve -b + 52 = 50 for b.\n2\nSolve -43*r + 42*r = 4 for r.\n-4\nSolve -34 = 19*p - 110 for p.\n4\nSolve -30 = -72*r + 66*r for r.\n5\nSolve -26 + 626 = 150*g for g.\n4\nSolve -3*a + 0*a = a for a.\n0\nSolve k - 10 = -6 for k.\n4\nSolve 614*y - 617*y = 24 for y.\n-8\nSolve -h + 52 - 49 = 0 for h.\n3\nSolve 0 = -19*d + 710 - 881 for" +" is the hundreds digit of 346807?\n8\nWhat is the hundred thousands digit of 2538297?\n5\nWhat is the units digit of 125404?\n4\nWhat is the ten thousands digit of 3767369?\n6\nWhat is the thousands digit of 6037854?\n7\nWhat is the ten thousands digit of 164524?\n6\nWhat is the hundred thousands digit of 610583?\n6\nWhat is the thousands digit of 507092?\n7\nWhat is the units digit of 2830422?\n2\nWhat is the ten thousands digit of 55448?\n5\nWhat is the hundred thousands digit of 6107229?\n1\nWhat is the millions digit of 1273484?\n1\nWhat is the tens digit of 482114?\n1\nWhat is the ten thousands digit of 129705?\n2\nWhat is the hundred thousands digit of 863050?\n8\nWhat is the tens digit of 425614?\n1\nWhat is the units digit of 23081444?\n4\nWhat is the tens digit of 5863775?\n7\nWhat is the thousands digit of 4345?\n4\nWhat is the units digit of 4441360?\n0\nWhat is the hundred thousands digit of 520711?\n5\nWhat is the units digit of 11186779?\n9\nWhat is the units digit of 313240?\n0\nWhat is the thousands digit of 53964?\n3" +"ing order.\n5, 2, 0.4, -0.04429\nSort -11.7, 6, -0.74, -0.5 in descending order.\n6, -0.5, -0.74, -11.7\nSort 106, 5, 13, 7, -7, -5 in descending order.\n106, 13, 7, 5, -5, -7\nPut 503, 3, 3205, -4 in increasing order.\n-4, 3, 503, 3205\nSort 4, -10, -4, 11, 681, 3 in decreasing order.\n681, 11, 4, 3, -4, -10\nSort 64.7, -2, 882 in increasing order.\n-2, 64.7, 882\nSort 139, 5, -3, -7, 20 in ascending order.\n-7, -3, 5, 20, 139\nSort -2, -484, -2/6321 in descending order.\n-2/6321, -2, -484\nPut 0.722, 0.1, -58, 0.2, 11 in decreasing order.\n11, 0.722, 0.2, 0.1, -58\nPut 1465, -5, -4, -602 in descending order.\n1465, -4, -5, -602\nSort -442.4085, 17, 2.\n-442.4085, 2, 17\nSort 353, -1, 6, -100, -3 in descending order.\n353, 6, -1, -3, -100\nSort 7, 12, 2, -314, 1, -6.\n-314, -6, 1, 2, 7, 12\nPut 2/3, -100, -3/2, -7.62 in increasing order.\n-100, -7.62, -3/2, 2/3\nSort 0.1, -5, -0.4280435 in descending order.\n0.1, -0.4280435, -5\nPut 8281, -4, -9, 127 in decreasing order.\n8281, 127, -4, -9\nSort 3, 145591, 5, -1 in decreasing order.\n145591, 5," +"Solve 175*b - 170*b = 3*r + 39, 3*r + 3 = -b for r.\n-3\nSolve 4*v - 5*w + 37 = 0, -40*w = v - 38*w - 7 for v.\n-3\nSolve -5*i + 6 = -30*r + 31*r, 0 = -3*r + i + 18 for r.\n6\nSolve 1331*r - 667*r = v + 660*r + 2, 0 = -4*v - 2*r + 28 for v.\n6\nSolve -4*s - 4*b + 24 = 0, b = -2*s - 7 + 15 for s.\n2\nSolve -4*i - 45 = 5*r, -15 = -2*r - 18*i + 23*i for r.\n-5\nSolve -2 = -3*v + 4, -3*b + 2 = -2*v for b.\n2\nSolve 0 = -3832*c + 3835*c + j + 11, 2*c - 3*j = 22 for c.\n-1\nSolve 4 = 4*v - 4*w, 5*v - 8*w = -11*w + 21 for v.\n3\nSolve 0 = 5*z - 3*j - 17, -716*z + 712*z + j + 8 = 0 for z.\n1\nSolve 5*v - 2*j + 139 = 93, 4*v = 6*j - 5*j - 38 for v.\n-10\nSolve 20*q - 17*q = x - 4," +"5\nIn base 12, what is 0 - -8?\n8\nIn base 12, what is -1912 + 4?\n-190a\nIn base 5, what is 11 + -43?\n-32\nIn base 14, what is -30 + 5?\n-29\nIn base 9, what is -3 + -1846?\n-1850\nIn base 11, what is -2 + 277?\n275\nIn base 3, what is 220 + 110020?\n111010\nIn base 8, what is -104 - 157?\n-263\nIn base 11, what is -2 - 58?\n-5a\nIn base 9, what is 75 - -1?\n76\nIn base 3, what is 102 + -1200?\n-1021\nIn base 5, what is 0 - -104312?\n104312\nIn base 13, what is 24 + -25?\n-1\nIn base 7, what is 2 - -1252?\n1254\nIn base 16, what is -2 + 191?\n18f\nIn base 14, what is 6 + ba?\nc2\nIn base 9, what is -102 - -3?\n-88\nIn base 4, what is -3 + -21303?\n-21312\nIn base 9, what is 2 + -26?\n-24\nIn base 11, what is 6 + -23?\n-18\nIn base 13, what is 56 + 0?\n56\nIn base 13, what is 16 - -18?\n31\nIn" +" of -108*k**2 + 13*k**5 + 56*k**2 + o*k**2 wrt k.\n780*k**2\nLet c(f) be the first derivative of -6535*f**6/6 + 28*f**3/3 + 6*f + 5306. What is the third derivative of c(o) wrt o?\n-392100*o**2\nLet g(v) be the second derivative of -1060*v**7/21 - 23*v**3/3 - v**2 + 30*v - 2. What is the second derivative of g(c) wrt c?\n-42400*c**3\nSuppose h + 2 = 5*j + 5, 5*h = 4*j + 15. Differentiate v + 3*v - 6*v - h*v**3 + 3 - 114 - 80*v**3 with respect to v.\n-249*v**2 - 2\nLet y(i) be the first derivative of 1718*i**3/3 - 2246*i + 3080. Find the first derivative of y(b) wrt b.\n3436*b\nWhat is the second derivative of -816*r**2 - 1291*r + 2464*r + 7119*r + 362*r**2 - 516*r**2 wrt r?\n-1940\nLet q(a) be the second derivative of -9*a + 0*a**3 + 0 - 21/2*a**2 - 11/20*a**5 + 0*a**4 + 1/15*a**6. What is the derivative of q(r) wrt r?\n8*r**3 - 33*r**2\nLet n(l) = 5 + 7 + 14*l - 9. Let s(k) = 42*k + 9. Let i be 5*-1 - (-4 - -5). Let b(z) = i*s(z) + 17*n(z). Find the first" +"-2, -4 in descending order.\n10, -2, -4\nPut 11, 0.4, 1 in ascending order.\n0.4, 1, 11\nSort 0, -44, -2, 3 in descending order.\n3, 0, -2, -44\nSort 2, 13, -2, 4.\n-2, 2, 4, 13\nSort -4, 2, 6.\n-4, 2, 6\nSort -5, 3, -15, -2 in ascending order.\n-15, -5, -2, 3\nSort 7, 3/4, -3, 1/8, 5 in descending order.\n7, 5, 3/4, 1/8, -3\nSort 0.2, 13/3, 2 in ascending order.\n0.2, 2, 13/3\nSort -4, 0.06, 3, -3 in descending order.\n3, 0.06, -3, -4\nPut 395, -2/15, -2 in ascending order.\n-2, -2/15, 395\nSort -2/5, 2/29, -2, 5.\n-2, -2/5, 2/29, 5\nSort 58, 3, 0 in descending order.\n58, 3, 0\nPut -9, 2, -1 in descending order.\n2, -1, -9\nSort 1, 0.5, 195, -1.\n-1, 0.5, 1, 195\nSort -6, 5, 4 in descending order.\n5, 4, -6\nSort -47, 20, 2 in ascending order.\n-47, 2, 20\nSort -2/5, 2, -18, -4/3 in decreasing order.\n2, -2/5, -4/3, -18\nSort -5, 1.1, -1/4, 21/5 in ascending order.\n-5, -1/4, 1.1, 21/5\nSort -3, 0, 2, 1656 in increasing order.\n-3, 0, 2, 1656\nPut 4," +"= 2*o. Calculate the smallest common multiple of 194 and o.\n2134\nLet c = -122/15 + 377/60. Calculate the common denominator of 93/46 and c.\n460\nLet r be 0/(-4) + 2 + 2. Suppose -3*x + 25 = -4*d, -r*x - 7 = 4*d - x. What is the least common multiple of ((-8)/d)/((-1)/(-8)) and 18?\n144\nSuppose -4*y + o = -163, -12 = y + 4*o - 40. Suppose 0*i + y = 4*i. Calculate the least common multiple of i and 10.\n10\nLet q = -242 - -264. Let o = 8 + -6. Calculate the lowest common multiple of q and ((-6)/15)/(o/(-10)).\n22\nLet a = -14 + 16. Suppose -a*q + 10 = -8. What is the least common multiple of 7 and q?\n63\nLet t = -405296 + 129694823/320. Find the common denominator of -31/96 and t.\n960\nSuppose -4*p + 37458 = 5*p. Let g = p + -66545/16. Calculate the common denominator of g and 3 - 3 - (-35)/2.\n16\nSuppose -63*s + 30 = -60*s. What is the least common multiple of s and 7?\n70\nLet z = -1728/77 - -306343/13860. Calculate the common denominator" +" 5*d - h. Suppose x = 53*f - 55*f + 1706. Is f a prime number?\nTrue\nSuppose 395*p + 105436 = 399*p. Suppose p = -7*w + 100916. Is w prime?\nTrue\nIs 5/(110/(-4))*13757995944/(-1008) a composite number?\nFalse\nSuppose -4*w + 28 = 3*h + 2*h, -2*h + 4 = -2*w. Is (-310248)/(-168) + w/7 composite?\nFalse\nSuppose 60 - 28 = -2*g. Let b(z) = -15*z**2 - 26*z - 2. Let j(l) = -7*l**2 - 13*l - 1. Let k(o) = -4*b(o) + 7*j(o). Is k(g) composite?\nFalse\nSuppose -2*n = -2, -5*y - 3*n = -3*y - 1. Let r be 3/((-36)/8)*-3 - y. Suppose -4*k + 5*w + 2605 = k, 1547 = r*k + w. Is k a prime number?\nFalse\nLet x(w) = -2*w + 80. Let p be x(30). Suppose p*q = -7680 + 21460. Is q composite?\nTrue\nSuppose f = -4*x + 63, 3*x + 2 - 50 = -f. Suppose 0 = -x*a + 27*a - 106332. Is a prime?\nTrue\nLet r = 121 + 802. Suppose -4*u - 729 - r = 0. Let s = -264 - u. Is s a composite number?\nFalse\nSuppose 149 =" +"order.\n-1, 0.1, 0.3, 1.9\nSort -37, -5, -2 in descending order.\n-2, -5, -37\nPut 26, 5, 0.11 in decreasing order.\n26, 5, 0.11\nSort -2, -1, 5, -4.\n-4, -2, -1, 5\nSort -3, -1, -0.069, 0.4 in decreasing order.\n0.4, -0.069, -1, -3\nPut -4, -11, -38 in ascending order.\n-38, -11, -4\nPut -1/5, -1, 0.15, -2/5 in decreasing order.\n0.15, -1/5, -2/5, -1\nSort 15, -5, -2 in increasing order.\n-5, -2, 15\nPut 5, -2/17, 1098, 2/3 in increasing order.\n-2/17, 2/3, 5, 1098\nPut 4, -6, -5 in increasing order.\n-6, -5, 4\nSort -0.12, 9, -5, -0.3, -2/7 in descending order.\n9, -0.12, -2/7, -0.3, -5\nSort 0.2, 10/7, 0.1.\n0.1, 0.2, 10/7\nPut 1/8, -2.4, -0.2 in descending order.\n1/8, -0.2, -2.4\nSort 2/15, -3, 1 in ascending order.\n-3, 2/15, 1\nSort -20, -2, -3.\n-20, -3, -2\nSort 70, -3, 5 in descending order.\n70, 5, -3\nPut 0.33, 4.1, 3 in increasing order.\n0.33, 3, 4.1\nSort 0, -4, -37, 4 in decreasing order.\n4, 0, -4, -37\nPut -36, 60, -4 in decreasing order.\n60, -4, -36\nSort -36.6, 0, -1/5.\n-36.6, -1/5, 0\nPut -140, -8," +" = -13*z + 3332 - 2682. What is the remainder when 443 is divided by z?\n43\nLet w(m) = m**2 - m + 119. Let g be -4 + 4 - 0/1. What is the remainder when w(g) is divided by 33?\n20\nLet o = 6561 - 6525. What is the remainder when 168 is divided by o?\n24\nSuppose 3*j - 33 = 157*n - 160*n, -5*j - 55 = -5*n. What is the remainder when 54 is divided by n?\n10\nLet c be -4 + 1 - (2 - 7). Let v be (90/(-24))/(c/(-8)). Calculate the remainder when ((-25)/v)/(5/(-255)) is divided by 44.\n41\nSuppose -8*d - 7*d = -66 - 54. Calculate the remainder when 546 is divided by d.\n2\nLet o be (-519)/((3/2)/(-1)). Let b(q) = -q**2 + 84*q + 4841. What is the remainder when (o/4)/((-1)/(-2)) is divided by b(123)?\n41\nLet y be (-2)/(-4) + (-2)/4. Let p be ((-12)/60*6)/(6/(-20)). Suppose p*q + x = -y*x + 303, 3*x - 309 = -4*q. Calculate the remainder when q is divided by 26.\n23\nSuppose 106*l + 4*y = 108*l - 144, -5*y - 45 = 0. What is the remainder" +" = 102 - 96. What is the least common multiple of q and 11?\n66\nLet j be (9/(-4))/((-12)/(-224)). What is the smallest common multiple of 11 and j/(-5) + 4/(-10)?\n88\nLet u be 573/(-27) + (-2)/(-9). Find the common denominator of u/70*250/(-12) and 43/9.\n36\nLet a = 41 + -21. Suppose -3*v + a = u, 2*v + 4*u = 7*v - 56. Suppose -k - 4*f = -0*f, f = 2*k - 9. Calculate the lowest common multiple of v and k.\n8\nFind the common denominator of 33/7 and 31*(1 - 0)/(-4).\n28\nLet v(m) = -m + 12. Let j be v(0). Suppose -u - j = -2*u. What is the smallest common multiple of u and 10?\n60\nLet l = -20353365143/1154660 + 31/288665. Let n = -17621 - l. Calculate the common denominator of -25/12 and n.\n60\nSuppose 5*i = 3*h - 12, 20 = 3*i + 6*h - h. Suppose y + i*y = 20. What is the common denominator of -39/14 and (2/y)/(8/(-530))?\n56\nLet u = -6 - -6. Suppose v + 4*x + 38 = u, 5*x - 63 = -2*v + 5*v. Calculate the common denominator" +"hich is the nearest to -1/2? (a) 0.15849 (b) 8 (c) -1 (d) -4/23\nd\nWhich is the closest to -2/13? (a) -0.57165 (b) 0 (c) -7/5\nb\nWhich is the nearest to 716.8? (a) -1 (b) -2 (c) 0.2 (d) -13\nc\nWhat is the nearest to 0 in -0.2, 2, -2476, 0, 20?\n0\nWhat is the nearest to 0.2 in 4, 10, 43, -0.0187, 0.3?\n0.3\nWhich is the closest to 1.7? (a) 2/17 (b) -11141 (c) -3/5\na\nWhat is the closest to 1.55 in -4/7, 39, -113?\n-4/7\nWhat is the closest to 4 in -13, -1, -2/2197, 10/7?\n10/7\nWhat is the closest to 4 in -1, -2, 9/209?\n9/209\nWhich is the nearest to 1/3? (a) -5 (b) -5/3 (c) 2775.4\nb\nWhat is the closest to -27 in 1, -1/2, 122152, -2?\n-2\nWhat is the nearest to 1 in 1/2, -1/4, -0.11643, 0.1, 0?\n1/2\nWhat is the nearest to -248/15 in -2/9, 2/19, 0.1, -0.3, -1?\n-1\nWhat is the nearest to 328 in -2, 1, 0.0147, 4?\n4\nWhich is the nearest to -3/8? (a) -1 (b) -2/825 (c) -2 (d) -5\nb\nWhat is the closest to 1/4" +" -0.19 and 3?\n-0.57\nWork out -11.855 * -4.\n47.42\nMultiply -0.1 and 7.\n-0.7\nCalculate 5*113.\n565\nCalculate -4*3.6.\n-14.4\n0.2 times 1.24\n0.248\n2.327 * -0.3\n-0.6981\n3 * -5546\n-16638\nMultiply -0.1 and -27.5.\n2.75\nCalculate -4.998*-0.2.\n0.9996\n-0.2*-68\n13.6\n-0.1*73\n-7.3\n-6 times -0.1\n0.6\nMultiply 49 and -6.8.\n-333.2\n4*180\n720\nWhat is the product of 236 and -0.05?\n-11.8\nWhat is 3947 times 0.3?\n1184.1\n267 * -1\n-267\nProduct of 14 and -424.\n-5936\n1549 times 0.08\n123.92\nCalculate -2*0.0629.\n-0.1258\n0.018 times 0.01\n0.00018\n3 times -112\n-336\nProduct of -0.1 and 47.\n-4.7\nWork out 2012 * -5.\n-10060\nCalculate 2*0.411.\n0.822\n3 times 0.187\n0.561\nProduct of -154 and 0.3.\n-46.2\nWhat is the product of 0.6 and 0.1059?\n0.06354\n-713.3*-0.3\n213.99\nWhat is the product of -1 and 233?\n-233\nMultiply -1.964 and 2.\n-3.928\nProduct of -51 and -1.\n51\n0.488 * 2\n0.976\nCalculate 24*2.68.\n64.32\nWhat is -25 times 0.04?\n-1\n62 times -0.13\n-8.06\nWork out 0.15 * 52.\n7.8\nCalculate -3*0.76.\n-2.28\nCalculate -0.5*181.\n-90.5\nProduct of -3 and -1.91.\n5.73\n0.5 * -1.13\n-0.565\nProduct of -1 and -0.0381.\n0.0381\nCalculate -7*2.7.\n-18.9" +" -4*r + 64, -k - 4*k = -5*r + 60. Is 15 equal to r?\nFalse\nSuppose 0 = -3*z - 12, 3*y = -2*y + 5*z + 65. Is 10 less than y?\nFalse\nLet j = -2.3 + 2.5. Which is smaller: j or -2?\n-2\nLet h = -29 + 31. Let p = -4 - -5. Which is greater: p or h?\nh\nLet f = -458 + 35268/77. Is f > 0?\nTrue\nLet d = -1 - -0.9. Let b = d - 0. Let t = -0.33 + -0.67. Which is smaller: t or b?\nt\nSuppose 7 = -4*d - 3*r - 4, -2*d = -4*r - 22. Which is bigger: 1/18 or d?\nd\nLet j = 11 - 8. Let g = j - 3. Let h = 0.01 + -1.01. Are h and g unequal?\nTrue\nLet r(y) = y**3 - 4*y**2 + 3*y - 1. Let s be r(2). Let g be (0*(2 - 1))/s. Which is smaller: g or -2?\n-2\nLet i = -30839/70 + 881/2. Is i greater than or equal to 1?\nFalse\nLet x = 55 - 55. Which is smaller: x or" +"v - -2). Solve 8*a - 3*x - 37 = 3*a, -x - t = -5*a for a.\n5\nLet a(m) = 2*m + 3. Suppose -7*v = -5*v. Let z be a(v). Solve -4*c - 2*n = -c - z, -n + 6 = 3*c for c.\n3\nLet r be -4 - -1 - (-14)/2. Let i(x) = 2*x - 3. Let l be i(r). Solve 2*u + 0*w + 3 = -w, 6 = -l*u - 3*w for u.\n-3\nLet d(w) = w**3 + 5*w**2 + 9*w + 6. Let u be d(-2). Solve 6 = -5*o - 4*s, -o - 4*s + 2 = -u for o.\n-2\nLet i be (-4 + 5/2)*(-4)/6. Let h(f) = -3*f**2 - 2*f - 2. Let d(z) = 1. Let o(q) = -4*d(q) - h(q). Let r be o(i). Solve -r*l - 4*u - 7 = 3, -8 = -2*l + u for l.\n2\nLet n = -150 + 170. Solve -v - 4*k - n = 0, -v = 2*v + 2*k + 10 for v.\n0\nLet k(m) be the first derivative of m**3/3 - m**2 - 6*m - 53. Let i be k(4). Solve" +"3 in increasing order.\n-3, -2, -1/2, -1/10, 1/5\nSort 2/49, 3, 2, 12 in decreasing order.\n12, 3, 2, 2/49\nSort -3/5, 4, 30 in descending order.\n30, 4, -3/5\nPut -1/2, 0, 2, -6 in decreasing order.\n2, 0, -1/2, -6\nSort -3, 1/8, 0.1, 134 in decreasing order.\n134, 1/8, 0.1, -3\nPut -2, 4, 5, -2823, 2 in descending order.\n5, 4, 2, -2, -2823\nPut 20, -2, 6, 1, -4 in decreasing order.\n20, 6, 1, -2, -4\nSort -85, 5, -3, 4 in ascending order.\n-85, -3, 4, 5\nSort 8, 1, 12.\n1, 8, 12\nPut 2, 3/4, -3/2, -11/15 in decreasing order.\n2, 3/4, -11/15, -3/2\nPut 4, -7/5, 7, -2 in decreasing order.\n7, 4, -7/5, -2\nSort -4/9, -1/5, -5, 2/39 in decreasing order.\n2/39, -1/5, -4/9, -5\nPut -9, 1317, -2 in decreasing order.\n1317, -2, -9\nSort 0, 4, -7, -48 in ascending order.\n-48, -7, 0, 4\nSort -19, -5, -7, 5, 1.\n-19, -7, -5, 1, 5\nPut -1, 4, -52, 3 in descending order.\n4, 3, -1, -52\nSort 1, -7, -5, 4, -2 in increasing order.\n-7, -5, -2, 1, 4\nPut 1, 4," +"t is the m'th term of 296, 1101, 2442, 4319, 6732, 9681, 13166?\n268*m**2 + m + 27\nWhat is the m'th term of -958332, -958333, -958334, -958335, -958336?\n-m - 958331\nWhat is the t'th term of -2649, -2694, -2729, -2748, -2745, -2714, -2649?\nt**3 - t**2 - 49*t - 2600\nWhat is the l'th term of 99483, 198965, 298447, 397929?\n99482*l + 1\nWhat is the i'th term of -1957, -2000, -2043?\n-43*i - 1914\nWhat is the y'th term of -7942, -63540, -214460, -508366, -992922, -1715792?\n-7944*y**3 + 3*y**2 + y - 2\nWhat is the r'th term of -17936, -17946, -17952, -17948, -17928, -17886, -17816?\nr**3 - 4*r**2 - 5*r - 17928\nWhat is the x'th term of 364, 1072, 2132, 3550, 5332?\nx**3 + 170*x**2 + 191*x + 2\nWhat is the y'th term of 712468, 1424937, 2137406?\n712469*y - 1\nWhat is the i'th term of 10380, 10405, 10446, 10503, 10576, 10665?\n8*i**2 + i + 10371\nWhat is the c'th term of -90, -104, -128, -162, -206?\n-5*c**2 + c - 86\nWhat is the y'th term of -290669, -290673, -290677, -290681, -290685, -290689?\n-4*y - 290665\nWhat is the v'th term of" +" terms in 1428 + h - 3*h + 48 - 2*h.\n-4*h + 1476\nCollect the terms in 44 - 836*y**3 - 20 - 24.\n-836*y**3\nCollect the terms in 0*w - 8 - 7*w - 6*w - 6*w + 15*w.\n-4*w - 8\nCollect the terms in 85 + 92 - 110 + 131 + 2*g.\n2*g + 198\nCollect the terms in -91*k + 15 + 333*k - 12 + 15.\n242*k + 18\nCollect the terms in 89*z + 89*z + 86*z - 262*z.\n2*z\nCollect the terms in 445*c**2 + 344*c**2 + 10*c**2 - 138*c**2.\n661*c**2\nCollect the terms in -18*d + 179 + 10*d - 182.\n-8*d - 3\nCollect the terms in 467*u**2 - u + 451*u**2 - 893*u**2.\n25*u**2 - u\nCollect the terms in 26*l + 13*l - l + 2*l**3 - 3*l.\n2*l**3 + 35*l\nCollect the terms in -23206 + 23206 + 10*c - 8*c**2 - 10*c.\n-8*c**2\nCollect the terms in 13174*d**3 + 7210*d**3 - 7*d + 7*d.\n20384*d**3\nCollect the terms in 1564*s**3 - 5639*s**3 - 13059*s**3 - 20210*s**3.\n-37344*s**3\nCollect the terms in 771*o - 1255*o + 466*o.\n-18*o\nCollect the terms in 1064*z**3 - 2119*z**3 +" +"2. Find the third derivative of g(s) wrt s.\n82320*s**2 - 30\nFind the second derivative of 516*w**3 + 290*w**3 - 94 - 3*w - 1 - 76 wrt w.\n4836*w\nWhat is the second derivative of -1861*d - d**2 - 109*d**5 + 504*d**5 - 337*d wrt d?\n7900*d**3 - 2\nLet k(t) be the first derivative of 671*t**3/3 + 107*t**2/2 + 7*t + 1134. Find the second derivative of k(q) wrt q.\n1342\nSuppose 14 = -4*s + 38. Let c(l) = -3*l + 44. Let f be c(14). What is the third derivative of 4*h**2 - h**2 + 34*h**s - 18*h**f + h**6 wrt h?\n4200*h**3\nLet o = -32 - -106. What is the third derivative of -29*n**2 - 9*n**3 - o*n**2 + 5*n**3 wrt n?\n-24\nSuppose 2*p + 13 = 17. What is the third derivative of 135*h**2 + 220*h**3 - 54*h**p + 131*h**2 + 42*h**3 + 29*h**3 wrt h?\n1746\nLet t(n) = -n**2 + 37*n - 132. Let j be t(33). What is the third derivative of j*m + 116*m**4 - 7*m + 122*m**4 + 2*m**2 wrt m?\n5712*m\nLet j(w) = -2*w**2 - 26*w + 32. Let m be j(-14). What is" +" the greatest common factor of q and d.\n7\nSuppose v = -5*w + 152, -4*w + v = -w - 96. Calculate the greatest common divisor of 775 and w.\n31\nLet y = 212 + -140. Suppose 2*s - s = 48. What is the highest common divisor of s and y?\n24\nSuppose -3*z + 3 = -3. Let a(x) = x + 11*x**2 + 0*x**z - 11*x - x**3. Let s be a(7). What is the greatest common factor of 14 and s?\n14\nLet q(b) = b**2 - b + 4. Let c be q(0). Suppose -4*p - k + 107 = 0, -5*k = 2*p - 2*k - 41. Calculate the highest common factor of c and p.\n4\nSuppose -11 = 4*i - 5*i. Let k(s) = -s**3 + 9*s**2 + 2. Let x be k(9). Suppose -x*p - 2 = -46. Calculate the greatest common factor of i and p.\n11\nSuppose 2*g = -g + 15. Suppose 0*x + g*x - 660 = 0. Calculate the highest common divisor of x and 12.\n12\nLet s = -262 + 370. Let y = s - 99. What is the highest common" +"nearest one hundred.\n-13400\nRound 0.003409116 to 5 decimal places.\n0.00341\nWhat is -0.0040611 rounded to 5 dps?\n-0.00406\nWhat is -12.931863 rounded to 3 dps?\n-12.932\nWhat is -6.47163 rounded to zero dps?\n-6\nWhat is -7566.97 rounded to the nearest one hundred?\n-7600\nRound 0.605465 to two decimal places.\n0.61\nWhat is 0.00008769495 rounded to 5 decimal places?\n0.00009\nWhat is 4669.9 rounded to the nearest 1000?\n5000\nRound 771.5037 to the nearest 100.\n800\nWhat is 240313.51 rounded to the nearest one thousand?\n240000\nWhat is -0.3955495 rounded to 4 dps?\n-0.3955\nWhat is -284.13 rounded to the nearest 1000?\n0\nWhat is -6299.313 rounded to 0 dps?\n-6299\nWhat is 58888.7 rounded to the nearest 10000?\n60000\nWhat is 60911.06 rounded to the nearest 100?\n60900\nRound -0.0005107 to four decimal places.\n-0.0005\nRound 0.0000205592 to six decimal places.\n0.000021\nWhat is -0.020817992 rounded to two decimal places?\n-0.02\nRound -0.000052223817 to 6 decimal places.\n-0.000052\nRound -0.0000596941 to five dps.\n-0.00006\nWhat is -282314400 rounded to the nearest 100000?\n-282300000\nWhat is -0.00001335727 rounded to 7 decimal places?\n-0.0000134\nWhat is -193921 rounded to the nearest 1000?\n-194000\nWhat is 0.000010298292 rounded to 7 decimal" +"= -5*k - 48. Let u be m(-12). Let j(q) = -10*q**2 + 124*q - 7. Let v be j(u). Calculate the greatest common factor of v and 369.\n41\nSuppose -25798 = -463*b + 9390. What is the greatest common factor of b and 15086?\n38\nLet l be (1232*44/154)/(2 - 1). What is the highest common factor of 864 and l?\n32\nLet j = -13369 + 13479. Calculate the greatest common factor of 2640 and j.\n110\nLet u = 24754 + -24522. What is the greatest common factor of u and 592?\n8\nSuppose 8*v - 41 = 7. Suppose 162 - 618 = -v*u. Let n = u + -67. Calculate the highest common divisor of 72 and n.\n9\nLet s(r) = 9*r + 153. Let a be s(-24). Let o be (-250)/(-9) + (-14)/a. Calculate the greatest common divisor of 28 and o.\n28\nSuppose 4*r = k - 92, -6*k + 3*r - 57 = -7*k. Let w be (13 - (-7 - -14)) + k. Calculate the highest common factor of w and 52.\n26\nLet n be 27*42*(-75)/(-405). Calculate the highest common factor of n and 2190.\n30\nLet z(s)" +"7742*i**3 + 17*i - 87591*i**3. Let y(a) = 4*a - 1. Let r be y(-2). Let m be v(r). Round m to the nearest 1000000.\n0\nLet t = -0.044 + -7.256. Let p = t - -7.300228. Round p to five dps.\n0.00023\nLet l = 28.23 + -28.22978415. What is l rounded to six decimal places?\n0.000216\nLet m = 8115 - 8115.004347. Round m to five dps.\n-0.00435\nLet w = 71715462 + -71715462.414116748. Let r = -0.015883712 + w. Let t = 0.43 + r. What is t rounded to seven decimal places?\n-0.0000005\nLet f = -41299.99981131 + 41300. What is f rounded to 5 dps?\n0.00019\nLet j = -8077.098 - -8075. Round j to 2 decimal places.\n-2.1\nLet w = -975 - -975. Suppose -3*s - 8 = 4*z + s, -4*z + 6 = -3*s. Suppose 2*b + z*b + 942 = w. Round b to the nearest ten.\n-470\nLet g(c) be the first derivative of 295*c**4/2 - 5*c**3/3 + c**2 - 32*c + 103. Let h be g(-14). What is h rounded to the nearest 100000?\n-1600000\nSuppose 0 = -4*w + 2*d + 14581030, 20 = d +" +"*b. Let q be 35/7 - (10 + 1). Let n be (-6 - q)/((-2)/2). Solve n = 2*f - 3*l - 5 - 1, h = -4*f - 3*l for f.\n-3\nSuppose 53*m - 45*m - 24 = 0. Solve -2*r - 5*v = -16, -m*r + 4*v - 2 = -r for r.\n3\nLet l = -14184 - -14188. Solve 3*a - 32 + 19 = l*h, 4*a - 7 = -5*h for a.\n3\nLet t be 1/(-8) - (-172395)/(-360). Let h = t - -481. Solve -2*f - h*a - 10 = 0, 4*a = -0*f - 2*f - 10 for f.\n-5\nSuppose -o - 4*q - 9 = -7*q, 6 = 5*o + 2*q. Suppose -8*g + 11 + 165 = o. Solve 3*j = f + f + 7, -5*f - g = -3*j for f.\n-5\nSuppose 9 = -3*g - 3*a, -5*g + 19 = -2*a - 1. Suppose 3*h = 2*o - g, h - 5 = -5*o + 17. Solve 0 = 2*l - 8, 0*c = o*c - 2*l for c.\n2\nLet d be 3 + (2/(-2) - 1). Let o be d - (-2" +"a multiple of 1063?\nFalse\nIs 8 a factor of 434885456?\nTrue\nDoes 2196 divide 1588099569?\nFalse\nDoes 459 divide 19236231?\nTrue\nIs 14210385 a multiple of 255?\nTrue\nIs 137797796 a multiple of 135?\nFalse\nIs 41972081 a multiple of 14?\nFalse\nIs 58140083 a multiple of 677?\nTrue\nDoes 738 divide 48296?\nFalse\nIs 93044832 a multiple of 31?\nFalse\nDoes 597 divide 17512831?\nFalse\nIs 27 a factor of 35551413?\nTrue\nIs 20645820 a multiple of 13?\nTrue\nDoes 312 divide 109571904?\nTrue\nIs 4717107027 a multiple of 25?\nFalse\nDoes 1047 divide 136407381?\nFalse\nIs 150 a factor of 40986530?\nFalse\nIs 239500152 a multiple of 166?\nTrue\nIs 9 a factor of 363424536?\nTrue\nIs 3794072240 a multiple of 3530?\nTrue\nIs 2482370 a multiple of 55?\nTrue\nDoes 7 divide 97540247?\nTrue\nIs 577 a factor of 382053626?\nTrue\nDoes 2119 divide 987511434?\nFalse\nDoes 65 divide 4437517?\nFalse\nDoes 195 divide 4777110?\nTrue\nDoes 732 divide 4206072?\nTrue\nIs 366 a factor of 481797349?\nFalse\nIs 232 a factor of 22235971?\nFalse\nIs 620896661 a multiple of 17?\nTrue\nIs 590 a factor of 4279864130?\nTrue\nIs 426 a factor of 108417000?\nTrue" +"when y is divided by i.\n23\nSuppose -6*h - 55 - 47 = 0. Let r = 74 - h. Calculate the remainder when r is divided by 29.\n4\nSuppose -208*r + 263511 = -485074 - 101719. Calculate the remainder when r is divided by 21.\n14\nSuppose -192*r = -8*r - 109*r - 19275. What is the remainder when r is divided by 31?\n9\nSuppose 3086 = 75*k - 364. Calculate the remainder when 5703 is divided by k.\n45\nSuppose 6*f - 2*f + 12 = 0, -4*r + 2*f = -294. Let l = r + 36. Calculate the remainder when l is divided by 10.\n8\nSuppose -436 = -4*s - 44. Suppose 5*c = d + s, -c - 18 = -2*c + d. Let x = c - 0. What is the remainder when 117 is divided by x?\n17\nSuppose 0 = -12*g - 1536 - 2484. Let t = g + 412. Calculate the remainder when t is divided by 40.\n37\nLet r(m) = m**3 - 8*m**2 - 5*m + 27. Let k be r(8). Let w(d) = 4 - 4 - 2 - 2*d. What is the" +"8\nLet m(u) = u**3 - 16*u**2 + 29*u - 15. Let k be m(14). What is the lowest common multiple of 9 and k/2 + (-145)/(-10) + -5?\n9\nSuppose -3*r = o - 82, -2*o + 31*r - 30*r + 178 = 0. Calculate the lowest common multiple of 24 and o.\n264\nSuppose 2*u - 5*w = 375, 5*u + 264 = -4*w + 1284. Calculate the common denominator of (-2 + 28/15)/((-22)/u) and 49/30.\n330\nSuppose 0 = -4*x + 213 - 25. Suppose -x = -3*q - 11. What is the lowest common multiple of q and 24?\n24\nLet n = 154 - 157. Calculate the common denominator of -121/36 and (2/(-66))/((-48)/15 - n).\n396\nLet u = -32 + 48. Let w = u + -14. Calculate the smallest common multiple of (-3)/2*(3 - 15) and w.\n18\nCalculate the common denominator of -115/36 and (-321)/(-27) - 252/63.\n36\nLet t(n) = -2*n + 1. Suppose 0 = z - 3*d + 11, d = 3*z + 4*d - 3. Let x = -10 - -17. Calculate the least common multiple of t(z) and x.\n35\nSuppose 0 = w - 3*p +" +"- 3\nWhat is the k'th term of -328, -379, -500, -721, -1072?\n-5*k**3 - 5*k**2 - k - 317\nWhat is the v'th term of -1769, -3939, -6109?\n-2170*v + 401\nWhat is the g'th term of 515, 566, 623, 686, 755?\n3*g**2 + 42*g + 470\nWhat is the w'th term of 662, 640, 620, 602, 586?\nw**2 - 25*w + 686\nWhat is the f'th term of -80, -254, -532, -914, -1400, -1990?\n-52*f**2 - 18*f - 10\nWhat is the n'th term of 7706, 7713, 7720, 7727?\n7*n + 7699\nWhat is the c'th term of 15708, 15706, 15702, 15696?\n-c**2 + c + 15708\nWhat is the z'th term of -23198, -92803, -208812, -371225, -580042?\n-23202*z**2 + z + 3\nWhat is the p'th term of 1586446, 1586451, 1586456?\n5*p + 1586441\nWhat is the k'th term of -7867, -15752, -23637, -31522?\n-7885*k + 18\nWhat is the j'th term of -205, -464, -1183, -2596, -4937?\n-39*j**3 + 4*j**2 + 2*j - 172\nWhat is the l'th term of -570, -557, -534, -501, -458, -405?\n5*l**2 - 2*l - 573\nWhat is the y'th term of -518, -1022, -1510, -1982, -2438?\n8*y**2 - 528*y +" +" be t(16). Let i be a(j). Is (i/(-11))/(3/(-3)) composite?\nFalse\nLet y be 4/(-8) - (-27)/6. Let v(p) = -3*p + 4. Let z be v(0). Suppose -2224 = -y*h - 2*s, 4*s = -z*h + 514 + 1718. Is h a prime number?\nFalse\nSuppose 274984 = 3*m + 5*p, -m + 91694 = -18*p + 15*p. Is m a composite number?\nFalse\nIs (-8)/7*(-1)/(-2) - 42485571/(-469) a prime number?\nFalse\nLet l = 1057 - -328. Let b = l - 128. Suppose 2*j - 3*z - 494 = 0, 4*j - b = -j + 2*z. Is j composite?\nTrue\nIs ((-9706)/(-8) + 2)/((-122)/(-488)) a composite number?\nFalse\nLet w = 28691 + -19004. Suppose 0 = -10*k + w + 2073. Suppose -5*q + 3*p = -2*q - k, 0 = -4*q - 3*p + 1575. Is q prime?\nFalse\nLet f(r) = -3*r**2 - 20*r + 28. Let p be f(-4). Let a(c) = c**3 - 2*c**2 + c - 1. Let y be a(2). Is (y - p)/(9/(-2) + 4) prime?\nFalse\nLet n = 4333 - 4329. Let d(q) be the first derivative of 3*q**4 + q**3/3 + q**2 - 23*q - 2." +"s -3 - 205?\n-208\nIn base 16, what is -1 + -ecb?\n-ecc\nIn base 5, what is -404 - -110?\n-244\nIn base 15, what is 3 + -7d1?\n-7cd\nIn base 13, what is 517 - -4?\n51b\nIn base 11, what is -249 - -30?\n-219\nIn base 4, what is -1 + 21113?\n21112\nIn base 8, what is 3174 - -3?\n3177\nIn base 8, what is 1704 + -2?\n1702\nIn base 5, what is -2 + 41410?\n41403\nIn base 3, what is 120 + -20000?\n-12110\nIn base 8, what is -4 + 146?\n142\nIn base 9, what is -23 - 12?\n-35\nIn base 11, what is -145a - -2?\n-1458\nIn base 12, what is -19 - 3?\n-20\nIn base 16, what is a47 - -4?\na4b\nIn base 7, what is 3101 + 11?\n3112\nIn base 10, what is 10 - 358?\n-348\nIn base 5, what is -442 + 30?\n-412\nIn base 6, what is 312 + -11?\n301\nIn base 3, what is -11 - 1202?\n-1220\nIn base 16, what is 520 + 3?\n523\nIn base 16, what is -42" +"inator of 11/20 and z?\n20\nLet j(t) = 12*t - 291. What is the lowest common multiple of 24 and j(44)?\n1896\nSuppose 0 = 4*u - 9*u + 35. Let j be ((-5004)/(-16))/(u/4). Let c = j + -359/2. What is the common denominator of 83/12 and c?\n84\nLet x = -1/1677 - -63169/3354. Let j = 5156 - 51621/10. Find the common denominator of j and x.\n30\nLet f(s) = -776843552*s**3 + s**2 - 2*s + 1. Let p be f(1). Let j = p - -2502989901895/3222. Let h = 124/179 - j. What is the common denominator of -7/16 and h?\n144\nSuppose 17*x - 39 = 14*x. Suppose x*i - 16*i + 12 = 0. Calculate the least common multiple of 10 and i.\n20\nSuppose 0 = -3*r - 4*c + 6, 2*r - 45 + 18 = 5*c. Calculate the least common multiple of r and 6.\n6\nLet r be (3 - 1) + 0 + 3. Suppose 3*y - r*y + 4 = 0. Suppose 36 = y*m + 5*u, 3*m + m - 28 = u. What is the least common multiple of 10 and m?\n40\nSuppose" +"*1*2. Let s(d) = d**2 + 6*d. Let m be s(-6). Put g, 1, m in descending order.\ng, 1, m\nSuppose -2*c - 6*u = -u + 25, 0 = -4*c - 5*u - 25. Sort -4, -2, c in decreasing order.\nc, -2, -4\nSuppose 7 = 5*g - 3. Suppose 8 = 2*i - 3*i - 5*t, 10 = -4*i + 2*t. Sort i, -1, g in decreasing order.\ng, -1, i\nSuppose 33 = 7*a + 5. Sort -0.1, -3/2, 0.16, a in ascending order.\n-3/2, -0.1, 0.16, a\nLet c be 10/(-25) - (-2)/5. Suppose c = t - 3*t. Let u be 1/(-2)*(3 - 7). Put t, u, -4 in descending order.\nu, t, -4\nLet g = -9 + 8.8. Sort g, -0.3, 2 in increasing order.\n-0.3, g, 2\nLet j(q) = -2*q. Let r be j(-2). Let c(f) = 0 + 0*f + 0 - 4 - f. Let m be c(-7). Sort -3, r, m in decreasing order.\nr, m, -3\nLet n = -13 - -9. Let m = 0.2 + 0.2. Let c = m - 0.2. Sort 1, c, n.\nn, c, 1\nLet j = 4" +".\n-4\nLet v(s) = -46*s + 1471. Let o be v(31). Solve -2*u - 33 + o = 0 for u.\n6\nSuppose 2*a - 174 = -4*q, 4*a - 314 = -4*q - 26*a. Solve -y - 33 + q = 0 for y.\n8\nSuppose -103*o = -106*o - 5*r + 1057, -4*o + r + 1440 = 0. Solve -o*x + 6 = -362*x for x.\n-2\nLet l(y) = 54*y - 1364. Let w be l(26). Solve 5*z - w = -3*z for z.\n5\nLet l(c) = 12*c + 4. Suppose 0 = -a - 3*a - 8. Let z be l(a). Let r be (z/(-12))/((-15)/(-54)). Solve -r*b = -b for b.\n0\nLet f be 1 + (-7)/(-3 + 8 + -5 + -1). Solve -40 = f*s - 16*s for s.\n5\nLet g(z) = -2*z - 8. Let a be g(-6). Let l(r) = r**3 - r**2 + r - 2. Let j be l(0). Let y be 7 + (-9 - -9) + j. Solve -y = -a*n - 9 for n.\n-1\nLet v = 35732 + -35571. Solve v*g = 81*g + 720 for g.\n9\nLet g" +"963 to 6 dps.\n-0.00213\nRound 67.05997 to 1 decimal place.\n67.1\nRound -0.1079164 to 4 decimal places.\n-0.1079\nWhat is 6735.91 rounded to the nearest 100?\n6700\nWhat is 66481.7 rounded to the nearest 1000?\n66000\nRound -535477.3 to the nearest one thousand.\n-535000\nRound -0.000023596169 to six dps.\n-0.000024\nWhat is 18522.5 rounded to the nearest 1000?\n19000\nWhat is -0.0104730086 rounded to 5 dps?\n-0.01047\nRound -0.985434 to 3 dps.\n-0.985\nRound 0.6884083 to three decimal places.\n0.688\nRound 0.000517951 to 6 decimal places.\n0.000518\nRound 0.0307377 to 2 decimal places.\n0.03\nRound 0.01343293 to 5 decimal places.\n0.01343\nWhat is 0.0000003850846 rounded to seven decimal places?\n0.0000004\nRound 37862 to the nearest one thousand.\n38000\nWhat is -833361 rounded to the nearest one hundred thousand?\n-800000\nWhat is 335447890 rounded to the nearest 1000000?\n335000000\nWhat is -37740.99 rounded to the nearest one thousand?\n-38000\nWhat is 284.2646 rounded to the nearest 10?\n280\nRound -0.0000052 to 5 dps.\n-0.00001\nRound -0.01965364 to three dps.\n-0.02\nRound 14410750 to the nearest one million.\n14000000\nRound -0.09400597 to 3 decimal places.\n-0.094\nWhat is 44.0263 rounded to the nearest 10?\n40\nRound -609920 to the nearest 10000." +" 1. Let u = 689 - 251. Suppose -566 = -m*o + u. Is o a prime number?\nTrue\nLet a(n) = 2*n - 14. Let q be a(16). Suppose 2*i + 2*c = q, 0 = -4*i - 3*c - 0 + 32. Suppose 4*b + 11 - 30 = -y, -4*y + 43 = i*b. Is y composite?\nFalse\nLet k(f) = -30*f - 12. Let n be k(-4). Let w = n + 199. Is w a composite number?\nFalse\nLet f(u) = 147*u**2 - 15*u + 17. Let z(g) = 73*g**2 - 8*g + 8. Let s(n) = 6*f(n) - 11*z(n). Is s(5) prime?\nTrue\nLet g be (3 - 4)/((-1)/3). Suppose 5*s - 5 = -w + 14, -g*w = -s - 25. Let v = 154 + w. Is v prime?\nTrue\nSuppose 56363 - 12564 = 7*o. Is o composite?\nFalse\nSuppose -267 = -8*y + 5*y. Suppose 145 = 6*z - y. Is z a prime number?\nFalse\nLet z(j) = -225*j + 2. Let s(l) = -674*l + 5. Let i(q) = 2*s(q) - 7*z(q). Is i(1) a composite number?\nFalse\nLet l be ((-1)/(-2) + 1)*2. Suppose -l*c + 3" +"*c - 37 = 4*j, j - 2*j - 6 + 8 = 3*c + 10 for c.\n1\nSolve -5*j + 159 + 183 = 4*j + 141*f - 153*f, 0 = -2*j + 2*f + 56 for j.\n-2\nSolve 54852*x = 5*c + 54854*x - 33, 3*c - 17*x = 9*x + 47 for c.\n7\nSolve -2*g + 1510*l - 1511*l = -5 - 4, -6*l = -3*g - 24 for g.\n2\nSolve 17 = 3*c - 3*p - 4, -2*c - p = p + 34 for c.\n-5\nSolve 7*m + 351 = -0*n - 5*n, 5*m - 5*n - 51621 = -51846 for m.\n-48\nSolve -272*r + 9 + 6 = -273*r - 4*y, -54*y + 58*y + 9 = r for r.\n-3\nSolve -i - 264 = -6*a, -56 + 1376 = 2*i + 30*a for i.\n0\nSolve 0 = 2*q - 10*b + 24, 3*q + 14810 = 2*b + 14800 for q.\n-2\nSolve 0 = 2*n - 16*d - 56, 5*d = -3609*n + 3610*n - 19 for n.\n4\nSolve -15101*q + 7549*q + 50 = 5*y - 7557*q, 0 = -2*y - 5*q" +"or s.\n0\nSuppose 0 = -12*g + 8*g. Suppose 5*w + 0*i - 2*i - 14 = g, 5*i - 7 = 2*w. Solve w*d - 3*u - 1 = 0, -5*u + 4 = 5*d - 6 for d.\n1\nLet j(l) = -83*l - 78. Let b be j(-1). Solve -b*m + o + 6 = 0, 2*m + 0*o - 24 = -5*o for m.\n2\nLet h(p) = p**2 + 16*p - 292. Let f be h(-27). Solve v + 2 = -5*g + 3*g, 0 = -5*v - f*g for v.\n2\nLet k = -511 + 515. Solve 12 = -6*d + d - 2*v, k*v = -4 for d.\n-2\nSuppose -3 = 4*j - 5*x + 4, 5*j - 2*x = -30. Let w = 16 + j. Solve 4*s = w, -2*y - s - 4*s + 14 = 0 for y.\n2\nSuppose 0 = 5*b + 4*k - 205, 0*k + 2*k = 10. Suppose -7*g + 19 = -b. Solve 0 = 3*j - 7*j - g, 4*y + 6 = -j for y.\n-1\nLet s = 1226 + -1210. Solve -v - 2*p + 9" +"laces?\n0\nLet y = -449 + 406.4. What is y rounded to the nearest ten?\n-40\nLet c(x) = x**3 - 4*x**2 + 4*x. Let f be c(3). Suppose u = -o - f*u - 9492, 5*u + 47490 = -5*o. What is o rounded to the nearest 1000?\n-10000\nLet a(h) = -81*h**3 - 12*h**2 + h + 12. Let q be a(9). Round q to the nearest 100000.\n-100000\nLet o = -0.5185 - 1.6305. Let r = -0.3 - 1.76. Let g = o - r. What is g rounded to two decimal places?\n-0.09\nLet q = 15.5346 - 14.342. Let z = -1.2 + q. What is z rounded to 3 dps?\n-0.007\nLet i = 32 - 29. What is i rounded to the nearest ten?\n0\nLet k = 0.7555 - 0.74. Round k to 2 dps.\n0.02\nLet t = -10.37 + 10. Let b = t - -0.3773. What is b rounded to three dps?\n0.007\nLet p = 18 - 13. Suppose 2*y = -y + 5*z + 12585, p*y - 21009 = -3*z. What is y rounded to the nearest one thousand?\n4000\nLet u(l) = 130*l**2 +" +" = 70 - 44. Suppose 44 = 24*n - g*n. Is 6/(-4)*(n - 400) prime?\nFalse\nSuppose 4*a = -o + 259203, -a = a - 5*o - 129563. Is a a composite number?\nTrue\nLet r(o) = -o**2 - 16*o - 7. Let x be 308/9 - (-2)/(-9). Let n = -44 + x. Is r(n) a composite number?\nFalse\nIs ((-138)/(-230))/((-3)/(-263210)) a prime number?\nFalse\nSuppose 25633 = -2*s + 84053. Suppose 2*l = -3*t - 3166 + s, l - 13015 = 2*t. Is l a prime number?\nFalse\nSuppose 130280 = -23*x - 135025. Let v = -7544 - x. Is v composite?\nTrue\nLet j(v) = -18504*v + 29. Is j(-1) composite?\nTrue\nLet y = 27332 + -75686. Is (y/6)/(1 + -1 + -1) composite?\nFalse\nSuppose 171*f - 276*f - 9183854 = -191*f. Is f prime?\nFalse\nLet p(q) be the first derivative of 733*q**2 - 18*q - 16. Let f be p(-12). Is ((-2)/(-4))/((-15)/f) a composite number?\nFalse\nLet y = -18 - 74. Let m be ((-489)/12)/(-2 - y/48). Let d = m - -44. Is d prime?\nFalse\nLet i = -63 - 16. Let w = i + 82." +"ed by 378?\n34\nWhat is the remainder when 24520 is divided by 1021?\n16\nWhat is the remainder when 681095 is divided by 962?\n961\nCalculate the remainder when 240598 is divided by 8.\n6\nWhat is the remainder when 24829 is divided by 388?\n385\nCalculate the remainder when 1419 is divided by 448.\n75\nCalculate the remainder when 1951 is divided by 26.\n1\nCalculate the remainder when 14411 is divided by 2379.\n137\nCalculate the remainder when 2097359 is divided by 120.\n119\nCalculate the remainder when 7082 is divided by 310.\n262\nCalculate the remainder when 21162 is divided by 37.\n35\nCalculate the remainder when 75972 is divided by 580.\n572\nCalculate the remainder when 6864 is divided by 3346.\n172\nCalculate the remainder when 3016 is divided by 151.\n147\nCalculate the remainder when 38194 is divided by 7638.\n4\nCalculate the remainder when 123940 is divided by 2.\n0\nCalculate the remainder when 1110818 is divided by 129.\n128\nCalculate the remainder when 15688 is divided by 66.\n46\nCalculate the remainder when 4095 is divided by 137.\n122\nCalculate the remainder when 22037 is divided by 7339.\n20\nCalculate the remainder" +"9 for v.\n-3\nLet x be (-64)/11 - (-8)/(-44). Let z be (-85)/(-15) - (-4)/x. Solve z*n - 30 + 10 = 0, -2*q = -2*n + 6 for q.\n1\nLet y = 107 + -102. Solve -j = 3*u + 11, -4*j + 2*u = -31 + y for j.\n4\nLet g = 282 + -279. Solve 0 = 3*m - 5*h, 4*m - 2*m = -g*h + 19 for m.\n5\nSuppose 3*p = 2*a + 4*p - 6, 3*a - 9 = p. Solve a*s = 5*m - 20, -4 = -4*s + 3*m - 27 for s.\n-5\nSuppose -4*s = -0*s - 4. Let h be 3 + ((-207)/(-3))/s. Suppose -b - h = -7*b. Solve -b = 3*v, -3*l - 3*v = 2*l + 37 for l.\n-5\nLet q = 13 + -13. Suppose -l = -3 - 1. Solve -n = -x - q - 1, 6 = 3*n - l*x for n.\n-2\nLet n(h) = -h**3 + 6*h**2 + 7*h + 5. Let p be n(7). Let y(l) = -l + 10. Let k be y(p). Solve 5*s = 3*m + 20, s - k*m + 3*m" +"+ -9. Let c be (3 - 3 - 18)*(-2)/(-3). Let z = 22 - c. Calculate the lowest common multiple of z and r.\n306\nLet m be (603/(-39) - -3) + 4. Let o = 1069/78 - m. Let y = -141/25 + 3053/200. What is the common denominator of y and o?\n24\nLet t = -54 - -57. Find the common denominator of 35/2 and (2/4)/(((-90)/222)/t).\n10\nLet u = 5304 - 106057/20. What is the common denominator of u and 63/44?\n220\nLet z = -396/31 - -13433/93. Let j = z - 3779/30. Find the common denominator of -7/8 and j.\n40\nLet p = 64 - 29. Suppose 3*d + p = j + 136, 4*j - 91 = -3*d. Suppose 5*c - 12 - d = 0. What is the least common multiple of 8 and c?\n72\nLet p be (5/2)/(3/36). Find the common denominator of (-35)/(-42)*152/p and (8/20)/(7/(-125)).\n63\nLet d = -3854 - -23203/6. Let v be (1/52)/((-219)/29253). Let l = v + 65/292. Calculate the common denominator of d and l.\n78\nLet p = 581534/39 + -14912. Find the common denominator of p and 8/35.\n1365\nLet" +" - 156*x for x.\n9\nSolve 770*z = 30*z - 413*z - 147584 for z.\n-128\nSolve -621*r - 9876 - 24449 = -1412 for r.\n-53\nSolve 2403 + 1557 = 445*c - 115*c for c.\n12\nSolve -674994 + 678424 = -70*a for a.\n-49\nSolve 679*p - 6897 + 5232 = 11915 for p.\n20\nSolve 3952 + 1407 = 380*j + 419 for j.\n13\nSolve -1231*j + 179712 = 1265*j for j.\n72\nSolve 547*n + 6991 + 5277 = 781 for n.\n-21\nSolve 470*r + 149*r + 6520 = -5241 for r.\n-19\nSolve 0 = 146197*p - 146337*p + 10080 for p.\n72\nSolve -319513*z + 319364*z + 7301 = 0 for z.\n49\nSolve 9347 + 10605 = -688*n for n.\n-29\nSolve 973*l + 367*l - 7618 + 21958 = 145*l for l.\n-12\nSolve -211191 = -3364*b - 1787*b for b.\n41\nSolve 80*f - 175*f - 33*f + 3840 = 0 for f.\n30\nSolve 112*h + 58*h - 44*h + 327 + 1689 = 0 for h.\n-16\nSolve 1682*s = 27231 - 202159 for s.\n-104\nSolve 94 - 515 = -71*i + 289 for i." +" = -202 + 307. Suppose -d = 93 + n. Is d at most -198?\nTrue\nLet v be 53/318*0 + (-9745 - 0). Which is smaller: -9744 or v?\nv\nSuppose 0 = -r - 5*o + 79, -5*r + 561 = o - 50. Which is smaller: r or 164?\nr\nLet k = 4/269 + -3509/807. Is k equal to 13?\nFalse\nLet v = 281 + -59.7. Is 2 greater than or equal to v?\nFalse\nSuppose 0 = -2*p + 2*k - 40, 3*k = 10*p + 1078 - 969. Let r = -175/24 - -5/8. Is r bigger than p?\nTrue\nSuppose -8 = -2*c, 15 = q + 7*c - 3*c. Let w be (((-30)/97)/6)/((-12)/24). Do w and q have different values?\nTrue\nLet p = 2147/212 - 550/53. Is 3222 greater than p?\nTrue\nLet b be ((-11865)/(-25) + 0)*5. Let h = 21329/9 - b. Let o(c) = -4*c**3 - 26*c**2 - 12*c - 4. Let d be o(-6). Which is smaller: d or h?\nd\nLet i = 0.0408 - 20.0408. Which is smaller: i or 27?\ni\nLet c(y) = -16*y + 48. Let f be c(3). Suppose f" +"8/23?\nTrue\nWhich is greater: 1 or -0.0472?\n1\nIs 5 greater than 61/10?\nFalse\nIs 12114 <= -1/4?\nFalse\nIs -3 equal to -151/56?\nFalse\nWhich is smaller: 674 or 670?\n670\nIs 2161 <= 2160?\nFalse\nWhich is smaller: -1/6 or 1/55?\n-1/6\nWhich is bigger: -1988 or -1989?\n-1988\nIs -0.1 greater than or equal to -10103?\nTrue\nAre 6720 and 6719 equal?\nFalse\nWhich is smaller: -10990 or -2/3?\n-10990\nWhich is bigger: 22 or -53?\n22\nIs -27 bigger than -556/21?\nFalse\nIs -141 less than -140?\nTrue\nWhich is smaller: 0 or -3/25?\n-3/25\nWhich is smaller: 324 or -0.1?\n-0.1\nWhich is greater: 0 or -22/65?\n0\nIs 37 at most -35/2?\nFalse\nWhich is greater: -62 or -51?\n-51\nWhich is bigger: 1 or -1/2666?\n1\nWhich is smaller: -511/3 or -170?\n-511/3\nWhich is greater: 478/5 or 96?\n96\nIs 5/2 < -0.073?\nFalse\nIs -4/431 at most -4/3?\nFalse\nIs 21 at least 0.04?\nTrue\nIs -177 less than -85?\nTrue\nIs -1 at least as big as 29/99?\nFalse\nWhich is bigger: -0.1 or 1435?\n1435\nWhich is smaller: 2/4265 or -1?\n-1\nIs -9 less than 481?\nTrue" +"1 (b) l (c) y\nc\nSuppose 38 = 13*g + 12. Let x = -0.1 + 0.1. Let i be (-2)/2*7/(-35). What is the nearest to x in 0.4, i, g?\ni\nLet g = 88 + -266/3. Let v = 8.7 + 0.3. Let s = v - 9.4. Which is the closest to -0.1? (a) s (b) -0.5 (c) g\na\nLet y = -10.2 + 30.2. Let s = y - 17. Which is the closest to 0.1? (a) 0.4 (b) s (c) 6/11\na\nLet a = -45835/23 + 1993. What is the closest to -2 in 1/2, -1/9, a?\n-1/9\nLet x = 36 + -38.3. Let k = -2.3 - x. Let t = -6.5 - -6.5. Which is the nearest to k? (a) 0.2 (b) 1 (c) t\nc\nLet t be 2 - 0 - (-5 + 9). Let k be 11/132 + t/6. Let x = 341/6 - 117/2. What is the closest to 2/7 in k, 1, x?\nk\nLet w = 0.8 - -2.2. Let a = -0.03 - 0.02. Let q = -1.05 - a. What is the closest to q in -2, w, 1?\n-2\nLet" +"+ 30 + -23 + 23?\n12\nEvaluate (0 - -2 - 9) + 0 + 11 + -10.\n-6\nWhat is the value of 30 + 35 + -27 + -27?\n11\nEvaluate 34 - (-34 - (19 - 66)).\n21\nWhat is the value of 2 - 4 - -1 - (18 + (15 - 42))?\n8\nCalculate -3 + -6 + 2 - (-5 - (-5 - 1)).\n-8\nWhat is the value of 9 - (20 + -11 + -5)?\n5\nCalculate (2 - 9) + (18 - 20).\n-9\nCalculate -7 + -7 + -4 + 5 + 8.\n-5\nEvaluate 3 + (-5 + 5 - (-13 - -10)).\n6\nEvaluate ((-7 - 5) + 2 - -8) + 19.\n17\nEvaluate 0 + 4 + 4 + (9 - -1) + 1.\n19\nWhat is 5 - (4 - -3 - (8 + -9 + 12))?\n9\nEvaluate 6 + -3 - (-67 + 78 + -8 + 1).\n-1\nCalculate -25 + 20 - (-1 + (-10 - -1) + -1).\n6\nCalculate 1 - (-6 - (-1 - (24 - 4))).\n-14\n18 + (-28 + (3 - -30) - (5" +" j + 18*h = 22*h + 17 for j.\n1\nSolve -2*x + 3 = c, 4*c + 8 = 2*x - 5*x for x.\n4\nSolve 2*o - 379 + 362 = 3*d, 22 = 4*o - 2*d for o.\n4\nSolve -10*k + 15*v - 99 = 11, 7 = -2*k + k + v for k.\n1\nSolve s - 11 = 0, 4*y + 62*s = 59*s + 37 for y.\n1\nSolve 25 = -5*q, -2*c + 4*q = 7*q + 19 for c.\n-2\nSolve 0 = -c - 5*l - 17, 38 + 8 = -8*c + 5*l for c.\n-7\nSolve -n = -5*x + 8, 5*x - 35*n + 36*n = 22 for x.\n3\nSolve -26 = 2*a - 4*b, -5*b - 1962 = 4*a - 1897 for a.\n-15\nSolve 0 = -5*s - 4*x + 90, -7*x + 22 = s + 4 for s.\n18\nSolve 4*u = 4*b - 12, 7 = 1778*b - 1773*b - 3*u for b.\n-1\nSolve 25*w = 60*w + 3*g - 82, 3*w = 4*g - 10 for w.\n2\nSolve -578*w + 576*w + b + 12 = 0," +"-1, 2, v, 11\nSuppose 4*g - 14*g + 50 = 0. Sort -4, g, -14 in descending order.\ng, -4, -14\nSuppose 0 = 101*x - 105*x - 496. Put 0, x, 5 in decreasing order.\n5, 0, x\nLet r be 3/(-6)*2 + -6. Let m = -2 - r. Let k(q) = -q**2 + 2*q + 4. Let s be k(4). Put 4, m, s in decreasing order.\nm, 4, s\nSuppose -63 + 267 = -6*i. Let j = i - -38. Sort -2, j, -5 in descending order.\nj, -2, -5\nLet h = 3.4 + 0.6. Suppose -3*i + 3*n + 31 = 2*n, 23 = 2*i - 3*n. Put h, -1, i in increasing order.\n-1, h, i\nLet x be ((-4)/5)/(8/(-60)). Let f(m) = -2*m + 3*m + 0 + 0 - 7. Let c be f(x). Sort 2, c, 2/3 in decreasing order.\n2, 2/3, c\nLet w = -130.1763 - -0.1763. Put w, -1, 1/3, 2 in increasing order.\nw, -1, 1/3, 2\nLet a(s) = s**3 + 4*s**2 - 4. Let r be a(-3). Let o = r - 8. Sort o, -1, -4, 0.\n-4, o, -1, 0" +"Suppose 2*o = -3*w - 4, 4*w - 2 = -0*o + o. Suppose w = -4*k + 4, -2*t - 4*k - 55 = -3*k. Let u = 39 + t. What are the prime factors of u?\n11\nSuppose 0*b = -2*m + 2*b + 78, 4*m - 2*b - 150 = 0. What are the prime factors of m?\n2, 3\nSuppose 0*t + 2*d = t - 4, 0 = 5*t - 2*d - 4. Let j be t + (2 + 0)*2. Suppose -5*q - j*y = -50, -4*q - y - 14 + 43 = 0. What are the prime factors of q?\n2, 3\nSuppose 2*k - k + 9 = -2*l, 3*l - 2*k = -10. Let j = 16 - l. List the prime factors of j.\n2, 5\nLet n = 100 - 60. What are the prime factors of n?\n2, 5\nLet x be (-2 + 23)*4/(-4). Let n = -5 - x. List the prime factors of n.\n2\nLet c be (-45)/(-6)*(-6)/(-9). Suppose c*z + 4*m = -25, -2*z + 0 = -4*m - 18. Let w = 11 + z. List the prime factors of" +"= -376.5855 - 2.1945. Let y = 374 + x. Let l = y - -3.7. What is l rounded to 1 decimal place?\n-1.1\nLet z = 0.3077 + -0.332. What is z rounded to three dps?\n-0.024\nLet v = -12548399 + 21448399. Round v to the nearest one million.\n9000000\nLet i = 1.061 - 21.2814. Let k = i - -20.62. Let p = k - 0.4. What is p rounded to three decimal places?\n0\nLet q = 205.605 - 203.90498. Let l = -1.7 + q. What is l rounded to four dps?\n0\nLet k = 0.08858 + -0.01072. Let g = -7.8 + 7.877. Let t = k - g. Round t to four decimal places.\n0.0009\nLet j(t) = -22246*t**2 - 7*t + 5. Let f be j(-7). What is f rounded to the nearest 100000?\n-1100000\nLet s = -0.39 + 0.39106. What is s rounded to four decimal places?\n0.0011\nSuppose 0*z - 12 = -4*b + z, 5*z = -5*b + 40. Suppose -4*s = -3*i - 0*s + 458, -i + b*s = -142. Let o = i - 288. What is o rounded to the nearest" +"itres?\n8881.126\nConvert 715.649mm to meters.\n0.715649\nHow many meters are there in thirteen fifths of a kilometer?\n2600\nConvert 1.92396ns to minutes.\n0.000000000032066\nHow many nanoseconds are there in twenty-seven quarters of a microsecond?\n6750\nHow many decades are there in 0.574169 millennia?\n57.4169\nConvert 4667.888 millilitres to litres.\n4.667888\nWhat is 31382.59 millilitres in litres?\n31.38259\nConvert 1523.995 nanograms to tonnes.\n0.000000000001523995\nHow many minutes are there in 623092.5 days?\n897253200\nConvert 805.321ng to tonnes.\n0.000000000000805321\nWhat is 5/4 of a day in minutes?\n1800\nConvert 97465.12 decades to years.\n974651.2\nWhat is eleven eighths of a century in months?\n1650\nHow many millimeters are there in seven quarters of a meter?\n1750\nWhat is 5/6 of a day in hours?\n20\nConvert 0.404663 millilitres to litres.\n0.000404663\nWhat is 6/25 of a litre in millilitres?\n240\nWhat is 0.9450831um in kilometers?\n0.0000000009450831\nHow many decades are there in 745.8849 millennia?\n74588.49\nHow many nanograms are there in 0.1493094 micrograms?\n149.3094\nWhat is three fifths of a centimeter in millimeters?\n6\nConvert 0.3099842 centuries to years.\n30.99842\nWhat is 43/4 of a millimeter in micrometers?\n10750\nWhat is 27/4 of a milligram in micrograms?\n6750\nConvert 0.5530381g to" +"(4) and n.\n42\nSuppose -1 = -2*x + 3*z, -49 = -3*x - 3*z - 2*z. Suppose 110 = -3*j - 5*n, 2*n - x = -4*j - 178. What is the common denominator of -13/7 and j?\n7\nSuppose 4*k = 0, -5*k = -4*b - 0*k + 80. Calculate the lowest common multiple of 2 and b.\n20\nLet d = 17565443/16 + -1094621. Let m = d + -3221. Find the common denominator of m and 31/16.\n16\nSuppose -3*b - 2*t = -2, 4*t + 10 = 3*b + 2*t. Suppose 0*h + 4*n = 5*h - 70, 0 = 3*h - 3*n - 39. Calculate the least common multiple of h and b.\n18\nLet s = -55 - -71. Calculate the lowest common multiple of 2 and s.\n16\nSuppose 4*h - 160 = -2*z, -h - 3*z + 80 = h. Suppose 0 = 7*g - 3*g - h. Calculate the lowest common multiple of 16 and g.\n80\nLet b(s) = -s**2 - 6*s - 2. Suppose -2*t = 5*p + 21, -t + 26 = -4*p + 4. Suppose 7 = t*q - 25. What is the smallest common multiple" +"m + 5*i + 20, 9*i + 4 = 8*i for m.\n0\nSolve -4*m - 2574*j + 2571*j = 25, 13 = -4*m + j for m.\n-4\nSolve 18*n - 14*n = 3*l - 35, -23*l + 55 = -4*n for l.\n1\nSolve 5*w + 24 = 4*c, 0 = -2086*c + 2090*c - 2*w - 12 for c.\n1\nSolve 2*a = -1031*j + 1035*j - 42, 3*a + 45 = 4*j for j.\n9\nSolve 5*a - 17701*l = -17703*l - 47, -l + 59 = -5*a for a.\n-11\nSolve 77*z = 82*z + 6*q + 50, -16 = -z + 4*q for z.\n-4\nSolve -55*j + 60*j - r - 27 = 0, 1 = -j - 3*r for j.\n5\nSolve 178*p = -4*u + 183*p - 90, 24 = -2*u + p for u.\n-5\nSolve -146 + 147 = 3*i + 2*r, 3*r = 3*i + 9 for i.\n-1\nSolve -38*t + 18 = -95*t + 54*t + 4*j, -12 = 2*t - 4*j for t.\n-6\nSolve -2*r = 47 - 57, -6*n - 3*r = -n - 5 for n.\n-2\nSolve 0 = -a -" +"nearest one million.\n-3000000\nWhat is -0.000001827521773 rounded to 7 dps?\n-0.0000018\nWhat is 623263.066 rounded to the nearest one hundred thousand?\n600000\nRound -7.0561242 to 1 decimal place.\n-7.1\nRound -0.01005862475 to five decimal places.\n-0.01006\nWhat is 0.7427450342 rounded to three dps?\n0.743\nRound -115.905412 to two dps.\n-115.91\nWhat is 0.0085934853 rounded to 3 decimal places?\n0.009\nRound -0.0010156734 to seven dps.\n-0.0010157\nWhat is -10948.97754 rounded to the nearest ten?\n-10950\nRound -28499421.7 to the nearest one hundred thousand.\n-28500000\nRound 0.0274131573 to three decimal places.\n0.027\nWhat is 1852.9793297 rounded to 2 dps?\n1852.98\nRound 0.008006393857 to 6 dps.\n0.008006\nWhat is 0.01057600625 rounded to three dps?\n0.011\nWhat is 396315.52 rounded to the nearest 1000?\n396000\nRound 0.0003783018167 to five decimal places.\n0.00038\nWhat is -0.091781345 rounded to two decimal places?\n-0.09\nRound 14615084.11 to the nearest 10000.\n14620000\nRound 0.0016152002 to 3 dps.\n0.002\nWhat is 14549742.1 rounded to the nearest one hundred thousand?\n14500000\nRound 0.0000000420095512 to 7 dps.\n0\nWhat is 2650.664611 rounded to the nearest one hundred?\n2700\nWhat is 20.10853058 rounded to the nearest integer?\n20\nWhat is -0.00019417729 rounded to 6 decimal places?\n-0.000194\nWhat is -0.0000113531408 rounded" +"18/17, -0.5, 0.4, 1, 4\nPut -0.4, -263/4, 13/4, -7, -0.2 in increasing order.\n-263/4, -7, -0.4, -0.2, 13/4\nSort 17, 4, -7, 0, 25, 2.\n-7, 0, 2, 4, 17, 25\nPut -12, 86, -7, 0 in increasing order.\n-12, -7, 0, 86\nPut -486, 2, 1, 51 in descending order.\n51, 2, 1, -486\nSort 13, 6, 210, 0 in decreasing order.\n210, 13, 6, 0\nPut -4, 18, 0, -17 in ascending order.\n-17, -4, 0, 18\nPut -4, -114, 17, 2 in increasing order.\n-114, -4, 2, 17\nPut 0.2, -4/5, -484, -3 in descending order.\n0.2, -4/5, -3, -484\nPut -0.5, 1, 5, -81, -8/7 in decreasing order.\n5, 1, -0.5, -8/7, -81\nSort -3/5, 0.13627, 0, -5 in decreasing order.\n0.13627, 0, -3/5, -5\nSort 2, -1832, 5, 3 in descending order.\n5, 3, 2, -1832\nSort 3, 5, -5, -228 in decreasing order.\n5, 3, -5, -228\nPut -9, -4, 3, 230, -5 in descending order.\n230, 3, -4, -5, -9\nSort -5, 2, 2594, -4, 5, -1.\n-5, -4, -1, 2, 5, 2594\nPut -12, 13, -2, 4, 2 in ascending order.\n-12, -2, 2, 4, 13\nPut 3, 5, -4, 1.6," +"and 1.2.\n9.2\nAdd together -11699 and 0.1.\n-11698.9\nTotal of -8927 and -2.\n-8929\nSum 2.39 and 5.\n7.39\nWhat is -26 + 0.0121?\n-25.9879\nWhat is the distance between -50102 and -4?\n50098\nCalculate 0.397 + 14.\n14.397\nSubtract 29 from -100934.\n-100963\nWhat is -0.02 less than -63.5?\n-63.48\nWhat is -2673284 + -3?\n-2673287\nCalculate -44 - 0.13.\n-44.13\n-140494 - -1\n-140493\nWhat is the difference between 127 and -0.041?\n127.041\nCalculate -4 - 119100.5.\n-119104.5\nTotal of -9397 and 5.\n-9392\nAdd together 0.26 and -148.\n-147.74\nWhat is 151.24 minus -0.227?\n151.467\nCalculate -0.8 - -35.11.\n34.31\nWhat is -8 + 0.0664?\n-7.9336\nWhat is -0.3 + -707?\n-707.3\nWhat is the distance between -10 and 1.053?\n11.053\nWhat is 0.21346 less than 0.1?\n-0.11346\nPut together 1458.8 and 1.1.\n1459.9\nTotal of 3338 and 577.\n3915\nWhat is -52 - -4.7901?\n-47.2099\nCalculate -16 + -1.05584.\n-17.05584\nTotal of -0.12 and -11.\n-11.12\nTotal of 0.35 and 1.98.\n2.33\nSubtract -6 from -0.7162.\n5.2838\nWhat is 0.1 take away -14.012?\n14.112\nWhat is 4 minus -36.81?\n40.81\n0.5 + -141150\n-141149.5\nWhat is 4.83 minus 0.0011?\n4.8289\nSum -891 and -0.7.\n-891.7" +"the highest common factor of 58 and 290.\n58\nWhat is the greatest common divisor of 225 and 9825?\n75\nWhat is the highest common divisor of 378 and 84?\n42\nWhat is the greatest common divisor of 7980 and 20?\n20\nWhat is the greatest common divisor of 807 and 3?\n3\nCalculate the highest common factor of 108 and 81.\n27\nCalculate the highest common factor of 187 and 136.\n17\nWhat is the highest common divisor of 6 and 822?\n6\nWhat is the greatest common divisor of 386 and 10?\n2\nCalculate the highest common factor of 76 and 38.\n38\nWhat is the greatest common divisor of 16 and 592?\n16\nWhat is the highest common factor of 30 and 1374?\n6\nWhat is the greatest common divisor of 125 and 200?\n25\nWhat is the highest common divisor of 440 and 88?\n88\nCalculate the highest common factor of 172 and 86.\n86\nWhat is the highest common divisor of 22 and 979?\n11\nWhat is the highest common factor of 6 and 504?\n6\nWhat is the greatest common factor of 158 and 79?\n79\nWhat is the greatest common divisor of 2421" +"e the highest common divisor of p and u.\n28\nLet f(v) = 32*v**2 + 39*v - 268. Let d be f(7). Calculate the greatest common factor of d and 242.\n121\nLet d be (-3)/((-2*12/8)/5). Suppose 5*n = 2*w + 124, d*w + 106 = 10*n - 6*n. What is the highest common divisor of 96 and n?\n24\nLet q(c) = c**3 - 34*c**2 + 38. Suppose -3*m - 49 = -151. Let d be q(m). Calculate the greatest common factor of d and 6.\n2\nLet c(l) = 476*l**2 + 5*l - 42. Let w be c(5). What is the highest common factor of 51 and w?\n51\nLet c(k) = 29*k**2 + 11*k + 7. Let o be c(-3). Let u = o - 204. What is the highest common divisor of u and 2?\n1\nSuppose 128*d - 2016 = 114*d. Let w = 255 + -239. What is the highest common divisor of w and d?\n16\nLet q(r) = 108*r**2 - 3*r - 3. Suppose -7 + 1 = 6*f. Let a be q(f). Calculate the greatest common factor of a and 12.\n12\nSuppose 5*r + 137 = 2*q + 524, -3*r" +"= -2*p. Let j = 27 - 21. Calculate the least common multiple of p and j.\n48\nSuppose v - 3*v + 4 = 0, 80 = t - 2*v. Calculate the least common multiple of 98 and t.\n588\nLet q = -455/2 - -2500/11. Find the common denominator of q and 2*1/4*(-1725)/(-4255).\n814\nLet y(i) = i**3 + 24*i**2 + i + 34. Let q = 39 - 63. Calculate the lowest common multiple of 68 and y(q).\n340\nLet t = -128125 + 13837391/108. What is the common denominator of t and -113/132?\n1188\nLet u = 925/2 - 486. What is the common denominator of 35/4 and u?\n4\nLet m = 1605 - 1599. What is the smallest common multiple of 323 and m?\n1938\nLet w = -926763/308 - -21048/7. Calculate the common denominator of w and 49/11.\n44\nLet d = -78857310907/178902660 - -3/5963422. Let t = 7117/12 + d. Let g = -151 + t. Find the common denominator of 3/10 and g.\n10\nSuppose -2 = 2*b - 3*b. Suppose 2*s = -2*m + 5*m - 33, m = -b*s - 29. Let t(v) = -v**3 - 14*v**2 + 14*v" +"9160\nCalculate the lowest common multiple of 215 and 189685.\n8156455\nWhat is the common denominator of 93/1232 and -63/3872?\n27104\nCalculate the least common multiple of 6153 and 182539.\n547617\nCalculate the least common multiple of 3 and 140581.\n421743\nFind the common denominator of 30/101783 and 129/92530.\n1017830\nCalculate the lowest common multiple of 297398 and 16.\n2379184\nFind the common denominator of 83/2914 and -71/2697.\n253518\nFind the common denominator of -35/36 and 57/9860.\n88740\nWhat is the common denominator of -38/111 and 65/145269?\n5374953\nCalculate the common denominator of 50/63 and 7/346788.\n2427516\nCalculate the least common multiple of 41856 and 480.\n209280\nWhat is the common denominator of -193/1560 and -18/625?\n195000\nWhat is the common denominator of 49/473 and -43/363?\n15609\nFind the common denominator of 35/11292 and -95/60224.\n180672\nWhat is the common denominator of 71/270788 and -39/4?\n270788\nCalculate the lowest common multiple of 1398696 and 2.\n1398696\nWhat is the smallest common multiple of 4368 and 117?\n13104\nCalculate the common denominator of 1/3184 and 67/52536.\n105072\nCalculate the smallest common multiple of 4104 and 2088.\n119016\nFind the common denominator of -71/1522 and 13/45.\n68490\nWhat is the least common" +"76*(0 - w)*-1. Let n = b + -92. Is n a multiple of 20?\nTrue\nSuppose 36*p - 24871 = 216185. Is 72 a factor of p?\nTrue\nLet t be (-72)/48*8/(-6). Suppose -14 = t*o - 22. Suppose 191 = o*c + 23. Is c a multiple of 21?\nTrue\nLet y(i) = -14*i + 137. Let j be y(-15). Let h be -3 + 3 - 6/(-2). Suppose -j = -2*a - r, -5*a + r + 349 = -h*a. Does 11 divide a?\nFalse\nIs -24*51447/(-198) - 5*-1*1 a multiple of 7?\nFalse\nLet h(i) be the third derivative of i**5/60 - 5*i**4/24 - i**3/2 - 15*i**2. Let l be h(6). Suppose -55 = -l*j - 10. Is j a multiple of 5?\nTrue\nSuppose -2180*q + 39217 = 2*v - 2183*q, 5*q - 39273 = -2*v. Does 23 divide v?\nTrue\nLet w be 30*-18*(-7)/210. Suppose 3*o + 0*o = 3*c - 234, 4*o = -c + 78. Does 2 divide (5/((-25)/w))/(c/(-195))?\nFalse\nSuppose -3*q - 62 - 1 = 0. Let a be q/(-84)*0/(-2). Is (2 - a)*685/10 a multiple of 32?\nFalse\nSuppose -3*k = 80 - 86. Let b be (-259)/7*(k -" +"207 = x*c + 967. Is 22 a factor of c?\nFalse\nSuppose -2*j + 2*p + 673 = -205, -3*j + 4*p = -1316. Suppose j = 2*g - 3*s, 5*g - 4*s - 550 - 557 = 0. Does 6 divide g?\nFalse\nLet f(z) = 27*z - 13. Let r be f(1). Suppose 0 = -3*s - 4*l + 1346, -12*l - 1798 = -4*s - r*l. Does 47 divide s?\nFalse\nSuppose -2020*z + 119196 = -2016*z. Is z a multiple of 33?\nTrue\nLet p(t) = -4*t**3 + t**2 + 3466. Is 5 a factor of p(0)?\nFalse\nSuppose 0 = 15*b + 201 - 81. Is 6 a factor of (b/(-120)*-18)/((-1)/495)?\nTrue\nLet a(o) be the second derivative of -o**5/20 + o**3/2 + o**2 - 12*o. Let s be a(-1). Is 19 a factor of 3 - -84 - (-2 - (-1 + s))?\nFalse\nLet a(h) = -350*h + 438. Does 62 divide a(-3)?\nTrue\nSuppose -6*h = -3*h - 12. Suppose 2*g = h*g - 284. Suppose 0*p - p = -5*k - g, -2*k = -5*p + 618. Is 29 a factor of p?\nFalse\nIs 9 a factor of 30/180" +"2*w, k*h - 36 = 2*h + 4*w. Sort h, v, -5, 5.\n-5, v, 5, h\nLet n = -1931 - -1924. Let i be ((-70)/(-21))/(-10)*1*-9. Sort i, -4, n in decreasing order.\ni, -4, n\nLet z = -0.5 + -4.5. Suppose 96 = -44*u - 388. Sort u, 0.4, z in decreasing order.\n0.4, z, u\nLet g be ((-18)/(-15))/(12/120). Suppose 2*n = -20*i + 24*i, 0 = -3*i + g. Sort 5, -7, n, 4.\n-7, 4, 5, n\nLet w = -14604 + 14607. Sort w, -1, 0, -4, -53.\n-53, -4, -1, 0, w\nLet x = -13.89 - -0.59. Let f = 10.2298 - -0.0702. Let v = f + x. Put v, -15, -1 in decreasing order.\n-1, v, -15\nLet t be 0*(1 - (-4)/(-6)). Suppose 2*y + 3*y - 180 = t. Let n be 8/(-12)*y/(-40). Put n, -3/10, 0.3 in increasing order.\n-3/10, 0.3, n\nLet z be ((-7)/42)/(1/(-54)). Sort -3, -4, z, -2, 3 in ascending order.\n-4, -3, -2, 3, z\nLet r(y) = -y**3 - 24*y**2 + 81*y + 2. Let m be r(-27). Let u = 103504/89 - 1163. Let k = -341/445 + u." +" 38*h + 253. Determine r(-19).\n253\nLet r(f) = 4*f**3 + 50*f**2 + 23*f + 13. Give r(-12).\n25\nLet a(i) = -291*i + 851. Calculate a(3).\n-22\nLet l(u) = u**3 + 35*u**2 - 152*u + 23. Give l(5).\n263\nLet t(n) = 138*n - 791. What is t(6)?\n37\nLet l(t) = -867*t - 9542. Calculate l(-11).\n-5\nLet k(w) = 5270*w - 168665. Give k(32).\n-25\nLet p(s) = s**2 - 9*s + 8. Give p(3).\n-10\nLet u(n) = -666*n - 17329. Give u(-26).\n-13\nLet d(l) = l**3 - 4*l**2 - 1106*l + 2222. What is d(2)?\n2\nLet z(w) = -w**2 - 6*w + 3. Give z(-11).\n-52\nLet l(n) = n**3 - 17*n**2 + 7*n + 13. Determine l(17).\n132\nLet y(c) = 32*c**2 + 1983*c - 58. Give y(-62).\n4\nLet s(d) = d**2 - d - 86. Calculate s(16).\n154\nLet y(v) = -v**2 + 203*v + 2595. Determine y(-12).\n15\nLet j(o) = -2*o**2 - 21*o + 69. Calculate j(-17).\n-152\nLet f(o) = -o**2 - 1292*o + 13021. Calculate f(10).\n1\nLet l(y) = -18*y + 654. Give l(22).\n258\nLet m(k) = -461*k + 41055. What is m(89)?" +"12\nWhat is -0.0406903883 rounded to 4 decimal places?\n-0.0407\nRound -27848153.25 to the nearest 10000.\n-27850000\nWhat is 0.0000027637078 rounded to six dps?\n0.000003\nRound 28.431664041 to three dps.\n28.432\nWhat is 1151.8142641 rounded to zero dps?\n1152\nWhat is 0.835553 rounded to four dps?\n0.8356\nRound 201.6970142 to 3 decimal places.\n201.697\nRound 1.04497754 to two decimal places.\n1.04\nRound -14873161.103 to the nearest one hundred.\n-14873200\nWhat is 0.00332923374 rounded to 6 dps?\n0.003329\nWhat is 60790685.9 rounded to the nearest one hundred thousand?\n60800000\nWhat is -33446.5669 rounded to the nearest integer?\n-33447\nWhat is 13777967640 rounded to the nearest 1000000?\n13778000000\nRound -31300.773 to the nearest 10000.\n-30000\nRound -0.000086236204 to four dps.\n-0.0001\nWhat is 0.000201563638 rounded to six decimal places?\n0.000202\nWhat is -5921998 rounded to the nearest one hundred thousand?\n-5900000\nWhat is -528195.4169 rounded to the nearest ten?\n-528200\nRound 0.000141262783 to six decimal places.\n0.000141\nWhat is -0.85140195 rounded to four decimal places?\n-0.8514\nRound 0.000080016956 to 5 decimal places.\n0.00008\nWhat is -2219739.38 rounded to the nearest one hundred?\n-2219700\nRound -70686.097 to the nearest ten thousand.\n-70000\nWhat is 31054796.2 rounded to the nearest one thousand?\n31055000\nRound" +"What is the closest to -2/83 in 3/7, 1/6, -3, -10?\n1/6\nWhat is the closest to 2/5 in 2, 0.1, 3577?\n0.1\nWhat is the nearest to 1 in 12, 0.2, 0.23, 5?\n0.23\nWhat is the closest to -1 in -2/23, 3/5, -2, 2.1, -1?\n-1\nWhat is the nearest to -4 in -9, -3/5, 3?\n-3/5\nWhat is the nearest to -3906 in -1/2, 3, -4/7, 0.08?\n-4/7\nWhat is the nearest to 1505 in 2, -0.2, 1?\n2\nWhat is the nearest to 0.2 in -8, -3, 5739, -1/12, 0.4?\n0.4\nWhat is the nearest to -1/6 in 0.1, -0.3, -11993?\n-0.3\nWhich is the closest to 0? (a) 3062/11 (b) 2/7 (c) 0 (d) 1/5\nc\nWhich is the closest to 0? (a) -1 (b) -6.3 (c) -41/3 (d) -2/19\nd\nWhat is the nearest to -0.1 in -0.4, -0.2, -19/3, 2/7?\n-0.2\nWhat is the closest to 2 in 0, 0.4, 312?\n0.4\nWhat is the closest to -2/7 in -2/5, 9, 6/11?\n-2/5\nWhat is the nearest to 1/4 in 0.2, 17, -0.412, 1/4?\n1/4\nWhat is the nearest to 129 in 0.2, 0.1, -1/10, -4?\n0.2\nWhich is the closest to 1?" +" to four decimal places.\n-0.0025\nRound 10.807 to one dp.\n10.8\nRound 0.00000014514 to seven decimal places.\n0.0000001\nWhat is -1831800 rounded to the nearest 100000?\n-1800000\nRound 6240 to the nearest ten thousand.\n10000\nRound 418.899 to the nearest integer.\n419\nWhat is -3.498 rounded to 0 decimal places?\n-3\nWhat is -17544000 rounded to the nearest 100000?\n-17500000\nRound -0.0001143 to 6 decimal places.\n-0.000114\nRound 0.00000000652 to 7 dps.\n0\nRound 4376.3 to the nearest ten.\n4380\nRound -130.8 to the nearest ten.\n-130\nRound -2647.2 to the nearest one hundred.\n-2600\nRound -24700000 to the nearest one million.\n-25000000\nRound -12420 to the nearest 1000.\n-12000\nRound -5013 to the nearest 1000.\n-5000\nWhat is 499810 rounded to the nearest ten thousand?\n500000\nRound -0.000001154 to seven dps.\n-0.0000012\nRound 0.6242 to 2 dps.\n0.62\nRound 0.0000130205 to 7 decimal places.\n0.000013\nWhat is 1.542 rounded to one decimal place?\n1.5\nWhat is 0.0000028287 rounded to 6 dps?\n0.000003\nWhat is -365900 rounded to the nearest 10000?\n-370000\nWhat is 0.00027609 rounded to 5 dps?\n0.00028\nRound -0.0021964 to 4 decimal places.\n-0.0022\nRound 85410 to the nearest 1000.\n85000\nRound -28300 to the nearest 100000." +"-n, 5*q + 4*n = 51. Suppose -q*b + 48 = -4*b. What is the tens digit of b?\n1\nSuppose 2*r - 5*h = 174, 4*r - 3*h - 332 = -h. What is the tens digit of r?\n8\nLet k be 1 - (1 - (34 - 0)). Let q = k - 17. What is the tens digit of q?\n1\nSuppose 5*p - 2*g - 9 - 7 = 0, 0 = p + g - 6. Suppose -147 = -p*i + s, -4*i + 2*s + 146 = -0*s. What is the tens digit of i?\n3\nLet b = -16 + 99. What is the units digit of b?\n3\nSuppose h + 0 = 30. What is the tens digit of h?\n3\nLet c(r) = 3*r - 4. Suppose 2*i + 48 = 6*i. What is the tens digit of c(i)?\n3\nSuppose 2*a = -2*r - 10, 2*r + 4 = 5*a + 1. Suppose 4*o - o = -12. What is the units digit of (0 + a)/(o/20)?\n5\nSuppose 0*q + 78 = -3*x + q, -x - 4*q - 13 = 0. Let l be ((-30)/x)/((-3)/10). What" +"ound 0.0001052042307 to 6 decimal places.\n0.000105\nRound 0.00000367286401 to seven dps.\n0.0000037\nWhat is 127153.156 rounded to the nearest one hundred thousand?\n100000\nRound 13888531.2 to the nearest one thousand.\n13889000\nRound -174312.07 to the nearest 100.\n-174300\nRound 8317.9105 to the nearest one hundred.\n8300\nRound 0.00734152232 to 3 decimal places.\n0.007\nWhat is 576892358 rounded to the nearest 10000?\n576890000\nWhat is -0.00003125405 rounded to 5 dps?\n-0.00003\nWhat is -159140.596 rounded to the nearest 10?\n-159140\nRound 16.2373854 to 3 decimal places.\n16.237\nWhat is 591.968949 rounded to the nearest ten?\n590\nRound -0.0000621427318 to six decimal places.\n-0.000062\nWhat is 0.000432243842 rounded to four decimal places?\n0.0004\nWhat is 0.00045952008 rounded to 7 decimal places?\n0.0004595\nRound -0.119095841 to 3 decimal places.\n-0.119\nRound 0.97145751 to one decimal place.\n1\nRound 0.1027521 to 1 decimal place.\n0.1\nRound -0.00021902144 to 7 decimal places.\n-0.000219\nWhat is -2814663.26 rounded to the nearest one hundred thousand?\n-2800000\nWhat is 818.0018622 rounded to the nearest 10?\n820\nWhat is -313746280 rounded to the nearest one hundred thousand?\n-313700000\nWhat is -0.00004236568 rounded to four dps?\n0\nRound 9.547649198 to four dps.\n9.5476\nRound 4659.35065 to 1 decimal place." +"es 1972 divide 512489276?\nTrue\nIs 5 a factor of 883770?\nTrue\nIs 8 a factor of 47611224?\nTrue\nDoes 43 divide 16169591?\nTrue\nIs 187129735 a multiple of 5?\nTrue\nIs 15129 a factor of 6705475380?\nTrue\nIs 65592180 a multiple of 228?\nTrue\nIs 15 a factor of 113053605?\nTrue\nDoes 49 divide 865934909?\nTrue\nDoes 6 divide 105936144?\nTrue\nDoes 527 divide 784453051?\nFalse\nIs 22 a factor of 7644622?\nFalse\nIs 584 a factor of 11519984?\nTrue\nIs 93 a factor of 276961115?\nFalse\nIs 22223838 a multiple of 79?\nFalse\nIs 366270300 a multiple of 60?\nTrue\nDoes 133 divide 1523887775?\nFalse\nIs 1451 a factor of 7606142?\nTrue\nDoes 103 divide 392839197?\nFalse\nDoes 90 divide 38050705?\nFalse\nIs 5293064607 a multiple of 1267?\nFalse\nIs 33 a factor of 3374314977?\nTrue\nIs 62763710 a multiple of 5?\nTrue\nDoes 165 divide 1231495716?\nFalse\nIs 101 a factor of 45753469?\nFalse\nDoes 11 divide 2986313?\nTrue\nIs 61852245 a multiple of 113?\nTrue\nIs 45 a factor of 1611225630?\nTrue\nIs 308200980 a multiple of 15?\nTrue\nIs 166 a factor of 2838766?\nTrue\nDoes 259 divide 96796070?\nTrue\nIs 530 a factor of" +"**3 - 64*k**2 - 37*k - 1\nWhat is the w'th term of -215, -1288, -4133, -9614, -18595?\n-144*w**3 - 22*w**2 + w - 50\nWhat is the w'th term of 216, 801, 1768, 3123, 4872, 7021?\nw**3 + 185*w**2 + 23*w + 7\nWhat is the s'th term of -1593737, -3187479, -4781223, -6374969, -7968717, -9562467, -11156219?\n-s**2 - 1593739*s + 3\nWhat is the o'th term of 2150, 4076, 6004, 7934?\no**2 + 1923*o + 226\nWhat is the s'th term of 66049, 66054, 66059?\n5*s + 66044\nWhat is the u'th term of 62, 49, 4, -91, -254, -503?\n-3*u**3 + 2*u**2 + 2*u + 61\nWhat is the c'th term of -2795, -11213, -25263, -44945, -70259?\n-2816*c**2 + 30*c - 9\nWhat is the f'th term of 3729, 14938, 33627, 59796, 93445, 134574?\n3740*f**2 - 11*f\nWhat is the i'th term of -60, -119, -232, -411, -668, -1015, -1464?\n-2*i**3 - 15*i**2 - 43\nWhat is the r'th term of 59167, 118316, 177463, 236608, 295751, 354892?\n-r**2 + 59152*r + 16\nWhat is the f'th term of 65, 150, 291, 488?\n28*f**2 + f + 36\nWhat is the i'th term of 506, 1022, 1544, 2072, 2606?" +"-4\nSolve -2*c - 16 = 4*i, 822*i - 28 = 826*i - 4*c for i.\n-5\nSolve h - 45 = 5*f, h + 2*h - 15 = 0 for f.\n-8\nSolve -6*g - 5*n - 18 - 95 = 0, 4*n + 118 = -6*g for g.\n-23\nSolve 0 = -2*x - 1294*g + 1296*g + 24, -5*x = 14*g - 22 for x.\n10\nSolve -37*x + 68 = -3*l, x + 5*l = 743 - 731 for x.\n2\nSolve -3*g - 1800 + 1802 = -2*s, -2*g - s = -6 for g.\n2\nSolve -15 = 2*f - 5*u, 5*f - 1975 + 1900 = -10*u for f.\n5\nSolve 3*t + 169 = -3*f + 175, -3*t - 5*f + 8 = 0 for t.\n1\nSolve -l - 2*m = 4*l - 15, -65 = -2*l + 11*m for l.\n5\nSolve -54 = -3*c - 5*x, c + 15 = 3*c + x for c.\n3\nSolve 3*g + 53*z + 2 = 52*z, 2*g + 4*z = 12 for g.\n-2\nSolve 2*f - 6*f = 2*u, 4*f + 5*u = -6 for f.\n1\nSolve 0 =" +"common multiple of 279 and 93?\n279\nWhat is the smallest common multiple of 171 and 95?\n855\nCalculate the common denominator of -74/35 and 32/55.\n385\nFind the common denominator of -26/99 and 16/81.\n891\nWhat is the common denominator of 29/295 and -4/55?\n3245\nWhat is the least common multiple of 981 and 2071?\n18639\nCalculate the common denominator of 40/153 and -47/85.\n765\nFind the common denominator of 53/627 and -1/399.\n4389\nCalculate the common denominator of -49/60 and 53/90.\n180\nFind the common denominator of -65/198 and 13/189.\n4158\nWhat is the smallest common multiple of 390 and 114?\n7410\nCalculate the lowest common multiple of 2136 and 6.\n2136\nWhat is the common denominator of 20 and -83/96?\n96\nWhat is the common denominator of -79/350 and 69/350?\n350\nCalculate the least common multiple of 1152 and 72.\n1152\nCalculate the common denominator of 59/4550 and 27/3185.\n31850\nCalculate the lowest common multiple of 1568 and 40.\n7840\nCalculate the common denominator of 46/869 and -97/8.\n6952\nCalculate the smallest common multiple of 138 and 24.\n552\nWhat is the common denominator of -103/26 and -55/14?\n182\nCalculate the smallest common multiple of 390 and" +" 9:28 AM?\n139\nWhat is 44 minutes after 3:31 PM?\n4:15 PM\nHow many minutes are there between 8:20 AM and 6:51 PM?\n631\nWhat is 184 minutes after 2:17 PM?\n5:21 PM\nWhat is 49 minutes before 2:03 AM?\n1:14 AM\nWhat is 217 minutes after 2:45 AM?\n6:22 AM\nWhat is 448 minutes before 2:47 PM?\n7:19 AM\nWhat is 255 minutes before 9:13 AM?\n4:58 AM\nHow many minutes are there between 9:06 PM and 11:13 PM?\n127\nWhat is 292 minutes after 3:30 AM?\n8:22 AM\nWhat is 277 minutes after 10:08 PM?\n2:45 AM\nHow many minutes are there between 10:33 PM and 2:59 AM?\n266\nWhat is 51 minutes after 11:24 PM?\n12:15 AM\nWhat is 663 minutes after 9:13 PM?\n8:16 AM\nWhat is 130 minutes before 1:29 PM?\n11:19 AM\nWhat is 160 minutes before 8:45 AM?\n6:05 AM\nHow many minutes are there between 8:35 AM and 8:23 PM?\n708\nHow many minutes are there between 9:07 PM and 1:16 AM?\n249\nWhat is 583 minutes before 9:42 PM?\n11:59 AM\nWhat is 514 minutes after 2:00 AM?\n10:34 AM\nHow many minutes are there between 11:05 AM and 1:21 PM?" +"3, 386\nPut 3/5, 8, -3, 18.7, 6 in decreasing order.\n18.7, 8, 6, 3/5, -3\nSort 31, 1, -8, 6, -5 in descending order.\n31, 6, 1, -5, -8\nPut 12, -6, 0, -3, 1 in ascending order.\n-6, -3, 0, 1, 12\nSort 0, 196917, -0.4 in decreasing order.\n196917, 0, -0.4\nSort 0.8, 51.5, -243 in descending order.\n51.5, 0.8, -243\nSort -1, -2, -8, 153.\n-8, -2, -1, 153\nSort 37, 217, -3/4, -4, -0.4.\n-4, -3/4, -0.4, 37, 217\nSort 0.06, -1559, 3 in decreasing order.\n3, 0.06, -1559\nPut -39971, 1, -0.07 in increasing order.\n-39971, -0.07, 1\nPut -32.2, -0.4, 0.2, 2/11 in decreasing order.\n0.2, 2/11, -0.4, -32.2\nSort 1/20, -1/2, 85, 4/9 in increasing order.\n-1/2, 1/20, 4/9, 85\nPut -47, -86, 1/9, 1 in decreasing order.\n1, 1/9, -47, -86\nPut 0, -3094, 295 in descending order.\n295, 0, -3094\nPut 172, -37, 60, -5 in descending order.\n172, 60, -5, -37\nSort -3/20, 2/9, -14, -23.\n-23, -14, -3/20, 2/9\nSort 0.112653, 2, -5 in decreasing order.\n2, 0.112653, -5\nPut -2, 2, 1223, 8 in increasing order.\n-2, 2, 8, 1223\nSort -82159, -3, -1 in increasing order." +" -90.043 + o. What is c rounded to two dps?\n-0.04\nLet o be (-6)/(6*(-1)/4). Suppose -5194105 = o*d - 230121. Let j = d - -1920996. Round j to the nearest one hundred thousand.\n700000\nLet j(s) = -473335*s + 5. Let o be j(-6). Let v(n) = 3*n - 25. Let d be v(10). Suppose o = q - 5*q + d*h, -3*q - 2130012 = -4*h. Round q to the nearest 100000.\n-700000\nLet o = -118.5 + -4.5. Let d = o - -122.99999838. Round d to 7 dps.\n-0.0000016\nSuppose -5 = 4*f + 5*p - 21, 2*f - p = 8. Suppose 2*u + 44226 = -x, f*u + u + 110559 = -x. Let h = -27889 + u. Round h to the nearest ten thousand.\n-50000\nLet r(m) be the second derivative of 5917*m**4/3 - m**3/6 - 15*m**2/2 + 4*m + 1. Let q be r(-3). What is q rounded to the nearest one hundred thousand?\n200000\nSuppose -222 = -4*i - 2*z, i - 73 = -2*z - 19. Let n be (i/(-12) + 4)*6. Let r be n/12*3 + 10000001. Round r to the nearest 1000000.\n10000000\nLet p(m) =" +"-3408269.\n3408268.9\nSubtract -0.0485 from -1.25.\n-1.2015\nAdd together -98 and -18.81.\n-116.81\nWork out 640 + -3.\n637\nWhat is the distance between -0.1 and 18883?\n18883.1\nWhat is 10.161 + 0.02?\n10.181\n-0.06217 - 336\n-336.06217\nWork out 20.8 + 27462.\n27482.8\nWhat is -22348 take away -4?\n-22344\n-243+0.36\n-242.64\nWork out -9 - -42480.7.\n42471.7\nWhat is -2 take away -1450?\n1448\nWork out -44 - -0.32.\n-43.68\nWork out -10 + -307168.\n-307178\nTotal of -3.07352 and 5.\n1.92648\nWhat is -0.01946 + -50?\n-50.01946\n-66+-106.3\n-172.3\nTotal of -718 and -24.55.\n-742.55\nWork out 0.4 - -2423.\n2423.4\n-3.672 - -0.1\n-3.572\nWhat is -0.019 plus 0.2056?\n0.1866\nWhat is the difference between -171 and 0.96?\n171.96\nAdd together -326304 and 0.3.\n-326303.7\nSum -0.5 and 26914.\n26913.5\nCalculate -0.2 - 134864.\n-134864.2\nWhat is 0 minus -9.51?\n9.51\nWork out -119 - 0.7.\n-119.7\nSum -63 and 14.\n-49\nWhat is the difference between -1.436 and 8.3?\n9.736\nWhat is -8 - 295?\n-303\nTotal of -0.03 and -31.14587.\n-31.17587\nWork out -30447 - 0.5.\n-30447.5\nWork out 0.02 - 82.\n-81.98\nWork out -0.28 + -86.57.\n-86.85\nWhat is 82205 minus 0.7?" +" is divided by 69?\n62\nWhat is the remainder when 41361 is divided by 81?\n51\nWhat is the remainder when 6880 is divided by 287?\n279\nWhat is the remainder when 3549 is divided by 456?\n357\nCalculate the remainder when 83925 is divided by 24.\n21\nWhat is the remainder when 60790 is divided by 422?\n22\nCalculate the remainder when 788 is divided by 461.\n327\nCalculate the remainder when 48137 is divided by 16044.\n5\nWhat is the remainder when 107739 is divided by 35846?\n201\nWhat is the remainder when 58775 is divided by 1130?\n15\nWhat is the remainder when 5538 is divided by 73?\n63\nCalculate the remainder when 34941 is divided by 39.\n36\nWhat is the remainder when 23331 is divided by 49?\n7\nWhat is the remainder when 85740 is divided by 62?\n56\nWhat is the remainder when 3248024 is divided by 75?\n74\nWhat is the remainder when 32607 is divided by 694?\n683\nWhat is the remainder when 3146 is divided by 944?\n314\nCalculate the remainder when 1226272 is divided by 669.\n664\nCalculate the remainder when 10319 is divided by 321.\n47\nCalculate the remainder" +"late the common denominator of 61/82 and d.\n82\nLet g(f) = 11*f + 3. Let x be g(4). Let v = x - 41. Suppose 2*y - 56 = -7*i + 2*i, 2*y + 34 = 4*i. What is the smallest common multiple of v and i?\n30\nSuppose -71*s = -47*s - 216. What is the least common multiple of 564 and s?\n1692\nSuppose 0 = 10*l - 1736 - 1964. Calculate the least common multiple of 148 and l.\n740\nSuppose -280 = -11*f - 3*f. What is the smallest common multiple of f and 2494?\n24940\nCalculate the least common multiple of 32 and 5 - (-3)/((-9)/(-39)).\n288\nSuppose -98*g + 534 - 44 = 0. Let t = 3 - 0. Calculate the least common multiple of t and g.\n15\nSuppose 29 = 5*w - 6. Calculate the smallest common multiple of 80 and w.\n560\nLet c = 4249639/8 - 531925. Let h = 714 + c. Find the common denominator of (-6)/27*(-50)/(-4) and h.\n72\nLet u(z) = 11*z - 2. Let t be u(6). What is the common denominator of -59/3 and 4 + (t/(-7) - 1)?\n21\nSuppose 4*i" +"et d be (-2)/(-3) - 6670/667*(-2)/6. Suppose -52 = -3*a - a. Solve 9*h - d*c - a = 4*h, h = 5*c + 11 for h.\n1\nSuppose 238*s - 16326 - 13356 = -6358. Solve -102*k + s*k - 22 = 2*u, 3*u = 4*k + 7 for k.\n-4\nSuppose 11*j - 15*j + r + 110 = 0, 78 = 3*j - 3*r. Suppose -9*v + j = 1. Solve 8 = t + f, 0*f + 34 = 5*t + v*f for t.\n5\nLet k(l) = -2*l**2 + 9*l + 5. Let n be k(15). Let j = 319 + n. Solve j*z + 4*y + 28 = 4*z, 0 = -2*z + 5*y + 2 for z.\n-4\nLet n(w) = -w**2 + 10*w - 20. Let m be n(5). Suppose 3*p + 18 = 3*s, 0 = m*s - p + 3*p - 23. Solve 3*k + x - 3 - 11 = 0, x - 22 = -s*k for k.\n4\nLet b(j) = -15*j + 201. Let l be b(13). Solve 0*p - l = 5*v - 2*p, 0 = -v + p for v.\n-2\nLet b = -4389" +"\nWhat is the common denominator of 19/3522 and 56/5883?\n6906642\nWhat is the common denominator of 23/52928 and -97/48?\n158784\nCalculate the common denominator of -37/48 and -61/690.\n5520\nFind the common denominator of -47/12747 and 47/63.\n38241\nCalculate the lowest common multiple of 26 and 22932.\n22932\nWhat is the smallest common multiple of 326448 and 435264?\n1305792\nWhat is the common denominator of -21/454738 and 67/12?\n2728428\nWhat is the common denominator of 91/2196 and 109/1248?\n228384\nWhat is the common denominator of -65/5248 and -73/7680?\n314880\nWhat is the smallest common multiple of 1845 and 18081?\n90405\nWhat is the common denominator of 143/223446 and -28/99?\n7373718\nFind the common denominator of 11/242238 and -109/60.\n2422380\nWhat is the least common multiple of 279 and 640278?\n19848618\nFind the common denominator of -63/220 and -79/1990.\n43780\nFind the common denominator of -37/4860 and 169/354780.\n354780\nCalculate the common denominator of 53/2873338 and 9/14.\n20113366\nWhat is the lowest common multiple of 73850 and 36925?\n73850\nWhat is the lowest common multiple of 960 and 1632?\n16320\nWhat is the smallest common multiple of 672 and 165920?\n3484320\nWhat is the common denominator of -10/69 and -87/110078?\n330234" +"place?\n4.6\nWhat is -7353346.7 rounded to the nearest one thousand?\n-7353000\nRound -0.00001571377 to five decimal places.\n-0.00002\nRound -9170670 to the nearest one thousand.\n-9171000\nRound 0.15047582 to 4 dps.\n0.1505\nRound 8229.1878 to the nearest integer.\n8229\nRound -1141184 to the nearest one thousand.\n-1141000\nRound -0.000001125732 to 7 dps.\n-0.0000011\nRound 0.009085554 to four dps.\n0.0091\nRound -6511.088 to the nearest 1000.\n-7000\nWhat is -41.41096 rounded to two dps?\n-41.41\nWhat is -0.0332956 rounded to 2 decimal places?\n-0.03\nWhat is -0.0454067 rounded to three decimal places?\n-0.045\nWhat is -2362960 rounded to the nearest 10000?\n-2360000\nRound 0.00017006371 to five decimal places.\n0.00017\nWhat is 0.00008064697 rounded to 6 dps?\n0.000081\nWhat is -0.0000443513 rounded to 7 dps?\n-0.0000444\nWhat is -0.0000267809 rounded to 6 dps?\n-0.000027\nWhat is -0.030469 rounded to three decimal places?\n-0.03\nRound -7731969000 to the nearest one million.\n-7732000000\nRound 0.000600313 to 6 decimal places.\n0.0006\nWhat is -358.923 rounded to the nearest ten?\n-360\nWhat is -3.233599 rounded to one decimal place?\n-3.2\nRound -3931437 to the nearest one hundred thousand.\n-3900000\nWhat is 10895.3 rounded to the nearest 1000?\n11000\nWhat is -0.00035522 rounded to 5 dps?" +"b - 49. Let a be b*((-10)/4)/1. Suppose -a = -4*w + 9. What is the smallest common multiple of 6 and w?\n6\nLet t be 737/(-684) + 6/8. Let f = t + 2867/342. What is the common denominator of (23/30)/(4/(-6)) and f?\n180\nLet x = -2383/174 - -129/116. Let i be (8/(-6))/((-2)/9). Calculate the common denominator of (-518)/60 - 4/i and x.\n60\nLet t(i) = 3*i - 3. Let y be t(3). Let s = y + -2. What is the least common multiple of 5 - 3 - (-8 - 0) and s?\n20\nLet q be 3*(2 - (0 - 0)). Calculate the common denominator of 43/3 and 176/q*1/(-6).\n9\nCalculate the common denominator of ((-6)/14)/((-9)/50) and -85/24.\n168\nLet r = -15214/45 + -253003/360. Let p = r - -1043. Let k = -9570 - -95621/10. Find the common denominator of p and k.\n40\nSuppose -11*a - 16 = -115. What is the least common multiple of 33 and a?\n99\nSuppose -4*i + i = 27. What is the common denominator of i and (-7)/42 + (-61)/66?\n11\nLet s(y) = -y**2 - 6*y - 5. Let u be s(-4)." +"*m + 164. What is the tens digit of t(n)?\n0\nLet d = 143 + -94. Suppose -d = 6*z - 1. What is the units digit of (19/(-2))/(z/16)?\n9\nLet b(z) = 5*z - 22. Let w be b(-7). Let g = -25 - w. Suppose 2*a = c - 38, 0*c = c - 5*a - g. What is the tens digit of c?\n4\nLet l = 7180 - 1779. Suppose -15*z - l = -26*z. What is the hundreds digit of z?\n4\nLet d be (1/(-1))/1 + 0 + 3. Let h be (-693 - d)/5*2. Let p = -84 - h. What is the units digit of p?\n4\nSuppose 18*d - 2880 = 2*d. What is the tens digit of d?\n8\nLet w(x) = -x**3 - 23*x**2 - 24*x - 40. Let z be w(-22). What is the tens digit of 3/z + (-4468)/(-16) - 1?\n7\nSuppose -2*c - o = 880 - 17808, 2*o = -3*c + 25394. What is the thousands digit of c?\n8\nLet r(d) be the third derivative of d**5/15 - d**4/6 - d**3/6 - 117*d**2. Let g = -4 + 7. What is the" +"a composite number?\nTrue\nIs 50633 a composite number?\nTrue\nIs 745 composite?\nTrue\nIs 144961 a prime number?\nTrue\nIs 459874 a prime number?\nFalse\nIs 38491 a prime number?\nFalse\nIs 877 composite?\nFalse\nIs 11269 a prime number?\nFalse\nIs 48163 a composite number?\nFalse\nIs 364801 prime?\nTrue\nIs 241369 composite?\nTrue\nIs 107171 composite?\nFalse\nIs 1217 prime?\nTrue\nIs 646607 prime?\nFalse\nIs 13291 composite?\nFalse\nIs 3691 a prime number?\nTrue\nIs 415238 composite?\nTrue\nIs 65287 a prime number?\nTrue\nIs 14017 composite?\nTrue\nIs 4847 prime?\nFalse\nIs 111919 composite?\nFalse\nIs 13853 a prime number?\nFalse\nIs 2779094 prime?\nFalse\nIs 599213 composite?\nFalse\nIs 571 prime?\nTrue\nIs 15253 composite?\nTrue\nIs 564733 a composite number?\nTrue\nIs 2267 a composite number?\nFalse\nIs 240991 a prime number?\nFalse\nIs 8861 a composite number?\nFalse\nIs 551455 a composite number?\nTrue\nIs 9103 a prime number?\nTrue\nIs 3517 prime?\nTrue\nIs 554747 a composite number?\nFalse\nIs 15073 a composite number?\nFalse\nIs 10123 a prime number?\nFalse\nIs 22978 prime?\nFalse\nIs 30449 a composite number?\nFalse\nIs 790781 a prime number?\nTrue\nIs 2495 composite?\nTrue" +"0\nLet o be (-1)/(-1 + 2/4). Let u = -136454 + 229651. Suppose -g + 2*g + u = -4*f, o*f - 2*g = -46606. What is f rounded to the nearest one thousand?\n-23000\nLet d = -690102 + -1825898. What is d rounded to the nearest one million?\n-3000000\nLet g = -10.784 - -11. Let m = -0.21206 + g. What is m rounded to four dps?\n0.0039\nLet m = 0.882 + -0.8. Let h = 0.122 + -0.052. Let u = h - m. Round u to 2 dps.\n-0.01\nLet u = -121 - -84. Let b = u + 172. Let r = 135.099 - b. Round r to two dps.\n0.1\nLet u = 31.2 + -31.168. Round u to 2 dps.\n0.03\nLet r(c) = -c + 8. Let m(b) = 3*b - 15. Let x(p) = -3*m(p) - 5*r(p). Let k be x(4). Let n = 87 + k. What is n rounded to the nearest 10?\n80\nLet q = -2309.999997011 - -2310. What is q rounded to seven dps?\n0.000003\nLet a = -0.945 - -0.92. Round a to two decimal places.\n-0.03\nLet a = 4.9" +"12 = -l - 9 for l.\n1\nSolve -11*h + 8*h + n = 0, 4*n = h for h.\n0\nSolve 4*n + 2*g - 22 = 0, 0 = -n - 4*g + g + 13 for n.\n4\nSolve 4*a = -5*s + 20, a + 2*a - 15 = -4*s for s.\n0\nSolve 0 = r + 3*r - 4*h - 24, -3*r + 5*h + 28 = 0 for r.\n1\nSolve 0 = -163*r + 162*r + 2*p + 7, -4*p = 5*r - 21 for r.\n5\nSolve t + 5*u = 4*u, -3*t + 5*u - 32 = 0 for t.\n-4\nSolve 0 = 2*w + 4*f + 47 - 29, 11 = -w - 3*f for w.\n-5\nSolve 0 = -4*s + 4*w + 8, -11*s + 13*s + 21 = -3*w for s.\n-3\nSolve -6 = -v + t, -3*v - 20*t - 6 = -15*t for v.\n3\nSolve -25 + 37 = 4*q + 4*n, 0 = -n + 4 for q.\n-1\nSolve -3*i - u - 3 = 0, 4*i = 5*i + 5*u + 1 for i.\n-1\nSolve -3*o" +"nded to 3 dps?\n-0.003\nLet a = 29.0000224 + -29. What is a rounded to six dps?\n0.000022\nLet d = -318 + 594. What is d rounded to the nearest 10?\n280\nLet p be (-1)/(-3)*(9 + -3). Suppose -o = p*o + 3900000. What is o rounded to the nearest one million?\n-1000000\nSuppose -4 = -5*h + 1. Suppose -4*f + s = -h, 4*f + 2*s + 1 = -1. Round f to seven dps.\n0\nLet s = -3.24539558 + 0.24539528. Let r = -2 - -5. Let u = r + s. What is u rounded to seven decimal places?\n-0.0000003\nSuppose 0 = -0*v - 2*v - n + 2659998, 4*v = n + 5320002. Round v to the nearest 100000.\n1300000\nLet t = 38 + 2. Suppose -3*m - m = t. Let z be m/(-6)*40*108000. What is z rounded to the nearest 1000000?\n7000000\nLet b = 29 - 29.0000076. What is b rounded to 6 dps?\n-0.000008\nLet k = -0.108 - -0.24. Let f = -92 + 107.268. Let h = f + k. Round h to zero dps.\n15\nLet c(i) = i**2 + 5*i -" +"(t) = -2*t**3 + 26*t**2 + 6*t - 514. Calculate m(6).\n26\nLet u(a) = 7*a + 86. Give u(-19).\n-47\nLet r(k) = 297*k - 355. Give r(3).\n536\nLet b(n) = 2128*n - 38311. Give b(18).\n-7\nLet k(o) = -77*o**2 - 327*o - 5. Give k(-5).\n-295\nLet m(d) = d**3 - 100*d**2 - 142*d - 6322. Determine m(102).\n2\nLet o(t) = 151*t - 2134. Determine o(15).\n131\nLet r(h) = h**2 + 4*h - 63. Determine r(7).\n14\nLet t(u) = 7*u + 196. Determine t(-26).\n14\nLet c(g) = -g**3 - 19*g**2 - 105*g - 99. Calculate c(-6).\n63\nLet x(m) = m**3 - 77*m**2 - 1831*m - 135. Give x(-19).\n-2\nLet j(z) = -13*z + 40. Give j(6).\n-38\nLet b(r) = -r**2 + 189*r + 1545. Give b(-8).\n-31\nLet v(a) = -97*a - 60. Determine v(1).\n-157\nLet r(d) = 17*d**3 - 80*d**2 - 23*d - 6. Determine r(5).\n4\nLet m(c) = 22*c**2 + 481*c + 2615. What is m(-12)?\n11\nLet z(x) = -2*x**2 - 30*x - 33. Determine z(-14).\n-5\nLet d(b) = b**2 + 10*b - 18. Calculate d(-5).\n-43\nLet z(k) = 882*k + 16794." +"r of 625921 and 121024?\n1891\nWhat is the greatest common divisor of 9832 and 123782422?\n2458\nCalculate the highest common divisor of 29500 and 41538950.\n2950\nCalculate the greatest common divisor of 551 and 209694792.\n19\nCalculate the greatest common divisor of 3920 and 2711905.\n245\nCalculate the highest common divisor of 133 and 619191.\n19\nWhat is the greatest common factor of 9014256 and 36?\n36\nWhat is the greatest common factor of 107187099 and 3396?\n849\nCalculate the greatest common factor of 23385508 and 1974.\n94\nCalculate the greatest common factor of 35 and 38198657.\n7\nCalculate the greatest common divisor of 168850 and 327338.\n22\nCalculate the highest common factor of 1334 and 2121089.\n29\nCalculate the greatest common divisor of 370 and 4287500.\n10\nWhat is the greatest common factor of 7322 and 2786?\n14\nCalculate the highest common divisor of 2501535 and 21330.\n1185\nWhat is the greatest common factor of 101526615 and 120?\n15\nWhat is the highest common divisor of 315173 and 37127?\n271\nCalculate the greatest common factor of 4489 and 455216023.\n4489\nCalculate the highest common divisor of 3967254 and 36.\n18\nWhat is the greatest common factor of 1456280" +"ivided by -2\n12489/2\n406 divided by -7\n-58\nCalculate 3478 divided by -74.\n-47\nDivide 219 by -3.\n-73\n512 divided by -2\n-256\nCalculate 736 divided by 46.\n16\nDivide 1 by -49.\n-1/49\nCalculate 5320 divided by -1064.\n-5\n-196 divided by -49\n4\nWhat is 432 divided by 27?\n16\nWhat is 2400 divided by 30?\n80\n-5 divided by 767\n-5/767\n-29 divided by 8\n-29/8\nWhat is 5 divided by -4?\n-5/4\nDivide 47 by 47.\n1\nWhat is -3282 divided by 2?\n-1641\n0 divided by 802\n0\n3 divided by -1174\n-3/1174\nCalculate 1 divided by -50.\n-1/50\nCalculate -1596 divided by 114.\n-14\nDivide -84 by 2.\n-42\nWhat is -1 divided by 93?\n-1/93\nDivide 17 by 122.\n17/122\nWhat is 1206 divided by -134?\n-9\n-22 divided by -87\n22/87\nWhat is 0 divided by -34?\n0\nCalculate 11 divided by -228.\n-11/228\nDivide -20964 by 6.\n-3494\nDivide -584 by 6.\n-292/3\n218 divided by -2\n-109\nCalculate -2 divided by 294.\n-1/147\nDivide -5 by 48.\n-5/48\nCalculate 3735 divided by 747.\n5\nCalculate 482 divided by -1.\n-482\nCalculate -104 divided by -1.\n104\n-57 divided" +"s at least as big as -4?\nTrue\nLet l be (-57)/9 - (6 - (-57)/(-9)). Do l and -72/13 have the same value?\nFalse\nSuppose -4*v + 105 = -b, -8*b + 3*v = -13*b - 410. Is -2 smaller than b?\nFalse\nLet h = -1337/290 + 3/290. Suppose 0 = -114*p + 112*p - 10. Does h = p?\nFalse\nSuppose -d + 5 = 0, 0 = -3*w - 2*d + d - 8917. Let i = w + 68414/23. Let m = i + 78/115. Which is bigger: m or 0?\nm\nSuppose 5*u - 2*g = 4, -16*g = -15*g - 3. Suppose 0 = -5*a, -4*a = -3*w - 6*a + 12. Suppose -2*n - 18 = 3*h + 2*n, 2*h - w*n = 8. Is h bigger than u?\nFalse\nLet v(j) = j**2 + 3*j - 13. Let h be v(3). Suppose 5*r = 3*m + h, -m - r + 1 = -0*r. Let i = 5/9 + -19/18. Is m less than i?\nFalse\nLet j = 2.03 - 0.03. Let s = -72 - -71.83. Let v = -0.87 - s. Which is greater: j or v?\nj" +"Suppose 3*g - 1 = d. Is g <= 2?\nTrue\nSuppose 6*m - 5*m = 4*c, 3*m + c - 13 = 0. Let q(x) = -10*x + 41. Let w be q(m). Is -3/100 less than w?\nTrue\nLet r = 4554 - 41045/9. Are -6 and r nonequal?\nTrue\nLet p(j) = 3*j - 1. Let h be p(1). Suppose 3 = h*n - 13. Suppose -4*z + 4 = -2*o, 5*o = 5*z - n - 2. Is -4/7 equal to o?\nFalse\nLet j = 83 - 51. Suppose -2*o = -96 - j. Is 64 greater than o?\nFalse\nLet c be (-284)/(-10) + (-4)/10 + 0. Let t = c - 37. Which is greater: t or -8?\n-8\nLet r(w) = -3*w**3 + w**2 - 21*w - 57. Let f be r(-4). Do 235 and f have the same value?\nTrue\nSuppose -6 = -7*r + 5*r. Suppose 3*c = -3*b, -c = r*b - 0*c. Does -4 = b?\nFalse\nLet j = 1.4 + -1.57. Let g = j - 1.53. Let x = -1.8 - g. Is x not equal to 1?\nTrue\nLet g be -1 - -1" +" 390.\n-1/130\nDivide -5 by 400.\n-1/80\nCalculate 234 divided by 117.\n2\nDivide 1668 by 4.\n417\nCalculate 1 divided by -8198.\n-1/8198\nWhat is -1079 divided by 3?\n-1079/3\nDivide -893 by 19.\n-47\n89 divided by -6\n-89/6\nCalculate 32718 divided by -3.\n-10906\nDivide -142 by -6.\n71/3\n-4636 divided by -4\n1159\nDivide 690 by 345.\n2\nCalculate -1148 divided by 11.\n-1148/11\n-49120 divided by 4\n-12280\n-13 divided by -48\n13/48\nDivide 0 by 4205.\n0\nCalculate -318 divided by 2.\n-159\nCalculate -24 divided by -53.\n24/53\nWhat is 20 divided by 587?\n20/587\nCalculate -82 divided by 50.\n-41/25\nCalculate -5412 divided by 132.\n-41\nWhat is -5 divided by -359?\n5/359\nWhat is 0 divided by -9230?\n0\nCalculate 14 divided by -2.\n-7\n115 divided by -1\n-115\n-13 divided by 6\n-13/6\nCalculate 181 divided by -1.\n-181\n-56 divided by 5\n-56/5\nWhat is 45265 divided by 11?\n4115\nWhat is 237 divided by 50?\n237/50\nDivide 359 by 2.\n359/2\nDivide -25 by 10.\n-5/2\nWhat is -58 divided by 9?\n-58/9\n-66 divided by 6\n-11\nCalculate -11006 divided by 1.\n-11006\nCalculate -1132 divided" +"6))/(515515/4862 - 107) and d/(-2) + 10/32.\n176\nLet n be -1 - ((-52 - 0) + -1). Suppose 8072 = 246*m + 15095 - 49335. Suppose -3*p = -m + n. What is the least common multiple of p and 8?\n40\nLet f(g) = -6*g + 29. Let r be f(4). Suppose 0 = -r*s + 5*y + 270, -8*s + 3*s = -4*y - 268. Calculate the smallest common multiple of 22 and s.\n572\nLet t = -10124/5 + 637577/315. Let r = 4805 + -33697/7. Let g = r - t. Calculate the common denominator of -151/6 and g.\n18\nLet z(j) = -15*j + 26. Let s be z(-12). Suppose -803 = -3*l - l - g, l + 2*g - s = 0. What is the lowest common multiple of 15 and l?\n600\nLet b = -80511628/7 - -2418156001/210. Let m = 13362 - b. Calculate the common denominator of 131/84 and m.\n420\nLet k = 11902 - 9914. Calculate the least common multiple of 12 and k.\n5964\nLet b(c) = 5*c - 13. Let j be b(3). Let s(x) = 3*x**3 + 2*x - 7. What is the smallest" +"- (-4 - 6) - 1 - 6) + -4\n-5\nWhat is the value of 9 - ((5 - -11) + -7) - 3?\n-3\nWhat is (0 + 0 - -5) + (19 - (28 - 17))?\n13\n(-8 - 2) + 23 + 11 + 5 + -9\n20\nEvaluate (-4 - 0 - -2 - 7) + 9.\n0\nEvaluate 17 + (-26 + 13 - -1).\n5\nCalculate (2 - -13 - 8) + 0 + -9 + 23.\n21\nEvaluate 17 - (5 + 16 + -16).\n12\nWhat is the value of -2 + 7 + (-2 - -2) + (-2 - 6)?\n-3\n(-196 - -199) + -15 + 1\n-11\nWhat is the value of 2 + (12 + -8 - -7) - 28?\n-15\nWhat is 275 - 230 - (24 - -2)?\n19\nCalculate -55 + (-42 + 18 - -46).\n-33\nWhat is -8 - (-1 - -4) - -11?\n0\nEvaluate -8 - ((29 - (-5 - -29)) + (-17 - 1)).\n5\nWhat is the value of (-1 - 4) + -11 + (5 - (-19 + 8))?\n0\nCalculate 4 - (13 - (7 -" +" the common denominator of -127/2663980 and 75/38.\n50615620\nWhat is the lowest common multiple of 101183728 and 35711904?\n607102368\nWhat is the common denominator of -15/158745148 and 7/8?\n317490296\nCalculate the least common multiple of 460 and 48470430.\n96940860\nWhat is the lowest common multiple of 79765 and 9890?\n3669190\nWhat is the least common multiple of 78783646 and 236350938?\n236350938\nWhat is the common denominator of -41/1032 and 29/3285?\n1130040\nWhat is the least common multiple of 8 and 3165697?\n25325576\nWhat is the common denominator of 103/104 and -47/9362080?\n9362080\nWhat is the common denominator of -47/1807440 and -13/917010?\n124713360\nWhat is the least common multiple of 1567307 and 56?\n12538456\nWhat is the common denominator of -181/27220440 and 17/2093880?\n27220440\nFind the common denominator of 7/2663344 and -17/6658360.\n13316720\nCalculate the smallest common multiple of 750 and 5276625.\n10553250\nWhat is the common denominator of 89/3062584 and 109/45038?\n3062584\nCalculate the common denominator of -27/496 and 21/4768048.\n4768048\nWhat is the lowest common multiple of 3057808 and 364?\n21404656\nFind the common denominator of 11/79690 and -59/209646.\n13626990\nWhat is the lowest common multiple of 175 and 927300?\n6491100\nWhat is the smallest common multiple of 6" +"t(-6). Let r be (0/(-3 + 1))/2. Suppose 4*y - 3 - 9 = r. Solve -o = y*b - b for b.\n-2\nLet v(o) = o**2 + 23*o - 84. Let z be v(-28). Let a be (z/(-42))/((-4)/6). Solve a*m + 2 + 0 = 0 for m.\n-1\nLet v be (-21)/(-154) + 28890/5940. Let t be (21/(-12))/(2/(-8)). Let s = t + -3. Solve -v = s*c - 3*c for c.\n-5\nSuppose -5*b = -5, u - 66 = b + 67. Solve 344 - u = 30*c for c.\n7\nLet f be (58/(-5))/((-146)/1095). Solve -32*o - 220 = -f*o for o.\n4\nSuppose 0 = 4*a - 5*z - 26, -6*a + a + 12 = 4*z. Suppose 5*u - 2 = 5*w + 6*u, -3*u = a*w + 6. Solve 7 = 7*s - w*s for s.\n1\nLet b = 79 - -245. Let h = 326 - b. Solve -6*w - h*w + 40 = 0 for w.\n5\nSuppose 3*m - 266 = 4*h, -2*h + 61 + 211 = 3*m. Solve -16*f - m = 22 for f.\n-7\nLet v = 0 - -9. Let c =" +"e cube root of 2405770 to the nearest integer?\n134\nWhat is the cube root of 2125627 to the nearest integer?\n129\nWhat is the third root of 8650651 to the nearest integer?\n205\nWhat is the fifth root of 19395593 to the nearest integer?\n29\nWhat is 6901889 to the power of 1/4, to the nearest integer?\n51\nWhat is 122710 to the power of 1/3, to the nearest integer?\n50\nWhat is 367610 to the power of 1/3, to the nearest integer?\n72\nWhat is the third root of 854321 to the nearest integer?\n95\nWhat is the fifth root of 684906 to the nearest integer?\n15\nWhat is 584265 to the power of 1/3, to the nearest integer?\n84\nWhat is the sixth root of 47411 to the nearest integer?\n6\nWhat is the fifth root of 13236571 to the nearest integer?\n27\nWhat is 985915 to the power of 1/8, to the nearest integer?\n6\nWhat is the cube root of 1432210 to the nearest integer?\n113\nWhat is 258698 to the power of 1/9, to the nearest integer?\n4\nWhat is 351036 to the power of 1/2, to the nearest integer?\n592\nWhat is 156560" +"is the greatest common factor of o and 90?\n10\nSuppose 3*b = 14*b - 1331. What is the greatest common divisor of 363 and b?\n121\nLet h(b) = b**3 + 8*b**2 + 10*b + 7. Let p be h(-6). Let o = -10 + p. Suppose -3 = -y + o. Calculate the highest common factor of 8 and y.\n4\nSuppose 8*o - 110 = 3*o. Let u = o - -16. Calculate the highest common divisor of 95 and u.\n19\nLet l = -3 - -9. Let p(a) = -1091*a + 2236. Let b be p(2). Calculate the greatest common divisor of l and b.\n6\nLet b(y) = -y**2 + 22*y - 4. Let n be b(18). Let q = 76 - 42. What is the greatest common factor of q and n?\n34\nSuppose 4*v = f - 2*f + 165, 15 = 3*f. Suppose 3*g - 4*d = -15, 4*g - 2*d + 7 = -d. Let m be 5/((-5)/2) + 13 + g. What is the greatest common factor of m and v?\n10\nLet m = 6 - -3. Let x(n) be the third derivative of n**5/20 + 4*n**3 +" +"e highest common factor of 1230 and 510.\n30\nCalculate the greatest common factor of 408 and 1088.\n136\nWhat is the highest common divisor of 1196 and 52?\n52\nCalculate the highest common factor of 243 and 1053.\n81\nCalculate the greatest common factor of 1566 and 3.\n3\nWhat is the greatest common divisor of 7345 and 65?\n65\nCalculate the greatest common factor of 108 and 1728.\n108\nCalculate the greatest common divisor of 80 and 5.\n5\nCalculate the greatest common divisor of 551 and 928.\n29\nWhat is the highest common divisor of 17 and 4709?\n17\nWhat is the highest common factor of 16912 and 224?\n112\nCalculate the highest common divisor of 176 and 2772.\n44\nWhat is the highest common divisor of 12977 and 19?\n19\nCalculate the greatest common divisor of 15436 and 8.\n4\nCalculate the greatest common divisor of 299 and 234.\n13\nWhat is the greatest common divisor of 1119 and 24?\n3\nWhat is the greatest common factor of 156 and 52?\n52\nCalculate the highest common factor of 942 and 7222.\n314\nCalculate the greatest common factor of 80 and 380.\n20\nCalculate the highest common" +"58, -25*j + 26*j = -7*c + 127. Sort c, 0.47, 0.5.\n0.47, 0.5, c\nSuppose -4*x = 13 + 3. Let n be 2/x + (-15)/10. Suppose -4*r = -3*s + 29, -3*r = -r - 5*s + 25. Sort 3, n, -1, r.\nr, n, -1, 3\nSuppose 5*f + 4*k + 15 = 51, 5*k - 20 = 0. Let o be (6/8*(-8)/12)/((-95)/570). Put o, 6, f in increasing order.\no, f, 6\nLet q be (-2 + 11)*6/6. Let s be 4 - q - (-11 - (-1)/1). Put s, -2, -4 in increasing order.\n-4, -2, s\nLet w be 14 + -13 + 0/2 - -11. Suppose 5*k - w = 2*r, -3*r - 4*k + 4 = -1. Sort -2, 4, -58, r.\n-58, -2, r, 4\nSuppose 12*s + 5*z = 7*s - 10, 5*s + 4*z + 10 = 0. Let f be (-8)/16*s/(0 - -1). Sort f, -9, 8 in increasing order.\n-9, f, 8\nLet k = -247 - -84. Let r = k + 168. Sort 37, 2, r.\n2, r, 37\nSuppose 5*p - 8 = -2*x - 3, p - 1 = -5*x. Let j be" +" -0.36 + c. Let n = s - 14.992. Round n to 3 dps.\n0.008\nLet q = 1592 - 1711.9. Let r = -159 - q. Round r to the nearest 10.\n-40\nLet h(f) = -f. Let v be h(1). Let s be (0 + (-4 - 0))*v. Suppose -s*z + 6*z = 12800. Round z to the nearest one thousand.\n6000\nLet c = 7.18691278 + -1.18691244. Let w = -6 + c. What is w rounded to seven dps?\n0.0000003\nLet s = -162905.9977 + 162918. Let i = 46.00242 - s. Let u = -34 + i. What is u rounded to 4 dps?\n0.0001\nSuppose -5*j - n - 4*n = 0, 3*n = j - 12. Let o be 15*(-350)/j*8. Round o to the nearest ten thousand.\n-10000\nLet u = 0.1391 - -8.4109. What is u rounded to the nearest integer?\n9\nLet d = 97.3 + -6.3. Let w = -356533.0178 - -356442. Let b = w + d. Round b to three decimal places.\n-0.018\nLet f = -1275.113 - -1275. Round f to 1 dp.\n-0.1\nLet z = 14.56 + -15.95984. Let s = 1.4 + z. Round" +"-21)?\n7\nSuppose 16*w - 18*w + 18 = 0. Let y(h) = 126*h - 103. Calculate the remainder when y(1) is divided by w.\n5\nLet s = 3908 - 3366. What is the remainder when s is divided by 61?\n54\nSuppose -14*j + 32*j = 13*j, -3*t + 4*j + 195 = 0. What is the remainder when 449 is divided by t?\n59\nLet x = -11616 + 11875. Calculate the remainder when x is divided by 18.\n7\nLet k = -14 + 39. Suppose 5*n - 431 = -3*u + n, -4*n - 4 = 0. Calculate the remainder when u is divided by 0 + (k - -8) - (-3 - 1).\n34\nSuppose 47*n = -6*n - 27*n + 52080. What is the remainder when 1975 is divided by n?\n22\nCalculate the remainder when 234 is divided by (-57 + 21)/(9/(-6)).\n18\nLet s = -6529 + 9169. Calculate the remainder when s is divided by 52.\n40\nSuppose 0*h - 64 = -16*h. Suppose h*x = -4*d + 173 + 303, 2*d - 250 = -5*x. Calculate the remainder when d is divided by 17.\n13\nSuppose -l + 399" +"0?\n-13500\nLet w(f) = -376086*f**2 - 9*f + 41. Let k be w(7). Let d = k + 8028236. What is d rounded to the nearest 1000000?\n-10000000\nSuppose 5*k = 262532 + 230393. Let c be 4/((-180)/k) + (-6)/27. Let t = c - -8291. Round t to the nearest one thousand.\n6000\nLet u(p) = 1848*p**2 - 1727*p - 86. Let o be u(38). What is o rounded to the nearest one million?\n3000000\nLet f = -53.096 - -0.096. Let o = 52.907 + f. Let c = 0.1172 + o. Round c to 3 decimal places.\n0.024\nLet v = -8 - -3.5. Let c = -130476464 - -130476468.50000136. Let h = v + c. Round h to seven decimal places.\n0.0000014\nLet u = 0.8397712 + -232.6547812. Let c = u + 237.514. Let v = c + -5.7. Round v to 4 decimal places.\n-0.001\nLet d be (5/10)/((-33)/(-1357620)). Round d to the nearest 10000.\n20000\nLet x = 10451683794 - 10451684275.0000471. Let y = -481 - x. Round y to 6 decimal places.\n0.000047\nLet d = 59.0131 - 59. Let x = 0.01309838 - d. Round x to six decimal places." +"4612 + 1444 = 0. Solve -15*d - 21*d + p = 0 for d.\n2\nLet i = -79 - -32. Let y = i - -45. Let d be (y/3)/(1*(-6)/27). Solve -4 = d*u - u for u.\n-2\nLet q be (-1260)/(-25) + (-178)/445. Solve -q*k = -27*k for k.\n0\nLet j be (-8)/3*15/10. Let r be (1/(-3))/(j/48). Suppose 5*l + 45 = r*p, 2*p - 4*l = 6*p. Solve -15 = -p*s + 2*s for s.\n5\nLet x be 20430/63 - (-12)/7. Solve 0 = x*a - 330*a + 20 for a.\n5\nLet y(p) = -p - 7. Suppose 0 = 2*n - 0*w - 5*w + 146, -236 = 4*n + 4*w. Let l = n - -56. Let c be y(l). Solve c*f - 4*f = 8 for f.\n-2\nSuppose 0*h = -10*h + 340. Suppose 14*z = 190 + h. Solve -z*u + 18*u - 10 = 0 for u.\n5\nLet a be 2 - 10/3 - 114/(-18). Let v be (-2 + a + -5)/((-5)/20). Let y be ((-4)/(-26) + (-15)/(-156))*v. Solve o + y*o = 9 for o.\n3\nLet s be 615 - (14*18/24)/((-27)/(-18)). Solve" +"34527.\n1127\nCalculate the highest common factor of 94403 and 67.\n67\nCalculate the highest common factor of 68 and 166651.\n17\nCalculate the highest common factor of 919024 and 2272.\n1136\nCalculate the greatest common divisor of 5925 and 1500.\n75\nCalculate the greatest common divisor of 4 and 36783.\n1\nCalculate the greatest common divisor of 1572 and 277720.\n524\nCalculate the highest common divisor of 40500 and 24462.\n162\nCalculate the greatest common divisor of 258 and 15394.\n86\nWhat is the greatest common factor of 582 and 1258478?\n194\nWhat is the greatest common factor of 3510 and 7670?\n130\nWhat is the greatest common divisor of 618012 and 27?\n9\nWhat is the greatest common divisor of 20737 and 267?\n89\nCalculate the greatest common divisor of 50749 and 76.\n19\nWhat is the greatest common factor of 167 and 99198?\n167\nWhat is the highest common divisor of 140 and 86160?\n20\nCalculate the highest common divisor of 132 and 3084.\n12\nWhat is the greatest common factor of 2740 and 108915?\n685\nCalculate the greatest common factor of 16640 and 19840.\n640\nWhat is the greatest common divisor of 193 and 271?\n1" +" the units digit of d?\n5\nLet h = -340 + 317. Let z(j) = -j + 5. Let m be z(6). What is the tens digit of (-13 - -11) + (m - h)?\n2\nLet d = -43503 - -133176. What is the hundreds digit of d?\n6\nWhat is the hundreds digit of 10*((-40)/450*-9 - 90354/(-20))?\n1\nSuppose -2*c = 2*f - 1324 - 288, 2430 = 3*c + f. What is the tens digit of c?\n1\nSuppose 2*u - 50 = -m + 8, 232 = 4*m - 5*u. Let s = m - 55. Suppose -s*c + 72 = -0*c. What is the units digit of c?\n4\nSuppose 19*s = -87154 + 291784. What is the thousands digit of s?\n0\nLet s(b) = -155*b**3 + b**2 + 106*b + 522. What is the units digit of s(-5)?\n2\nSuppose -19579 = -13*c + 7006. Suppose -6*v + 205 + c = 0. What is the tens digit of v?\n7\nLet a(g) = -43*g - 382. Let y be a(-9). Suppose -y*n - 9*m = -7*m - 76, 5*n - 70 = -5*m. What is the tens digit of n?\n1\nLet" +"rs of 383305?\n5, 13, 5897\nWhat are the prime factors of 14521529?\n11, 19, 69481\nWhat are the prime factors of 13172225?\n5, 11, 19, 2521\nWhat are the prime factors of 28115938?\n2, 751, 18719\nWhat are the prime factors of 151392?\n2, 3, 19, 83\nList the prime factors of 234063.\n3, 8669\nWhat are the prime factors of 30609362?\n2, 7, 137, 15959\nWhat are the prime factors of 1150816?\n2, 35963\nList the prime factors of 26631727.\n113, 235679\nList the prime factors of 6050021.\n73, 179, 463\nList the prime factors of 31678.\n2, 47, 337\nList the prime factors of 3049796.\n2, 101, 7549\nWhat are the prime factors of 68169?\n3, 31, 733\nWhat are the prime factors of 20165362?\n2, 7, 149, 1381\nList the prime factors of 954861.\n3, 318287\nWhat are the prime factors of 9337481?\n607, 15383\nList the prime factors of 1807397.\n1807397\nList the prime factors of 83530.\n2, 5, 8353\nWhat are the prime factors of 485644?\n2, 317, 383\nList the prime factors of 36319163.\n37, 981599\nList the prime factors of 231992.\n2, 47, 617\nList the prime factors of 738263.\n738263\nWhat" +"-0.009\nLet t = -4095.47 - -7232.38. Let n = 3345 - t. Let x = 209 - n. What is x rounded to 1 dp?\n0.9\nLet i = -0.0538 - -49.3538. Let q = -33 + i. Let r = -16.29999757 + q. Round r to seven decimal places.\n0.0000024\nLet l = 1059 + -968. Let q = -547 - -347. Let o = q + l. Round o to the nearest 10.\n-110\nLet w = -2618055 - 2965094. Let y = -5583270.9999808 - w. Let l = -122 - y. Round l to 6 decimal places.\n-0.000019\nLet f = 38761 - -85991. What is f rounded to the nearest ten thousand?\n120000\nLet r = 6758 + -6651.2. Round r to the nearest integer.\n107\nLet x = -1089 - -1202.8. Let j = x + -5.8. Let y = -108.0000138 + j. Round y to 6 dps.\n-0.000014\nLet i = -3.327782917 - -3.3278. What is i rounded to 6 decimal places?\n0.000017\nSuppose -4*z - 10 = -46. Let n be 152246/(-8) + z/12. What is n rounded to the nearest one thousand?\n-19000\nLet g(c) = -27*c**3 + c**2 + 10" +"million.\n-6000000\nSuppose -158988 = u + 3*h, -4*u - 5*h + 235173 = 871153. What is u rounded to the nearest ten thousand?\n-160000\nLet x(y) = -82*y**3 + y**2 - 4*y - 2. Let i be x(4). What is i rounded to the nearest one hundred?\n-5300\nLet s be 0/(-3) - 602117 - -3. Let p = s - 7886. Round p to the nearest 100000.\n-600000\nSuppose 5*w - 4*o - 90 = -2*o, 3*w - 45 = 3*o. Suppose 15 = 5*v + 2*y, 2*v + 2*y = 4*y + w. Suppose 0 = v*h + 715676 + 4334324. Round h to the nearest 100000.\n-1000000\nSuppose -4*h - 9 = 3*g - 34, 3 = -3*h + 5*g. Suppose 0 = h*w + 485902 - 4085902. What is w rounded to the nearest 1000000?\n1000000\nSuppose 2*n - 6000 = 5*n. Round n to the nearest 1000.\n-2000\nLet x(n) = 20775*n**2 + 2*n + 3. Let y(o) = -o**2. Let t(m) = -x(m) + 5*y(m). Let v be t(-2). Let z = -21119 - v. What is z rounded to the nearest ten thousand?\n60000\nSuppose -6*p + 128829 - 15429 = 0." +"u(v) = 166*v**2 - 58*v - 1257. What is the ten thousands digit of u(-16)?\n4\nLet m = -245 - 880. Let z = 1825 + m. What is the units digit of z?\n0\nLet r = 26870 + -1902. What is the tens digit of r?\n6\nLet d(b) = 1. Let s(t) = 13*t + 42. Let p(m) = 5*d(m) - s(m). Let x be p(-19). Suppose 8*q - x = q. What is the tens digit of q?\n3\nLet m = 27740 + -13423. What is the thousands digit of m?\n4\nLet c(o) = 2*o**2 - 2*o - 6. Let l be c(-3). Suppose -2*k + 28 = -2*m, -l = m - 5*k + 8. Let d = m + 75. What is the tens digit of d?\n6\nSuppose 2*d + 37 = 189. Suppose 93*r = 76*r. Let g = d - r. What is the tens digit of g?\n7\nSuppose -81*u = -79*u - 1238. Suppose 0 = i - u + 525. What is the tens digit of i?\n9\nLet d be ((-12)/15)/(28/70). What is the units digit of ((-30198)/168)/(d/8)?\n9\nLet v be -1 -" +"number?\nTrue\nIs 887288219 a composite number?\nTrue\nIs 1840384363 a composite number?\nFalse\nIs 2949637619 a composite number?\nTrue\nIs 2777773307 composite?\nFalse\nIs 444007013 composite?\nTrue\nIs 372783619 a composite number?\nTrue\nIs 152440807 prime?\nTrue\nIs 24605881607 prime?\nTrue\nIs 3670551211 a composite number?\nFalse\nIs 3700801571 prime?\nTrue\nIs 65559931 composite?\nFalse\nIs 40871255 composite?\nTrue\nIs 1046645027 a prime number?\nTrue\nIs 1933248314 composite?\nTrue\nIs 903864595 composite?\nTrue\nIs 881088001 a prime number?\nTrue\nIs 4388642117 composite?\nFalse\nIs 1265705659 a composite number?\nFalse\nIs 278573711 composite?\nTrue\nIs 162588421 a prime number?\nTrue\nIs 186005641 composite?\nFalse\nIs 891703277 a prime number?\nFalse\nIs 405802711 a prime number?\nTrue\nIs 3133937713 composite?\nTrue\nIs 19081814419 a prime number?\nTrue\nIs 29975105 a composite number?\nTrue\nIs 61444493 prime?\nFalse\nIs 4281105713 a prime number?\nFalse\nIs 19100162261 composite?\nFalse\nIs 14983699333 prime?\nTrue\nIs 3009171817 composite?\nTrue\nIs 12555772742 composite?\nTrue\nIs 2240994293 a prime number?\nFalse\nIs 12212376361 prime?\nFalse\nIs 14129933 composite?\nFalse\nIs 1105016411 a composite number?\nFalse\nIs 1511763901 a prime number?\nFalse\nIs 31876509151 prime?\nTrue\nIs 51544243 composite?\nTrue\nIs 20223940819 a prime number?\nTrue\nIs 18115025047" +"for q.\n4\nSolve 43*c - 41*c + 55 = -13*d, 0 = 3*c + 5*d + 10 for c.\n5\nSolve -d = 5*z + 91, -17*z - 1671 + 1360 = 5*d for d.\n-1\nSolve -72*f + 73*f - 17 = 3*m, -3*f - 4*m + 116 = 0 for f.\n32\nSolve 32 = 5*o + 43*t - 39*t + 74, -2*o - 32 + 4 = 3*t for o.\n-2\nSolve -12*x + 63 = -v + 302, -5*v - 4*x - 8*x = 81 + 164 for v.\n-1\nSolve 0 = -4*j + 5*t, 20*j + 5*t + 150 = 30 for j.\n-5\nSolve -2*m + 5*d + 16 = m - 7 - 12, 7*m - 15 = -5*d for m.\n5\nSolve -36*r + 72 = 32*r - 63*r - 4*t, -5*t = -2*r + 22 for r.\n16\nSolve n + 0*n - 96 = -5*n - 3*j, 8*j = -7*n + 7*j + 22 for n.\n-2\nSolve -5*c = -4*d - 33*d + 49, 4*c - 30 = -0*c - 5*d for c.\n5\nSolve -931*v + 68 = -2*u - 966*v, -2 = -6*u - 0*u" +"- 3*q. Let a be u(-7). Suppose 5*h - i - 213 = -4*i, -a*i = 5*h - 209. What is the remainder when h is divided by 16?\n13\nLet f(r) = r**3 + 3*r - 3. Let z be f(6). What is the remainder when z/15 - (-2)/(-5) is divided by 9?\n6\nSuppose 0 = 10*k + 6*k - 1760. Suppose 0 = 3*r + 4*w - k, 7 = 3*r - 4*w - 87. Calculate the remainder when r is divided by 6.\n4\nSuppose -42 = 9*j - 105. What is the remainder when j is divided by 6?\n1\nCalculate the remainder when 295 is divided by ((-444)/(-518))/(3/35).\n5\nLet w(o) = o + 73. Let p = 60 - 60. Calculate the remainder when w(p) is divided by 13.\n8\nLet l(p) = -6*p - 29. Calculate the remainder when 249 is divided by l(-9).\n24\nWhat is the remainder when (5 - 2) + 14 + 6/(-3) is divided by 8?\n7\nLet c(f) be the third derivative of 23*f**4/24 - f**3/2 - 2*f**2. Suppose 37*j = 35*j + 34. Calculate the remainder when c(3) is divided by j.\n15\nSuppose 6*t" +"41702 - 42604 for n.\n-22\nSolve 0 = 1495*h + 40114 + 6249 + 16427 for h.\n-42\nSolve 764*m + 115*m - 1156 + 127300 = -289*m for m.\n-108\nSolve -621 = 1551*s + 2612*s - 3692 - 1092 for s.\n1\nSolve -64580*h = -64362*h + 1090 for h.\n-5\nSolve -62*r + 222*r = 3949 - 1069 for r.\n18\nSolve -1901*g = -190*g - 56463 for g.\n33\nSolve 0 = -265*p - 8900 + 950 for p.\n-30\nSolve -1125*x + 4140 - 17640 = 0 for x.\n-12\nSolve 1123*l - 13995 = 52262 for l.\n59\nSolve 2865*l - 2823*l - 114 - 165 = 99 for l.\n9\nSolve -81*t - 20*t + 43*t = 81*t + 87*t for t.\n0\nSolve 26625 = 92818*y - 93193*y for y.\n-71\nSolve -212 = 278*p + 79 + 1377 for p.\n-6\nSolve -128*k - 1851 = -208*k + 3589 for k.\n68\nSolve -135720 = 117097*u - 118402*u for u.\n104\nSolve 181617*o - 309 = 181564*o + 221 for o.\n10\nSolve -58*f + 143220 = -2228*f for f.\n-66\nSolve 831*t + 110205 = -409*t - 80221 +" +" be k(9). Let j be t + (6 - 1) + -2. Suppose -2*c - 4 = -u, 0 = 5*u - 2*c - j*c - 8. Solve u*s = -5*s - 20 for s.\n-4\nSuppose -43*t + 54*t + 897 = 50*t. Solve -11 = 6*q - t for q.\n2\nSuppose 5*n - 40 = 5*w, 5*w - 9 = -4*n + 14. Suppose 2*j - n*r = -2*r + 11, j = r + 7. Suppose 0 = g + 2, -6 = -i + g. Solve -2*o + i*o - j = 0 for o.\n4\nLet a(c) = c**3 + 15*c**2 - 31*c - 234. Let w be a(-11). Solve 0 = 582*g - w*g + 18 for g.\n2\nSuppose -7*p + 5*p = -4. Suppose 7 + 5 = -2*g + 4*o, 2 = -2*g + p*o. Suppose 0 = g*l + 25 - 37. Solve l*m + m = 0 for m.\n0\nSuppose w = 2*w - 4. Let x be (-130)/(-4) - 21/(-14). Let j = 38 + -24. Solve -j = w*q - x for q.\n5\nSuppose 3*y - 8 = y. Suppose y*r - 19 +" +" least common multiple of 62 and 372?\n372\nWhat is the smallest common multiple of 140 and 2?\n140\nWhat is the least common multiple of 1200 and 1800?\n3600\nCalculate the smallest common multiple of 612 and 4.\n612\nCalculate the least common multiple of 920 and 10.\n920\nWhat is the common denominator of 59/6 and -49/10?\n30\nFind the common denominator of -161/360 and 11/72.\n360\nCalculate the lowest common multiple of 1 and 791.\n791\nWhat is the smallest common multiple of 18 and 42?\n126\nCalculate the common denominator of 107/968 and -155/792.\n8712\nFind the common denominator of 63/55 and 29/220.\n220\nWhat is the lowest common multiple of 24 and 93?\n744\nCalculate the common denominator of -16/525 and 56/15.\n525\nCalculate the common denominator of 27/112 and -89/224.\n224\nWhat is the common denominator of -71/6702 and -77/2?\n6702\nWhat is the common denominator of 125/6 and -46/33?\n66\nCalculate the smallest common multiple of 30 and 231.\n2310\nCalculate the smallest common multiple of 300 and 80.\n1200\nFind the common denominator of 119/18 and 35/3651.\n21906\nWhat is the smallest common multiple of 22 and 14?\n154\nWhat is the" +"dreds digit of y?\n1\nLet i(u) = -2*u**3 + 172*u**2 + 51*u + 64. What is the ten thousands digit of i(85)?\n1\nSuppose -2*l + 96 = 86. Let i be 1*(-1 + (-60)/l). What is the tens digit of (7 - (-6 - -21))/(1/i)?\n0\nLet p = -16431 + 31025. What is the ten thousands digit of p?\n1\nLet y = 27464 - 24652. What is the hundreds digit of y?\n8\nLet q(y) = y**3 + 16*y**2 + 38. Let k be q(-16). Suppose 0 = 36*m - k*m - 34. Let n = m - -80. What is the units digit of n?\n3\nSuppose 17*u - 238125 + 29824 = 0. What is the hundreds digit of u?\n2\nLet u = -3660 - -6260. Suppose u = -32*d + 40*d. What is the hundreds digit of d?\n3\nLet k(f) = 423*f**3 + 13*f - 215*f**3 + 29*f**2 - 72 - 207*f**3. What is the tens digit of k(-28)?\n4\nLet f(k) = 1307*k**2 + 9*k + 18. What is the ten thousands digit of f(-3)?\n1\nLet w = 640 - 250. Suppose y - 4*v = 362, 4*y +" +"*h + 5*q - 18352, p*q = h - 6*h + 30592. Is h prime?\nFalse\nLet z(d) = d**3 - 6*d**2 - d - 7. Let u be z(7). Let w be ((-1)/(-15) + (-14)/u)*-15. Suppose w*x = -h + 6003, 0 = -14*x + 10*x - 5*h + 4794. Is x composite?\nFalse\nIs (-228785544)/(-264) - 39 - (-1)/11 a prime number?\nTrue\nLet y(u) = 3412*u + 990. Is y(49) prime?\nFalse\nSuppose -340*n + 3*p = -342*n + 291641, -3*n + 437459 = 2*p. Is n composite?\nFalse\nLet h = 3 + -3. Suppose 29770 = 5*y - 5*s, -6*y = s - h*s - 35759. Is y a prime number?\nFalse\nSuppose -3*k - 5*b = -5255, -5*k + 7028 = -k - 4*b. Let w = -898 + k. Let z = 1512 - w. Is z prime?\nFalse\nLet z(s) = 70*s**2 + 4*s + 25. Let h = 75 + -69. Is z(h) composite?\nTrue\nSuppose -47*m = 33*m - 115228 - 1042692. Is m a prime number?\nFalse\nLet l(u) = 1374*u**2 + 8*u. Let w(i) = -i**2 + 6*i + 56. Let n be w(11). Is l(n) a prime" +"the prime factors of 6865237?\n1321, 5197\nWhat are the prime factors of 3862198?\n2, 967, 1997\nWhat are the prime factors of 231016?\n2, 67, 431\nWhat are the prime factors of 128509?\n128509\nWhat are the prime factors of 67287?\n3, 11, 2039\nWhat are the prime factors of 1009769?\n23, 43, 1021\nWhat are the prime factors of 413881?\n13, 31, 79\nWhat are the prime factors of 1154867?\n7, 29, 5689\nList the prime factors of 498937.\n498937\nList the prime factors of 1438770.\n2, 3, 5, 199, 241\nWhat are the prime factors of 5523541?\n5523541\nWhat are the prime factors of 1938233?\n11, 23, 47, 163\nList the prime factors of 5565489.\n3, 67, 27689\nWhat are the prime factors of 20671?\n7, 2953\nWhat are the prime factors of 935658?\n2, 3, 17327\nWhat are the prime factors of 43874405?\n5, 43, 204067\nWhat are the prime factors of 11790445?\n5, 443, 5323\nWhat are the prime factors of 13776257?\n11, 79, 83, 191\nWhat are the prime factors of 6188762?\n2, 619, 4999\nList the prime factors of 659494.\n2, 11, 31, 967\nWhat are the prime factors of 418708?\n2, 104677" +"me factors of 4636665.\n3, 5, 11, 17, 19, 29\nList the prime factors of 1492821751.\n3769, 396079\nList the prime factors of 1767004591.\n11, 160636781\nList the prime factors of 237445754.\n2, 7, 13, 643, 2029\nList the prime factors of 3954079.\n37, 106867\nList the prime factors of 112324380.\n2, 3, 5, 7, 267439\nList the prime factors of 84536632.\n2, 103, 102593\nList the prime factors of 114777607.\n7, 16396801\nWhat are the prime factors of 6371419?\n331, 19249\nList the prime factors of 62915574.\n2, 3, 19, 647, 853\nWhat are the prime factors of 1075436960?\n2, 5, 13, 191, 2707\nWhat are the prime factors of 128034172?\n2, 7, 137, 33377\nWhat are the prime factors of 1419461977?\n251, 5655227\nList the prime factors of 151314049.\n409, 369961\nList the prime factors of 54235520.\n2, 5, 83, 1021\nWhat are the prime factors of 299356130?\n2, 5, 29935613\nWhat are the prime factors of 24732708?\n2, 3, 7, 11, 13, 29, 71\nWhat are the prime factors of 353024537?\n14753, 23929\nWhat are the prime factors of 817277027?\n7, 59, 282697\nWhat are the prime factors of 135096086?\n2, 67548043\nWhat are the prime factors" +"(2 + -3) - -14 and n(13).\n176\nLet h = 1614 - -1823. Let m be (-4)/2 + (-34307)/(-10). Let d = h - m. Calculate the common denominator of d and -95/8.\n40\nSuppose -i = -17 - 9. What is the lowest common multiple of i and 4?\n52\nSuppose 4*c - 16 = 5*l, -5*c + 20 = -l - 3*l. Suppose -c = 10*n - 11*n. What is the lowest common multiple of 18 and n?\n36\nSuppose 0*c = 3*c - 18. Suppose 17 = 2*b - 3*v, -2*v + 11 = b - v. What is the least common multiple of b and c?\n30\nLet k(w) = w**2 + 16*w + 2. Let p(a) = -3*a**2 - 47*a - 7. Let j(y) = 17*k(y) + 6*p(y). Calculate the lowest common multiple of 10 and j(-6).\n80\nLet d(y) = -4*y**2 - 32*y - 8. Calculate the lowest common multiple of d(-7) and 22.\n220\nLet x(d) = -d**2 - 10*d - 11. Let q be x(-8). Let a(z) = z**3 - 6*z**2 + 5*z + 3. What is the lowest common multiple of 5 and a(q)?\n15\nSuppose -3*p + 5*h +" +"-3/2446. What is the common denominator of h and u?\n576\nFind the common denominator of -73/42 and (72/14)/(42/9).\n294\nFind the common denominator of 8372/312 + -2 + 0 + -1 and 63/562.\n1686\nLet t = 1/56700 - -5099/226800. What is the common denominator of -187/450 and t?\n3600\nWhat is the common denominator of (-2)/6 + (-1729)/(-84) and -19/18?\n36\nLet h = 2 + -6. Find the common denominator of (-139)/h - 3/12 and 16/5.\n10\nLet m = 28 - 31. Let u(r) = -r - 7. Let o be u(m). Let p = o + 14. What is the smallest common multiple of 7 and p?\n70\nLet d be (-3)/9 + (-4)/(36/(-21)). Suppose 0 = -d*z + 6. Calculate the lowest common multiple of z and 6.\n6\nCalculate the common denominator of (-1 - 16/(-14))*264/1914 and -10/261.\n1827\nLet a(l) = -l**2 - 46*l - 82. Calculate the lowest common multiple of a(-44) and 24.\n24\nLet t be ((-15)/(-6))/(1/1498). Let g = t - 52477/14. Find the common denominator of g and (-7)/(56/(-39))*-4.\n14\nLet f be (-2)/(-8) - 220/(-64)*-227. Let x = 784 + f. What is the common denominator" +"/v).\n63\nLet g = 33 + -36. Calculate the common denominator of 6/(-9)*(-606)/56 and (24/160)/(g/218).\n70\nCalculate the common denominator of 1032/108 + -10 + 2*2 and -3/145.\n1305\nLet w = -19/16 - 245/16. Calculate the common denominator of ((-8)/19 - 3) + -8 + 12 and w.\n38\nLet c(g) = -g**3 - 2*g**2 + g + 15. Suppose -2*v - 3 = z - 0*z, -3*v + 3 = -z. Calculate the lowest common multiple of c(v) and 3.\n15\nLet p = 28/2125 - -30329/439875. Calculate the common denominator of p and -25/6.\n414\nLet y(k) = -19*k**3 - 7*k**2 - 4*k - 3. Let d be y(-12). Let i be d/(-60) - 4/(-10). Let j = i + 541. Find the common denominator of 5/3 and j.\n12\nLet w(v) = -v**3 - 2*v**2 + 5*v + 4. Let s be w(-3). Let m be 7 - -1*(s - 1). Suppose 4*r = -0*r + m. Calculate the common denominator of -117/10 and r.\n10\nSuppose -189 = -12*u + 87. Suppose -8*t + u + 25 = 0. Calculate the least common multiple of t and 6.\n6\nLet a be ((-45)/(-105))/((-2)/499) +" +"-6*x - 4 = 2 for x.\n-1\nSolve 0 = -11*n + 76 - 21 for n.\n5\nSolve -172 = 7*y - 158 for y.\n-2\nSolve 52*n = 3*n + 196 for n.\n4\nSolve 3 = 13*l - 10 for l.\n1\nSolve -31*j - 16*j = -141 for j.\n3\nSolve 12*q + 36 - 84 = 0 for q.\n4\nSolve -3*k - 5 + 14 = 0 for k.\n3\nSolve -3*k - 197 = -185 for k.\n-4\nSolve -16*i + 6*i = -10 for i.\n1\nSolve 5*n + 0 + 5 = 0 for n.\n-1\nSolve -341*i - 32 = -337*i for i.\n-8\nSolve -29*p + 1 = -30*p for p.\n-1\nSolve 85*z - 27 = 76*z for z.\n3\nSolve -8*v = 10 - 18 for v.\n1\nSolve 732*x = 728*x + 4 for x.\n1\nSolve d = -72*d - 146 for d.\n-2\nSolve 26*q - 24*q + 12 = 0 for q.\n-6\nSolve 6*b - 52 = -22 for b.\n5\nSolve -30 = 3*u - 9*u for u.\n5\nSolve 146*s + 78 = 133*s for s.\n-6\nSolve -25*x" +"+ 17*t(d). Let n be h(3). Let g = 0 - n. What are the prime factors of g?\n19\nLet t(n) = -n - 1. Let c(j) = -22*j - 9. Let h(f) = 2*c(f) - 14*t(f). List the prime factors of h(-2).\n2, 7\nLet t = -4 + 9. Let b = t - 1. Suppose -b*h + 41 = -3*h. What are the prime factors of h?\n41\nLet n be -4 - -1 - (42/6 - 1). List the prime factors of (-15)/9*n*1.\n3, 5\nList the prime factors of 11/(-2)*13*-20.\n2, 5, 11, 13\nLet m = 1722 + -816. What are the prime factors of m?\n2, 3, 151\nLet m(x) = -x**3 - 9*x**2 + x + 100. List the prime factors of m(-13).\n7, 109\nSuppose -28*u = -31*u + 129. Let q = 2 - -1. Suppose -2*w - u - 43 = -4*i, q*w + 9 = i. What are the prime factors of i?\n2, 3\nSuppose 0 = -2*r + 4*r + 2. Suppose -5*h - 5*b + 45 = 0, 5*h - 5*b - 53 = -2*b. Let t = h + r. What are the" +"pose 0 = 5*q + 25, 4*g + 4*q = q - 3. Suppose g*i = 8*i - s - 22, -4*i - 4*s = -32. What is the units digit of i?\n5\nLet a(n) = n**3 - 5*n + 4. What is the units digit of a(4)?\n8\nLet j = 8 - 14. Let d be 2*(j/4)/1. Let g = d + 4. What is the units digit of g?\n1\nSuppose -39 - 109 = -2*s. What is the tens digit of s?\n7\nSuppose -c - c - 4*q = -176, 4*c - q - 307 = 0. What is the units digit of c?\n8\nSuppose 0 = 3*a + 3 - 21. What is the units digit of a?\n6\nSuppose 2*x + q = 15, 3*x + 2*q = -3*q + 33. What is the tens digit of 2/(-3)*(-135)/x?\n1\nSuppose -5*f - 5*m = -15, -3*f - 1 = -4*m - 17. Suppose -16 = -f*t - 2*y, -t + 1 = -2*y + 7. What is the units digit of ((-42)/12)/((-1)/t)?\n7\nSuppose 0 = -5*o + 213 + 2. What is the units digit of o?\n3\nLet y" +" 1290/263 or 4?\n4\nIs 1 < 0.32996?\nFalse\nWhich is smaller: -152 or 803?\n-152\nWhich is smaller: -595092 or -595091?\n-595092\nWhich is smaller: -119254 or -0.1?\n-119254\nDo 313 and 207 have the same value?\nFalse\nWhich is smaller: -2198 or -2420?\n-2420\nIs -5 greater than -683/17?\nTrue\nDo -2929330 and -2929330 have the same value?\nTrue\nWhich is bigger: -1 or 1/25643?\n1/25643\nIs 586 less than or equal to 4100/7?\nFalse\nWhich is greater: -1 or -30/5731?\n-30/5731\nWhich is smaller: 71787 or 71791?\n71787\nDo 1 and -3/3206 have the same value?\nFalse\nWhich is greater: -11.4964 or 0.1?\n0.1\nWhich is greater: -52624 or -263123/5?\n-52624\nWhich is smaller: 25 or 135083?\n25\nIs 575 less than 291?\nFalse\nDoes 0.7 = -12.918?\nFalse\nAre -5/6 and 28653 non-equal?\nTrue\nDo 7947 and -125 have the same value?\nFalse\nIs 1/2 less than or equal to 2/74569?\nFalse\nDoes -1117 = -1128?\nFalse\nWhich is smaller: 1 or -2/479203?\n-2/479203\nWhich is smaller: 56 or -538?\n-538\nIs 4578037 less than 4578038?\nTrue\nIs 37847 at most 37847?\nTrue\nIs -101797/13 <= -7832?\nFalse\nAre -1/16 and 52/1291 equal?\nFalse\nAre -58" +", -1, 3, -1.01167, -0.2, 4?\n4\nWhich is the third biggest value? (a) -16 (b) -4 (c) -103040 (d) -2 (e) -0.07\nb\nWhat is the smallest value in -9/43, 0.263, 9, -5.2?\n-5.2\nWhich is the second biggest value? (a) 3 (b) 1 (c) 268213.769 (d) 2/11\na\nWhat is the fourth biggest value in -0.1, 0, 2, 3, -1248, -4/7, 4?\n0\nWhat is the biggest value in 0.051, 56/317, -2?\n56/317\nWhat is the fourth biggest value in -0.1, -23178/163, 2, -0.05?\n-23178/163\nWhat is the second biggest value in 3/17, 5059, 2, -2.48, -0.4, -1?\n2\nWhich is the third biggest value? (a) -217/167 (b) 9 (c) 1/6 (d) 0.3 (e) -0.3\nc\nWhich is the biggest value? (a) 5 (b) -5 (c) -640 (d) 46\nd\nWhat is the seventh smallest value in 0.5, -51, -4, 3, 0.7, 0, -0.2?\n3\nWhat is the smallest value in -3/2, -59, -0.3, -2, 0, -5, -184?\n-184\nWhat is the third smallest value in 2, 10765572, -1/6, 0.1?\n2\nWhat is the sixth smallest value in 10, -22, -0.1, -4, 5/11, -5?\n10\nWhat is the second smallest value in -428, 3425, 0.11, 0.02?\n0.02\nWhich" +"ert 6b7 (base 16) to base 15.\n799\nWhat is -1002200 (base 3) in base 7?\n-2223\nConvert -12001 (base 9) to base 10.\n-8020\n26310 (base 9) to base 16\n4554\n-21322 (base 4) to base 13\n-39a\n-2755 (base 8) to base 12\n-a65\n6030 (base 8) to base 15\ndb6\n-1010001001 (base 2) to base 6\n-3001\n4ce (base 15) to base 3\n1111112\nWhat is -2605 (base 11) in base 5?\n-102033\nWhat is 1501 (base 10) in base 2?\n10111011101\nConvert -514 (base 11) to base 12.\n-438\nWhat is 940 (base 15) in base 14?\na8d\nConvert -101201 (base 3) to base 13.\n-193\nWhat is -135a (base 11) in base 13?\n-a54\nConvert -10110 (base 7) to base 6.\n-15213\nConvert -35b4 (base 13) to base 5.\n-220313\n1c9a6 (base 13) to base 12\n288b2\nWhat is -5a51 (base 13) in base 11?\n-9633\nWhat is -110111100011011 (base 2) in base 16?\n-6f1b\n4102 (base 8) to base 7\n6110\nConvert -1157 (base 16) to base 5.\n-120224\nConvert 111101 (base 3) to base 4.\n11221\nConvert -11a5 (base 11) to base 8.\n-3037\nConvert 191b (base 13) to base 14.\n1514\nWhat" +" seven quarters of a litre in millilitres?\n1750\nWhat is 3/16 of a week in minutes?\n1890\nWhat is 6164.499 nanometers in meters?\n0.000006164499\nHow many months are there in eight thirds of a year?\n32\nWhat is 7.629706ml in litres?\n0.007629706\nHow many micrometers are there in 322.7011cm?\n3227011\nHow many decades are there in 746.6968 millennia?\n74669.68\nWhat is 26/5 of a century in decades?\n52\nWhat is fifty-seven fifths of a kilometer in meters?\n11400\nHow many nanograms are there in 13/8 of a microgram?\n1625\nHow many years are there in 5/4 of a millennium?\n1250\nWhat is 13/5 of a litre in millilitres?\n2600\nWhat is 28579.46us in seconds?\n0.02857946\nConvert 72145.49 minutes to milliseconds.\n4328729400\nWhat is twenty-five quarters of a century in months?\n7500\nHow many microseconds are there in 10.96331 days?\n947229984000\nConvert 98993.32 minutes to microseconds.\n5939599200000\nWhat is 21/5 of a meter in millimeters?\n4200\nWhat is 26.626806s in minutes?\n0.4437801\nHow many milliseconds are there in 0.8103617 weeks?\n490106756.16\nWhat is seven quarters of a millennium in months?\n21000\nConvert 643.5553m to kilometers.\n0.6435553\nWhat is 0.842422 milligrams in nanograms?\n842422\nWhat is seven quarters of a centimeter in" +"3*v - 442 = -4*b + v, 0 = 5*b - 5*v - 515. Suppose 2*u = -6 - 2, 0 = -4*r - 3*u + b. List the prime factors of r.\n2, 3, 5\nSuppose -4*c + 699 = 2*r + 279, 0 = r - c - 201. List the prime factors of r.\n2, 3, 17\nSuppose 3*j - 9 = 4*j. Let f = j - -5. List the prime factors of f/3*(-48)/8.\n2\nLet w = 112 - 79. Suppose -2*d - w = -f, -d = 4*d - 15. Let l = f - 27. List the prime factors of l.\n2, 3\nSuppose 5*r - 2*y - 543 = 2*r, -5*r + 901 = -2*y. What are the prime factors of r?\n179\nSuppose -4*f = -3*f + 3. What are the prime factors of (-154)/(-3) - (-4)/f?\n2, 5\nLet m(a) = a**3 + 2*a**2 - a. Let v be m(-2). Let j be 2/((-27)/12 + v). Let c = 15 + j. What are the prime factors of c?\n7\nSuppose 0 = -4*j + 10*j - 702. List the prime factors of j.\n3, 13\nSuppose 4 = 2*l" +"hat is the highest common factor of 20 and 4555?\n5\nCalculate the highest common divisor of 538809 and 9.\n3\nWhat is the highest common factor of 447486 and 78?\n78\nCalculate the greatest common divisor of 114756 and 1332.\n12\nCalculate the greatest common factor of 18370 and 275.\n55\nWhat is the highest common factor of 143 and 27534?\n13\nCalculate the highest common factor of 52 and 117182.\n26\nCalculate the highest common divisor of 18717 and 1051455.\n1101\nWhat is the greatest common divisor of 545 and 32?\n1\nWhat is the highest common divisor of 120 and 42360?\n120\nCalculate the greatest common divisor of 7236 and 9204.\n12\nCalculate the highest common divisor of 180 and 144972.\n36\nWhat is the greatest common factor of 2077 and 62109?\n67\nCalculate the greatest common divisor of 30267 and 472.\n59\nCalculate the highest common factor of 784 and 3311.\n7\nCalculate the greatest common factor of 2797 and 1.\n1\nCalculate the greatest common factor of 167536 and 6068.\n148\nCalculate the highest common factor of 4614560 and 32.\n32\nWhat is the greatest common factor of 3540 and 20826?\n6\nWhat is the" +"er when 482 is divided by 21?\n20\nWhat is the remainder when 7641 is divided by 3798?\n45\nWhat is the remainder when 126066 is divided by 581?\n570\nWhat is the remainder when 668737 is divided by 89?\n80\nCalculate the remainder when 37583 is divided by 65.\n13\nWhat is the remainder when 1861 is divided by 113?\n53\nWhat is the remainder when 1532 is divided by 101?\n17\nCalculate the remainder when 13241 is divided by 1472.\n1465\nWhat is the remainder when 11579 is divided by 132?\n95\nCalculate the remainder when 324959 is divided by 9847.\n8\nCalculate the remainder when 3885 is divided by 3880.\n5\nWhat is the remainder when 711990 is divided by 61?\n59\nCalculate the remainder when 11640 is divided by 69.\n48\nCalculate the remainder when 300738 is divided by 426.\n408\nWhat is the remainder when 13279 is divided by 230?\n169\nWhat is the remainder when 5483 is divided by 190?\n163\nCalculate the remainder when 4226 is divided by 140.\n26\nWhat is the remainder when 1082378 is divided by 4?\n2\nWhat is the remainder when 195345 is divided by 6511?\n15\nWhat" +"\nList the prime factors of 194642.\n2, 7, 13903\nList the prime factors of 1746001.\n499, 3499\nWhat are the prime factors of 30478?\n2, 7, 311\nWhat are the prime factors of 5181490?\n2, 5, 19, 27271\nList the prime factors of 5374770.\n2, 3, 5, 97, 1847\nList the prime factors of 1689529.\n457, 3697\nWhat are the prime factors of 96205?\n5, 71, 271\nList the prime factors of 19585916.\n2, 7, 443, 1579\nList the prime factors of 476337.\n3, 83, 1913\nWhat are the prime factors of 386526?\n2, 3, 7, 9203\nList the prime factors of 214.\n2, 107\nList the prime factors of 4593001.\n7, 167, 3929\nWhat are the prime factors of 187113?\n3, 97, 643\nList the prime factors of 473039.\n7, 67577\nWhat are the prime factors of 882326?\n2, 23, 19181\nWhat are the prime factors of 2851422?\n2, 3, 7, 67891\nList the prime factors of 32407453.\n13, 71, 35111\nList the prime factors of 15107872.\n2, 13, 23, 1579\nWhat are the prime factors of 479467?\n107, 4481\nWhat are the prime factors of 6868642?\n2, 11, 312211\nWhat are the prime factors of 23221256?\n2, 2902657" +"(-30424)/15208). Suppose 11*s - 563 - b = 0. Calculate the remainder when s is divided by 9.\n8\nLet b(i) = 4*i - 1. Let q(j) = -2*j + 1. Let f(u) = -4*b(u) - 7*q(u). Let k = 99 - 94. Calculate the remainder when f(-7) is divided by k.\n1\nSuppose -7112 - 792 = -52*q. Calculate the remainder when 1148 is divided by q.\n84\nSuppose 2*k = -6*g - 17 + 373, -240 = -4*g - 4*k. What is the remainder when 257 is divided by g?\n21\nLet r = 19023 - 14420. What is the remainder when r is divided by 1533?\n4\nLet y(h) = 5*h - 50. Let b be y(6). Calculate the remainder when 143 is divided by 393/12 - (5 + 0)/b.\n11\nLet n = 469 - -449. What is the remainder when n is divided by 46?\n44\nSuppose -171*u + 9592 = 47*u. What is the remainder when 215 is divided by u?\n39\nLet q(i) = -i + 3. Let t be q(0). Suppose -t = b - 10. Let w = -5571 + 5633. Calculate the remainder when w is divided by b.\n6" +"imal places?\n-0.0000004\nWhat is -1.17929 rounded to 3 dps?\n-1.179\nWhat is 4302600 rounded to the nearest 10000?\n4300000\nRound -0.02258 to two decimal places.\n-0.02\nWhat is -0.001485 rounded to 5 dps?\n-0.00149\nWhat is -883400 rounded to the nearest 100000?\n-900000\nWhat is -18080 rounded to the nearest 10000?\n-20000\nWhat is -10371000 rounded to the nearest one hundred thousand?\n-10400000\nWhat is -1592.6 rounded to the nearest ten?\n-1590\nWhat is -0.00000363409 rounded to 7 dps?\n-0.0000036\nWhat is 351180000 rounded to the nearest 1000000?\n351000000\nRound -0.0025031 to four dps.\n-0.0025\nWhat is -0.0001087 rounded to five decimal places?\n-0.00011\nWhat is -73.04 rounded to 0 dps?\n-73\nWhat is -2.726 rounded to the nearest integer?\n-3\nRound 0.000000606 to 7 decimal places.\n0.0000006\nWhat is 382.2 rounded to the nearest one hundred?\n400\nWhat is 38376000 rounded to the nearest one million?\n38000000\nWhat is -0.00476 rounded to 3 dps?\n-0.005\nWhat is 0.00001813 rounded to six decimal places?\n0.000018\nWhat is 271.2 rounded to the nearest ten?\n270\nRound 0.00000492 to six decimal places.\n0.000005\nRound -74875 to the nearest 100.\n-74900\nWhat is -743.44 rounded to the nearest one hundred?\n-700\nWhat" +"151*h**2 - 4755*h**2.\n-65*h**2 - 8*h\nCollect the terms in 851*t**2 - 625 + 309 + 3*t + 319.\n851*t**2 + 3*t + 3\nCollect the terms in 5*t + 4*t + 3*t + 3*t - 88*t + 94*t.\n21*t\nCollect the terms in 396*w**3 - 32 - 1085*w**3 + 30 + 696*w**3.\n7*w**3 - 2\nCollect the terms in 5 + 5033*w + 12379*w - 5 - 859*w.\n16553*w\nCollect the terms in -3521 - 1911 - 260 - 31*g + 40*g - 11*g.\n-2*g - 5692\nCollect the terms in 2 - 10 - 612*r - 13 - 448*r.\n-1060*r - 21\nCollect the terms in 32*u**2 - u + 34*u**2 + 788*u**3 - 103*u**2 + 37*u**2.\n788*u**3 - u\nCollect the terms in -17021 + r + r + 3595 - r**2.\n-r**2 + 2*r - 13426\nCollect the terms in 907534533*q - 907534533*q + 3*q**2.\n3*q**2\nCollect the terms in -2245746*u**3 + 4491468*u**3 - 2245724*u**3 + 28.\n-2*u**3 + 28\nCollect the terms in 20036*h + 464*h + 8132*h.\n28632*h\nCollect the terms in -v + 2*v - 6223 + 0*v + 3995 + 2234.\nv + 6\nCollect the terms in 427 + 106*g**3 +" +"er when 3553794 is divided by 867?\n828\nWhat is the remainder when 47478 is divided by 183?\n81\nWhat is the remainder when 744525 is divided by 372124?\n277\nCalculate the remainder when 772782 is divided by 193181.\n58\nCalculate the remainder when 549785 is divided by 744.\n713\nCalculate the remainder when 43676514 is divided by 8173.\n2\nCalculate the remainder when 3533583 is divided by 1029.\n1026\nWhat is the remainder when 12217 is divided by 4826?\n2565\nCalculate the remainder when 1081077 is divided by 143.\n140\nWhat is the remainder when 38503085 is divided by 641718?\n5\nCalculate the remainder when 1103315 is divided by 19356.\n23\nWhat is the remainder when 6849985 is divided by 263?\n150\nWhat is the remainder when 7609762 is divided by 142?\n124\nCalculate the remainder when 49907 is divided by 400.\n307\nCalculate the remainder when 9162278 is divided by 538957.\n9\nCalculate the remainder when 164844319 is divided by 97.\n94\nCalculate the remainder when 17850 is divided by 8196.\n1458\nWhat is the remainder when 29798557 is divided by 40?\n37\nCalculate the remainder when 1516414 is divided by 505469.\n7\nCalculate the remainder when 13730468" +"3628, -25/3, -6\nSort 1, 16494, -3, 5 in decreasing order.\n16494, 5, 1, -3\nSort 0, 26164, 7, -2.\n-2, 0, 7, 26164\nSort 5, -385, 27, 113 in decreasing order.\n113, 27, 5, -385\nSort -0.1, -8/3, 140, 1/2.\n-8/3, -0.1, 1/2, 140\nPut -61, -5, 9, 3 in descending order.\n9, 3, -5, -61\nSort -4, 0, -7, -45 in descending order.\n0, -4, -7, -45\nSort -5/4, 5, -15, 566 in descending order.\n566, 5, -5/4, -15\nPut 0, 0.4, 116.2, 3/5 in decreasing order.\n116.2, 3/5, 0.4, 0\nSort -35, 943, 0 in ascending order.\n-35, 0, 943\nPut -2, 88, -3, 5, 3, -805 in ascending order.\n-805, -3, -2, 3, 5, 88\nPut 5, 7, 60, 2, -1, -5 in increasing order.\n-5, -1, 2, 5, 7, 60\nPut 1, 0.226, 3, -2, -0.4 in decreasing order.\n3, 1, 0.226, -0.4, -2\nPut 2/5, -64, 15, 0.5 in decreasing order.\n15, 0.5, 2/5, -64\nPut 4, 2824, 26, 5 in decreasing order.\n2824, 26, 5, 4\nPut 5848, -3, 5, 3 in descending order.\n5848, 5, 3, -3\nSort -1/6, 2/9, -0.12, 129, 0 in ascending order.\n-1/6, -0.12, 0, 2/9, 129\nPut" +"+ q*g + 4*b, 3*b + 3 = g. Suppose -8*n + g*n = 33500. Round n to the nearest 1000.\n-7000\nLet h = -281 - -781. Let d be h/((-1353)/(-450) + -3). Suppose -3*u = -0*u + d. Round u to the nearest 10000.\n-30000\nLet a = -0.1082 - -385.8082. Round a to the nearest ten.\n390\nSuppose -t - 2*p = 1223006, -5*t = -9*p + 8*p + 6114997. Round t to the nearest one hundred thousand.\n-1200000\nLet n be (-6)/(-9) + (-2194816)/(-12). Suppose -5*d = n + 102098. Round d to the nearest ten thousand.\n-60000\nLet b = 9121.9994577 + -9122. What is b rounded to 5 decimal places?\n-0.00054\nLet b = 492694786 + -220140220. Let p = -145354570 + b. Let j be (-1)/(-2) - p/(-8). What is j rounded to the nearest 1000000?\n16000000\nSuppose 0 = -42*o + 45*o + 148800000. Round o to the nearest 1000000.\n-50000000\nLet p(u) = 3*u + 8. Let n be p(-3). Let w be n + 6/2 + 33099998. Round w to the nearest 1000000.\n33000000\nSuppose 13 = t + 4*h - 3, 0 = -2*t + 2*h - 18. Let" +"52\nWhat is 75557.7 years in decades?\n7555.77\nHow many millilitres are there in 172.458 litres?\n172458\nConvert 0.415374l to millilitres.\n415.374\nWhat is fourty-two fifths of a microgram in nanograms?\n8400\nHow many months are there in five sixths of a millennium?\n10000\nWhat is 55774.2 meters in centimeters?\n5577420\nWhat is 23/3 of a year in months?\n92\nWhat is 11/2 of a milligram in micrograms?\n5500\nHow many nanometers are there in 11/2 of a micrometer?\n5500\nWhat is 8.338594 litres in millilitres?\n8338.594\nWhat is 45/4 of a litre in millilitres?\n11250\nHow many nanometers are there in 1/5 of a micrometer?\n200\nConvert 1055047.7 days to weeks.\n150721.1\nWhat is 1774.57662 seconds in days?\n0.02053908125\nWhat is thirty-one fifths of a millimeter in micrometers?\n6200\nWhat is 42437.71ml in litres?\n42.43771\nWhat is 9863.847 millennia in decades?\n986384.7\nHow many nanograms are there in 129225.5t?\n129225500000000000000\nConvert 6.66285 minutes to nanoseconds.\n399771000000\nHow many hours are there in 549274.5 microseconds?\n0.00015257625\nHow many millilitres are there in eleven halves of a litre?\n5500\nWhat is 4/3 of a millennium in months?\n16000\nHow many millilitres are there in 0.299829 litres?\n299.829\nWhat is 29/5 of" +"-10110110\nWhat is -20220 (base 3) in base 6?\n-510\nConvert 110 (base 2) to base 8.\n6\n3 (base 16) to base 12\n3\nConvert 43 (base 5) to base 4.\n113\nWhat is -400 (base 7) in base 12?\n-144\n-232 (base 8) to base 10\n-154\n-a (base 13) to base 4\n-22\nWhat is -2 (base 10) in base 8?\n-2\n-2 (base 14) to base 5\n-2\nWhat is -2 (base 7) in base 12?\n-2\n10100 (base 2) to base 11\n19\nWhat is 12 (base 3) in base 8?\n5\nConvert 9d (base 14) to base 12.\nb7\nWhat is db (base 14) in base 3?\n21011\nConvert -2 (base 14) to base 10.\n-2\n2 (base 5) to base 16\n2\n71 (base 10) to base 2\n1000111\n10 (base 9) to base 14\n9\n-32 (base 4) to base 11\n-13\nWhat is 5 (base 13) in base 5?\n10\n6 (base 11) to base 10\n6\nConvert 44 (base 5) to base 6.\n40\nWhat is 2 (base 14) in base 6?\n2\n3 (base 10) to base 3\n10\nWhat is 1 (base 12) in base 2?\n1\nConvert" +"ger?\n240\nWhat is -4.26598596 rounded to 0 dps?\n-4\nWhat is 4203060070 rounded to the nearest 100000?\n4203100000\nWhat is -0.0096980494 rounded to three dps?\n-0.01\nRound -0.001077756666 to six dps.\n-0.001078\nWhat is -0.0001706582106 rounded to 5 decimal places?\n-0.00017\nWhat is -10598134.8 rounded to the nearest one thousand?\n-10598000\nWhat is 2257327 rounded to the nearest one million?\n2000000\nRound -0.000009325400547 to seven dps.\n-0.0000093\nRound 92.8248349 to 1 dp.\n92.8\nWhat is 9056145700 rounded to the nearest 1000000?\n9056000000\nWhat is 166.128504 rounded to the nearest ten?\n170\nRound -0.00003752319549 to seven dps.\n-0.0000375\nRound 96396.941 to the nearest one hundred.\n96400\nWhat is 305.28336 rounded to the nearest ten?\n310\nWhat is -73108145 rounded to the nearest one million?\n-73000000\nWhat is 0.0239222929 rounded to 5 dps?\n0.02392\nWhat is 0.00001000063942 rounded to 6 dps?\n0.00001\nRound -2485.05482 to 0 dps.\n-2485\nWhat is -1471658.5216 rounded to the nearest 100000?\n-1500000\nRound -5743.096204 to the nearest 1000.\n-6000\nRound -1770.494319 to the nearest 100.\n-1800\nWhat is -0.001078664648 rounded to 6 decimal places?\n-0.001079\nWhat is 81.5084186 rounded to the nearest 10?\n80\nWhat is 0.000000608547897 rounded to 7 dps?\n0.0000006\nWhat is 14650.604756 rounded" +"s the remainder when 1288 is divided by 47?\n19\nCalculate the remainder when 75 is divided by 27.\n21\nCalculate the remainder when 3762 is divided by 53.\n52\nWhat is the remainder when 554 is divided by 20?\n14\nCalculate the remainder when 21 is divided by 8.\n5\nWhat is the remainder when 3954 is divided by 23?\n21\nCalculate the remainder when 13085 is divided by 22.\n17\nCalculate the remainder when 13 is divided by 4.\n1\nWhat is the remainder when 319 is divided by 46?\n43\nWhat is the remainder when 719 is divided by 79?\n8\nCalculate the remainder when 2725 is divided by 180.\n25\nCalculate the remainder when 100 is divided by 22.\n12\nCalculate the remainder when 53 is divided by 21.\n11\nCalculate the remainder when 106 is divided by 13.\n2\nCalculate the remainder when 55 is divided by 35.\n20\nCalculate the remainder when 120 is divided by 10.\n0\nWhat is the remainder when 502 is divided by 245?\n12\nWhat is the remainder when 12055 is divided by 88?\n87\nCalculate the remainder when 320 is divided by 55.\n45\nCalculate the remainder when" +" What is the tens digit of m?\n0\nLet d be 6/(-18)*(3/1 + -48). Let h be -154*(-1 + 2*d/(-12)). Suppose a - 105 = -v, 4*v - 4*a - h = -143. What is the hundreds digit of v?\n1\nLet w = 17998 - 619. What is the units digit of w?\n9\nLet k(z) = -z**3 + 32*z**2 - 4*z - 30. Let m be k(27). Suppose -4*b + b = -m. What is the units digit of b?\n9\nSuppose 7*i = 2*i + 5. Let n be i/3*9 - (-2)/2. Suppose 4 = -n*u + 20. What is the units digit of u?\n4\nLet p = 44 - 42. Let w be ((-18)/3 + p)*(-3)/4. Suppose 0 = -5*s - 2*z + 14 - 1, -w*z = s. What is the units digit of s?\n3\nWhat is the thousands digit of (68 - (-1 - 10))*467 - 5?\n6\nLet o(m) = -m**3 + 19*m**2 - 45*m + 189. Let p be o(17). Let w = 2 + -2. Suppose -2*z - 138 = -p*c, -z + w = 3. What is the units digit of c?\n6\nSuppose -12*f + 56 =" +"for v.\n-8\nSolve 3022*f = -303*f - 4504 + 52381 + 141648 for f.\n57\nSolve -1211*t + 95464 = -26783 + 13257 for t.\n90\nSolve -167931*t + 167875*t = -784 for t.\n14\nSolve -200031*j + 199982*j = -392 for j.\n8\nSolve -2565*u + 2531*u - 1462 = 0 for u.\n-43\nSolve 1405*n - 3671*n - 41500 = 31012 for n.\n-32\nSolve 0 = 296*o - 1246*o + 2755 + 6745 for o.\n10\nSolve 301*z - 7642 = 7709 for z.\n51\nSolve -200616 = 1212*n - 3784*n for n.\n78\nSolve 40*w + 1330 - 1894 = 87*w for w.\n-12\nSolve -1150*a + 9746 + 14563 = -26803 - 30538 for a.\n71\nSolve -1548*u = 447*u + 247*u for u.\n0\nSolve -210*o - 343*o = 56*o + 53*o - 3972 for o.\n6\nSolve 236214 = 23952*r - 184061 - 561757 for r.\n41\nSolve -4285*z + 1577 = -4348*z - 1825 for z.\n-54\nSolve -632268*z - 4900 = -632128*z for z.\n-35\nSolve 144266 = -4621*d - 117225 - 89798 + 46303 for d.\n-66\nSolve 8661*m + 71898 - 491094 - 550836 = 0 for m." +"e nearest to -5 in -4, s, 4?\n-4\nLet d = -1.7 + 10.2. Let k = 8.1 + 0.9. Let b = d - k. What is the closest to 0 in 2/7, -1/3, b?\n2/7\nLet q = 0.39 + -0.59. Let u = 10 - 10.4. What is the nearest to -2 in q, 2/3, u?\nu\nLet m = -1.8 - 2.2. Let a(n) = -3 + 2*n**2 + 13*n + 0*n + 0*n - n. Let k be a(-6). What is the nearest to 0 in m, 1/12, k?\n1/12\nSuppose 0 = t - 2*s - 4, 4*t = 3*t + s + 2. Which is the nearest to -1/3? (a) t (b) -1/10 (c) 0.25 (d) 1/5\nb\nLet i = -638.2 - -638. Let u = 1 + -1. Which is the closest to -0.2? (a) 6/5 (b) u (c) i\nc\nLet u = -19 + 31. Let x = -47/4 + u. Which is the nearest to 1? (a) x (b) -0.4 (c) -0.2\na\nLet t(w) = w**2 + 62*w + 230. Let h be t(-58). Which is the nearest to h? (a) 5 (b) 3 (c) 0" +"is the remainder when 312027 is divided by 30?\n27\nWhat is the remainder when 235825 is divided by 1604?\n37\nCalculate the remainder when 19044 is divided by 4761.\n0\nWhat is the remainder when 21816 is divided by 204?\n192\nWhat is the remainder when 280637 is divided by 23?\n14\nCalculate the remainder when 153856 is divided by 53.\n50\nCalculate the remainder when 1295 is divided by 420.\n35\nCalculate the remainder when 28886 is divided by 233.\n227\nCalculate the remainder when 11764 is divided by 818.\n312\nCalculate the remainder when 1627 is divided by 77.\n10\nWhat is the remainder when 7522 is divided by 146?\n76\nWhat is the remainder when 321701 is divided by 12868?\n1\nCalculate the remainder when 13743 is divided by 2969.\n1867\nCalculate the remainder when 76718 is divided by 28.\n26\nWhat is the remainder when 9013 is divided by 2252?\n5\nCalculate the remainder when 5405 is divided by 17.\n16\nWhat is the remainder when 3998 is divided by 996?\n14\nCalculate the remainder when 59023 is divided by 47.\n38\nWhat is the remainder when 447848 is divided by 325?\n323\nWhat is" +"mainder when d is divided by 6?\n3\nLet d = -7088 - -7633. What is the remainder when d is divided by 15?\n5\nSuppose 137203 + 27497 = 85*d + 32440. Calculate the remainder when d is divided by 19.\n17\nSuppose 0 = -5*i + p + 6381 - 1759, 0 = -4*i + 3*p + 3713. Calculate the remainder when i is divided by 14.\n13\nLet c = 16996 - 16703. What is the remainder when c is divided by 7?\n6\nLet a = -547 + 768. Let x = a - 198. Let b = 28 - -109. What is the remainder when b is divided by x?\n22\nLet r be 1 - (3/6)/(2/(-4)). Let f be 0 - 2*9/r. What is the remainder when (3 - f/(-6))*140/6 is divided by 19?\n16\nLet o(a) = -1189*a - 861. Calculate the remainder when o(-2) is divided by 80.\n77\nCalculate the remainder when 834 is divided by (-144)/(-7) + 110/77*(-42)/(-140).\n15\nLet r(k) = 2*k**3 + 9*k**2 + 8*k + 25. Let o be r(-4). Suppose 3*u + 4*d = o*d + 475, u - 5*d = 145. What is the remainder" +"er when 7743426 is divided by 151830.\n96\nCalculate the remainder when 15413 is divided by 657.\n302\nWhat is the remainder when 2284951 is divided by 26569?\n17\nCalculate the remainder when 5220462 is divided by 685.\n77\nWhat is the remainder when 33460 is divided by 1849?\n178\nWhat is the remainder when 77330 is divided by 8202?\n3512\nWhat is the remainder when 49813328 is divided by 87?\n86\nCalculate the remainder when 126890 is divided by 7929.\n26\nWhat is the remainder when 89844 is divided by 21829?\n2528\nWhat is the remainder when 317237 is divided by 2224?\n1429\nCalculate the remainder when 37060 is divided by 11412.\n2824\nWhat is the remainder when 51986 is divided by 25975?\n36\nWhat is the remainder when 7332586 is divided by 17972?\n10\nCalculate the remainder when 3064 is divided by 1018.\n10\nCalculate the remainder when 89864 is divided by 9971.\n125\nWhat is the remainder when 3972 is divided by 3270?\n702\nWhat is the remainder when 17813253 is divided by 14?\n3\nCalculate the remainder when 1438546 is divided by 84618.\n40\nWhat is the remainder when 186378 is divided by 2537?\n1177\nCalculate" +"- 28. Calculate the remainder when (12/(-18))/(g/402) is divided by 35.\n32\nSuppose 5*o = -2*q + 311, -3*q - 216*o = -208*o - 469. Let a(l) = -l**2 + l + 50. Calculate the remainder when q is divided by a(0).\n43\nLet a = 529 + -527. Suppose -a*i + 5*h = -300, -h + 6 = 2. What is the remainder when i is divided by 23?\n22\nWhat is the remainder when 957 is divided by (8 + (-312)/36)*-87?\n29\nLet f be 9024/(-64)*1*(-1)/3. Let j = 305 - f. Calculate the remainder when j is divided by 69.\n51\nSuppose 16*b - 10095 = 11*b - 4*x, 0 = -4*b + 5*x + 8035. Calculate the remainder when b is divided by 12.\n11\nLet i(u) = 3*u + 43. Let h be i(-13). Suppose 0 = -2*q - 5*v + 16, 2*v - h = 3*v. What is the remainder when 52 is divided by q?\n16\nLet r(v) = -v**3 - 14*v**2 + 9*v + 27. Let g be r(-7). Let x = g - -427. What is the remainder when 154 is divided by x?\n10\nSuppose 2*j - 2 = 2*g," +"1 (b) d (c) 1/10\nc\nLet s = -3010437/572 + 5263. Let j = s - 2281/4004. Let h = 2.9 + -3. What is the closest to h in 0.1, -4, j?\n0.1\nLet k = 3933 - 3933. What is the closest to k in -3/4, -15, -1, 0.1?\n0.1\nLet i(l) = -5*l**2 + 11*l + 75. Let n be i(5). What is the nearest to 13 in -1.7, n, -2, -1/6?\nn\nLet y = -2385 + 2388. Which is the closest to -0.73? (a) -1/3 (b) 0.3 (c) y\na\nLet m = 25151 + -578475/23. Which is the nearest to 4? (a) -2/13 (b) m (c) 1/4 (d) 3/28\nc\nSuppose -7*j - 3 = 39. Let w be (j/16)/((-60)/(-40)). Which is the closest to 3? (a) 1/23 (b) -4 (c) w\na\nLet t be 251/((-483)/(-24) - (-6)/(-48)). Let l = t - 107/4. Let d = l + 223/15. Which is the nearest to d? (a) 0.5 (b) -3 (c) 0\na\nLet v = 8.919 + -8.849. What is the nearest to 40 in 2/3, 4, v?\n4\nLet f = -163.1 - -163. Let y = -8.6 + 7." +". What is l rounded to the nearest 10000?\n-20000\nLet j = 46 + -42. Suppose -j*w = w - 10. Suppose -5*n + 5*u = 9250020, 16 = 6*u - w*u. Round n to the nearest one hundred thousand.\n-1900000\nSuppose 10*f + 115560 + 214860 = 0. Let z = -52692 - f. What is z rounded to the nearest one thousand?\n-20000\nLet f = -19351847.7602017 - -19351844. Let o = -3.76 - f. What is o rounded to five dps?\n0.0002\nLet z = 953183.333 + -953883. Let c = 700 + z. Let j = c - 0.3139. Round j to three decimal places.\n0.019\nSuppose 772605 = -7*o + 2107239. Suppose -o = -m - 1830662. Round m to the nearest one hundred thousand.\n-1600000\nLet i = 28457.54 + -27255. Let y = i - 1218. What is y rounded to the nearest integer?\n-15\nLet x = 58.5 - 69. Let z = 57.5 + x. Let n = 47.014 - z. What is n rounded to three decimal places?\n0.014\nLet n = -2171.56 + 2211. Let b = 39 - n. Let o = b + 0.4219. What is" +"(-6). Let t = 1/48 - k. Let y = -41/2 + 19. Sort t, 2, y in increasing order.\ny, t, 2\nSuppose 0*z - 16 = -4*z. Suppose -3*k + 4 = 4*i, 3*i = -0*i + 4*k + 3. Suppose 0 = -10*d + 46 - 86. Put z, d, i in descending order.\nz, i, d\nLet l be 0 + -2 - (-3)/1. Suppose -5*x = -0*x. Sort -5, x, l in descending order.\nl, x, -5\nLet g = -392669/91 + 4315. Let c = -30/91 - g. Sort -4, 2/7, c in ascending order.\n-4, c, 2/7\nLet k = 10 + -19. Let x = -8 - k. Put 4, 2, x in increasing order.\nx, 2, 4\nLet n(i) = 3*i**2 - 18*i + 2. Let v be n(6). Sort v, 8, 4 in decreasing order.\n8, 4, v\nLet q(p) = -2*p - 7. Let k be q(-6). Suppose 3*c + 4 = k*c. Suppose r - 1 = c*r. Sort 0, r, -4.\n-4, r, 0\nLet p = -90 - -89.5. Sort -5, 0.16, p in descending order.\n0.16, p, -5\nSuppose -2*r + 4 = -0*r. Let" +"2. Suppose -3*h + 1 = 4*u - 9, -3*u + 13 = 5*h. Is v(h) composite?\nTrue\nLet y = 5161 - 3012. Is y a prime number?\nFalse\nLet v(w) = -w**3 - 2*w**2 + w. Let j be v(-3). Let q be 38/j + 12/18. Is (-2)/7 - (-247)/q a composite number?\nTrue\nLet t(z) = 2*z - 1. Let o be t(2). Suppose 0*p - 3*p + 9 = 0, o*x + 4*p - 18 = 0. Suppose 4*n + 3*j - x*j - 57 = 0, 0 = 5*n + 5*j - 60. Is n a prime number?\nFalse\nSuppose -5*u + 5549 = 2*x, 2*x + 5*u - 5529 = 4*u. Is x composite?\nTrue\nLet d(y) = -9*y - 35. Is d(-10) prime?\nFalse\nLet c(q) = q**3 - 11*q**2 + 2*q - 9. Is c(11) prime?\nTrue\nIs 5677/9 + 55/45 + -1 a prime number?\nTrue\nSuppose 2*i + 2*i + 6 = 5*g, -3*g = -2*i - 4. Let b be (6/(-2))/(1/(-35)). Suppose -c - g*c = -b. Is c a composite number?\nTrue\nSuppose -5*o + 25 = -5*y, -o - 2*y = 3*o - 20. Let u be" +"7?\n366\nWhat is next in -7, 3, 23, 59, 117, 203, 323?\n483\nWhat comes next: -21, -36, -85, -186, -357, -616, -981?\n-1470\nWhat is the next term in -86, -158, -326, -638, -1142, -1886, -2918?\n-4286\nWhat is next in 24, 37, 64, 111, 184?\n289\nWhat is next in -53, -85, -115, -143, -169, -193?\n-215\nWhat is next in -518, -2070, -4656, -8276?\n-12930\nWhat is the next term in -17479, -17478, -17477?\n-17476\nWhat is next in -7, -30, -71, -136, -231, -362, -535, -756?\n-1031\nWhat is next in 479, 473, 463, 449, 431, 409?\n383\nWhat comes next: -8, -33, -76, -137, -216, -313, -428?\n-561\nWhat is next in -7784, -7788, -7794, -7802?\n-7812\nWhat is the next term in 122, 134, 158, 200, 266?\n362\nWhat is the next term in 7, 24, 53, 94, 147, 212, 289?\n378\nWhat is the next term in -39, -42, -49, -60, -75, -94?\n-117\nWhat is next in 111, 117, 135, 171, 231, 321, 447, 615?\n831\nWhat is next in 0, -60, -218, -522, -1020, -1760, -2790?\n-4158\nWhat is the next term in 66428, 66427, 66426?\n66425\nWhat is next" +"uppose -3*b = 4*b - 7. Suppose -29 = -6*j + b. Suppose 2*t - y - 10 = -4*y, 30 = 5*t + j*y. Solve t*p = 4*p + 20 for p.\n5\nLet i = 23 + -18. Solve -i*n = -9*n for n.\n0\nSuppose -q + 21 = -4*z, -4*q - 5*z = -0*z. Suppose q*d - 6 = 19. Solve -d*b + 20 = -0*b for b.\n4\nSuppose -31 + 9 = -5*j - 2*k, 9 = 3*j - 3*k. Let d be (-83)/(-7) - j/(-28). Solve d = 3*p - 0 for p.\n4\nSuppose 0 = -5*g - 3*n + 83, 10*g - 62 = 6*g + 2*n. Solve g = -s + 17 for s.\n1\nLet d = -48 + 52. Solve d*c = -12 - 0 for c.\n-3\nLet h(g) = -g**2 + 3*g + 3. Let l be h(-4). Let n = 0 - 13. Let u = n - l. Solve -r = 3*r + u for r.\n-3\nSuppose 2*t = m - 14, -88*m + 31 = -84*m - 3*t. Solve m*x - 2*x - 8 = 0 for x.\n4\nLet t(o) be" +"1\nIs -1/9 equal to -1?\nFalse\nIs 14074 greater than 14074?\nFalse\nWhich is smaller: 34 or 8?\n8\nIs -0.1 at most -0.1?\nTrue\nIs -1 at least 2/37809?\nFalse\nAre 1 and -7/73 non-equal?\nTrue\nIs 1594 <= 1595?\nTrue\nIs -9 < -7?\nTrue\nIs -9/10060 bigger than -1?\nTrue\nWhich is smaller: 0.299 or 1/4?\n1/4\nWhich is smaller: 95/4 or 25?\n95/4\nWhich is bigger: 0.144 or 67?\n67\nWhich is bigger: 1 or -28.9?\n1\nWhich is smaller: 205 or -5?\n-5\nWhich is greater: 27 or 107/4?\n27\nIs -740/27 equal to -28?\nFalse\nWhich is smaller: 5466/7 or 780?\n780\nWhich is smaller: -4/15 or -23?\n-23\nWhich is smaller: -74 or -147?\n-147\nIs -2/5 greater than or equal to -2666/3?\nTrue\nIs 12/143 > 0?\nTrue\nWhich is greater: 25 or 16?\n25\nWhich is bigger: -83 or -82?\n-82\nIs -0.0401 >= -0.3?\nTrue\nIs -2/11 <= -118/13?\nFalse\nWhich is greater: -72/25 or 0?\n0\nWhich is smaller: 9373 or 9374?\n9373\nIs 1 not equal to -23/523?\nTrue\nIs -1/592 bigger than 0.1?\nFalse\nIs -66 smaller than -86?\nFalse\nWhich is bigger: -19/5 or 6?" +"Let n be x(5). Suppose t = -n*t + 75. Is t a multiple of 5?\nTrue\nLet r(d) = -d**2 - 34*d - 11. Does 12 divide r(-24)?\nFalse\nLet p = -376 + 541. Is p a multiple of 3?\nTrue\nLet x be (-196)/(-10) + 2/5. Suppose -2*y - 4*t + 8 = t, 0 = -5*y + t + x. Is y a multiple of 4?\nTrue\nSuppose q - k - 6 = 2*q, -5*q + 2*k = 58. Let s be 1/(25/q + 3). Does 16 divide ((-1)/s)/((-2)/128)?\nTrue\nLet t = -23 + 22. Is t/5 + 722/10 a multiple of 20?\nFalse\nLet h(w) = w + 18. Suppose -3*u = 3*m - 33, 0*m - 59 = -4*u + m. Let l = 14 - u. Does 9 divide h(l)?\nTrue\nLet a be (-1524)/14 - (-1)/(-7). Let g be (a - -20)/(-1 + 0). Suppose -4*w + g = -115. Is 17 a factor of w?\nTrue\nDoes 19 divide (-1 - 1)/1 - (-75 - 155)?\nTrue\nLet w(j) = j**2 + j - 1. Let b(l) = -2*l**2 - 12*l + 6. Let i(c) = -b(c) - 3*w(c)." +" three dps.\n0.003\nLet t = 47 - 46.565. Let j = 58 - 58.025. Let v = j - t. What is v rounded to 1 decimal place?\n-0.5\nLet u = 46.3 - 46.299999659. What is u rounded to 7 decimal places?\n0.0000003\nLet v = 3.01 - 6.9. Let i = 4 + v. Let s = i + -0.038. What is s rounded to 2 dps?\n0.07\nLet d = -3.1999496 + 3.2. Round d to 5 decimal places.\n0.00005\nLet a = 21 - 16. Let b be (-12399)/(-2) + a/10. Round b to the nearest one thousand.\n6000\nLet b be 3/(-4) + 231350/200. What is b rounded to the nearest 10?\n1160\nLet q = -992127 + 6578127. Round q to the nearest one million.\n6000000\nLet v(w) = -w**3 + 23*w**2 - 25*w + 3. Let n be v(18). Suppose 5*q - n = -o, 1161 = 5*q - 5*o + 2*o. What is q rounded to the nearest ten?\n230\nLet x = -112.9975 - -93.023. Let c = -0.9 + -19.1. Let o = c - x. What is o rounded to three dps?\n-0.026\nLet f = -0.0080905 -" +", 461, 1229\nWhat are the prime factors of 100578488?\n2, 12572311\nWhat are the prime factors of 12350992?\n2, 771937\nWhat are the prime factors of 129547566?\n2, 3, 2399029\nList the prime factors of 133135779.\n3, 7, 383, 16553\nList the prime factors of 4600884841.\n7, 59, 67, 23753\nList the prime factors of 4771990794.\n2, 3, 293, 2714443\nList the prime factors of 1433458665.\n3, 5, 239, 133283\nList the prime factors of 506581894.\n2, 7, 13, 73, 419\nList the prime factors of 318208530.\n2, 3, 5, 137, 139, 557\nWhat are the prime factors of 1533130282?\n2, 766565141\nList the prime factors of 30093956.\n2, 353, 21313\nWhat are the prime factors of 2212123995?\n3, 5, 37, 1328603\nWhat are the prime factors of 518939762?\n2, 11, 23588171\nList the prime factors of 51178173.\n3, 2179, 7829\nList the prime factors of 36476622.\n2, 3, 7, 13, 571\nList the prime factors of 2401706551.\n2401706551\nWhat are the prime factors of 10655221?\n331, 32191\nList the prime factors of 9918743.\n9918743\nWhat are the prime factors of 406267821?\n3, 45140869\nWhat are the prime factors of 8155454?\n2, 479, 8513\nList the prime factors of" +"east p?\nFalse\nLet z(i) = 2*i**3 + 70*i**2 + 132*i + 5. Let s be z(-33). Let b = 182/5 - 309/10. Which is bigger: b or s?\nb\nLet r = 14 + -10. Let y be (-9)/6*20/(-30)*-20. Is r equal to y?\nFalse\nLet i(k) = -3 + 2*k - 2*k + 0*k - k. Let q be i(-6). Suppose 2*l - q*l = -y - 5, 0 = 2*y + l + 1. Are 1 and y unequal?\nTrue\nLet u(v) = -8*v - 1. Let q be u(-1). Suppose q*g - 630 = 4*g. Let b be 4/14 + 234/g. Which is greater: 0 or b?\nb\nSuppose 10*k = 336 + 434. Is 77 at most k?\nTrue\nLet u(n) = 2*n**2 - n + 3. Let z be u(0). Let v be (4/(-6))/(z/(-27)). Let g be (v/11)/3 + 0. Which is smaller: g or 0?\n0\nLet s = -10 + 9.2. Let g = -1.3 - s. Let q = -0.6 - g. Which is bigger: q or -10?\nq\nLet q = 1440 - 1440.719. Let x = -0.019 - q. Let a = 50/13 + -289/65. Is x smaller than" +" Which is the closest to 0? (a) 0 (b) s (c) 15\na\nLet g = 0.02 + 0.28. Let k = -1.5 + 2. Let m = g - k. What is the closest to 0.1 in -3/5, -2/5, m?\nm\nLet t = 5.01 + -0.01. Let x = 8 - t. Let a = 0 - 0.4. What is the closest to 1 in 3/7, x, a?\n3/7\nSuppose -o + 3 = -3*h + 9, -2*o = 3*h + 3. What is the nearest to -2 in o, -0.02, 3/2?\no\nLet w = -14/11 - -232/165. Let z = -7.06 - -0.06. Let l = z + 5. What is the closest to -1 in w, 1/5, l?\nl\nLet o = -12 + 17. Let x be (-2)/o + 0/5. Let w = -0.1 + 0.3. Which is the nearest to w? (a) x (b) -5 (c) -1\na\nLet f = -148 - -157. What is the nearest to -2/7 in -3, 4/3, f?\n4/3\nLet m = 0 - 4. Let l = 0.03 - -0.97. Which is the nearest to 1? (a) l (b) -1/11 (c) m\na\nLet z =" +" 6?\n30\nFind the common denominator of 1393/(-1232) - -6 - 4/22 and 101/132.\n528\nLet f = 5/197083 + -21103281/607015640. Find the common denominator of 93/22 and f.\n3080\nLet y = 2977/63237416 - -3/22682. Let v = -122685/72488 + y. Calculate the common denominator of v and (-15)/(-10)*(-92)/(-42).\n91\nSuppose 0 = 2*p - 3*p + 42. Let k = -38 + p. Calculate the least common multiple of 11 and k.\n44\nLet n be (-711693)/18*1/9. Suppose 0 = -w - 1, 3*j + 4*w - 21836 = -2*j. Let v = n + j. Find the common denominator of -26/3 and v.\n6\nSuppose -684 = 7*l - 992. Calculate the smallest common multiple of l and 16.\n176\nSuppose 4*c + t + 23 - 83 = 0, -3*t = -4*c + 44. Suppose -w = -0*w - c. Let j = 306 - 302. Calculate the lowest common multiple of j and w.\n28\nLet i = -527 - -815. What is the smallest common multiple of 6 and i?\n288\nSuppose 45*d - 306 = 11*d. Calculate the smallest common multiple of 101 and d.\n909\nLet t(v) = v**3 + 19*v**2 -" +"7a + -b8?\nceb2\nIn base 8, what is -2032 - 3532?\n-5564\nIn base 4, what is 112210022 + -323221?\n111220201\nIn base 7, what is -24652164541 + -5?\n-24652164546\nIn base 13, what is -62793 + -2a?\n-627c0\nIn base 9, what is -31 - 184454?\n-184485\nIn base 7, what is 25623631314 - -1?\n25623631315\nIn base 3, what is 122001110002 - 10110120?\n121220222112\nIn base 15, what is 7be9 - 45?\n7ba4\nIn base 8, what is 45220 - -537?\n45757\nIn base 5, what is -21433110313 - -20?\n-21433110243\nIn base 2, what is 1111111000000011000010 - -10000?\n1111111000000011010010\nIn base 3, what is 211202012212020222 + 2?\n211202012212021001\nIn base 15, what is -291b + d40c?\na9e1\nIn base 14, what is -9 - 4c03cd1?\n-4c03cda\nIn base 14, what is 11 + -124c86a?\n-124c859\nIn base 2, what is 1 - 110110001001111110010101100?\n-110110001001111110010101011\nIn base 8, what is -550 - 12165662?\n-12166432\nIn base 16, what is -130 - -2984?\n2854\nIn base 14, what is 2bc0674 + b?\n2bc0681\nIn base 2, what is -100 + -10000010111000011010000?\n-10000010111000011010100\nIn base 15, what is 4ab125 + -1b?\n4ab109\nIn base 14, what is -91188c -" +" k = -2 - -1. Let f = -2.1 - 2. Let r = f - -0.1. Which is the closest to k? (a) -0.5 (b) 0.8 (c) r\na\nLet q = -37 - -23. Let r be ((-35)/q)/(-1)*(-4)/25. What is the nearest to r in 1, -4, -0.1?\n-0.1\nLet h(m) = 2*m - 4. Let p be h(12). Let s = 62/3 - p. Which is the closest to s? (a) -0.5 (b) -2 (c) -1/8\nc\nSuppose 3*s = 2 + 4. Let d = -4.8 + 5. Let y = -0.4 + d. What is the nearest to y in s, 1/3, -0.3?\n-0.3\nLet u = -16.9 + 0.9. Let k = u - -7. Let i = -0.86 - 0.14. Which is the nearest to i? (a) 4 (b) -2/7 (c) k\nb\nLet g = 48/5 - 42/5. Let v = 118.5 + -118.6. What is the closest to v in g, -1/7, 1?\n-1/7\nLet m be ((-22)/(-14) - 2)/((-14)/(-49)). What is the nearest to 1/4 in -2/29, m, -0.4?\n-2/29\nLet a = -4859/4 - -1214. What is the nearest to -0.2 in 1.2, a, -5, 1?\na\nSuppose -4*w" +"54*f = -65001 - 114767 for f.\n-92\nSolve -258*h = 138*h + 10296 for h.\n-26\nSolve 1475*d + 6836 + 10360 = -327 + 2773 for d.\n-10\nSolve -3033 = -149*p + 6205 for p.\n62\nSolve 33*j + 10*j - 2524656 + 2522162 = 0 for j.\n58\nSolve 2459 - 54 = -65*w for w.\n-37\nSolve -2189*q + 504 = -41421 - 1855 for q.\n20\nSolve 181970 = -3877*o + 165341 + 462484 for o.\n115\nSolve 19*r + 29*r = 34*r + 179 - 11 for r.\n12\nSolve 4287*h + 30855 + 52017 = 834*h for h.\n-24\nSolve -412856 = 30*p - 413396 for p.\n18\nSolve 558*l - 139*l - 587*l - 339*l - 18252 = 0 for l.\n-36\nSolve 1425*m + 4202 + 11022 = 41*m for m.\n-11\nSolve 824*k = -740*k + 326*k - 325*k + 3126 for k.\n2\nSolve -153*b = 652*b + 240*b - 24140 - 10345 for b.\n33\nSolve -198*r - 1158*r + 30502 = -271*r - 9643 for r.\n37\nSolve 6549*x + 1292*x = 556711 for x.\n71\nSolve 0 = 221*g - 411*g + 7030 for g." +"*o = -352. Does 16 divide o?\nTrue\nSuppose 0 = 2*b - 3 - 11. Suppose -b*i - 81 = -8*i. Is 26 a factor of i?\nFalse\nLet y be 3 + (-3)/2*2. Suppose 4*q - 4 = 0, 21 - 4 = 4*b - 3*q. Suppose y*w - 170 = -b*w. Is w a multiple of 10?\nFalse\nSuppose -52 = -3*t + 26. Is t a multiple of 13?\nTrue\nLet j(z) = 249*z - 187. Is j(3) a multiple of 20?\nTrue\nSuppose 0 = -3*c - 2*h + 3*h + 7, 0 = 5*c + 5*h - 5. Suppose 1448 = -j + 296. Is c/(-7) + j/(-14) a multiple of 15?\nFalse\nSuppose -5*f - 16 = -f. Let i = f - 3. Let l = -3 - i. Is l even?\nTrue\nLet h be 147/(-28) + 2/8. Let o(c) = -12*c - 5. Does 11 divide o(h)?\nTrue\nLet a be (-4)/18 - 1000/36. Let l = a - -49. Suppose f - l = 2*x, -8 = 3*f + 2*x - 47. Is f a multiple of 11?\nFalse\nSuppose 5*c - 2*c = -18. Is (3/(-1))/c*10 a multiple" +"095711?\n9\nWhat is the thousands digit of 28107175?\n7\nWhat is the ten thousands digit of 1005261623?\n6\nWhat is the hundred thousands digit of 75040854?\n0\nWhat is the tens digit of 157957816?\n1\nWhat is the tens digit of 52352084?\n8\nWhat is the ten thousands digit of 4624616947?\n1\nWhat is the hundreds digit of 262481437?\n4\nWhat is the thousands digit of 207572338?\n2\nWhat is the millions digit of 239446841?\n9\nWhat is the hundreds digit of 4993202434?\n4\nWhat is the millions digit of 10868282?\n0\nWhat is the ten thousands digit of 5807681?\n0\nWhat is the millions digit of 309420684?\n9\nWhat is the hundred millions digit of 847135727?\n8\nWhat is the ten thousands digit of 117640057?\n4\nWhat is the hundreds digit of 1276188?\n1\nWhat is the ten thousands digit of 6071411?\n7\nWhat is the millions digit of 939772875?\n9\nWhat is the ten millions digit of 177779232?\n7\nWhat is the millions digit of 445412475?\n5\nWhat is the tens digit of 588857722?\n2\nWhat is the millions digit of 4616183062?\n6\nWhat is the hundreds digit of 504428801?\n8\nWhat is the hundreds digit of" +"2 + c + (-9)/4. Which is bigger: b or r?\nb\nLet q = -28.92 + 28. Let p = -0.08 + q. Is p <= 2/11?\nTrue\nLet g be (-56)/20*1*5. Let l = 16 + g. Is l bigger than 3/5?\nTrue\nLet i = 2/485 + -493/1940. Let s = 0.1 + 0. Let a = -0.9 - s. Which is smaller: i or a?\na\nLet j = 103 + -722/7. Let h be (-4)/3*(-3)/2. Suppose -h*c = -3*f + 2 - 12, 3*c + 4*f + 19 = 0. Which is smaller: c or j?\nc\nLet z be ((-16)/(-10))/((-2)/(-5)). Let o = -13/3 + z. Suppose -f + 0 = -x + 1, 0 = -3*x - 5*f - 5. Do o and x have different values?\nTrue\nLet u = 0.5 - 0.5. Which is greater: u or -15?\nu\nLet n be ((-3)/(-9) - 0)*9. Suppose -5*f - 3*y + 1 = -0*y, -n*f = 2*y. Which is bigger: 4/5 or f?\nf\nSuppose 2*z + 0*p = -2*p + 10, -2*p = -2*z + 30. Let k be (-158)/(-14) + (-4)/14. Which is greater: z or k?\nk\nSuppose -12" +" d be (4/16)/(12/(-48)). Put d, -9, 1 in descending order.\n1, d, -9\nLet a = -6.4 + 6.313. Let j = a + -0.113. Put -2, j, 3 in descending order.\n3, j, -2\nLet l = 1.2 + 0.7. Let q = l + -1.9. Put 1/3, 0.5, q in decreasing order.\n0.5, 1/3, q\nSuppose -399 + 347 = 13*w. Suppose 0 = -4*o - 3 - 1. Put o, w, 5 in increasing order.\nw, o, 5\nLet u be -1 - (-4 + (-5)/(4 + -9)). Suppose -5*w + 4*z = -17, 2*w + 3*w - 5*z = 15. Suppose x = w*x + 8. Sort 3, u, x in descending order.\n3, u, x\nLet q = 9.78 - 9.98. Sort -5, q, -107 in increasing order.\n-107, -5, q\nSuppose -d + 20 = -6*d. Suppose 27 = 123*q - 114*q. Sort 0, 1, d, q.\nd, 0, 1, q\nLet x = -0.9 - -8.9. Let t = 7 - x. Let u = 16 - 15. Sort t, u, -4 in descending order.\nu, t, -4\nLet a = -2127.97 + 2128. Put a, 1/4, -0.08 in descending order.\n1/4, a," +"+ -8 + 2?\n13\nEvaluate (-3 - (-9 - -1)) + (8 - 31).\n-18\nCalculate (-2 - (-1 + -1)) + -3 - (0 + -4).\n1\nEvaluate 20 + (25 - 69) + 43.\n19\nEvaluate 7 + -21 + 10 + 0 + 3.\n-1\nWhat is -6 - (16 - (0 + 11))?\n-11\nWhat is the value of 28 + -15 - (1 - (2 - 42))?\n-28\n7 + (6 - (-5 + -3 - (-8 + 1)))\n14\nWhat is -3 - (-3 - 20 - -8)?\n12\nCalculate -8 + (-15 - -5) - (5 - 3).\n-20\nWhat is (1 - -12) + 14 + (-8 - 2) + -12?\n5\nCalculate -6 + 1 + 1 + (-38 - -31) + 15.\n4\nWhat is (-9 - (-4 - 5) - -6) + -32 + 6?\n-20\nCalculate -17 - (-29 + -1 - -13) - -6.\n6\n-11 - 6 - (-17 + -4)\n4\nWhat is 9 - (7 + 4 + -9 + -3)?\n10\nWhat is -35 + 31 + (9 - (0 - 3))?\n8\n5 + -2 + -107 + 109\n5\nCalculate" +"e remainder when 15799345 is divided by 112.\n65\nWhat is the remainder when 12568629 is divided by 8135?\n54\nCalculate the remainder when 1163782 is divided by 581884.\n14\nWhat is the remainder when 7270422 is divided by 4718?\n4702\nWhat is the remainder when 15524956 is divided by 156?\n148\nWhat is the remainder when 23696895 is divided by 7898961?\n12\nCalculate the remainder when 36373998 is divided by 18186995.\n8\nCalculate the remainder when 1574304 is divided by 79.\n71\nCalculate the remainder when 9801 is divided by 4804.\n193\nWhat is the remainder when 5560607 is divided by 110?\n107\nWhat is the remainder when 18080 is divided by 1117?\n208\nWhat is the remainder when 583923 is divided by 662?\n39\nCalculate the remainder when 46374501 is divided by 88.\n85\nWhat is the remainder when 573434 is divided by 204?\n194\nWhat is the remainder when 6341281 is divided by 98?\n93\nWhat is the remainder when 17708 is divided by 69?\n44\nCalculate the remainder when 227023 is divided by 2441.\n10\nWhat is the remainder when 280804 is divided by 5616?\n4\nWhat is the remainder when 42656209 is divided by 3046871?" +"creasing order.\n-9, 2, 4, 151\nSort 1/4, 6, -1/2, 0.3, -48867.\n-48867, -1/2, 1/4, 0.3, 6\nPut -4, 3/8, 7, -9.21 in increasing order.\n-9.21, -4, 3/8, 7\nPut -8, -4, -9, 3, 2 in descending order.\n3, 2, -4, -8, -9\nSort 3, -0.04, -1, -6, -5/9, 4 in increasing order.\n-6, -1, -5/9, -0.04, 3, 4\nSort 47, -186, 22 in descending order.\n47, 22, -186\nSort 0.2, -55, -2/5, 152 in descending order.\n152, 0.2, -2/5, -55\nPut -5, 2/3, -0.053, 7, -2/9 in descending order.\n7, 2/3, -0.053, -2/9, -5\nSort 3, 1/26, 25/2, 1 in increasing order.\n1/26, 1, 3, 25/2\nPut 109, -12, -4 in ascending order.\n-12, -4, 109\nPut -2, 3, -4, -8, -7, 29 in increasing order.\n-8, -7, -4, -2, 3, 29\nSort 2, 0, -10635 in descending order.\n2, 0, -10635\nSort -1, -124, 5, 2, -7.\n-124, -7, -1, 2, 5\nSort 89, 3565, -1/4, -5 in decreasing order.\n3565, 89, -1/4, -5\nSort -1, 4, 29 in ascending order.\n-1, 4, 29\nSort 13, -2, -3, 96694.\n-3, -2, 13, 96694\nSort 47, -17264, 3.\n-17264, 3, 47\nSort 4, -5, 10, 1155, 0 in descending" +"ch is smaller: q or a?\nq\nSuppose -140 + 24 = -s. Suppose -d - 61 = -s. Is d at least as big as 56?\nFalse\nLet a be 14/49 + 24/14. Let h be (-21)/(-28) - a/(-8). Let f be (-4)/h - (-52)/12. Is -3 greater than f?\nFalse\nSuppose -8 = -5*i + 2. Let x be ((-2)/(-6))/((-2)/(-3)). Is i at most x?\nFalse\nSuppose -126*l + 34 = -124*l - 2*y, 4*l + 5*y = 41. Which is greater: l or -7?\nl\nLet p be 4/(-6)*99/(-2). Which is smaller: p or 95/3?\n95/3\nLet u = -129 - -136. Suppose -2*y - 1 + 9 = 0. Is y bigger than u?\nFalse\nLet y = 19/34 + -757/442. Let v be (-1 - -2)*0/(-2). Is y less than or equal to v?\nTrue\nLet y = 1275 + -1096. Which is smaller: 180 or y?\ny\nLet q be (-7 + 4)/(1*-1). Suppose 5*a + q*d - 6 = 0, -3*a + 13 = 5*d + 3. Let j = 269/4 - 1373/20. Is j >= a?\nFalse\nLet d = -137 - -60. Is -74 less than d?\nFalse\nLet p =" +"s the units digit of 76744?\n4\nWhat is the hundred thousands digit of 503840?\n5\nWhat is the hundreds digit of 12152190?\n1\nWhat is the units digit of 557855?\n5\nWhat is the thousands digit of 74481?\n4\nWhat is the ten millions digit of 11430512?\n1\nWhat is the hundreds digit of 1715737?\n7\nWhat is the hundred thousands digit of 809893?\n8\nWhat is the thousands digit of 661594?\n1\nWhat is the ten thousands digit of 23671?\n2\nWhat is the tens digit of 24669?\n6\nWhat is the hundred thousands digit of 4686984?\n6\nWhat is the ten thousands digit of 198114?\n9\nWhat is the hundreds digit of 2895209?\n2\nWhat is the hundred thousands digit of 613448?\n6\nWhat is the hundreds digit of 49364?\n3\nWhat is the units digit of 636773?\n3\nWhat is the units digit of 7378942?\n2\nWhat is the tens digit of 20487943?\n4\nWhat is the thousands digit of 17814?\n7\nWhat is the ten thousands digit of 281761?\n8\nWhat is the thousands digit of 165593?\n5\nWhat is the ten thousands digit of 274783?\n7\nWhat is the thousands digit of 244409?\n4" +" at least as big as -2238061/20?\nFalse\nIs -2 > -202798725?\nTrue\nWhich is greater: 5577616 or 5577613?\n5577616\nIs -36631590 at least as big as -36631591?\nTrue\nWhich is smaller: 0 or -100/98947?\n-100/98947\nWhich is smaller: 1 or 270879026?\n1\nWhich is smaller: -11622 or -23952?\n-23952\nWhich is bigger: 9 or 3930715?\n3930715\nWhich is smaller: -64954 or -786?\n-64954\nWhich is smaller: 15926212 or 111483490/7?\n15926212\nWhich is smaller: 929 or 1049763/1129?\n929\nIs 4 < -4247.865?\nFalse\nWhich is bigger: 1306 or 455883/349?\n455883/349\nIs 149/115553 at least 3?\nFalse\nWhich is bigger: -10/47993987 or 1?\n1\nWhich is smaller: 0 or 1034/19443?\n0\nIs 316811205 at most as big as 316811203?\nFalse\nWhich is bigger: 138604 or 141622?\n141622\nIs 1032/8375 >= -1?\nTrue\nIs 5.433 greater than or equal to 502.4?\nFalse\nWhich is bigger: -20 or -217/220?\n-217/220\nWhich is smaller: -6793204 or -6793177?\n-6793204\nWhich is smaller: 2547 or 274915/108?\n274915/108\nIs 2939104 <= 2939104?\nTrue\nDo 0 and 60/13633261 have the same value?\nFalse\nWhich is bigger: 13 or 20511/1781?\n13\nIs 33011889 >= 33011889?\nTrue\nIs -9018 greater than or equal to -6813?\nFalse\nWhich is greater: -0.33 or" +"d 22?\n22\nLet h be 247/9 + (-36)/81. Calculate the greatest common divisor of h and 6.\n3\nLet s = 28 + -17. Let x = 6 + s. Suppose 3*v + 8 = 3*a + 35, 5*v + 2*a - x = 0. Calculate the highest common factor of v and 10.\n5\nLet a(r) = 5*r - 17. Let k be a(5). Calculate the highest common factor of 1192 and k.\n8\nLet c be ((-6)/(-4) + 0)/((-1)/(-84)). Suppose 0 = 4*b - 2*h - c, 4*h = -b - 20 + 65. Calculate the greatest common factor of b and 11.\n11\nLet b be (-1)/((3/6)/(134/4)). Let s = b - -68. Calculate the highest common factor of 7 and s.\n1\nLet d = 46 + -35. Suppose 0 = 13*u - d*u - 52. What is the greatest common factor of u and 26?\n26\nSuppose 0 = 4*g - 649 - 751. Calculate the highest common factor of g and 14.\n14\nSuppose 4*h - 9830 = 2378. Suppose 4*k = -2*o + h - 682, 4*o = -5*k + 2958. What is the greatest common factor of k and 66?\n66" +"k.\n5\nSuppose 0 = 5*p + 5 - 45. Solve 5*i - 3*i - p = 0 for i.\n4\nSuppose 0 = -n - 4*u - 1, 0 = n + n + 5*u - 4. Let m = n + -2. Suppose 3*z = -m*b - 2 - 8, 2*b - z - 7 = 0. Solve 3*h - b = 2 for h.\n1\nLet u = 44 - 42. Suppose 0*v - 3*v + 27 = 0. Solve u*g + g = v for g.\n3\nSuppose 0 = 2*s - 18 - 22. Let t(k) = -2*k - 6. Let g be t(-6). Let u = g - 1. Solve -u*v = -v + s for v.\n-5\nLet n be (-4)/(-6) + (-16)/(-12). Let m be (2 - -1 - 3)/n. Solve -3*q - 9 = -m for q.\n-3\nLet o be -1*(3 + -2) + 5. Suppose -y - 20 = r + o*y, r = 5*y + 20. Suppose -u - 2*u = r. Solve l - 5*l - 4 = u for l.\n-1\nLet n = 9 - 6. Suppose n*i = 4*i + l, 5*l = -2*i" +"nator of ((-19)/4)/(9/(-14)) and k.\n18\nLet z = 10119/4 - 2553. Calculate the common denominator of 99/2 and z.\n4\nCalculate the common denominator of -97/18 and (-55)/44*12/(-82).\n738\nLet h(t) = -t + 26. Calculate the least common multiple of 18 and h(6).\n180\nLet p = 15591/8 - 1954. Let u = 205/17 - 331/136. Let a = u - p. Calculate the common denominator of a and 47/5.\n20\nLet n = -4009219/194 - -20666. Let p = -2168/1067 - n. What is the common denominator of 31/8 and p?\n88\nLet m = -5807/22 + 264. What is the common denominator of m and (-10)/(-18)*(70/(-4))/7?\n198\nLet b = 2 + -2. Let h be (b - -1 - 0)*26. Let f = h + -14. Calculate the smallest common multiple of 10 and f.\n60\nLet v = -9 + 12. Suppose 2*i - i = v. Suppose -a - 3 = 0, 0 = 4*s - a - 10 + 3. Calculate the lowest common multiple of s and i.\n3\nLet v = -3 + 3. Suppose 3*f + a - 12 = 0, 2*f - 9 = -v*f - a. What" +"ose -17*n - t = -24*n. Solve -k - k + n = h for k.\n2\nLet z = 226 + -221. Let b be 10/z*(4 - (-12)/(-8)). Solve -b*p - 20 = -5 for p.\n-3\nLet x be (-26)/182 + 192/21. Solve -30*v = -x*v - 147 for v.\n7\nLet i = -11059 - -11064. Solve 288 = -31*o - i*o for o.\n-8\nLet c(n) = 2*n**2 + 16*n + 6. Let p be c(-8). Suppose -p*x + 0 = -36. Let w be ((-9)/(-5) - 1)*5. Solve -w*f = -x*f + 6 for f.\n3\nSuppose -28*w - 4*y = -25*w - 1312, -450 = -w + 5*y. Solve 0 = -11*a - 44*a + w for a.\n8\nSuppose 11*m + 32 = 27*m. Let k(c) = -c**2 + 9*c + 13. Let t be k(10). Solve -t*p - 5 = -m for p.\n-1\nLet u(a) = -a**3 + 4*a**2 - a - 4. Suppose -t - 8 = -2*b, 0*t + 6 = 4*b + 3*t. Let n be u(b). Let x be (-1029)/(-196) + 6/8. Solve -n*f + x = 16 for f.\n-5\nSuppose -5*m + 63 = 2*r" +"8341\nWhat are the prime factors of 41666?\n2, 83, 251\nWhat are the prime factors of 2740815?\n3, 5, 7, 11, 113\nWhat are the prime factors of 210545?\n5, 17, 2477\nList the prime factors of 9865603.\n11, 293, 3061\nWhat are the prime factors of 9987800?\n2, 5, 49939\nList the prime factors of 568398.\n2, 3, 61, 1553\nWhat are the prime factors of 1377334?\n2, 7, 131, 751\nList the prime factors of 133753.\n59, 2267\nList the prime factors of 2090743.\n661, 3163\nWhat are the prime factors of 11170443?\n3, 47, 227, 349\nWhat are the prime factors of 8518788?\n2, 3, 83, 2851\nList the prime factors of 4507847.\n29, 155443\nList the prime factors of 2075894.\n2, 809, 1283\nList the prime factors of 278543.\n278543\nList the prime factors of 128142.\n2, 3, 7, 113\nList the prime factors of 3075888.\n2, 3, 64081\nList the prime factors of 18544619.\n311, 59629\nWhat are the prime factors of 960900?\n2, 3, 5, 3203\nWhat are the prime factors of 109655?\n5, 7, 13, 241\nList the prime factors of 5080458.\n2, 3, 211, 4013\nWhat are the prime factors of" +"by 25440829\n-5\nCalculate -67788532 divided by -4858.\n13954\nWhat is 29085733 divided by -401?\n-72533\nDivide 3445 by 15032.\n3445/15032\nWhat is 109364255 divided by -21851?\n-5005\nCalculate -951696488 divided by -1.\n951696488\nWhat is -112702280 divided by 5?\n-22540456\nWhat is -521 divided by 249426?\n-521/249426\n20683205 divided by 2\n20683205/2\nWhat is 0 divided by -5452855?\n0\n223967888 divided by -4\n-55991972\nDivide 0 by -1816104.\n0\n30926 divided by 1750\n2209/125\n-123390420 divided by 6\n-20565070\n-691348418 divided by -913274\n757\n-1192530 divided by -626\n1905\nWhat is 5301008 divided by 6?\n2650504/3\nDivide -325 by -59596.\n325/59596\nCalculate -20264266 divided by -341.\n59426\nDivide 362555 by 25.\n72511/5\nCalculate 26773 divided by 355.\n26773/355\nCalculate -155776 divided by -456.\n19472/57\nDivide -5627746 by 8.\n-2813873/4\nWhat is 145589 divided by 785?\n145589/785\n179092332 divided by 1257\n142476\nCalculate 17 divided by -527193.\n-17/527193\nWhat is 688 divided by 62770?\n344/31385\nCalculate 284 divided by 58291.\n4/821\nCalculate 5400002 divided by 72973.\n74\n-18 divided by -2031108\n3/338518\nCalculate 204417214 divided by 166.\n1231429\nCalculate -11 divided by -91740277.\n11/91740277\nDivide -10978283 by 1.\n-10978283\nCalculate 21692370 divided by 42.\n516485\nWhat is 2 divided by" +"et h = v + 132.8. Sort b, h, 0 in increasing order.\nb, h, 0\nLet w = 567 + -563. Put -5, 0, -4, w in increasing order.\n-5, -4, 0, w\nLet q be ((-3)/(-2) + -1)*2. Let j(m) = -8*m + 23. Let c be j(3). Let t be ((-13)/(-39))/(c*q). Sort -4, t, 5/4 in descending order.\n5/4, t, -4\nSuppose 3*m + 4*b + 442 = -2*m, 4*m + 2*b + 356 = 0. Let a = m + 90. Sort 2, a, 3, -3.\n-3, a, 2, 3\nLet n = -551/7 + 79. Let f = 0.2 - 0.4. Let o = 3593 + -35929/10. Sort f, n, o in increasing order.\nf, o, n\nLet l = -3 + 8. Let p = -877 + 879. Sort 7, l, p in increasing order.\np, l, 7\nLet n be 8 + (-17)/((-34)/(-20)). Put n, 13, -5 in increasing order.\n-5, n, 13\nSuppose 12*g - 10*g - 5 = l, g - 2*l = 10. Put 1, -2, -5, g in descending order.\n1, g, -2, -5\nLet f = 3/338 + -47/24336. Sort 4/5, 2/5, f.\nf, 2/5, 4/5\nLet c(q)" +"ppose -3*p = 2*q + 31, -4*q + n*q = 5*p + 45. Put p, -4, 3 in descending order.\n3, -4, p\nLet d be -4 + -3 + (-28)/(-4). Put -4, d, -8, 1 in decreasing order.\n1, d, -4, -8\nLet h = 5/41 + -158/287. Let a(l) = l + 16. Let k be a(-15). Let o = 0 - -1/3. Put k, h, o in descending order.\nk, o, h\nLet y = -7 + 5. Let k be 1 - (1 + 4 + y). Put k, -5, 3 in decreasing order.\n3, k, -5\nLet s(f) = f**2 - 6*f - 2. Let d be s(6). Let t(k) = -2 + 0*k + k**2 + 0*k**2 - k. Let b be t(3). Put d, b, 1 in decreasing order.\nb, 1, d\nLet y = 66 + -65. Put 3, -5, y, 2 in decreasing order.\n3, 2, y, -5\nLet t(i) = 2 + 3*i**3 + 5*i - 6 - 4*i**3 + 2*i**2. Let y be t(3). Sort y, -6, -5.\n-6, -5, y\nSuppose 0 = 3*d - 18 + 3. Put d, -3, 9 in descending order.\n9, d, -3" +"90740*y + 4434442*y + 3 - 4 + 1375403*y.\n12600585*y - 1\nCollect the terms in -3 - 728484*y**2 + 3 + 169097*y**2.\n-559387*y**2\nCollect the terms in -12*p - 2*p + 0*p + 11 + 8*p - 2*p - p.\n-9*p + 11\nCollect the terms in -543*y**2 + y**3 + 1136*y**2 - 593*y**2 - 138.\ny**3 - 138\nCollect the terms in 10783*z - 20465*z - 3 + 3 + 9799*z.\n117*z\nCollect the terms in 49223664198652*b**2 - 49223664198652*b**2 - 2*b**3.\n-2*b**3\nCollect the terms in 0*c + 334*c**3 + 3*c - 3*c - 5343 + 5343.\n334*c**3\nCollect the terms in -85*b + 31*b + 30*b + 24*b + 6457*b**2.\n6457*b**2\nCollect the terms in 291629 - 27*f - 97213 + 7*f - 97213 - 97202.\n-20*f + 1\nCollect the terms in -147*y**2 + 3*y - 161*y**2 - 26*y**2 - 3*y - 2*y - 909*y**2.\n-1243*y**2 - 2*y\nCollect the terms in 60*c - 11*c - 123*c + 17*c - 123*c.\n-180*c\nCollect the terms in -581*a + 1197*a - 616*a + 17279*a**2 - 17302*a**2.\n-23*a**2\nCollect the terms in -462 + 462 + 91889034620*r - 91889034623*r.\n-3*r\nCollect the terms in -16748*x**2 + 0 -" +"l**2 + 2*l + 9\nWhat is the y'th term of 61, 125, 193, 265?\n2*y**2 + 58*y + 1\nWhat is the n'th term of 4128, 4137, 4146, 4155, 4164?\n9*n + 4119\nWhat is the o'th term of 176, 514, 1048, 1778?\n98*o**2 + 44*o + 34\nWhat is the f'th term of 2437, 2434, 2415, 2368, 2281, 2142, 1939?\n-2*f**3 + 4*f**2 - f + 2436\nWhat is the i'th term of -11072, -22155, -33238, -44321, -55404?\n-11083*i + 11\nWhat is the q'th term of 9023, 18044, 27063, 36080?\n-q**2 + 9024*q\nWhat is the i'th term of -2, -50, -208, -536, -1094, -1942?\n-10*i**3 + 5*i**2 + 7*i - 4\nWhat is the h'th term of 75, 182, 369, 678, 1151?\n7*h**3 - 2*h**2 + 64*h + 6\nWhat is the l'th term of 20, 38, 64, 92, 116, 130, 128?\n-l**3 + 10*l**2 - 5*l + 16\nWhat is the i'th term of -7, -276, -1023, -2488, -4911?\n-40*i**3 + i**2 + 8*i + 24\nWhat is the h'th term of 70636, 70631, 70614, 70579, 70520, 70431, 70306, 70139?\n-h**3 + 2*h + 70635\nWhat is the s'th term of -2160, -17360, -58636, -139026," +"a prime number?\nTrue\nIs 10585969 composite?\nFalse\nIs 1123495 prime?\nFalse\nIs 939737 composite?\nFalse\nIs 2329577 a prime number?\nTrue\nIs 175211 a composite number?\nFalse\nIs 56204429 prime?\nTrue\nIs 41391983 a prime number?\nTrue\nIs 283330409 a prime number?\nTrue\nIs 1160161 composite?\nFalse\nIs 22544923 composite?\nFalse\nIs 151167461 a prime number?\nTrue\nIs 4945229 composite?\nTrue\nIs 1458203 a prime number?\nTrue\nIs 715171 composite?\nFalse\nIs 13430327 a composite number?\nTrue\nIs 1257647 composite?\nFalse\nIs 4435549 prime?\nTrue\nIs 49180459 prime?\nFalse\nIs 53105993 prime?\nTrue\nIs 2219431 prime?\nFalse\nIs 278981 composite?\nFalse\nIs 58623857 prime?\nTrue\nIs 192394105 a composite number?\nTrue\nIs 1713233 a composite number?\nTrue\nIs 122243 prime?\nFalse\nIs 2227163 a composite number?\nFalse\nIs 7598183 prime?\nFalse\nIs 16359251 a composite number?\nTrue\nIs 4787579 a composite number?\nTrue\nIs 19520761 prime?\nFalse\nIs 350462103 prime?\nFalse\nIs 8111333 a composite number?\nFalse\nIs 277645 a prime number?\nFalse\nIs 2833583 prime?\nFalse\nIs 37038697 prime?\nFalse\nIs 8507591 a composite number?\nFalse\nIs 1787509 a prime number?\nTrue\nIs 172763947 prime?\nFalse\nIs 60066631 a composite number?\nFalse\nIs 22814053 prime?\nTrue\nIs 82369013" +" common factor of z and 12.\n12\nLet k(n) = n**2 + 54*n + 257. Let z be k(-50). Calculate the greatest common factor of z and 9.\n3\nLet b(o) = 5*o + 3*o - 3 - 9*o. Let i be b(-7). What is the greatest common divisor of i and 14?\n2\nSuppose -k - 4*x + 70 = 0, 2*k - 115 = -4*x + 9. Let h = -53 - -76. Suppose h*b - k = 20*b. What is the greatest common factor of 12 and b?\n6\nLet o be -189*(95/38)/((-2)/4). Calculate the highest common factor of 35 and o.\n35\nSuppose -4 = 4*c, 5*g - c + 4*c = 12. Suppose -3*f + 0 = 5*y + 6, -g*f = 3*y. What is the greatest common divisor of f and 21?\n3\nSuppose 2*g - 4*t - 16 = 0, 35 = -3*g + 7*g - 5*t. Suppose -4*l + 62 = -g. Calculate the greatest common divisor of 2 and l.\n2\nLet w = -211 - -319. Let j(f) = f**2 - 22*f + 124. Let h be j(8). What is the greatest common divisor of w and h?\n12\nSuppose" +"- 2*r + 5 = 0. Let x be (-1)/r + (-95)/(-25). Solve -4 = x*j, l - m = 3*j - 3 for l.\n2\nLet z(i) = -i**2 - 17*i - 72. Let f be z(-9). Solve 3*o = -y - y - 14, f = 2*o - y for o.\n-2\nLet o be ((-2)/(-3))/(14/315). Suppose -11*p = -16*p + o. Solve -4*h + p*n - 25 = -0*n, 0 = -5*h - 4*n - 8 for h.\n-4\nSuppose -6*d + 2*d - 4*f = -4, 5 = -5*f. Suppose 42 = 4*q - 2*h, -2*q + d*h = -6*q + 62. Solve 3*c = -2*s + q, -4*s = c - s - 9 for c.\n3\nLet u(x) be the first derivative of -8*x**2 + 1/4*x**4 + 14/3*x**3 - 11*x - 5. Let m be u(-15). Solve 2*w = -s - 4*s + 17, -2*w - m*s + 14 = 0 for w.\n1\nLet r be (-1)/3*(-15 - -9). Let o(x) = -x**r + 11 - 6 - 7*x + 6 + 5. Let h be o(-7). Solve 3*y + 3*s + 12 = -0*y, -y + 3*s = -h for y.\n1" +"the fourth root of 24374908 to the nearest integer?\n70\nWhat is 14515607 to the power of 1/2, to the nearest integer?\n3810\nWhat is 972750557 to the power of 1/3, to the nearest integer?\n991\nWhat is the third root of 1179451254 to the nearest integer?\n1057\nWhat is 4926752472 to the power of 1/3, to the nearest integer?\n1702\nWhat is 274585553 to the power of 1/5, to the nearest integer?\n49\nWhat is the ninth root of 44736270 to the nearest integer?\n7\nWhat is the eighth root of 6881110306 to the nearest integer?\n17\nWhat is 94616660 to the power of 1/6, to the nearest integer?\n21\nWhat is the ninth root of 137575690 to the nearest integer?\n8\nWhat is 2439989642 to the power of 1/2, to the nearest integer?\n49396\nWhat is the tenth root of 138415121 to the nearest integer?\n7\nWhat is the cube root of 50644602 to the nearest integer?\n370\nWhat is the third root of 48978600 to the nearest integer?\n366\nWhat is the third root of 22226043 to the nearest integer?\n281\nWhat is the square root of 278285994 to the nearest integer?\n16682\nWhat is the third" +"se\nSuppose l = -5*a + 5 + 8, -5*l + 23 = 4*a. Let f be ((-4)/a)/(3/(-261)). Suppose 0 = -0*u - 3*u + f. Is u a prime number?\nFalse\nSuppose 0 = -2*f + 3*m + 11, -4*f + 9*f - 2*m = 33. Suppose 0 = a - f + 2. Suppose -4*x - p = -x - 61, -a*x + 3*p = -111. Is x prime?\nFalse\nSuppose -2*t + 5*b + 787 = 0, -4*b = -2*t + 583 + 207. Is t prime?\nTrue\nSuppose 2*r + 3*r = 10. Suppose 2*s - t + r = -3*s, -5*s = t - 2. Suppose z - 6*z + 5*j + 170 = s, z - 31 = 4*j. Is z a composite number?\nTrue\nSuppose 2*b - 220 = -6*m + 2*m, -b = 4*m - 110. Let f = -11 - -14. Is 6/f + b + 1 a prime number?\nTrue\nIs (4 + -2)/((-2)/(-521)) composite?\nFalse\nLet q(i) = -8*i**3 - 2*i - 1. Let g be q(-1). Suppose -3*m - 29 = 4*n, 0 = m + 3*n - 2*n + g. Is (m - 0)*(-4 + 2) a" +"order.\n-0.5, 5, 799\nSort 2, 2/7, -0.0299 in descending order.\n2, 2/7, -0.0299\nPut 286, -2, 1 in descending order.\n286, 1, -2\nSort -4, 12, -3 in descending order.\n12, -3, -4\nPut 2, -14, 31 in ascending order.\n-14, 2, 31\nSort 33, -4, -3, 1 in descending order.\n33, 1, -3, -4\nSort 4.2, 32, 1/2, 4 in descending order.\n32, 4.2, 4, 1/2\nPut 4, 12, 1, -7 in decreasing order.\n12, 4, 1, -7\nSort -1, 4, 183, -9.\n-9, -1, 4, 183\nPut -3, 0.3, -291 in descending order.\n0.3, -3, -291\nPut -2, 23, -3, -1/5 in descending order.\n23, -1/5, -2, -3\nPut 0.0424, -2/3, 2/11, 0.1 in increasing order.\n-2/3, 0.0424, 0.1, 2/11\nSort 1, -5, 0.1, -3.3 in descending order.\n1, 0.1, -3.3, -5\nSort 1, -2/9, -25/121, 2 in descending order.\n2, 1, -25/121, -2/9\nPut -4, -2, -86, -3 in descending order.\n-2, -3, -4, -86\nSort -4, -12, -65.\n-65, -12, -4\nPut 3, -1, 2, 5 in decreasing order.\n5, 3, 2, -1\nSort -138, 1, -10 in decreasing order.\n1, -10, -138\nPut 3, -7, 7 in increasing order.\n-7, 3, 7\nSort -17," +"is the hundred thousands digit of 2170006?\n1\nWhat is the hundred thousands digit of 208106?\n2\nWhat is the millions digit of 8258392?\n8\nWhat is the tens digit of 2027704?\n0\nWhat is the ten thousands digit of 936998?\n3\nWhat is the units digit of 1156725?\n5\nWhat is the ten thousands digit of 14014767?\n1\nWhat is the tens digit of 2241487?\n8\nWhat is the tens digit of 179640?\n4\nWhat is the thousands digit of 2180574?\n0\nWhat is the hundreds digit of 2937570?\n5\nWhat is the ten thousands digit of 311836?\n1\nWhat is the ten thousands digit of 239434?\n3\nWhat is the millions digit of 6482490?\n6\nWhat is the hundred thousands digit of 1972962?\n9\nWhat is the units digit of 124870?\n0\nWhat is the thousands digit of 108911?\n8\nWhat is the tens digit of 2737757?\n5\nWhat is the thousands digit of 650948?\n0\nWhat is the tens digit of 50834?\n3\nWhat is the thousands digit of 5183461?\n3\nWhat is the hundred thousands digit of 251473?\n2\nWhat is the hundreds digit of 581013?\n0\nWhat is the hundred thousands digit of 14991164?\n9" +"?\nFalse\nLet x(v) = 3*v**2 + 0*v + 11*v - 2*v - 6*v. Does 4 divide x(4)?\nTrue\nIs (0 - (-7608)/(-72))*-69 a multiple of 23?\nTrue\nSuppose -17*o = -10*o + 14. Does 87 divide (290/(-20))/(o/84)?\nTrue\nLet x = 2694 + -2570. Is 2 a factor of x?\nTrue\nSuppose -2*t = -0*n + n - 5, 0 = -2*t + 2*n + 8. Suppose t*g = 0, 5*g - 3*g = x - 819. Is 13 a factor of x?\nTrue\nDoes 8 divide (-20266 - -6)*(-21)/84?\nFalse\nLet k = -2168 - -3039. Is k a multiple of 6?\nFalse\nLet d = -915 + 9490. Is 35 a factor of d?\nTrue\nLet g(k) = -4 - 11*k + 151*k**2 - k**3 + 8*k**3 - 162*k**2 + 0*k**3. Does 30 divide g(5)?\nFalse\nSuppose 2*s - 218 = -212. Suppose 12 = s*i, -3*o + 3*i = -8*o + 557. Does 4 divide o?\nFalse\nSuppose -15 = -5*m, 3*y + 9*m = 4*m + 213. Let l be 27/18 - y/4. Is (0 + -1)/(15/l)*21 a multiple of 8?\nFalse\nSuppose -1066*p + 1067*p = 186. Is p a multiple of 38?\nFalse" +"Is 321737 prime?\nFalse\nIs 172214893 a composite number?\nFalse\nIs 603417 a prime number?\nFalse\nIs 7339957 a composite number?\nFalse\nIs 382457 a composite number?\nFalse\nIs 152869 a prime number?\nFalse\nIs 21760393 a prime number?\nFalse\nIs 4070711 a composite number?\nFalse\nIs 400759367 composite?\nFalse\nIs 1991477 composite?\nFalse\nIs 15906359 a composite number?\nTrue\nIs 1852547 a composite number?\nTrue\nIs 318728863 composite?\nFalse\nIs 2876057 prime?\nTrue\nIs 11554117 prime?\nFalse\nIs 468070657 a composite number?\nTrue\nIs 23877893 composite?\nTrue\nIs 5341837 prime?\nFalse\nIs 24943207 a prime number?\nTrue\nIs 62053447 prime?\nFalse\nIs 1075483 prime?\nFalse\nIs 27487259 prime?\nFalse\nIs 376008223 a composite number?\nFalse\nIs 44975935 prime?\nFalse\nIs 876257 a composite number?\nFalse\nIs 586150827 prime?\nFalse\nIs 662042171 prime?\nFalse\nIs 614741 a prime number?\nTrue\nIs 3933037 composite?\nFalse\nIs 17558599 composite?\nFalse\nIs 233903089 composite?\nTrue\nIs 88065431 composite?\nTrue\nIs 7853551 a composite number?\nFalse\nIs 3489857 prime?\nFalse\nIs 10437269 a composite number?\nTrue\nIs 54955631 a composite number?\nTrue\nIs 7210661 a composite number?\nTrue\nIs 74071 composite?\nFalse\nIs 16039481 a composite number?\nTrue\nIs 155541067 composite?\nTrue\nIs 1511457" +"ose -3*a + 38 = n, 120 = 5*n - a - p. Is 20 a factor of n?\nFalse\nSuppose -10*f = -9*f. Let t be (3 + f)/((-36)/168). Is 16 a factor of (63/t)/((-3)/32)?\nTrue\nLet w be 6/9 - (-19)/3. Let a(p) = p**3 - 12*p**3 - 9*p + w + 10*p. Is 20 a factor of a(-2)?\nFalse\nLet d be (-156)/(-30) + -4 + (-2)/10. Let q be 2 + d*-8 - 0. Let w = q - -54. Is 16 a factor of w?\nTrue\nLet c(r) = -r**3 + 14*r**2 + 3*r - 14. Let w be c(14). Let z be 3 + w/(-8) - (-79)/2. Suppose -175 + z = -j. Is 34 a factor of j?\nTrue\nLet u(q) be the first derivative of -24*q**2 + 6*q + 3. Let k(h) = 8*h - 1. Let s(b) = 34*k(b) + 6*u(b). Is 12 a factor of s(-4)?\nFalse\nLet b(g) = g**3 - 3*g**2 + 6*g - 3. Let n be b(2). Suppose c + 4*c + n = 0, -2*j + 2*c = -12. Suppose -j*d = 178 - 433. Does 17 divide d?\nTrue\nSuppose -4 + 54 =" +"at is 85d - -ece?\n172b\nIn base 12, what is 7 + 23a0797?\n23a07a2\nIn base 6, what is -531424 + 115225?\n-412155\nIn base 7, what is 11542 + -5053?\n3456\nIn base 4, what is -2211113 - 21100?\n-2232213\nIn base 16, what is 1 - 1d278b?\n-1d278a\nIn base 2, what is 100111010010100111000 - -11?\n100111010010100111011\nIn base 9, what is -74155236 + 6?\n-74155230\nIn base 2, what is 1111 - -1111110010011111110001?\n1111110010100000000000\nIn base 12, what is 6 - -2a91006?\n2a91010\nIn base 14, what is 14 + 28abc0d?\n28abc23\nIn base 3, what is -121120 - -21122112200?\n21121221010\nIn base 11, what is -2a4 + -43667?\n-43960\nIn base 7, what is -1360 - -230640?\n226250\nIn base 8, what is 0 + 3005716?\n3005716\nIn base 8, what is -2371 + -160420?\n-163011\nIn base 6, what is 1241501 - 100?\n1241401\nIn base 12, what is -3 - 75979?\n-75980\nIn base 12, what is -38b68 + 374?\n-387b4\nIn base 2, what is 11000111000010011 + 11010111?\n11000111011101010\nIn base 5, what is -242411404 + -2?\n-242411411\nIn base 8, what is 72 - 214707?\n-214615\nIn base 7, what is" +" Let l = w + x. What is l rounded to the nearest 1000000?\n4000000\nLet h = 794164 + -794146.999825. Let d = -17 + h. What is d rounded to 5 dps?\n0.00018\nLet h = 126 + -126.162. Let n = h + -98.838. Let m = n - -99.0000073. What is m rounded to 6 decimal places?\n0.000007\nLet u = 796.0383 + -796. What is u rounded to three dps?\n0.038\nLet j = -81.104 + -261730.896. Let b = j - -261802.99954. Let q = -9 - b. Round q to four dps.\n0.0005\nLet q be ((-1485)/(-2) + 2)*2. Suppose 5689 = -v + q. Round v to the nearest one thousand.\n-4000\nLet l = -2883026907098201 + 2883026882708410.49000089. Let h = -24389791 - l. Let s = -0.49 - h. Round s to 7 decimal places.\n0.0000009\nLet t = -1.52 + 1.52000087. What is t rounded to 7 dps?\n0.0000009\nLet a = -11.13 + 11. Let q = -0.06 - a. Round q to 1 dp.\n0.1\nSuppose u + k - 292 = -4*k, -902 = -3*u - 2*k. What is u rounded to the nearest one hundred?\n300" +"s be (-35)/5 - (-27 + -8). Solve 0 = -4*l - 3*m + s, 5*l - 8*m + 3*m = q for l.\n4\nLet a be 4/(-6) - 332/6. Let u = -54 - a. Solve -n + u*n - 8 = -2*k, 5*n = 3*k + 1 for n.\n2\nLet f(x) = -10*x - 5. Let i be f(-1). Let h be 2/i + -2 + (-54)/(-15). Solve 0 = -2*t + 5*z + 15, 2*t - z + h*z = -15 for t.\n-5\nSuppose n - 2*x + 3 = x, -5*n + 3*x - 3 = 0. Solve -3*z + 7*z - 1 = -5*q, n = 3*z - 4*q + 7 for z.\n-1\nLet h be 16/(-20)*(35/(-14))/1. Solve 3*j + j - 16 = 2*a, 0 = -h*j + 8 for a.\n0\nSuppose -6*j - 7*j = -52. Solve 2*f = -y + 4, 0 = -2*y + 3*f - j*f - 1 for y.\n-2\nSuppose -s + 5 = -4*o, 3*o + s = -0*s + 5. Solve -a + 5*a - 3*k + 3 = o, a - 12 = 5*k for a.\n-3\nSuppose -2*p +" +" - 65 = -4*d. Is d composite?\nTrue\nSuppose 0 = -3*n + 4*z + 635, -4*z = 4*n - 6*n + 418. Is n a prime number?\nFalse\nSuppose 2 = i - 6. Suppose 0*h - 2*r + 168 = 2*h, -4*r = -4. Let z = i + h. Is z prime?\nFalse\nSuppose 0*v - 9 = -3*v. Suppose -2*o + 4*l = 16, -19 = -v*o - 3*l - 7. Let h(a) = -a**3 + a**2 + a + 35. Is h(o) a composite number?\nTrue\nLet t be (-1636)/(-4) + (-1 - 2). Suppose 3*o - 2*a = -t + 135, 4*a = 3*o + 281. Is 5 - o - 6/(-2) composite?\nTrue\nLet o = 2452 + -1235. Is o a prime number?\nTrue\nSuppose 10*b = 5*b. Is (b + 4)/((-2)/(-131)) a composite number?\nTrue\nLet a = 7 - 5. Let h(w) = -3 - w**2 + 2 + 8*w - 1 - a*w. Is h(5) a composite number?\nFalse\nSuppose -6*z - 4 = -5*z + 2*r, -3*r = -2*z - 29. Let j(g) = g**2 - 15*g + 11. Let q(x) = -x**2 + 7*x - 6. Let" +"8144789223 prime?\nTrue\nIs 11894094193 a prime number?\nFalse\nIs 1260165437 prime?\nFalse\nIs 3231934177 composite?\nTrue\nIs 5084670187 prime?\nFalse\nIs 1540381757 prime?\nFalse\nIs 8916444749 prime?\nTrue\nIs 406184617 prime?\nTrue\nIs 202315630331 prime?\nTrue\nIs 555563703 a composite number?\nTrue\nIs 64903091 prime?\nFalse\nIs 181647559 a composite number?\nTrue\nIs 1488555311 a composite number?\nFalse\nIs 35813920721 prime?\nFalse\nIs 64120523 prime?\nFalse\nIs 1877454071 composite?\nFalse\nIs 794606837 a prime number?\nTrue\nIs 64363459579 a prime number?\nTrue\nIs 1186563911 composite?\nTrue\nIs 8928224797 prime?\nTrue\nIs 1431617441 composite?\nFalse\nIs 167930947 a composite number?\nTrue\nIs 15009436438 prime?\nFalse\nIs 7983194279 composite?\nFalse\nIs 928742959 composite?\nFalse\nIs 2523629321 a composite number?\nFalse\nIs 21887999879 composite?\nTrue\nIs 54035070241 a prime number?\nTrue\nIs 6759391831 a composite number?\nTrue\nIs 38961813587 composite?\nFalse\nIs 478221721 composite?\nTrue\nIs 42580553 prime?\nTrue\nIs 39704572795 prime?\nFalse\nIs 1548772223 a composite number?\nTrue\nIs 4800762673 a composite number?\nTrue\nIs 83138366981 composite?\nFalse\nIs 1962973853 a prime number?\nTrue\nIs 540829027 a prime number?\nTrue\nIs 51037607989 prime?\nTrue\nIs 1794205177 a prime number?\nFalse\nIs 4966604077 a composite number?\nTrue\nIs 4496405637 composite?\nTrue\nIs" +"ltiple of 73980 and 924750.\n1849500\nCalculate the lowest common multiple of 347248 and 26.\n4514224\nCalculate the lowest common multiple of 1575 and 50365.\n2266425\nWhat is the lowest common multiple of 199260 and 169740?\n4582980\nWhat is the lowest common multiple of 7360 and 6005024?\n60050240\nCalculate the lowest common multiple of 3 and 79500.\n79500\nWhat is the least common multiple of 296 and 7275162?\n29100648\nCalculate the smallest common multiple of 88998 and 9828.\n1601964\nWhat is the common denominator of 93/36158 and 47/33642?\n608213718\nFind the common denominator of 145/3515388 and -7/8.\n7030776\nWhat is the lowest common multiple of 186 and 7136479?\n42818874\nFind the common denominator of -1/30 and -103/6281830.\n18845490\nCalculate the common denominator of 43/245258028 and 26/21.\n1716806196\nWhat is the smallest common multiple of 154014540 and 10?\n154014540\nWhat is the least common multiple of 3931732 and 4493408?\n31453856\nWhat is the lowest common multiple of 11187363 and 5085165?\n55936815\nCalculate the common denominator of -34/531 and -26/8847699.\n26543097\nFind the common denominator of 155/6552 and 47/245016.\n22296456\nCalculate the lowest common multiple of 33 and 7696245.\n84658695\nWhat is the lowest common multiple of 429750 and 150?\n429750\nWhat" +"*3 - 852*q**2\nSuppose -10*u + u = -9. Let q be u*((0 - -3) + 1). Find the third derivative of -15*m**q + 1351*m - 1351*m - 7*m**2 wrt m.\n-360*m\nLet z(a) = a**2 + 12*a - 37. Let f be z(4). What is the second derivative of -94*h - 88*h + 9*h + 118*h**3 - 4*h + f*h wrt h?\n708*h\nWhat is the third derivative of -1169*b**5 + 649*b**2 + 199*b**5 - 210*b**2 + 267*b**2 wrt b?\n-58200*b**2\nLet o(k) = -1773*k**5 - 3*k**2 + 16. Let j(n) = 5319*n**5 + 10*n**2 - 47. Let q(i) = -4*j(i) - 11*o(i). What is the third derivative of q(t) wrt t?\n-106380*t**2\nLet c be -5*1*((-1020)/25)/12. Find the third derivative of 48*b**6 + 12 + 14 - c - 7*b**2 wrt b.\n5760*b**3\nDifferentiate -12*z**4 + 6*z**4 + 3*z**4 - 82*z**3 + 7*z**4 - 3*z**4 + 232 wrt z.\n4*z**3 - 246*z**2\nLet m(j) be the first derivative of j**7/120 - 7*j**6/45 + 3*j**3 + 3. Let g(x) be the third derivative of m(x). What is the third derivative of g(d) wrt d?\n42\nLet t(v) be the second derivative of 29*v**5/20 - v**3/2 - 2453*v**2/2 - 3588*v." +"nd 37.\n37\nWhat is the greatest common factor of 30 and 78?\n6\nWhat is the greatest common factor of 183 and 61?\n61\nCalculate the greatest common factor of 88 and 198.\n22\nWhat is the highest common factor of 1190 and 14042?\n238\nWhat is the greatest common divisor of 276 and 23?\n23\nCalculate the highest common divisor of 90 and 12630.\n30\nCalculate the highest common factor of 6 and 27.\n3\nCalculate the highest common divisor of 1090 and 20.\n10\nCalculate the greatest common divisor of 30 and 3.\n3\nCalculate the highest common factor of 456 and 57.\n57\nCalculate the greatest common factor of 11 and 5027.\n11\nWhat is the highest common divisor of 244 and 10126?\n122\nWhat is the greatest common divisor of 8758 and 58?\n58\nWhat is the greatest common divisor of 24458 and 28?\n14\nCalculate the highest common divisor of 6105 and 66.\n33\nWhat is the highest common divisor of 120 and 72?\n24\nCalculate the highest common divisor of 37 and 1369.\n37\nWhat is the greatest common factor of 112 and 1204?\n28\nCalculate the highest common factor of 96 and" +" 5\nLet t be 6/4*(-8)/16. Let b = 115 - 73. Sort t, 0.3, 2, b in decreasing order.\nb, 2, 0.3, t\nLet t be -3*(1/1 - 2). Let l = 852 - 865. Sort l, t, 1 in decreasing order.\nt, 1, l\nLet s be (416/468)/((-4)/(-18)). Sort s, -7, -2 in ascending order.\n-7, -2, s\nLet b = 13 - 9. Put 0, -6, -5, b in ascending order.\n-6, -5, 0, b\nSuppose -113*o + 46*o - 402 = 0. Sort o, -5, 12 in decreasing order.\n12, -5, o\nLet a = 1.137 - 1.15. Let g = a - -7.013. Sort 5, 3, g in decreasing order.\ng, 5, 3\nLet q = -1.46 - -0.96. Sort -0.7, q, 0.7.\n-0.7, q, 0.7\nLet a = 71.87 - 73. Let z = a - -1.1. Let c = z - 0.07. Put -1/6, c, 3 in decreasing order.\n3, c, -1/6\nLet k be 104/715 + 24/(-44). Put 7/5, k, 5 in descending order.\n5, 7/5, k\nLet i = -909 - -908. Suppose -m + 60 = -6*m. Put m, -2, 1, i in increasing order.\nm, -2, i, 1\nLet a" +"ding order.\n4, 3, -0.1, -4, -254\nSort -1, -3, 4, 1, -10 in increasing order.\n-10, -3, -1, 1, 4\nPut 5, -3.7, -0.3592, 0.3 in decreasing order.\n5, 0.3, -0.3592, -3.7\nPut 3, -45, -22 in descending order.\n3, -22, -45\nSort 30, -0.4, -0.1, -1, 5.\n-1, -0.4, -0.1, 5, 30\nSort -8, 1, 1992, -4 in descending order.\n1992, 1, -4, -8\nPut 14, -0.3, 3/65, 0.3, 0 in descending order.\n14, 0.3, 3/65, 0, -0.3\nPut 1, 21, 0, -4 in decreasing order.\n21, 1, 0, -4\nPut -1, -4/3, -8.73, 1.4 in decreasing order.\n1.4, -1, -4/3, -8.73\nPut 4, 1/2, -15, -264.7 in ascending order.\n-264.7, -15, 1/2, 4\nPut -2, -0.3, 3/517, -24, 2/5 in decreasing order.\n2/5, 3/517, -0.3, -2, -24\nPut -3, -45, -1, -13 in ascending order.\n-45, -13, -3, -1\nSort 14, -9, 55, 0, -5 in descending order.\n55, 14, 0, -5, -9\nSort -4, -2, -48, -21, -12 in increasing order.\n-48, -21, -12, -4, -2\nSort 0, -10, 485, 4 in ascending order.\n-10, 0, 4, 485\nPut 0.3291, -2/13, -2/3 in ascending order.\n-2/3, -2/13, 0.3291\nSort -84, 2/11, -0.018.\n-84, -0.018, 2/11\nSort" +"ve -w*j = -44 + 22 for j.\n2\nLet n(g) = -g**3 + 3*g + 1. Let u be n(-2). Suppose 0 = -u*y - 6 + 66. Solve 0*j = -5*j + y for j.\n4\nSuppose -44*d - 65 = -57*d. Solve -2*q = d*q for q.\n0\nLet d be (17 - 18) + (2 - -5). Solve -x = -d*x for x.\n0\nLet s be (-8)/(-6)*(9/2)/1. Solve -2*a = 16 - s for a.\n-5\nSuppose 4*h = 3*v, -h - 4*v = -0*h - 19. Solve -h*i - 5*i = -24 for i.\n3\nSuppose 7*u + 12 = 11*u. Suppose -f + 2*f = u. Suppose 1 = -f*n + 13. Solve -x + n = x for x.\n2\nLet s(q) = -q. Let c be s(-4). Suppose 3 = -m, 3*t + 2*m - 438 = -3*m. Let f = 151 - t. Solve f*a = -c*a for a.\n0\nLet j(k) = k**2 + k + 3. Let h be j(0). Suppose 8 = -z - 7. Let i(o) = -2*o - 27. Let w be i(z). Solve w*m = 2*m - h for m.\n-3\nLet h =" +" of 40199908?\n2, 7, 37, 38803\nWhat are the prime factors of 99148440?\n2, 3, 5, 571, 1447\nList the prime factors of 1595324549.\n7, 13, 353, 49663\nList the prime factors of 591557728.\n2, 4157, 4447\nList the prime factors of 771273564.\n2, 3, 64272797\nWhat are the prime factors of 30553164?\n2, 3, 848699\nWhat are the prime factors of 3873235602?\n2, 3, 1187, 543841\nWhat are the prime factors of 717787566?\n2, 3, 17, 137983\nList the prime factors of 42886580.\n2, 5, 11, 17, 11467\nWhat are the prime factors of 185054623?\n13, 19, 749209\nList the prime factors of 1842916470.\n2, 3, 5, 71, 193, 4483\nList the prime factors of 78757728.\n2, 3, 7, 233, 503\nList the prime factors of 94679490.\n2, 3, 5, 29, 108827\nWhat are the prime factors of 962354930?\n2, 5, 96235493\nWhat are the prime factors of 223528388?\n2, 19, 271, 10853\nWhat are the prime factors of 643182282?\n2, 3, 3970261\nWhat are the prime factors of 110221263?\n3, 59, 69191\nList the prime factors of 2034256204.\n2, 19, 317, 84437\nWhat are the prime factors of 1047526?\n2, 523763\nWhat are the prime factors of 598463596?" +"Let l = 62.29 + -1.29. Let r = v - l. Round r to 0 dps.\n8\nSuppose -y - y - 312000 = 0. Round y to the nearest 10000.\n-160000\nLet v(m) = -4*m + 13*m + 2 + 10*m. Suppose c = -4*c + 20. Let u be v(c). What is u rounded to the nearest ten?\n80\nLet w = -5 - -7. Suppose 4*s = w*s + 196. Let m = s + -47. Round m to the nearest 10.\n50\nLet t = 2.5999995 + -2.6. Round t to 7 dps.\n-0.0000005\nLet z = -19.55 + 20. Let r = 150.45 - z. Let j = r - 150.061. Round j to two dps.\n-0.06\nLet g = 0.8 - 0.5. Let x = 0.3 - g. Let a = 0.0003 - x. What is a rounded to three dps?\n0\nLet r = -15.68 - -14. Let l = 1.67999831 + r. Round l to seven dps.\n-0.0000017\nSuppose 0 = -3*c + 392 + 307. What is c rounded to the nearest one hundred?\n200\nSuppose -c = 2*c - 9. Let b be -3 + (1 - (c +" +"?\nFalse\nLet d(r) = -57*r - 56. Suppose 52 - 17 = -5*q. Does 19 divide d(q)?\nFalse\nLet p(k) = -k**3 + 25*k**2 - 12*k - 33. Let f be p(25). Let b = -195 - f. Is b a multiple of 6?\nTrue\nLet w be ((-36)/24)/((-1)/2). Let g be 0 + (1 - 2 - -1). Suppose -4*u - 4 = g, 3*q - 252 = w*u - 0*u. Does 24 divide q?\nFalse\nLet b = -4454 - -8114. Is 14 a factor of b?\nFalse\nLet q(r) = 65*r**2 - 138*r - 883. Is q(-6) a multiple of 12?\nFalse\nSuppose 5*x + 4 = 7*x. Let n be 56/10 - x*(-3)/(-10). Suppose z = -n*d + 79, -18 = -d - 4*z - 6. Does 2 divide d?\nTrue\nLet x be 82/(-2 + (6 - 3)). Suppose 0 = 4*y + 3*v - 652, -y = -4*v - x - 81. Is y a multiple of 23?\nFalse\nLet d(y) be the first derivative of -y**2/2 + 13*y - 2. Let a be d(10). Does 3 divide a - 4/(4/(-19))?\nFalse\nSuppose 47022 - 9652 = 10*t. Is t a multiple of" +" lowest common multiple of q and 8.\n8\nSuppose -5*o + r - 33 = -o, 0 = 5*o - 3*r + 36. Let z = -4 - o. Suppose -41 + 253 = 5*j + 2*s, z*s + 196 = 4*j. Find the common denominator of 103/10 and j.\n10\nLet t(z) = -32*z**3 - 2*z - 1. Let y = -48 + 54. Calculate the lowest common multiple of t(-1) and y.\n66\nLet n = 795 + -631. Calculate the smallest common multiple of n and 44.\n1804\nSuppose -v + 5*g + 1 = 0, v + 27*g = 24*g + 9. Let l be -2*1/2*-5. Suppose a - 231 = -2*a + 3*d, l*d + 309 = 4*a. What is the least common multiple of v and a?\n228\nSuppose 3*z + 20 = 2*v + z, 0 = 2*v + 2*z - 28. Let q = v - 7. Suppose 5*c + q*f - 105 = 0, -f - 3*f - 78 = -5*c. What is the least common multiple of 4 and c?\n36\nLet l(u) = 45*u + 44. Let t be l(-4). Let a = t - -156. Calculate the lowest" +"factors of 1104053?\n523, 2111\nList the prime factors of 3681910.\n2, 5, 53, 6947\nList the prime factors of 4398275.\n5, 7, 41, 613\nList the prime factors of 8325062.\n2, 163, 25537\nList the prime factors of 599502.\n2, 3, 41, 2437\nWhat are the prime factors of 1392490?\n2, 5, 11, 12659\nWhat are the prime factors of 2114849?\n11, 192259\nList the prime factors of 569488.\n2, 35593\nList the prime factors of 20232982.\n2, 7, 11, 137\nList the prime factors of 710730.\n2, 3, 5, 53, 149\nWhat are the prime factors of 8969271?\n3, 2989757\nWhat are the prime factors of 13837?\n101, 137\nList the prime factors of 3324212.\n2, 29, 28657\nWhat are the prime factors of 4266393?\n3, 19, 29, 89\nWhat are the prime factors of 812964?\n2, 3, 37, 1831\nWhat are the prime factors of 271839?\n3, 31, 37, 79\nList the prime factors of 678596.\n2, 169649\nWhat are the prime factors of 4255132?\n2, 7, 151969\nList the prime factors of 1005810.\n2, 3, 5, 13, 2579\nList the prime factors of 791779.\n353, 2243\nWhat are the prime factors of 107103?\n3, 19, 1879" +"o) = 42*o - 24*o - 707 + 712 + 6*o**2. Let a be k(-3). Solve -5*m - a = -10 for m.\n1\nLet j = -230 - -331. Suppose 10*n - 19 = j. Solve -n = -4*o + 8 for o.\n5\nSuppose 5*d + 4 - 74 = 0. Suppose g = 4*m - 15, 4*g + d - 2 = 0. Suppose -m*p - 3*p + 24 = 0. Solve 0 = p*j - 9*j for j.\n0\nSuppose -61*g + 50*g = -22. Let d be (-6)/((-7)/14*g). Solve 0*h = -3*h + d for h.\n2\nSuppose -10*f = 2*f + 4956. Let b = f + 425. Solve -b*i + 5*i = -7 for i.\n1\nLet d(u) = -3*u**2 + 6. Let t be (2/(-6)*0)/(3*-1). Let f be d(t). Solve -i + f*i = -25 for i.\n-5\nSuppose 351 = 5*b - 5*q + 2*q, 2*b = -2*q + 134. Suppose 2*y + 2*y - d = 63, -5*d = 4*y - b. Suppose -5*f + y = 1. Solve -4*t - f = -t for t.\n-1\nLet d(a) = -170*a - 1013. Let x be d(-6). Solve x*w =" +"\n-9\nWhat is the closest to -2 in 0.0157, -2/13, -1/16, 98?\n-2/13\nWhich is the closest to 0.27? (a) -1/117 (b) -3/2 (c) -1 (d) -1/5\na\nWhat is the closest to 0.2 in 0.4, 2, 8492, -3?\n0.4\nWhich is the nearest to 322? (a) 1.8 (b) 11213 (c) 4\nc\nWhat is the closest to -89.28 in -1.7, 5, 59/5?\n-1.7\nWhat is the nearest to -4/9 in 0.4, 0.3, 43, 5/6, -16?\n0.3\nWhat is the nearest to 231 in -2/7, -1, -1/12, 18/7?\n18/7\nWhat is the closest to -0.26 in 4, -0.068, -75?\n-0.068\nWhat is the nearest to 23 in -1233, 1.97, -1/6?\n1.97\nWhich is the closest to -161? (a) -0.02 (b) 9 (c) -5 (d) 4/3 (e) -11\ne\nWhich is the closest to 3/11? (a) 2 (b) -93 (c) -2 (d) -0.5 (e) 6\nd\nWhich is the closest to 347? (a) -349 (b) 0.4 (c) -0.03 (d) 2/9 (e) -2\nb\nWhich is the nearest to 124654? (a) -7/5 (b) 1/10 (c) 5/2\nc\nWhat is the nearest to 0.1 in -1/5, 4, 110, 41497?\n-1/5\nWhich is the nearest to -980? (a) -9 (b) 1/3 (c) 2/3 (d)" +"\n20\nLet c(m) = m**3 - m**2 - 4*m + 20. Let r be c(0). What is the greatest common factor of r and 540?\n20\nLet i = -17 - -27. Suppose 23 = -i*c + 11*c. Calculate the greatest common divisor of c and 253.\n23\nSuppose 5*s - 1435 = -t - 4*t, 4*t = -5*s + 1147. Calculate the highest common factor of 9 and t.\n9\nLet a be (5 + -6)/(3/18). Let o be (-140)/21*a/5. Let n be (2/(-3))/(-1)*96. Calculate the highest common factor of n and o.\n8\nSuppose 0*i + 5*l = 2*i, -4*i - 28 = -3*l. Let t be (i - -19)*22/6. What is the greatest common factor of t and 11?\n11\nLet m(s) = 6*s + 1 + 1 + 6. Let x be m(6). Let w be (-96)/(-28) + (-4)/(-7). What is the greatest common factor of w and x?\n4\nLet z(g) = g**3 + 13*g**2 - 20*g - 309. Let t be z(-12). Suppose -s + 4*v + 70 = 0, -5*v = 6*s - 4*s - 75. Calculate the greatest common divisor of s and t.\n25\nSuppose -8*h + 518 = -3794. What" +". Solve 2*c - 3*l + v - 4 = d, -5*l = -10 for c.\n1\nLet u = -2 + 4. Solve 3*l - g = 2*g + 9, -18 = 4*l + u*g for l.\n-2\nSuppose -3*w = 4*g + w - 32, -g + 5*w = 22. Solve 2*q + 6 = g*n + q, -16 = -4*n + 4*q for n.\n1\nSuppose -5*z = -19 + 9. Solve z = -x - c, -1 = 3*c + 8 for x.\n1\nLet x be (10/3 + -3)*12. Suppose 3*k - 5 = 2*k. Solve -2*t = -0*z + k*z - 23, 0 = -x*t - 2*z + 22 for t.\n4\nSuppose 43 + 1 = 4*f. Let g = -7 + f. Solve g*s - 4 + 5 = -3*n, -n = 4*s + 3 for s.\n-1\nLet y(z) be the third derivative of -z**5/60 + 3*z**2. Let t be y(0). Solve t = l + 6*p - p, -6 = l - p for l.\n-5\nLet m be 242/55 - 2/5. Solve 3*n - 3*g = -6, 4*n = n + g - m for n.\n-1\nSuppose -s" +"2\nLet a = 23512 - 23410. Solve 5*w + 2*k = 15, -5*w + a = 3*k + 87 for w.\n3\nSuppose 4*u + 86 = -x, -3*x - 3*u = x + 344. Let g = x + 189. Suppose 14*b = g - 33. Solve -3*h + 11 = b*c, 3*c - 4*h + 5 = -0*c for c.\n1\nLet r(t) = 111*t + 28. Let g be r(-2). Let h = g + 205. Solve 0 = -0*j + 5*j + 3*k - h, 0 = -3*j + 5*k - 7 for j.\n1\nLet o = -258 - -260. Suppose -4*z - l = -o*z - 6, -5*l - 6 = z. Solve 3*h = 5*i + 5 + 4, 14 = -z*h - 2*i for h.\n-2\nSuppose r - 28 = 53*f - 49*f, -r + 16 = -2*f. Solve 21 = -w - r*h + 8*h, -5*w - 2*h = -5 for w.\n-1\nSuppose -2*j = 86*k - 88*k - 76, 14*j - 4*k - 482 = 0. Solve 0 = -4*w - 69*s + 65*s - 12, -4*w + 5*s = -j for w.\n2\nLet a be" +" = -11563/1665 - 41/370. Calculate the common denominator of 1/81 and h.\n162\nLet l be (-5 + 196/40)*152. Let y = l - -207/10. Find the common denominator of y and 61/2.\n2\nLet w(g) = -227*g**2 + 0*g + 220*g**2 - 3 + 4*g. Let s be w(2). Let x = -21 - s. What is the smallest common multiple of x and 6?\n6\nLet x = -310 - -311. What is the least common multiple of x and 36?\n36\nLet l(z) = -z**3 - 2*z**2 + 3*z + 3. Let m be l(-3). Suppose m*w - 48 = 45. What is the smallest common multiple of 2 and 2/6*(-10 + w)?\n14\nLet s(b) = 3*b**2 - 11*b + 38. Suppose -4*m - 4*f = -8, -f + 14 = 5*m + 3*f. What is the least common multiple of m and s(4)?\n42\nLet d = -625 - -3601. Let x = d + -26843/9. Find the common denominator of 83/16 and x.\n144\nLet h = -190 + 211. Calculate the least common multiple of h and 48.\n336\nLet t = -28 - -46. Suppose -6*v = -2*r - 7*v + 57," +"8 a factor of w(13)?\nTrue\nLet h = 4325 - 2998. Is 23 a factor of h?\nFalse\nLet f = 29659 - -4452. Does 20 divide f?\nFalse\nLet p be 3/2*7320/45. Let k = 412 - p. Is k a multiple of 14?\nTrue\nSuppose 4*s = 3*s - 2, -214 = -4*w - 5*s. Does 35 divide (-6)/(-21) + 22888/w?\nFalse\nIs (-9)/(12 + 6) + 18519/2 a multiple of 47?\nTrue\nSuppose -4*s - 2508 = 2*v, -s = -30*v + 33*v + 617. Let u = 756 - s. Does 61 divide u?\nFalse\nLet a(z) be the first derivative of -z**4/4 - 25*z**3/3 + 47*z**2/2 - 105*z + 309. Does 21 divide a(-27)?\nTrue\nLet m be -5 + (-231)/(-49) - (-46)/14. Suppose m = -p, -8*j - 3*p = -7*j - 7. Does 14 divide j?\nFalse\nSuppose q - 2*m = 11, 12 = 4*q - 4*m - 12. Is 15 a factor of q + 5/(-7) + 71251/301?\nFalse\nLet f = 540 - -3555. Does 57 divide f?\nFalse\nLet u = 29 - 73. Let v = u + 43. Is 14 + 144 + 0 + v" +"\nSuppose 4*l + 508 = -4*o, 3*o - l + 376 = l. What is o rounded to the nearest 10?\n-130\nSuppose -3*k - 1200012 = 2*a + k, -1799994 = 3*a - 2*k. Round a to the nearest 1000000.\n-1000000\nLet x be (0 - (-123)/(-6))*-200. Round x to the nearest one thousand.\n4000\nLet c = 127.0933 - 130.69. Let s = 18 - 21.6. Let y = c - s. Round y to three decimal places.\n0.003\nLet t = 5.11 - 5.110682. What is t rounded to four dps?\n-0.0007\nLet a = 0.45 + -0.54. Round a to one dp.\n-0.1\nSuppose -48 = -3*q + 18. Round q to the nearest 10.\n20\nLet z = 1.5 + -9.4. Round z to zero decimal places.\n-8\nLet j = -12.9 - -13. Let g = 3.1 + j. What is g rounded to the nearest integer?\n3\nLet t = 25.832 + -26. What is t rounded to two decimal places?\n-0.17\nLet h = -38 - -101. Let q = 9 - h. Let p = q - -53.99961. What is p rounded to four dps?\n-0.0004\nSuppose 6*v + 0 =" +" = -129*z**3 + 3*z**2 + 2*z - 2. What is the least common multiple of g(-2) and 14?\n7266\nLet u(f) = -40*f - 146. Calculate the smallest common multiple of 4 and u(-5).\n108\nLet o = -5505359/119 + 46264. Find the common denominator of o and -13/7.\n119\nSuppose 0 = 3*v - 8*v - 2*s + 124, 0 = 2*s - 4. Calculate the lowest common multiple of v and 96.\n96\nWhat is the common denominator of -37/2 and (198/(-9933))/(20/7)?\n430\nLet j(a) = -318*a - 3. Calculate the least common multiple of j(-1) and 270.\n1890\nLet l = -15191 - -243141/16. Let g = -600 + 2339/4. Find the common denominator of g and l.\n16\nSuppose -3*h - h + 5*w + 1032 = 0, 3*h + 3*w = 774. What is the smallest common multiple of h and 51?\n4386\nSuppose q - 5*q - g = -471, 3*q - 377 = 4*g. Find the common denominator of -17/22 and (43/(-8))/(5 - q/28).\n66\nLet b be 1/(-6) + 161043/54. Let x = -2974 + b. Let j = 1057/2 - 567. Find the common denominator of x and j.\n18\nFind" +"ultiple of o(5) and 12?\n60\nLet j be (10/(-20))/(1/12). Find the common denominator of (520/24)/(44/j) and 91/18.\n198\nLet r = 109483/20 + -5472. Let a = -124666/103 + 34042929/26780. Let v = a + -771/13. What is the common denominator of r and v?\n20\nLet i be -1 + -1 + 4875/2451. Let j = -38579/16340 - i. Find the common denominator of j and 1 + 0 - 13/(-10).\n20\nLet g = 101 - 70. Let h = -22 + g. Calculate the least common multiple of h and 3/(2/(-8)*-3).\n36\nLet d = 17257633447/4089189834 + 2/7833697. Let i = 34/87 + d. What is the common denominator of -19/12 and i?\n36\nLet y(f) = f**3 + 6*f**2 - 6*f + 9. Let h be y(-7). Suppose -h*o + 5 = -7. What is the lowest common multiple of o and 1?\n6\nLet y be (-5)/(-10) + 10/4. What is the lowest common multiple of y - -1 - 20/(-2) and 2?\n14\nLet x = -381/82 + 27835/2214. Let o = x - 445/189. Calculate the common denominator of ((-2)/(-10))/((-4)/(-650)) and o.\n14\nSuppose 0*k = 4*k + 612. Let v be" +"**3 + h + 1. Let m be n(2). Let g = m - -7. Which is bigger: 1 or g?\ng\nLet l = 8 + -4. Let w(o) = -10 + 0*o**3 + 15*o**2 + 2*o**3 + 13*o - o**3. Let u be w(-14). Is l less than u?\nFalse\nSuppose 0 = -r + 4*r - 4*f + 3, -4*f = -4*r. Suppose 7*a = 10*a - r. Is a less than or equal to 1/16?\nFalse\nLet p be (-4)/(-40)*4*1. Let c = 3.4 - -1.6. Which is smaller: p or c?\np\nLet r = 0.2 - 0.4. Let p = 49 + -50. Is p not equal to r?\nTrue\nLet f = 0.8 - -0.2. Let w = 23 - 23.9. Let y = w + f. Are y and 2/7 unequal?\nTrue\nLet q be (2 - 1*1079591) + 0. Let m = 717926961/665 + q. Let l = -2/133 + m. Which is smaller: l or -1?\n-1\nLet p be (-1)/2 + 2/(-4). Let h = -51/8 + 27/4. Which is smaller: p or h?\np\nLet f(t) = t**2 - 5*t + 4. Let h = 12 + -8." +" 103350 and 1960205.\n3445\nWhat is the greatest common divisor of 2625608620 and 20?\n20\nCalculate the highest common divisor of 65065 and 72435.\n55\nWhat is the highest common factor of 506 and 82491662?\n506\nCalculate the greatest common divisor of 4943191 and 253.\n11\nWhat is the greatest common factor of 3105 and 11106?\n9\nCalculate the highest common divisor of 196993545 and 630.\n105\nWhat is the highest common factor of 80109 and 171183?\n129\nCalculate the highest common factor of 2383378 and 752902.\n974\nWhat is the highest common divisor of 10091280 and 2000?\n80\nCalculate the highest common divisor of 204096 and 37248.\n192\nCalculate the greatest common factor of 1365 and 42775005.\n1365\nWhat is the greatest common factor of 4437 and 12385146?\n1479\nWhat is the greatest common factor of 653934 and 102?\n6\nWhat is the greatest common factor of 15148 and 39725?\n7\nCalculate the highest common factor of 78306 and 75524874.\n2526\nCalculate the highest common divisor of 756 and 165919131.\n189\nWhat is the greatest common divisor of 334458 and 216648?\n306\nCalculate the greatest common factor of 2058954 and 2109.\n57\nWhat is the highest common factor of" +"5?\n5\nWhat is the hundred thousands digit of 104216?\n1\nWhat is the units digit of 27375?\n5\nWhat is the tens digit of 35176528?\n2\nWhat is the ten thousands digit of 252403?\n5\nWhat is the hundreds digit of 4393107?\n1\nWhat is the units digit of 244601?\n1\nWhat is the ten thousands digit of 58547?\n5\nWhat is the hundred thousands digit of 3445181?\n4\nWhat is the units digit of 3273749?\n9\nWhat is the thousands digit of 224786?\n4\nWhat is the thousands digit of 23587122?\n7\nWhat is the thousands digit of 237554?\n7\nWhat is the hundred thousands digit of 8407774?\n4\nWhat is the thousands digit of 21463?\n1\nWhat is the hundreds digit of 5440?\n4\nWhat is the units digit of 13119753?\n3\nWhat is the hundred thousands digit of 14609602?\n6\nWhat is the hundreds digit of 927560?\n5\nWhat is the millions digit of 8371420?\n8\nWhat is the units digit of 3067167?\n7\nWhat is the tens digit of 6057121?\n2\nWhat is the thousands digit of 2370548?\n0\nWhat is the hundreds digit of 111682?\n6\nWhat is the tens digit of 11890?\n9" +"/12. What is the closest to 14 in g, -0.4, -0.5?\n-0.4\nLet w = -60.2048 - -0.2048. Let k = 0.36 + -0.36. What is the closest to -2/3 in k, w, 3?\nk\nLet m be (2/3)/((-20712)/(-36) - 11). Let p = m - 1699/5079. What is the closest to 1 in p, -3, 8/5, 1?\n1\nLet j = 4107 - 3991. What is the nearest to -1 in j, -2/17, 3/8?\n-2/17\nSuppose 267 = -2*l + 253. Which is the nearest to 2/3? (a) 3 (b) 2 (c) l (d) 4\nb\nLet a = 1132 - 1132.1. Let z = 0.1 - -0.1. Let u = 1.6 + -1. What is the nearest to a in u, 0.1, z?\n0.1\nLet y = 3988 + -3986. What is the nearest to y in -3, 5, 82, -2/11?\n-2/11\nLet g = -0.1289 - -0.7289. What is the nearest to 0.3 in 0.2, -0.5, g?\n0.2\nLet u = -179 + 181. Suppose -8 = -v + 5*f, -f = -5*v + v + 13. Which is the closest to -7? (a) u (b) 0 (c) v (d) 2/23\nb\nSuppose 179*z + 40 =" +" is greater: r or 3?\nr\nLet q = 27 - 30. Which is bigger: -5 or q?\nq\nLet t = -7 + 8. Which is smaller: -10 or t?\n-10\nSuppose 2*s + 3*s + 42 = -3*m, -5*m + s = 42. Suppose -135 = -5*u - 0*u. Let r be 6/u - 7/m. Which is greater: -3/11 or r?\nr\nLet j = -1 - -3. Suppose -2*t - t - 84 = 0. Let q be 20/t + (-4)/14. Which is smaller: q or j?\nq\nLet a = 2 - 1. Let c be a/(2 + (-5)/2). Suppose h = 3*j - 8*j - 19, 0 = -5*h - 20. Which is greater: c or j?\nc\nLet i(c) = -c - 15. Let w be i(-13). Is w < -5/9?\nTrue\nSuppose -3 = 3*l - 4*b, -6*l + 3*l + 24 = 5*b. Suppose -q = 4 - l. Which is smaller: q or 0?\nq\nLet f = -2.2 - 2.6. Let x = 5 + f. Let l = x - 0.1. Which is bigger: l or 1?\n1\nLet x(a) = -a**2 - 12*a - 14. Let j be" +"m - 16. What are the prime factors of m?\n2\nSuppose -4*c = -c + 3, 0 = 2*d + 5*c - 745. What are the prime factors of d?\n3, 5\nLet k = 1668 + -1608. Let y(v) = -v - 35. Let h be y(0). Let r = h + k. What are the prime factors of r?\n5\nLet x be (21/6)/((-4)/(-8) - 0). Suppose x*l + 540 = 1695. List the prime factors of l.\n3, 5, 11\nSuppose 8*m - 4*m = 684. What are the prime factors of m?\n3, 19\nSuppose 5*f - 1434 = 2*v, 11*f - 5*v = 10*f + 273. What are the prime factors of f?\n2, 3\nLet g = 183 - -2511. List the prime factors of g.\n2, 3, 449\nSuppose -4*t + 7*t + 252 = 0. Let u = -236 + 360. Let r = u + t. List the prime factors of r.\n2, 5\nSuppose -2*l - 4*c + 5*c + 1024 = 0, -1525 = -3*l - 4*c. List the prime factors of l.\n7, 73\nList the prime factors of 80/25*(7 + 15057/14).\n2, 433\nLet l(d) =" +"common divisor of 3730 and 340.\n10\nCalculate the highest common divisor of 1467722 and 46.\n46\nWhat is the greatest common factor of 217 and 2666?\n31\nWhat is the highest common factor of 55794 and 102?\n102\nWhat is the highest common divisor of 155262 and 8814?\n678\nWhat is the greatest common factor of 8455 and 122360?\n95\nCalculate the highest common factor of 75 and 29075.\n25\nCalculate the highest common divisor of 1285400 and 200.\n200\nWhat is the greatest common factor of 163213 and 5752?\n719\nWhat is the highest common divisor of 39432 and 2862?\n318\nCalculate the greatest common factor of 1840 and 4919056.\n368\nWhat is the greatest common divisor of 2074752 and 32?\n32\nWhat is the greatest common divisor of 22547 and 7?\n7\nWhat is the highest common divisor of 66 and 234?\n6\nCalculate the greatest common factor of 149538 and 6.\n6\nCalculate the highest common factor of 177440 and 620.\n20\nWhat is the greatest common divisor of 1653 and 60987?\n87\nCalculate the greatest common factor of 261 and 162429.\n87\nWhat is the greatest common divisor of 4028 and 836?\n76\nCalculate the" +"t is -198305 - 0.4?\n-198305.4\nCalculate -0.801 - -0.06.\n-0.741\nWhat is 0.1055 plus 0.6?\n0.7055\nWhat is 1.91 - 1?\n0.91\n-3 - 11.11\n-14.11\nTotal of 5099.4 and -4.5.\n5094.9\nPut together -451.1083 and 0.4.\n-450.7083\n50103 - -5\n50108\nCalculate -0.59 + -0.236.\n-0.826\nCalculate 112 + 2.3076.\n114.3076\n-6 + -0.090338\n-6.090338\nTotal of -1.6 and -162.\n-163.6\nWhat is 4 take away 0.145?\n3.855\nWork out -923 - -571.\n-352\nWhat is 4077 plus 1.7?\n4078.7\nPut together 3 and -924.\n-921\nWork out -15856 - -0.4.\n-15855.6\nPut together 0.138 and -138.7.\n-138.562\nWhat is -57 - 2931?\n-2988\nWhat is 3 plus 0.27?\n3.27\nSubtract -405494 from -0.1.\n405493.9\n16+84\n100\nAdd -3.08881 and 1.\n-2.08881\nWhat is 0.055239 minus -0.2?\n0.255239\nWhat is 0.07774 less than -2?\n-2.07774\nWhat is the difference between 6 and -8771.09?\n8777.09\nSum -0.0008 and -134.\n-134.0008\nWork out -0.14 + 53.\n52.86\nWhat is -0.1 less than -99882.4?\n-99882.3\nSum 8 and 8.\n16\n4595 - -2\n4597\nWhat is -8.68 - 1.1?\n-9.78\nCalculate 0.028 + 0.402.\n0.43\nSubtract -2 from 35163.7.\n35165.7\nSum -38 and 118.\n80\nAdd 0.78 and 21.2.\n21.98\nWhat" +"1, 33119, 45089?\n921*t**2 - 3*t - 19\nWhat is the z'th term of 4847, 9700, 14553, 19406?\n4853*z - 6\nWhat is the z'th term of 121, 134, 139, 136, 125?\n-4*z**2 + 25*z + 100\nWhat is the j'th term of 179, 755, 1725, 3089, 4847, 6999?\n197*j**2 - 15*j - 3\nWhat is the v'th term of 164162, 164168, 164178, 164192, 164210, 164232, 164258?\n2*v**2 + 164160\nWhat is the w'th term of 197499, 395007, 592515, 790023?\n197508*w - 9\nWhat is the h'th term of 367, 571, 809, 1087, 1411, 1787, 2221, 2719?\nh**3 + 11*h**2 + 164*h + 191\nWhat is the u'th term of 83128, 83107, 83076, 83029, 82960, 82863, 82732, 82561?\n-u**3 + u**2 - 17*u + 83145\nWhat is the l'th term of -2516, -4932, -7348, -9764, -12180, -14596?\n-2416*l - 100\nWhat is the q'th term of 134790, 269566, 404328, 539070, 673786?\n-q**3 - q**2 + 134786*q + 6\nWhat is the q'th term of 1278, 1751, 2224, 2697?\n473*q + 805\nWhat is the c'th term of 199, 616, 1253, 2110, 3187, 4484, 6001?\n110*c**2 + 87*c + 2\nWhat is the q'th term of 287, 994, 2171, 3818, 5935," +"s + 3*s - t + 1829998, -r*s - 5*t = -1219990. What is s rounded to the nearest 100000?\n600000\nLet j = 26 + -32. Let m be (360/14)/(j/84). Round m to the nearest 100.\n-400\nLet a = 144.1505 - 144. Round a to 2 dps.\n0.15\nLet x be (207288/10)/((-4)/(-70)). Suppose 0 = 5*n - 103715 - 905055. Let a = n - x. What is a rounded to the nearest 10000?\n-160000\nLet h = 7969.87 + -8004. What is h rounded to the nearest integer?\n-34\nLet x = 32301618 - 32301979.98198. Let p = -10.01018 - x. Let i = p + -352. Round i to three decimal places.\n-0.028\nSuppose 0 = -4*g + 5*w - 4, 0 = 3*g + 3*w + w + 3. Let h be g + (4992 - (4 - 4)). Suppose 6*p + h = 5*a + 3*p, -5*a + p = -4997. Round a to the nearest 10000.\n0\nLet l(y) = -11*y**3 + y**2 - 16*y - 60. Let w be l(-6). Round w to the nearest one hundred.\n2400\nLet y = -4262.2 + 4712. What is y rounded to the nearest ten?" +"8, -496, -776?\n-1118\nWhat comes next: 2342, 2350, 2362, 2378?\n2398\nWhat is the next term in 562, 1117, 1668, 2215, 2758, 3297, 3832?\n4363\nWhat is the next term in 113, 231, 355, 485, 621, 763, 911?\n1065\nWhat is the next term in 109, 218, 327?\n436\nWhat comes next: 352, 351, 350?\n349\nWhat is next in 129, 255, 381, 507, 633, 759?\n885\nWhat comes next: -161, -342, -525, -710, -897?\n-1086\nWhat is the next term in -35, -25, -15, -5?\n5\nWhat comes next: -23, -65, -107?\n-149\nWhat is next in -36401, -36400, -36399?\n-36398\nWhat is the next term in 230, 460, 690, 920, 1150?\n1380\nWhat is the next term in 86, 342, 766, 1358, 2118, 3046?\n4142\nWhat is the next term in 24, 35, 52, 75, 104?\n139\nWhat comes next: -101, -353, -773, -1361?\n-2117\nWhat is the next term in -10, -114, -398, -952, -1866, -3230, -5134, -7668?\n-10922\nWhat is next in 8, 4, 2, 2, 4, 8?\n14\nWhat is next in 52, 7, -38, -83, -128?\n-173\nWhat is next in 1817, 1819, 1821, 1823, 1825, 1827?\n1829\nWhat comes next: 21, 20," +" - 1354 = -274 for x.\n-15\nSolve 2376 = 22*t + 2310 for t.\n3\nSolve 12677*r - 12696*r = 133 for r.\n-7\nSolve 37*h = 17*h + 19*h + 23 for h.\n23\nSolve 142*v - 19062 = -482*v - 82*v for v.\n27\nSolve -23*o - 83 - 463 - 167 = 0 for o.\n-31\nSolve -841*m + 57 = -860*m for m.\n-3\nSolve 313*g - 514*g = 2211 for g.\n-11\nSolve -6*l + l = 8*l + 156 for l.\n-12\nSolve 2 + 23 = 16*y - 103 for y.\n8\nSolve -102*b = 67*b + 211*b - 70*b for b.\n0\nSolve 323158 = -13*q + 323392 for q.\n18\nSolve 49*q - 2891 + 2548 = 0 for q.\n7\nSolve -13*k + 24 - 114 = 118 for k.\n-16\nSolve 45 = 43*r - 48*r - 5 for r.\n-10\nSolve -436*w + 6499 = -477 for w.\n16\nSolve 20*r - 144 + 68 = -496 for r.\n-21\nSolve 1307 = 41*x + 651 for x.\n16\nSolve -90 = 198*m - 168*m for m.\n-3\nSolve -166*y + 180 = -80*y - 77*y for" +"0.21. Let x = 1465.21 - 1457. Let r = x - a. Round r to the nearest integer.\n8\nLet y = 7.2 + -8. Let p = 0.3 - y. Let c = 1.100001 - p. What is c rounded to 7 decimal places?\n0.000001\nLet w = -13.3 - -15.08. Let j = w + -1.7638. What is j rounded to 3 decimal places?\n0.016\nLet y(f) = -13*f - 4. Let d be y(-2). Let z = 122 - d. What is z rounded to the nearest one thousand?\n0\nLet s = -0.495 - -3.5956. Let k = s + -3.1. What is k rounded to three decimal places?\n0.001\nLet t = 69568979413543 + -69568975964393.7899997. Let g = -3449149 + t. Let y = g - 0.21. What is y rounded to 6 decimal places?\n0\nLet v = -203.16 + 2.06. What is v rounded to the nearest ten?\n-200\nLet t(z) = 7*z - 4. Let u(x) = -8*x + 5. Let n(f) = -7*t(f) - 6*u(f). Let d be n(-7). Suppose -26 = o - d. Round o to the nearest ten.\n-20\nLet s = -1175.988465 + 1176. Round s" +" = -6*k, w = 4*u + 4*k for u.\n2\nLet w = 4597 + -4595. Solve 0 = -5*a - w*n + 3, -4*n = -1 + 5 for a.\n1\nSuppose 21*j = 51 + 75. Suppose t + j = 3*t. Solve -3*m + t*n = 0, n - 8 = m + 4*n for m.\n-2\nLet h(w) = -2*w**2 - 48*w - 25. Let o be h(-23). Suppose 78 = 5*m + o*m. Solve 4*s = 3*s - 2*r + 11, 6 = m*s - 3*r for s.\n5\nSuppose 51*o - 1053 = -4*o - 228. Solve -13*d - u = -o*d + 10, -4*d + u + 18 = 0 for d.\n4\nLet c = 619 + -591. Suppose -c = 17*f - 24*f. Solve f*g + 17 = -3, 29 = -2*t - 5*g for t.\n-2\nLet q(x) = 4*x**2 + 274*x - 550. Let y be q(2). Solve -y*b + 11*b = -i - 10, 3*i - 22 = -4*b for i.\n2\nSuppose -727*t = -722*t - 4*o - 159, -3*t + 95 = -2*o. Solve -3*v - 4*z + 3 = 0, v - 26*z + t*z" +"226 = 0, 4*g = -i - i + 1478. Is i composite?\nTrue\nLet o(j) = 536*j**3 - j**2 + j - 1. Let f be o(1). Suppose -f + 3094 = 3*t. Is t prime?\nTrue\nSuppose -12*x = -37*x + 10175. Is x a composite number?\nTrue\nLet m(y) = 6*y**2 - y - 1. Let o be m(-1). Suppose o*x - 3*x = 777. Is x composite?\nTrue\nSuppose 5*m = -2*u - 10 - 40, 2*m + 21 = -u. Let g(c) = -3*c + 7. Let y be g(m). Is y - (-2 - 1)/1 composite?\nTrue\nLet h be 4/10 + (-448)/70. Let d = h - -10. Suppose -58 = -2*b + d*n, 3*b + 0*b - n = 92. Is b a prime number?\nTrue\nSuppose 272679 = 31*j + 2*j. Is j a composite number?\nFalse\nSuppose 0 = 9*n - 11*n + 4. Suppose -3*k = n*k - 25, 5*r + 3*k = 10. Is ((-161)/r)/(-2 - -3) prime?\nFalse\nLet g be 3/((-54)/(-60)) + (-1)/3. Suppose i - 1 + 4 = 0. Is (g/i)/(5/(-2185)) a composite number?\nTrue\nLet b be ((-33)/(-4))/((-3)/12). Let f be (-105)/b -" +"2*t + 405. Let y(n) = n**2 + 19*n - 203. Give 3*g(b) + 5*y(b).\n2*b**2 - b + 200\nLet o(n) = -192*n + 4. Let q(g) = 769*g - 14. What is -22*o(w) - 6*q(w)?\n-390*w - 4\nLet t(b) = 363*b**2 - 21*b + 7. Let r(i) = 483*i**2 - 28*i + 9. What is 7*r(a) - 9*t(a)?\n114*a**2 - 7*a\nLet z(d) = 4*d - 6. Suppose 16 = -3*m - m. Let u(x) = 3*x - 5. Let v(o) = m*z(o) + 5*u(o). Let i(s) = 0 - 2*s + 2 - 6 + 1. Calculate -2*i(f) + 6*v(f).\n-2*f\nLet u(i) = -i + 7. Let n = 34760 - 34765. Let p(k) = -2*k + 13. Determine n*u(x) + 2*p(x).\nx - 9\nLet a(k) = -4*k - 4. Let x(w) = -2*w - 2. Let c = 234 - 173. Suppose -c = 8*u - 13. Calculate u*a(y) + 13*x(y).\n-2*y - 2\nLet o(h) = -2*h**3 - 5*h**2 - 4*h - 3. Let u(y) = 4*y**3 + 11*y**2 + 9*y + 6. Let a(k) = 16*k + 45. Let b be a(5). Let v = 129 - b. What is v*u(r)" +"se 13, what is -3543 - -6?\n-353a\nIn base 16, what is -1fd88 - 6?\n-1fd8e\nIn base 3, what is -101 - 21220221?\n-21221022\nIn base 12, what is -330550 - -2?\n-33054a\nIn base 16, what is -73b + -30?\n-76b\nIn base 3, what is 12 - -10100220110?\n10100220122\nIn base 3, what is 212 + 122222?\n200211\nIn base 11, what is -2853 - 8?\n-2860\nIn base 5, what is 110 - -42443?\n43103\nIn base 15, what is 2 + -db60?\n-db5d\nIn base 11, what is -52 - 393?\n-435\nIn base 3, what is 2 - -1112221?\n1120000\nIn base 9, what is 4 + -8646?\n-8642\nIn base 12, what is -7b35 + -8b?\n-8004\nIn base 9, what is -4 + -52525?\n-52530\nIn base 9, what is 1413338 - 3?\n1413335\nIn base 2, what is -1000011 + 10100100110000?\n10100011101101\nIn base 2, what is -1001000111110 - -10101?\n-1001000101001\nIn base 6, what is -535542 - 32?\n-540014\nIn base 15, what is 1c88 + 2?\n1c8a\nIn base 13, what is 1 + 91a68?\n91a69\nIn base 2, what is 1 + -1001000100001011?\n-1001000100001010\nIn base 8," +"e -46520066 divided by -226.\n205841\nDivide -46284058 by 12.\n-23142029/6\nCalculate 367186176 divided by 8.\n45898272\nWhat is -3405257 divided by 5?\n-3405257/5\n251107370 divided by -1927\n-130310\nDivide 3432340 by -858085.\n-4\nWhat is -6558720 divided by 10?\n-655872\nDivide 0 by -419916.\n0\nCalculate 63895527 divided by 99993.\n639\n45 divided by 3797672\n45/3797672\n2316 divided by -5672\n-579/1418\nWhat is -172115691 divided by -11?\n15646881\nWhat is 12246003 divided by 3017?\n4059\n-3706902 divided by 6117\n-606\nDivide 7500 by 5954.\n3750/2977\n-2290218 divided by -109058\n21\nCalculate 108784144 divided by -420016.\n-259\nWhat is -88797408 divided by -226524?\n392\nWhat is 1870553210 divided by 5?\n374110642\nCalculate -2764950 divided by 460825.\n-6\n827463 divided by -54\n-275821/18\nCalculate -105118431 divided by -467.\n225093\nDivide -427584400 by -3265.\n130960\nDivide 345114143 by 39071.\n8833\nDivide 1780659 by -197851.\n-9\n-109 divided by -311833\n109/311833\n-29949 divided by -1018\n29949/1018\nDivide 94281 by -25.\n-94281/25\nDivide -56454615 by -3.\n18818205\nCalculate -37 divided by 2136511.\n-37/2136511\nWhat is -4 divided by -4401227?\n4/4401227\nCalculate 5059640 divided by -505964.\n-10\nDivide 5 by -5372089.\n-5/5372089\nDivide 130523943 by -3.\n-43507981\n25778205 divided by 166311\n155\nWhat is -21679899" +" + r. Does 15 divide v?\nTrue\nSuppose -3*q - 5*b = -58 + 9, -q - 7 = -3*b. Let w be (-4 - (-3 - -2)) + 1 + 9. Is 3 a factor of 4/(q/w)*2?\nFalse\nLet b = -7 - -10. Suppose -5*i + 4*c - 5 = 0, -4*c = -0*i + 4*i - 32. Suppose u = b + i. Does 6 divide u?\nTrue\nIs 16 a factor of (-228)/(-15) + 4/5?\nTrue\nLet v be ((-336)/(-9))/((-6)/18). Let j = v - -175. Does 21 divide j?\nTrue\nLet j(h) = -4*h + 6. Is 11 a factor of j(-4)?\nTrue\nSuppose -4*f + 20 = 0, 5*r + 2*f + f = 60. Let z = 24 - r. Is z a multiple of 5?\nTrue\nLet l(c) = -2*c + 2 + 8*c**2 - 4 + 3 - 2. Suppose 2*t - 2 = t. Does 13 divide l(t)?\nFalse\nIs 4 a factor of (24/16)/(1/6)?\nFalse\nSuppose n + n = 46. Is 12 a factor of n?\nFalse\nSuppose -3*v - 3*p + 93 = 0, -4*p = v - 45 + 8. Does 4 divide v?\nFalse\nLet" +"y 21?\n19\nWhat is the remainder when 47 is divided by 21?\n5\nCalculate the remainder when 33 is divided by 13.\n7\nWhat is the remainder when 1357 is divided by 34?\n31\nCalculate the remainder when 4719 is divided by 59.\n58\nCalculate the remainder when 345 is divided by 146.\n53\nCalculate the remainder when 1552 is divided by 515.\n7\nCalculate the remainder when 100 is divided by 18.\n10\nCalculate the remainder when 356 is divided by 116.\n8\nCalculate the remainder when 352 is divided by 131.\n90\nWhat is the remainder when 29369 is divided by 22?\n21\nWhat is the remainder when 645 is divided by 36?\n33\nCalculate the remainder when 437 is divided by 34.\n29\nWhat is the remainder when 154 is divided by 74?\n6\nCalculate the remainder when 96 is divided by 29.\n9\nCalculate the remainder when 266 is divided by 88.\n2\nWhat is the remainder when 268 is divided by 134?\n0\nWhat is the remainder when 3021 is divided by 24?\n21\nWhat is the remainder when 5802 is divided by 1931?\n9\nCalculate the remainder when 137 is divided by 9." +"16.02 - 16.01998325. Round u to six dps.\n0.000017\nLet s = 530.6 - 391. What is s rounded to the nearest ten?\n140\nLet w = -2 + -0.3. Let y = 2.055 + w. Round y to 2 decimal places.\n-0.25\nLet x = 2.536 + 0.004. Round x to the nearest integer.\n3\nLet t = 240 - 237.71. Let c = t + -2.2899843. What is c rounded to 6 decimal places?\n0.000016\nLet d = -188.2 - -174. Let g = -3.8 + d. Let n = g + 18.15. What is n rounded to 1 decimal place?\n0.2\nSuppose 0 = 6*a + 6*a - 2174940. Let m = -321245 + a. What is m rounded to the nearest one hundred thousand?\n-100000\nSuppose -4944 = 9*j + 2517. Round j to the nearest one hundred.\n-800\nLet j = 30.7 - 31.0109. Let y = j - -0.31. What is y rounded to four dps?\n-0.0009\nLet c = 8.68000551 + -8.68. Round c to 7 dps.\n0.0000055\nLet o = 1.3 + -2. Let g = -0.3 - o. Let t = g - -3.2. Round t to the nearest integer.\n4" +"3823*m + 60. Is f(-7) a prime number?\nTrue\nSuppose -1291 = 2*d - 5753. Is d prime?\nFalse\nLet x = -524 - -25635. Is x a composite number?\nFalse\nLet g be (2 + -4 + 2)*1/(-3). Is (0 - g - -11)/(28/2324) composite?\nTrue\nSuppose 946 = 14*j - 3380. Is j composite?\nTrue\nLet v be 4/14*728/104. Let q = 10 + -6. Suppose v*y - q*y - 256 = -2*m, 4*m - 506 = -2*y. Is m prime?\nTrue\nSuppose 0 = -4*h + 4 + 16. Suppose h*l + 4333 = -2387. Is 5/(-15) - l/9 a composite number?\nFalse\nLet p be 2630/15*(0 - -3) + 3. Let u = -168 + p. Is u prime?\nFalse\nLet u be (1*153)/(7 + -6). Let z = u + 52. Is z a prime number?\nFalse\nSuppose 2*v - 3*u = 31703, 5*u - 15884 = 12*v - 13*v. Is v a composite number?\nFalse\nSuppose -r = -6*r + 3140. Let n = r + -179. Is n prime?\nTrue\nSuppose -12*d = -7*d - 50. Suppose -2*m - 972 = -2*i, i = 2*m + d + 477. Is i a composite" +" of 1018255 and 2765.\n35\nCalculate the highest common factor of 6103728 and 29394.\n1278\nWhat is the highest common divisor of 660 and 2590670940?\n660\nWhat is the highest common divisor of 637267530 and 30?\n30\nWhat is the greatest common divisor of 16218680 and 10120?\n920\nWhat is the greatest common factor of 100 and 29719960?\n20\nCalculate the highest common divisor of 337179 and 3479.\n71\nWhat is the greatest common factor of 3163080 and 5676?\n516\nWhat is the greatest common factor of 96833979 and 71208?\n8901\nWhat is the greatest common divisor of 16600308 and 60?\n12\nCalculate the greatest common divisor of 15 and 186010485.\n15\nWhat is the greatest common divisor of 22296 and 158864?\n8\nWhat is the highest common divisor of 35244398 and 938?\n14\nWhat is the highest common factor of 348376524 and 72?\n12\nWhat is the greatest common divisor of 524048344 and 5768?\n824\nCalculate the highest common divisor of 6 and 52663386.\n6\nCalculate the highest common divisor of 56574 and 16457.\n7\nCalculate the greatest common divisor of 55522 and 10614358.\n2414\nWhat is the highest common divisor of 2996954 and 16722?\n1858\nWhat is the" +"-16 - 2/(-11). Give i(o).\n-9\nLet a(z) be the second derivative of z**3/2 - 29*z**2/2 + 2*z - 72. What is a(-9)?\n-56\nSuppose -5*o - 3*h + 50 = 0, 6*o - 3*h = 4*o - 1. Let p be ((-6)/(-42)*o)/(1/(-1)). Let s(u) = 9*u**2 - u. Calculate s(p).\n10\nLet x(j) = -2*j + 9 + 10 - 28. Let d(m) = -31*m - 720. Let z be d(-23). Determine x(z).\n5\nSuppose -3*j + 67*a + 73 = 62*a, j = 3*a + 35. Let p(k) = -k**3 + 13*k**2 - 22*k + 19. Determine p(j).\n19\nLet b = 1 - 3. Let p(t) = t + 47. Let y be p(-20). Let q(o) = 32 + 36 + o - 91 + y. Determine q(b).\n2\nLet w(v) = -v**2 - 2*v + 1. Suppose 100 = -3*g - i + 113, -4*g + 32 = 5*i. What is w(g)?\n-14\nLet z(l) = -l**2 + 4 - 14*l + 15*l + 0 - 2 - 17*l. Determine z(-13).\n41\nLet y(a) be the first derivative of -a**5/20 - a**4/6 + a**3/3 + 3*a**2/2 - 53*a - 151. Let j(i) be the first derivative" +" - q = u*q + 4, 4*z = 3*q + 16 for z.\n4\nLet m = 21 + -14. Let i = m + -3. Let q = 20106 - 20104. Solve 2*v + 0 = w - i, -q*w + 8 = 5*v for w.\n4\nSuppose -140 = -45*n - 50. Solve -n*l = -3*h + 11, -h - 15 = 4*l - 0*h for l.\n-4\nLet s(x) = 23*x + 142. Let l be s(10). Let t = l + -367. Solve 3*f - 4*n + 6 = -0*n, -t*f + 1 = -3*n for f.\n2\nSuppose -9*j = -16*j + 21. Suppose -j*t = t - 44. Let q(o) = -o**3 + 11*o**2 + o - 6. Let u be q(t). Solve x - 4*z + 1 = u, -2*x - 16 = 4*z for x.\n-4\nLet x be -2*-2*(-327)/(-12). Suppose -z + x = 4*y + 32, 65 = 4*y + 5*z. Let d be 345/12 - (-5)/y. Solve -2*j = -6*j + 16, -j = 5*s - d for s.\n5\nSuppose 54*d - 21*d - 6897 = 0. Let h = d + -192. Solve -3 = -2*i -" +"- a. What is the remainder when 9 is divided by p?\n4\nLet s = 177 - 174. Calculate the remainder when 36 is divided by s.\n0\nSuppose -2*l + 4 - 10 = -4*v, 13 = 4*v + 5*l. Let q = -28 - -35. Calculate the remainder when q is divided by (1 - 0)*v*2.\n3\nLet f be (-3)/(-2)*(-70)/(-15). Suppose f*q - 3*q - 112 = 0. What is the remainder when 82 is divided by q?\n26\nSuppose -m = 2*z + 1, 2*m + 4*z = -2*m - 8. What is the remainder when 5 is divided by (m + -2)*(-6)/10?\n2\nSuppose 0*c = -2*c + 68. Let y = -4 + 9. Let s(t) = t**2 - 2*t + 3. Calculate the remainder when c is divided by s(y).\n16\nLet h = -60 - -118. Calculate the remainder when h is divided by 20.\n18\nLet l = 1 - -1. Suppose -r - r = -l*n, 2*n = 8. Suppose 4*g = 2*i - 2, -5*i - 4*g = -2*g - 17. Calculate the remainder when r is divided by i.\n1\nSuppose -4*u + l = -13, u" +"64, 2325, 3486?\n4647\nWhat comes next: -1463, -2919, -4375, -5831?\n-7287\nWhat is next in 33, 28, 21, 12, 1, -12, -27?\n-44\nWhat is next in -4, -24, -58, -112, -192, -304?\n-454\nWhat is the next term in 52, 72, 92, 112, 132?\n152\nWhat is the next term in -191, -196, -213, -248, -307?\n-396\nWhat is the next term in -25933, -25937, -25943, -25951, -25961?\n-25973\nWhat is next in 50, 106, 162, 218, 274?\n330\nWhat is next in -19, -63, -203, -493, -987, -1739, -2803, -4233?\n-6083\nWhat is the next term in -1807, -7262, -16353, -29080?\n-45443\nWhat is next in -300, -303, -306, -309?\n-312\nWhat comes next: -347, -349, -351, -353, -355?\n-357\nWhat comes next: -28, -32, -36, -40, -44, -48?\n-52\nWhat comes next: 289, 287, 275, 247, 197?\n119\nWhat is next in 22, 101, 314, 727, 1406, 2417, 3826, 5699?\n8102\nWhat comes next: 192, 766, 1722, 3060, 4780, 6882?\n9366\nWhat is next in 4, 5, 0, -17, -52, -111, -200?\n-325\nWhat is the next term in -7864, -15730, -23596?\n-31462\nWhat comes next: 82, 98, 132, 190, 278, 402, 568?\n782\nWhat comes" +"ber?\nFalse\nSuppose -6*r - 1191416 = -18*r + 4*c, -5*r + 4*c + 496407 = 0. Is r prime?\nFalse\nLet k be (-4)/(-3 + -1)*(43 + 0). Let q = k - 49. Is ((-3)/9 + 5770/q)/(-2) composite?\nTrue\nLet l be (0 - (-2 + 10*2)) + -2. Let y = 417 - l. Let v = y + 194. Is v composite?\nFalse\nSuppose 2*x + 2*m - 14 = 0, 4*x - 1 + 8 = 3*m. Let l be 12/(-8)*4/(-3)*x. Suppose c - 629 = 4*r, -4*c - l*r = -7*c + 1911. Is c composite?\nFalse\nSuppose w = -2*i + 36199, 9*w = 5*w - 4*i + 144784. Is w a composite number?\nTrue\nLet z = -755 + -1918. Let h = -1054 - z. Is h prime?\nTrue\nLet p = 676173 + -70864. Is p composite?\nFalse\nLet j(l) = 8*l**2 + 3*l - 8. Let s be j(-4). Suppose 162 = -3*r - 2*k - 0*k, -5*k + s = -2*r. Let m = 11 - r. Is m a composite number?\nTrue\nSuppose -93*l + 90*l = 3*u - 20136, 3*l - u - 20124 = 0." +"= o + -0.3. Which is smaller: h or i?\ni\nLet l = -10.349 + 0.449. Let a = 0 - -1. Which is smaller: a or l?\nl\nLet c = -8/58137 + -167957737/406959. Let x = c + 49365/119. Which is smaller: x or 2?\n2\nLet y be ((-32)/((-2016)/(-147)))/((-2)/6). Is 37/5 less than or equal to y?\nFalse\nSuppose 0*s = 3*z + 2*s + 44, z = -s - 15. Let k be z/(-21) - (-122)/24. Suppose -3*y - 16 = -0*h - 2*h, 5*y = -10. Is h >= k?\nFalse\nLet t = 271081/83128037 - 5/43591. Which is bigger: 0 or t?\nt\nSuppose 2*j - 5*j = -3. Suppose 7566 = 6*q - 1332. Let h = q + -54868/37. Which is bigger: j or h?\nj\nSuppose 0 = 3*t - 3, -6*x + 9*x - t + 46 = 0. Which is smaller: -5 or x?\nx\nLet p be ((-19)/(1995/(-90)))/(1/7) - 5. Let b be (-2)/(1086/1095) - -2. Which is bigger: b or p?\np\nLet r = -117/17 - -10681/1547. Is r less than -0.13?\nFalse\nLet p(z) = z**3 - 53*z**2 + 230*z + 324. Let j" +"ound 0.0010834604 to 7 decimal places.\n0.0010835\nWhat is -0.00000037416 rounded to 7 dps?\n-0.0000004\nRound 0.04500319 to 2 decimal places.\n0.05\nRound -3.659552 to 0 decimal places.\n-4\nRound 337100000 to the nearest one million.\n337000000\nRound -39779.8 to the nearest one thousand.\n-40000\nWhat is 0.011109894 rounded to three dps?\n0.011\nRound 0.00501925 to 3 dps.\n0.005\nWhat is -29082.79 rounded to the nearest 100000?\n0\nWhat is 0.0006771772 rounded to 4 decimal places?\n0.0007\nRound -0.00189078 to 4 decimal places.\n-0.0019\nWhat is 0.812016 rounded to 2 decimal places?\n0.81\nRound -0.00038719 to 3 dps.\n0\nRound -3.5328 to 0 decimal places.\n-4\nWhat is 0.00002081199 rounded to 7 dps?\n0.0000208\nRound -0.0000231775 to 7 dps.\n-0.0000232\nRound -1.52733 to two dps.\n-1.53\nRound 7320.28 to the nearest 10.\n7320\nRound 578337 to the nearest 10000.\n580000\nWhat is 3.97955 rounded to 1 decimal place?\n4\nRound 0.1291945 to 4 decimal places.\n0.1292\nWhat is -1159.78 rounded to the nearest integer?\n-1160\nRound 0.138628 to two dps.\n0.14\nRound -142644 to the nearest ten thousand.\n-140000\nWhat is 2.215179 rounded to 1 dp?\n2.2\nWhat is -272062.7 rounded to the nearest 100000?\n-300000\nRound -512813 to the" +" + -2). Let d be (22688/6 - -2)/(1/z). Round d to the nearest ten thousand.\n-200000\nSuppose 94940181 = -7*o - 131964819. Round o to the nearest 1000000.\n-32000000\nLet u = 6.2 + -2.44. Let v = -3.759378 + u. Round v to 5 dps.\n0.00062\nLet s = -613.9 - -613.1318. Let q = 24.2548 - s. Let r = 25 - q. Round r to two decimal places.\n-0.02\nLet f = -265.87 - -4.87. Let r = 261.0000415 + f. Round r to 5 dps.\n0.00004\nLet r = -34.71293939 + 34.712. What is r rounded to 4 dps?\n-0.0009\nLet n = -8 + 2. Let z = 5.14 + n. Let q = 0.860143 + z. Round q to five decimal places.\n0.00014\nLet g = -53.9924 - 6.7706. Round g to 1 decimal place.\n-60.8\nLet g = -62 + 63.113. Let z = 11827.907 + -11828. Let v = z + g. What is v rounded to one dp?\n1\nLet k = 0.48 + 313.52. Let a = k + -313.702. Round a to 2 decimal places.\n0.3\nLet a = -36.587942748 - -36.588. What is a rounded to 5 dps?" +"r(v) = -37*v + 14. Let q be r(-5). Let y = q + -192. Solve 2*h = 5*c + 7, c + y = 5*h + 24 for h.\n-4\nLet n be (-3458)/(-27) - 148/1998. Suppose 5*t + k - 176 = 0, 4*t + 80*k = 76*k + n. Solve -5*z + 1 = l + 25, 0 = 4*z + 5*l + t for z.\n-4\nSuppose -180 + 165 = -5*r. Let a(y) = y - 3. Let k be 8 + (-3 + 1 - 0). Let o be a(k). Solve r*s = o*u - 6, 3*u - 1 = s + s for s.\n-5\nSuppose -f + 23 = 4*d, -3*d = f - 2*d - 8. Suppose 124 = -70*p + 334. Solve -12 = 4*x, -f*v + p*x = 2*x - 18 for v.\n5\nLet r be 12/(-16)*4*17/(-3). Suppose -r = 12*g - 41. Solve -2*y = -g*x + 3*x - 3, -3*y = 3*x - 9 for y.\n0\nSuppose -5*o + 15 = -14*v + 16*v, 2*o - 4*v = -18. Let z be 2 + -5 + 5/o. Solve -4 = 2*w - 0*i + 4*i," +"a + 13. List the prime factors of p(l).\n13\nSuppose -4*s - 3 = -2*w + 13, -5*s = -2*w + 19. Suppose -2*d + w = -14. List the prime factors of d.\n2\nSuppose 5*j - 317 = -2*n, 0*j - 2*j - 4*n + 130 = 0. Suppose 8*r - j = 5*r. What are the prime factors of r?\n3, 7\nSuppose 5*x + 4301 = 22*x. List the prime factors of x.\n11, 23\nLet y = -43 - -80. Suppose -5*b + 3 + 26 = -4*n, -5*b = -2*n - y. What are the prime factors of b?\n3\nLet p = 34 - 17. List the prime factors of p.\n17\nLet q = 0 - -4. Suppose -3*c - 2*c + 60 = -5*k, 0 = -q*c - k + 28. List the prime factors of c.\n2\nSuppose 2*c = 2*x + 4, 4*x - 1 + 15 = 2*c. Let p(v) = 2*v - 1. Let u be p(1). Let j = u - c. What are the prime factors of j?\n2\nLet b be (0*(-2)/(-6))/(-1). Let q be -3*(b - -2)/(-2). Let j(p) = 3*p**2 -" +" 5871718.94199926. Let h = -0.058 - y. What is h rounded to 7 dps?\n0.0000007\nLet i = -0.0527 + 0.05270813. Round i to seven dps.\n0.0000081\nLet d = 2472 - 1258. Let i = -1219.03 + d. Let t = i + 5. Round t to one decimal place.\n0\nLet b = -4.49276 - -4.5. What is b rounded to 3 decimal places?\n0.007\nSuppose 2*i - 11*i = -45. Suppose 2*p + i*o - 15615 = 0, -o - 7785 = -p + 4*o. What is p rounded to the nearest one thousand?\n8000\nLet c(d) = d**3 - 62*d**2 + 40*d - 222. Let p be c(62). Round p to the nearest 10.\n2260\nLet j = -55.017 + 55. Let w = -29606.983021 - -29607. Let f = w + j. What is f rounded to five dps?\n-0.00002\nLet n = -857.0001577 + 857. What is n rounded to four dps?\n-0.0002\nLet w(x) = 6 + 19*x - 3 - 7*x + 9*x. Let o be w(3). Let u be 60/12*o/(-10). Round u to the nearest ten.\n-30\nLet j = 54.019 + -53. Let s = j - -22.945. Let f" +"7055 microseconds to hours.\n0.000000228297375\nConvert 6582.24t to nanograms.\n6582240000000000000\nWhat is 7.615229 millimeters in micrometers?\n7615.229\nWhat is six fifths of a gram in milligrams?\n1200\nHow many litres are there in 6.614346ml?\n0.006614346\nHow many milligrams are there in 8.302455ng?\n0.000008302455\nWhat is 23/3 of a day in minutes?\n11040\nWhat is 7751.274km in nanometers?\n7751274000000000\nHow many micrograms are there in 59/4 of a milligram?\n14750\nHow many grams are there in 6/25 of a kilogram?\n240\nWhat is 871.7905 centimeters in kilometers?\n0.008717905\nWhat is 779638.1ml in litres?\n779.6381\nWhat is fifty-one eighths of a litre in millilitres?\n6375\nHow many millilitres are there in 3/40 of a litre?\n75\nConvert 31.5615 months to decades.\n0.2630125\nConvert 771455.5 millilitres to litres.\n771.4555\nHow many nanoseconds are there in 0.9068376us?\n906.8376\nWhat is 130839.2 millilitres in litres?\n130.8392\nWhat is 965372.5 millennia in months?\n11584470000\nWhat is 43560.81m in kilometers?\n43.56081\nWhat is 63222.55 centuries in millennia?\n6322.255\nConvert 870973.9 meters to nanometers.\n870973900000000\nWhat is 0.0378669 days in nanoseconds?\n3271700160000\nHow many kilograms are there in twenty-seven quarters of a tonne?\n6750\nConvert 2.834203 centuries to years.\n283.4203\nHow many nanograms are there in 3/50 of" +" prime number?\nTrue\nIs 185144939251 prime?\nTrue\nIs 23365955465 composite?\nTrue\nIs 9529275629 a composite number?\nTrue\nIs 45252370483 prime?\nFalse\nIs 361392173 a prime number?\nFalse\nIs 1503675059 a prime number?\nTrue\nIs 759711994 prime?\nFalse\nIs 13515301 composite?\nTrue\nIs 1742061319 a prime number?\nTrue\nIs 397988929411 composite?\nTrue\nIs 1233135151 composite?\nFalse\nIs 677259173 a composite number?\nTrue\nIs 27783667 a prime number?\nFalse\nIs 111055440943 composite?\nFalse\nIs 2950982157 a composite number?\nTrue\nIs 3720050011 composite?\nFalse\nIs 9684991651 composite?\nFalse\nIs 3691124389 composite?\nFalse\nIs 8185622083 a composite number?\nTrue\nIs 1673132327 a prime number?\nTrue\nIs 22452198869 a composite number?\nFalse\nIs 167875442219 prime?\nTrue\nIs 12478905679 composite?\nFalse\nIs 352446737 composite?\nTrue\nIs 387942341 a prime number?\nFalse\nIs 8825992229 a composite number?\nFalse\nIs 11603068459 a composite number?\nTrue\nIs 1699262161 composite?\nFalse\nIs 871142759 a prime number?\nTrue\nIs 8626237981 a composite number?\nTrue\nIs 31643155553 a composite number?\nTrue\nIs 58983163 a prime number?\nFalse\nIs 33748229 a prime number?\nTrue\nIs 1434495061 prime?\nFalse\nIs 4430110451 composite?\nTrue\nIs 1031666173 a composite number?\nTrue\nIs 59259802067 prime?\nTrue\nIs 306990109 prime?\nTrue\nIs 5955114379 a prime number?\nFalse\nIs" +"2/4)/((-5)/(-50))*1. Suppose 5*b - 5*o + 15 = 0, b = 3*b - j*o + 9. Put b, 7, -1, 3 in decreasing order.\n7, 3, -1, b\nSuppose 5*j - 18 = 2*j - 3*i, -2*j = -3*i - 17. Suppose -3*x + j = -8. Sort -3, -5, x in decreasing order.\nx, -3, -5\nLet n(v) = v**2 - 4*v - 2. Let l be n(5). Suppose -200 = -15*b - 13*b - 284. Sort b, l, -8 in decreasing order.\nl, b, -8\nLet h = -0.745 + 0.445. Let a = 0.3 - -0.2. Sort -0.5, 0.3, a, h in increasing order.\n-0.5, h, 0.3, a\nSuppose -16 = -2*i - 5*o + 14, 4*i + o - 78 = 0. Let c be 72/i - 2/(-5). Let y = 59 - 59. Put y, c, 5 in decreasing order.\n5, c, y\nLet y = -0.03 + 2.03. Let j be ((-244)/(-126) + (-4)/18)*(-136)/(-272). Sort -3, y, j, 3.\n-3, j, y, 3\nLet d = -59.67 - -59.74. Suppose 1 = l - 1. Let s be (-1)/(-1 + 2)*l. Sort s, d, -1 in decreasing order.\nd, -1, s\nLet u =" +"Suppose 5*u - 4*n - 63 = q, 2*u + 2*n = -2*n + 42. Calculate the common denominator of -45/8 and 873/u*1/(-6).\n40\nLet t be 4 + -2 + 2 + 2. Let l = -3 + t. What is the least common multiple of l and 8?\n24\nLet m = -35120/13 + 5309/2. Let w = m - -7/13. Find the common denominator of w and 43.\n2\nFind the common denominator of 95/6 and ((-9)/15)/((-4)/(-44)).\n30\nLet f be ((-1643)/(-376))/(18/(-8)). Let j = f + 5/94. Let b = 628 + -4409/7. Find the common denominator of j and b.\n63\nSuppose -2*s - 5 = -5*l, 2*l - 2 = 8. Let x be (0 + (-2)/5)*-10. Suppose -32 = -x*o + 2*o. What is the least common multiple of s and o?\n80\nLet b(m) = m + 3. Calculate the lowest common multiple of b(4) and 21.\n21\nLet z be -55*((-4)/5)/2. Suppose 5*m - z = -x, -6 = -x - 2*x. What is the lowest common multiple of 7 and m?\n28\nSuppose 0 = i + 3*i - 40. Calculate the smallest common multiple of (-2)/(-3) - 84/(-9) and" +"24 divide 123672?\nTrue\nDoes 4 divide 45?\nFalse\nIs 134 a factor of 20541?\nFalse\nIs 7 a factor of 2504?\nFalse\nIs 25 a factor of 775?\nTrue\nIs 4515 a multiple of 3?\nTrue\nIs 114 a factor of 5884?\nFalse\nIs 6 a factor of 662?\nFalse\nIs 16127 a multiple of 11?\nFalse\nDoes 6 divide 2130?\nTrue\nIs 18 a factor of 5523?\nFalse\nIs 55 even?\nFalse\nIs 265 a multiple of 4?\nFalse\nIs 123 a multiple of 41?\nTrue\nIs 1344 a multiple of 18?\nFalse\nDoes 9 divide 1161?\nTrue\nIs 72 a factor of 2952?\nTrue\nIs 56 a factor of 19312?\nFalse\nDoes 7 divide 739?\nFalse\nIs 4060 a multiple of 70?\nTrue\nIs 71 a factor of 1147?\nFalse\nIs 24 a factor of 3432?\nTrue\nIs 596 a multiple of 14?\nFalse\nDoes 4 divide 500?\nTrue\nIs 1212 a multiple of 12?\nTrue\nIs 15 a factor of 2700?\nTrue\nDoes 76 divide 12008?\nTrue\nIs 14 a factor of 36705?\nFalse\nDoes 100 divide 14000?\nTrue\nIs 113 a multiple of 5?\nFalse\nIs 1812 a multiple of 12?\nTrue\nIs 41 a" +"-14 + 168a5?\n16891\nIn base 11, what is -5 - 26218530?\n-26218535\nIn base 11, what is -6553a5061 + -1?\n-6553a5062\nIn base 8, what is 45707 + -42?\n45645\nIn base 3, what is 10 + -10212020011110001?\n-10212020011102221\nIn base 13, what is 5 - -112284?\n112289\nIn base 12, what is 4547a8 + -16?\n454792\nIn base 2, what is -10000101011010111 + 10100001010?\n-10000010111001101\nIn base 4, what is 10 - -23302122022?\n23302122032\nIn base 11, what is -3339997 - -15?\n-3339982\nIn base 8, what is -1 + -414442155?\n-414442156\nIn base 15, what is -4631 - 70?\n-46a1\nIn base 15, what is 5 + bbba12?\nbbba17\nIn base 13, what is -a - -54b806?\n54b7c9\nIn base 16, what is -415a - d1?\n-422b\nIn base 2, what is 110110011001000110001 + -10001110?\n110110011000110100011\nIn base 12, what is -44686 - -778?\n-43b0a\nIn base 7, what is -22326 + 215?\n-22111\nIn base 16, what is 5 + 2a947a?\n2a947f\nIn base 5, what is -233 - 1240323241?\n-1240324024\nIn base 7, what is -11 - -303331466?\n303331455\nIn base 10, what is -2 + 90326389?\n90326387\nIn base 15, what is 750 -" +"hest common divisor of 1576 and 1246764932.\n788\nWhat is the highest common divisor of 51537652 and 14744?\n7372\nWhat is the greatest common factor of 100128 and 402?\n6\nWhat is the highest common factor of 37990655 and 589?\n31\nCalculate the highest common divisor of 15 and 1569115.\n5\nCalculate the greatest common factor of 2280 and 77115528.\n456\nCalculate the highest common factor of 2240 and 2231488.\n448\nWhat is the greatest common divisor of 17200 and 17100240?\n3440\nCalculate the greatest common factor of 2265 and 10972113.\n453\nWhat is the highest common factor of 13643 and 12866?\n7\nCalculate the greatest common divisor of 78 and 28499406.\n78\nCalculate the greatest common divisor of 27741178 and 494.\n38\nWhat is the highest common factor of 24810 and 112870?\n10\nCalculate the highest common factor of 42194 and 1064559.\n73\nCalculate the greatest common divisor of 6136 and 79976.\n104\nWhat is the highest common divisor of 632 and 87172471?\n79\nCalculate the highest common factor of 2046 and 223292256.\n2046\nCalculate the greatest common divisor of 722736 and 1499964.\n2868\nWhat is the greatest common divisor of 1320 and 8134360?\n40\nCalculate the greatest common" +"j.\n1\nLet g(d) = -6 + 18 + 3*d + d - 6. Let l be g(2). Suppose -f - 2*f + 1 = 2*a, 2*f = -4*a + l. Solve 0 = -a*r + 5, -5*r + 3 - 1 = -3*v for v.\n1\nLet w be (-3 - (-49)/21) + 170/30. Solve -w*k + l - 21 + 25 = 0, -3*l = -5*k + 2 for k.\n1\nSuppose 11*d - 4*d = 182. Suppose 10 = 3*f - d. Suppose 7 = 3*y + 4*c, -4*y = -6*c + 10*c - f. Solve -3*v + 3*t = -7 - 5, -y*v - 2*t + 6 = 0 for v.\n2\nLet f be (550/(-25) - -21)*-7. Solve -f = 2*p - 3*t, 16 = 8*p - 4*p + 4*t for p.\n1\nLet g be (-6 - 0/3) + 6078. Let d be g/308 - 4/(-14). Solve -b = 4*b + 10, 4*b + d = 4*y for y.\n3\nLet r be ((-11)/5 + 2)*(66 + -41) - -10. Solve 2*t + r*b - 7 = 0, -5 = 2*t - 6*t - b for t.\n1\nLet m(g) = -2*g**2 + 15*g" +" 111?\n111\nCalculate the highest common divisor of 113 and 1.\n1\nWhat is the greatest common factor of 292 and 1606?\n146\nCalculate the highest common factor of 3972 and 12.\n12\nWhat is the highest common divisor of 300 and 140?\n20\nWhat is the highest common divisor of 11 and 77?\n11\nWhat is the highest common divisor of 6 and 6438?\n6\nWhat is the highest common divisor of 13 and 71318?\n13\nWhat is the greatest common divisor of 688 and 10148?\n172\nWhat is the highest common factor of 37231 and 31?\n31\nWhat is the greatest common factor of 13843 and 508?\n127\nWhat is the greatest common factor of 840 and 1995?\n105\nCalculate the greatest common divisor of 806 and 260.\n26\nWhat is the greatest common divisor of 2030 and 280?\n70\nCalculate the greatest common divisor of 8115 and 15.\n15\nWhat is the highest common divisor of 29 and 377?\n29\nWhat is the highest common factor of 3552 and 192?\n96\nWhat is the greatest common factor of 1672 and 5928?\n152\nCalculate the highest common divisor of 77 and 31108.\n77\nCalculate the highest common factor" +"hat is the second derivative of l(c) wrt c?\n24*c**2 - 2628*c - 8\nWhat is the first derivative of -7297 + 38*y + 1129 + 4*y**2 - 6259 + 553*y wrt y?\n8*y + 591\nLet x(f) be the first derivative of -31*f**5/5 + f**4/4 - 22*f**3/3 - 2*f**2 + 59*f - 874. What is the second derivative of x(k) wrt k?\n-372*k**2 + 6*k - 44\nLet t(f) be the first derivative of 758*f**6 + 2*f**3/3 + 240*f - 4703. Find the third derivative of t(l) wrt l.\n272880*l**2\nWhat is the second derivative of -684*c**3 - 760*c + 698*c - 1 + 578*c wrt c?\n-4104*c\nLet o = 23030 + -23030. Let y(s) be the second derivative of o*s**2 + 1/4*s**4 + 37*s + 0 + 0*s**3 - 21/20*s**5. What is the third derivative of y(b) wrt b?\n-126\nLet i be 169 + ((-2)/(-3))/(6/(-27)). What is the second derivative of i*s - 122*s - 178*s**2 + 54*s**2 wrt s?\n-248\nLet o(w) = 5*w - 12. Let f(m) = -m - 1. Let j be (-7)/(21/(-59)) - 1/(-3). Let a(s) = j*f(s) + 5*o(s). Differentiate a(k) with respect to k.\n5\nLet o(i) be the" +"bigger: b or n?\nn\nLet i = -843 + 561. Let h = -71941 - -71940.9. Is h < i?\nFalse\nLet c be (12/20)/(27/(-90)*-9). Is c bigger than 0.588?\nFalse\nLet s(q) = -8*q**2 + 2*q + 4. Let m be s(-4). Let a = -50645 - -50513. Is m at most a?\nTrue\nLet o = -18087 - -53420/3. Let t be 46624/(-165) + (-9)/(-15). Let z = t - o. Which is smaller: z or 1/3?\nz\nLet w(g) = -3*g - 9. Let b be w(-3). Suppose 3*o = 4*t + 6 + 2, b = -5*o - 4*t - 8. Let x(h) = -2*h**2 - 4*h - 2. Let j be x(-2). Is j >= o?\nFalse\nSuppose 26*o + 34747 = -33058 + 2753. Which is greater: -2501 or o?\n-2501\nLet a = -6688 - -8365. Is a at most 1677?\nTrue\nLet y(x) = -x**3 - x**2 + 3*x + 2. Let q be y(-1). Let z be 140/48 + -3 - q. Is z > 1?\nFalse\nLet b = -805 - -23339/29. Let h = -99.5 + 99.5. Is b greater than h?\nFalse\nLet j = 1834 +" +"(-12)/m). What is p rounded to the nearest 1000000?\n6000000\nLet f = -70 + 93.54. Let a = f + 0.86. Let i = 22 - a. Round i to the nearest integer.\n-2\nLet v = -0.05122 + 0.0509987. What is v rounded to five decimal places?\n-0.00022\nLet b = -0.0411 - -0.0084. Round b to three dps.\n-0.033\nLet u = -218 - -218.765. Let t = u + -0.025. Let q = t + -0.4. Round q to one decimal place.\n0.3\nLet d = 182.99999176 - 183. What is d rounded to 6 decimal places?\n-0.000008\nLet a = -2.339 + 36.819. Round a to the nearest 10.\n30\nLet q = -18.8 + 17.53. Let l = -2 - q. Let n = l - -0.730106. What is n rounded to 5 dps?\n0.00011\nSuppose 3*b - 2*a - 3504 = 0, b + 5*a = 392 + 776. What is b rounded to the nearest 1000?\n1000\nLet w = 0.1097 - 0.0713. Round w to three dps.\n0.038\nLet c = -2632989 - -2633045.99998. Let l = c - 57. Round l to 5 decimal places.\n-0.00002\nLet i = -0.55" +". What is the least common multiple of 48 and s(-111)?\n1920\nLet i(j) = j**3 - 2*j**2 + 13*j - 46. Let o be i(3). Let q(w) = 6*w**2 - 9*w + 4. What is the least common multiple of 77 and q(o)?\n770\nLet k = 1996/111 + -52477/2812. What is the common denominator of k and (-388093)/981030 - 4/106?\n1140\nSuppose 3*n - 2 = 2*r, 0 = n - 0*n + 4. Let k(i) = 29*i**2 + i + 9. Let m be k(r). Let g = 27077/19 - m. Calculate the common denominator of -58/7 and g.\n133\nLet m be -4 + -2*1115/(-330). Let a = m + -317/462. Calculate the common denominator of -99/116 and a.\n812\nLet z(g) = 33*g**2 + 312*g + 12. What is the smallest common multiple of 11 and z(-10)?\n2112\nWhat is the common denominator of (64/(-160) - (-16)/90)*642/(-880) and 151/36?\n1980\nLet y be (2/(-3))/((-1)/(-27)). Find the common denominator of (y/(-16))/((-12)/112) and (2354/616)/((-2)/4).\n14\nLet h = -11288089/165 - -68413. Find the common denominator of h and -25/153.\n8415\nLet v = 42574 - 4214743/99. Find the common denominator of v and (-681)/(-1589) - 43/231.\n99" +"escending order.\n4, 3, 0, -14706\nSort -0.3, 4/181, -27, 4, -0.4, -28 in decreasing order.\n4, 4/181, -0.3, -0.4, -27, -28\nSort 0, -3, 3, 1, -2, -3950.\n-3950, -3, -2, 0, 1, 3\nPut 1/6, 0, -1/5, -1, -146 in increasing order.\n-146, -1, -1/5, 0, 1/6\nSort -3, 5, 2, -2, -51.\n-51, -3, -2, 2, 5\nPut 1, -1.6, -0.067, 3 in increasing order.\n-1.6, -0.067, 1, 3\nPut -3, -12, -47, 4, 0 in decreasing order.\n4, 0, -3, -12, -47\nSort 3, 4, -26164.\n-26164, 3, 4\nSort 3, 74, -216, 4 in ascending order.\n-216, 3, 4, 74\nSort -19, -43, -1, -2, 1 in descending order.\n1, -1, -2, -19, -43\nPut 73/2, 0.1, -2/19, -3.7, -4/5 in descending order.\n73/2, 0.1, -2/19, -4/5, -3.7\nPut -4, 1, -5, 7088 in increasing order.\n-5, -4, 1, 7088\nPut -3, -21349, -5 in increasing order.\n-21349, -5, -3\nPut 4, 18, 339, -3 in descending order.\n339, 18, 4, -3\nSort 12, 5, -3, -4, -16, 1 in descending order.\n12, 5, 1, -3, -4, -16\nSort 0.624, -0.05, 0.02, -4, -0.2 in ascending order.\n-4, -0.2, -0.05, 0.02, 0.624\nSort -0.43, -4," +"254 - 20/209. Calculate the common denominator of t and 4 + ((-1393)/231)/(1/1).\n66\nWhat is the common denominator of 133/(-108) + (-21)/126 and -47/60?\n540\nWhat is the common denominator of -65/12 and -1*(-1)/3 - (-243)/(-276)?\n276\nLet o(z) = -z - 20. Let l be o(-21). Calculate the common denominator of (6/(-156))/(l/3) and -38.\n26\nLet r(a) = -44*a - 246. Calculate the least common multiple of 72 and r(-6).\n72\nSuppose 35 = -5*i + 3*c, 0 = -0*i + 4*i - 2*c + 26. Let b = -3 + 7. What is the least common multiple of b and (-5 - 0)*i - 0?\n20\nSuppose 3*m + 5 = 5*b, -m + 5*m - 2 = -2*b. What is the common denominator of ((-4)/(264/309))/b and -45/44?\n44\nLet j = 2 + 7. Suppose 6*b = -5 - 1. Let a = b + j. Calculate the least common multiple of 4 and a.\n8\nSuppose 2*i + 0*i = -4. Suppose 2*c + 16 = 2*z, 0 = -2*z - 8*c + 3*c - 19. What is the smallest common multiple of (-560)/(-72) - i/9 and z?\n24\nLet j = 142619050 + -245875254695/1724." +"t m(g) = p(g) - 3*v(g). Let n be m(r). Solve 5*o - o - n = 0 for o.\n1\nSuppose 3*u - 2 = 4. Solve a = -u*a for a.\n0\nSuppose -15 = -5*f, -v + f - 2 + 1 = 0. Suppose -2*i = -v, -5*j = -4*j - 5*i + 1. Solve j = 5*n + 14 for n.\n-2\nLet h(s) = 2*s - 6. Let u be h(4). Let o(t) = -1 - t + 6*t**2 - t**3 - u*t**2 - 2. Let m be o(3). Solve 5*i = m*i - 10 for i.\n-5\nLet m be -8*(10/(-4) + 2). Suppose -w + m*g = -24, w - 24 = -w + 2*g. Suppose 0 = -4*c - r + 12, -c + 0*c + 2*r = 6. Solve -c*j = -4*j - w for j.\n-4\nSuppose t - 15 = -2*t, 5*t = -3*x + 31. Suppose -x*u + 21 + 19 = 0. Solve 0*h - u = 5*h for h.\n-4\nSuppose -p - 2 = 5*u, -5*u - 6 = 3*p - 0*u. Let w be ((-6)/(-4) + -1)*2. Let b be (w + p/4)*10." +"/48. Solve c*w + 10 = l, -2*w = -2*l + 4*l + 20 for w.\n-5\nLet w = -59 + 59. Suppose w = 6*y + 2*y. Solve -2*n + 4 = 0, 5*p - 4*n + 0*n + 3 = y for p.\n1\nLet a = -17163 - -17166. Solve 5*j = 2*l + 15, -36 + 27 = 3*l - a*j for l.\n0\nSuppose 0 = 6*q - 0*q - 36. Let z(g) = g**2 - 4*g + 4. Let a be z(5). Suppose 0 = 28*f - 25*f - a. Solve -3*y = f*w - 0*w - 9, 2*y = -w + q for y.\n3\nLet x(s) = s**2 + 71*s + 882. Let q be x(-16). Solve 2*d = -3*f + q*f + 3, d + 3*f - 4 = 0 for d.\n1\nSuppose -3*v = 4*j - 14, j + 754*v - 3 = 753*v. Solve j*z + 23 = -5*w - 2, -5*z - 9 = w for w.\n-4\nSuppose -498*m = -493*m - 105. Suppose -3*w - k + 10 = 0, m = -k + 25. Solve 0 = -r + w*n - 10, -2*n" +" - 35 - 37 - 42, m - 24*q - 24 = 0 for m.\n24\nSolve 4*j = 4*u - 4, -u = -4*j - 3*u - u + 24 for j.\n3\nSolve 9*w - 547 = 7*m + 80, 2*m + 149 - 19 = -2*w - 40 for w.\n2\nSolve -5*b + 1007 = 22*g, -2*g + 8*b + 74 + 26 = 0 for g.\n46\nSolve 5*p - 3*t - 24 = 0, -69*t = -p - 4*p - 61*t + 39 for p.\n3\nSolve 10 + 112 = -2*p - 12*z + 12*z - 32*z, p + 5*p = 3*z - 69 for p.\n-13\nSolve -65*y - 99*y - 650 + 170 = 3*b, 3*b + 2*y - 6 = 0 for b.\n4\nSolve -4*j = 3*b + 26, 54 = -160001*j + 159989*j - 5*b for j.\n-2\nSolve 3*k - 6014 = -6044, 12*v = 7*k + 34 for v.\n-3\nSolve 21*c + 462 = -14*g + 3*g - 7*g, -g = 16*c - 13*c + 11 + 22 for g.\n-21\nSolve -11*s + 33 = v, -7220*v = 3*s - 7223*v - 45 for" +" 4.\n2/23, 1/4, y, 4\nLet h(d) = 5*d**2. Let z be h(-1). Sort z, -5, -37, -3 in descending order.\nz, -3, -5, -37\nLet s = 1.27 - 1.27. Sort -2, 0.4, s, -3.\n-3, -2, s, 0.4\nSuppose 4*x = 3*x. Suppose 4*q - 3*h + 1 = 0, -q - 3 = 2*h - x. Put -5, q, 7 in decreasing order.\n7, q, -5\nSuppose -20 = -5*u - 5*j, 3*j = -8*u + 4*u + 11. Sort 2, -13, u in descending order.\n2, u, -13\nLet k be ((-3)/21)/((-2)/7)*0. Put -4, k, 2 in increasing order.\n-4, k, 2\nLet i be (252/(-112))/((-33)/8). Sort i, 2/11, -1 in descending order.\ni, 2/11, -1\nLet r = 253/166 - 2/83. Let t = 15/13 - 161/117. Sort r, t, -3/5.\n-3/5, t, r\nLet b = 1.46 - 1.66. Put -3, 10, b, 0.4 in descending order.\n10, 0.4, b, -3\nLet h(o) = o**2 - 7*o + 7. Let t be h(5). Suppose 68*k = 63*k + 40. Suppose 2*s - k*s = -30. Sort s, -4, t in increasing order.\n-4, t, s\nLet f be -1*1*(-4 + 1). Let w be" +" hundred thousand.\n-1700000\nLet z = -1137841 + -56959. Round z to the nearest 100000.\n-1200000\nLet p be ((-9990)/20)/9*30. Round p to the nearest one thousand.\n-2000\nLet s = 73 + -271. Let b = -195.69 - s. What is b rounded to 1 decimal place?\n2.3\nLet m = 14509852.5225202 + -14473599.5812. Let z = m - 36371.9413. Let s = z - -119. What is s rounded to 6 decimal places?\n0.00002\nLet y = -168.6648 + 144.66. Let s = 24 + y. What is s rounded to 3 decimal places?\n-0.005\nLet r = -23.2 - -3.1. Let q = 20.099702 + r. What is q rounded to four decimal places?\n-0.0003\nLet x = 1272.93698 - 1273. Round x to 3 decimal places.\n-0.063\nLet h = -0.18 - -0.78. Let y = h + -0.5918. Round y to 3 decimal places.\n0.008\nLet l = -85.9 + 92.34. Round l to 0 dps.\n6\nLet d = -149.529 - 23.581. Round d to the nearest 10.\n-170\nSuppose -2*v = -5*a + 16, 6 + 12 = v + 4*a. Suppose -4*q = 0, -v*s + 0*q + 4*q = -18. Let" +"79?\n7\nWhat is the ten thousands digit of 45059?\n4\nWhat is the units digit of 3037496?\n6\nWhat is the ten thousands digit of 2505601?\n0\nWhat is the ten thousands digit of 15209?\n1\nWhat is the tens digit of 342002?\n0\nWhat is the hundreds digit of 953433?\n4\nWhat is the ten thousands digit of 6655504?\n5\nWhat is the tens digit of 2511020?\n2\nWhat is the thousands digit of 48005?\n8\nWhat is the millions digit of 13424348?\n3\nWhat is the units digit of 686873?\n3\nWhat is the hundred thousands digit of 1012677?\n0\nWhat is the hundreds digit of 8926732?\n7\nWhat is the units digit of 9857955?\n5\nWhat is the millions digit of 2408105?\n2\nWhat is the millions digit of 3624823?\n3\nWhat is the thousands digit of 6766873?\n6\nWhat is the ten thousands digit of 7482231?\n8\nWhat is the thousands digit of 3315866?\n5\nWhat is the thousands digit of 344241?\n4\nWhat is the thousands digit of 135714?\n5\nWhat is the ten thousands digit of 835454?\n3\nWhat is the millions digit of 4959226?\n4\nWhat is the units digit of 346306?" +"). What is the second derivative of k(o) wrt o?\n3196\nWhat is the first derivative of -3110*c - 3113*c + 6223*c + 9809 + 1075 - 6837*c**2 wrt c?\n-13674*c\nSuppose 2*l - 24 = -12. Suppose 14*c = 11*c + l. What is the second derivative of -23*b**3 - 54*b**2 - 28*b + 108*b**2 - 54*b**c wrt b?\n-138*b\nLet m(u) be the first derivative of -3331*u**3/3 - 1005*u**2/2 - 3082. What is the second derivative of m(a) wrt a?\n-6662\nLet f(u) be the second derivative of 38*u**5 - 641*u**2 + 1049*u. What is the derivative of f(c) wrt c?\n2280*c**2\nSuppose -2*w = 2*w + 4*v - 76, -5*w + 5*v = -55. Find the first derivative of -3*l + 11*l - 3*l + w - 3*l - 2*l**2 wrt l.\n-4*l + 2\nDifferentiate -12295 - 2896*d + 13517 + 711*d with respect to d.\n-2185\nFind the third derivative of 468*v**2 + 8*v**3 + 651*v**2 + 3*v**4 - 5*v**4 + 418*v**3 + v**4 wrt v.\n-24*v + 2556\nLet w(a) be the third derivative of 7*a**2 + 0*a + 0 - 27/2*a**3 + 89/24*a**4. What is the first derivative of w(x) wrt x?\n89" +"he common denominator of -42/115 and -52/5?\n115\nCalculate the lowest common multiple of 20680 and 22.\n20680\nCalculate the lowest common multiple of 10 and 42.\n210\nCalculate the smallest common multiple of 392 and 588.\n1176\nWhat is the smallest common multiple of 10 and 9816?\n49080\nCalculate the least common multiple of 24 and 597.\n4776\nWhat is the lowest common multiple of 183 and 9?\n549\nWhat is the smallest common multiple of 12 and 96?\n96\nCalculate the common denominator of 161/2700 and 44/225.\n2700\nWhat is the common denominator of -73/5894 and -87/6736?\n47152\nCalculate the smallest common multiple of 456 and 342.\n1368\nWhat is the least common multiple of 28 and 70?\n140\nWhat is the common denominator of 55/164 and 127/410?\n820\nFind the common denominator of -72/385 and -107/105.\n1155\nWhat is the lowest common multiple of 141 and 6?\n282\nWhat is the common denominator of -101/112 and -27/4?\n112\nWhat is the common denominator of -20/477 and -121/12?\n1908\nCalculate the least common multiple of 8 and 686.\n2744\nWhat is the smallest common multiple of 194 and 18?\n1746\nCalculate the lowest common multiple of 45 and" +"ber?\nTrue\nLet y = -5 + 7. Let l(d) = -y + 0 + d**2 - 5 + 8*d - 1. Is l(7) a composite number?\nFalse\nLet a be -1 - -4 - (8 - 137). Suppose 5*s - 209 = 2*s + 2*j, -2*s + a = -5*j. Is s a prime number?\nTrue\nLet h = 5506 + -2785. Is h prime?\nFalse\nSuppose 5*d - 2*k - 3 = -0*k, -d + 5 = 4*k. Let p be 1692/10 - d/5. Let i = -92 + p. Is i composite?\nTrue\nLet z be (-1)/((-2)/(-4)) + 3. Is (-43)/(-1) + (4 - z) composite?\nTrue\nLet t = 32 - -159. Is t composite?\nFalse\nLet d(l) = -l**3 + 5*l**2 - 2*l - 4. Let v be d(4). Suppose -v*j + 1492 - 24 = 0. Is j composite?\nFalse\nLet a = -2 - -64. Suppose -5*o - 5*d = -0*d - 165, -a = -2*o - 3*d. Is o prime?\nTrue\nSuppose x = -2*w + 531, -2*w + w + 2*x = -268. Suppose 4*p = 5*g - 351, -w = -5*g - 2*p + 61. Is g a composite number?" +"1000011000101111\nIn base 5, what is 1113003 + 11024?\n1124032\nIn base 10, what is 77104 - 8?\n77096\nIn base 3, what is -2122002 - -11200?\n-2110102\nIn base 10, what is -904 - 246979?\n-247883\nIn base 8, what is 33 - -11315174?\n11315227\nIn base 12, what is -2896 - 13ab9?\n-16793\nIn base 14, what is -6310 + -1d6?\n-6506\nIn base 6, what is 5504342 - 15?\n5504323\nIn base 4, what is -131131132 - -33331?\n-131031201\nIn base 12, what is -3481186 + 12?\n-3481174\nIn base 16, what is fbe0ed + 3?\nfbe0f0\nIn base 11, what is -1 - -34a80a6?\n34a80a5\nIn base 7, what is -2 + 516610330?\n516610325\nIn base 2, what is -10101100000 + -110010111100011?\n-110101101000011\nIn base 10, what is -500416 - -372?\n-500044\nIn base 16, what is -7416d + 10?\n-7415d\nIn base 6, what is -4 - 423551010?\n-423551014\nIn base 8, what is 21 + -2371755?\n-2371734\nIn base 16, what is 1a - -8055e?\n80578\nIn base 16, what is -4bb8 + -14d2?\n-608a\nIn base 3, what is 1200202121110 - 1210?\n1200202112200\nIn base 12, what is 1bb7a5 + -6?\n1bb79b\nIn" +"as u*d**2 + q*d + w + z*d**3 and give u.\n-7692\nExpress 13*n**2 + 8011679 - 8011679 as i + g*n**2 + r*n and give g.\n13\nExpress (162*b**2 + 236 - 236)*(42*b + 18*b**2 - 42*b) in the form q*b**2 + c*b**4 + f*b**3 + x + m*b and give c.\n2916\nExpress 318 + 319 - 1272 + 318 + 319 - 12*l**2 in the form q*l**2 + g*l + d and give q.\n-12\nExpress (0 + 0 - 1)*(416*x + 654*x - 2 + 3 - 46*x) in the form g*x + z and give z.\n-1\nRearrange -3*k**3 + 39 + 3*k**2 - 86*k - 85*k + 167*k - 33 to the form o + h*k + d*k**3 + s*k**2 and give h.\n-4\nRearrange (3254*u**3 + 721*u**2 - 3248*u**3 + 759*u**2)*(0 + u + 0) to v*u + j + r*u**3 + g*u**4 + n*u**2 and give r.\n1480\nRearrange 29*k - 357*k**2 - 44*k + 14*k - 31*k**2 + 33*k**2 to g*k**2 + o*k + d and give g.\n-355\nRearrange -513 + 18643*b - 1042 + 146 - 18641*b to the form m*b + q and give m.\n2\nRearrange -7*t**3" +"-0.2 bigger than -338/3?\nTrue\nDo -2/9 and 177 have the same value?\nFalse\nWhich is bigger: 11 or 9?\n11\nWhich is smaller: 476/45 or 11?\n476/45\nIs 1/649 at most 0?\nFalse\nWhich is bigger: -1/4 or -47?\n-1/4\nIs 112 less than or equal to 103?\nFalse\nWhich is bigger: 15 or 19?\n19\nWhich is bigger: -14 or 0?\n0\nWhich is smaller: -5/1173 or -1?\n-1\nIs -897 < -896?\nTrue\nWhich is bigger: 21 or 1?\n21\nIs -630 less than 0?\nTrue\nDoes 2 = 27?\nFalse\nWhich is smaller: -19904 or -19903?\n-19904\nIs -46 greater than -413/9?\nFalse\nWhich is greater: 3250 or 3252?\n3252\nWhich is smaller: 10/899 or -1?\n-1\nWhich is smaller: -6 or -155/34?\n-6\nDoes -1 = -42/17?\nFalse\nAre 8654 and 8655 unequal?\nTrue\nIs -1/30756 > 1?\nFalse\nWhich is smaller: -132 or -137?\n-137\nDoes 41 = 80?\nFalse\nIs -109 bigger than -109?\nFalse\nWhich is smaller: 394 or 134?\n134\nWhich is greater: 30 or 18?\n30\nWhich is bigger: 2/877 or 1?\n1\nWhich is greater: -0.02 or 32/75?\n32/75\nWhich is greater: 151/8 or 19?\n19\nWhich is smaller:" +"e -18602 = 37*n - 19712 for n.\n30\nSolve -777*l = -1611*l + 773*l + 793 for l.\n13\nSolve -3*i - 8*i + 1963 = 2271 for i.\n-28\nSolve 86 - 452 = -188*h + 249*h for h.\n-6\nSolve 217 = -34*g + 149 for g.\n-2\nSolve 159*d - 310*d = -122*d - 58 for d.\n2\nSolve -589 = -106*p + 2304 + 1241 for p.\n39\nSolve 93*m + 1596 = -135*m for m.\n-7\nSolve -49*r = 1501 - 2040 for r.\n11\nSolve 140*w + 222 - 46 = -384 for w.\n-4\nSolve 44652*o = 44669*o - 408 for o.\n24\nSolve 27*v - 84*v - 1732 = 149 for v.\n-33\nSolve -355*m = -272*m + 332 for m.\n-4\nSolve 0 = 806*o + 30*o - 10032 for o.\n12\nSolve 68*x + 75*x - 1652 = 25*x for x.\n14\nSolve 464 - 372 = 24*c - c for c.\n4\nSolve 112*i - 135 = -23*i for i.\n1\nSolve 482 + 205 = -53*m - 373 for m.\n-20\nSolve 85*n + 5140 = -429*n for n.\n-10\nSolve 12*s - 28*s = -17*s -" +"it of 278341?\n4\nWhat is the ten thousands digit of 2061925?\n6\nWhat is the hundreds digit of 1181330?\n3\nWhat is the tens digit of 4117379?\n7\nWhat is the hundreds digit of 271728?\n7\nWhat is the hundreds digit of 122173?\n1\nWhat is the hundred thousands digit of 149315?\n1\nWhat is the units digit of 337889?\n9\nWhat is the ten thousands digit of 196634?\n9\nWhat is the units digit of 252892?\n2\nWhat is the hundreds digit of 178787?\n7\nWhat is the units digit of 1070542?\n2\nWhat is the hundreds digit of 2198836?\n8\nWhat is the units digit of 2105528?\n8\nWhat is the thousands digit of 2229025?\n9\nWhat is the hundreds digit of 521174?\n1\nWhat is the ten thousands digit of 1742440?\n4\nWhat is the ten thousands digit of 46675?\n4\nWhat is the units digit of 308482?\n2\nWhat is the units digit of 4827450?\n0\nWhat is the millions digit of 2202894?\n2\nWhat is the hundreds digit of 4483748?\n7\nWhat is the ten thousands digit of 2744736?\n4\nWhat is the thousands digit of 185979?\n5\nWhat is the millions digit of" +"= -44, -2*n + 2*x + 0*x = -22. Suppose -9239 = -703*g - 1506. Do g and n have the same value?\nTrue\nLet t = -16279.931 + 16278. Is 0 greater than t?\nTrue\nLet n = 6944.8 + -6945. Let u = -69413/69 + 1006. Which is smaller: u or n?\nn\nLet j(s) = 212*s - 426. Let p be j(2). Which is smaller: p or -2/81?\np\nLet j = 330 - 340. Let h = 10.1 + j. Which is smaller: h or -34?\n-34\nSuppose 2*j + 4*z - 6 = 0, -j - 2 = -2*z + 15. Let t(y) = 2*y + 11. Let l be t(6). Let i = 15 - l. Is i <= j?\nTrue\nLet a(v) = -36*v**3 + 6*v**2 + 14*v + 8. Let x be a(4). Which is greater: -2146 or x?\nx\nLet t(s) = -48*s + 2. Let u be t(-1). Let f be (-80)/u + 2/(-5). Let i be (f - -1)/(13/13). Is i greater than or equal to -2/125?\nFalse\nSuppose -4*h = 4*a + 20 - 8, 0 = h - a - 3. Let i = -714.99 + 715." +"q for q.\n2\nLet b(y) = -y**2 - 23*y - 53. Let h be b(-20). Solve 2*k - h = -9 for k.\n-1\nSuppose 196 + 197 = -3*a + 5*n, -a + 5*n - 131 = 0. Let s = 143 + a. Solve 0 = -11*f + s*f - 4 for f.\n4\nSuppose 4*p = 5*p. Suppose -3*z + z + 6 = p. Suppose z*f + 1 = 5*n, 0 = -3*n - 5 + 20. Solve 0 = 6*d - 2*d + f for d.\n-2\nLet o be -2*(-5)/4*2. Suppose 5*w - 4*s = -3*s + 18, 3*w + o*s = 22. Solve -w*t + 15 = 3 for t.\n3\nSuppose 0 = 4*r + 4*x + 16, 4*r + 5*x = 4*x - 13. Let o(w) = -w + 5. Let q be o(r). Suppose j = -3*j + q. Solve 0*y - 10 = -j*y for y.\n5\nSuppose -4*k + 121 = 7*k. Suppose 3*v = k*v + 5*v. Solve v = -u + 4 for u.\n4\nLet y(f) = 3*f**3 + 47*f**2 + 72*f + 73. Let a(t) = 2*t**3 + 31*t**2 + 48*t + 49." +" = -2*b. What is the least common multiple of k and b?\n56\nSuppose 18 = -0*w - 3*w. What is the common denominator of 45/w - (-4)/(-10) and 101/20?\n20\nLet h = -803/18 + 11593/252. What is the common denominator of 524/(-24) + -6 + (-140)/(-21) and h?\n84\nLet x be 8/(-40130)*168526/(-8). Let v = 2/4013 + x. What is the common denominator of v and -43?\n5\nLet m be (24/15 + -2)*15. What is the common denominator of 59/9 and (-291)/m - (-1 + 1)?\n18\nWhat is the common denominator of -22/5 and 30/(-105) + (-151)/35?\n5\nSuppose 5*f + 15 = 1065. Suppose 4*t - t - f = 0. Find the common denominator of 37/4 and (-46)/t - 3/15.\n28\nLet f = -16 - -19. Let l = f + 17. What is the smallest common multiple of 4 and l?\n20\nSuppose 2*l - 9*l - 70 = 0. What is the common denominator of l and 19/11?\n11\nLet w = -14198045/12 - -1183977. Let h = w + -812. Calculate the common denominator of -75/22 and h.\n132\nSuppose 0*j - 2*j + 11 = -5*t, 3*j +" +"is the remainder when 93195298 is divided by 6?\n4\nWhat is the remainder when 8450164 is divided by 60358?\n44\nCalculate the remainder when 46049758 is divided by 11989.\n9\nWhat is the remainder when 5616453 is divided by 55062?\n129\nCalculate the remainder when 4655248 is divided by 109.\n76\nCalculate the remainder when 688927 is divided by 115.\n77\nCalculate the remainder when 44210 is divided by 615.\n545\nCalculate the remainder when 1783992 is divided by 48216.\n0\nCalculate the remainder when 1321749 is divided by 444.\n405\nWhat is the remainder when 393703925 is divided by 106?\n103\nWhat is the remainder when 495482 is divided by 18351?\n5\nWhat is the remainder when 21850629 is divided by 67649?\n2\nCalculate the remainder when 12145462 is divided by 1012118.\n46\nCalculate the remainder when 166842 is divided by 611.\n39\nWhat is the remainder when 2252991 is divided by 745?\n111\nWhat is the remainder when 3154097 is divided by 173?\n134\nWhat is the remainder when 60116539 is divided by 24?\n19\nCalculate the remainder when 6014 is divided by 92.\n34\nCalculate the remainder when 39584388 is divided by 102.\n24\nWhat is" +"60?\n-760\nWhich is bigger: 2330022472 or 2330022471?\n2330022472\nDoes -51695327 = -51695326?\nFalse\nWhich is smaller: 2 or -152648909?\n-152648909\nIs -179995399 <= -179995400?\nFalse\nIs -6034765/12 greater than -502897?\nFalse\nIs 1181886332 not equal to 1181886333?\nTrue\nAre -1 and 66/9327355 unequal?\nTrue\nWhich is greater: -788 or -8.81812?\n-8.81812\nIs 1 at most as big as 5/6509737?\nFalse\nWhich is bigger: -28752 or 3/995?\n3/995\nWhich is bigger: 340208 or -39?\n340208\nWhich is smaller: 59/5 or -2317352?\n-2317352\nWhich is bigger: 2 or 223450224/5?\n223450224/5\nWhich is greater: 622863953 or 622863955?\n622863955\nIs -4/3 at least as big as 7.0101336?\nFalse\nAre 82774705 and 82774705 equal?\nTrue\nIs -472 at most as big as -135553/287?\nFalse\nAre -2/7 and 10121/2274 equal?\nFalse\nAre -0.22417 and 216 equal?\nFalse\nIs 0 != -9/28105669?\nTrue\nWhich is smaller: -1 or 2810/96391?\n-1\nIs 0 > -5/163947128?\nTrue\nIs -3/4 smaller than -110698915?\nFalse\nIs 4518706 < 14?\nFalse\nIs -298 at most as big as -21265?\nFalse\nIs 12081 greater than or equal to 7927?\nTrue\nWhich is smaller: 227239699 or 227239697?\n227239697\nWhich is smaller: 0 or -539/26265?\n-539/26265\nIs -1190 equal to -3227/6?\nFalse\nIs -14991735" +" + 3. Let g be 7 + -1 - 8/(-8). Let j be q(g). Solve 0 = 5*l + j, -l = 3*r + 7 - 2 for r.\n-1\nLet f be (1 + -4)/(6/(-8)). Let k(h) = 2*h**3 - 3*h - 5 - h**3 - 2*h**2 + 5. Let b be k(f). Solve 23 = 4*y - 3*m, y + 2*y - b = 5*m for y.\n5\nLet n(l) = 0 - l - 2 + 10. Let y be n(6). Solve -t = -2*v - 5, 3*v + 11 - y = 2*t for t.\n3\nSuppose -3*r = 2*y - 5*y, -18 = -5*r - 4*y. Let l = -2 + 2. Suppose -r*x + l*x = -6. Solve -t + 12 = x*v, 3*t + 3 = 4*v - 0 for t.\n3\nLet h = -66 - -101. Solve s = -2*g - 1, -4*s + 5*g = -0*g - h for s.\n5\nLet k = 21 - 17. Solve -3*w - 5 = -4*q, w = -k*q - 4*w + 13 for q.\n2\nLet x = 33 + -30. Solve -6*c = -j - x*c - 10, 0 = 3*j" +"u rounded to 5 decimal places?\n0.00007\nLet y = -1.4 - -1.431. Let i = y - 0.611. Round i to one dp.\n-0.6\nSuppose -3*q - 3*r = -4908, 0 = -0*q + 3*q - 4*r - 4908. Let c = 1124 + -1690. Let v = q + c. What is v rounded to the nearest one hundred?\n1100\nLet b = 3900226 - 6820226. Round b to the nearest 1000000.\n-3000000\nLet x = 164 + -167.4. Let r = x - -3.7. What is r rounded to zero decimal places?\n0\nLet x = 10349387 - 6639881. Suppose 2440494 = -5*a - x. What is a rounded to the nearest one million?\n-1000000\nLet t(k) = 101*k**3 + 3*k**2 + 4*k + 4. Let w be t(-2). Let b be (w/60)/((-1)/1350). Round b to the nearest 10000.\n20000\nLet k(j) = 1 + 42624*j**2 + 82376*j**2 + j - 3. Let n be k(2). What is n rounded to the nearest 1000000?\n1000000\nLet r = 0.3609 - -5.6351. Let x = 58 + -64. Let g = x + r. Round g to three decimal places.\n-0.004\nSuppose -4243 = -2*z + 2955. Suppose" +"s the smallest value in -4/11, -1.73, 0.002?\n-1.73\nWhat is the second smallest value in -28/141, -3, 8?\n-28/141\nWhich is the biggest value? (a) 2/5 (b) 2 (c) 126\nc\nWhat is the third smallest value in 2/21, 0.3, -1, -3, -5.94?\n-1\nWhat is the smallest value in 0.3, 0.2, -22483, 0.4, 2, -0.4?\n-22483\nWhat is the biggest value in -7, -153, -0.01, -3/5?\n-0.01\nWhat is the fifth biggest value in 2/9, 4, -0.2, 1/3, -96, -2?\n-2\nWhat is the third biggest value in -2/42469, 2, 2/7?\n-2/42469\nWhat is the third smallest value in 34, 3/7, -5, 1/9, -405?\n1/9\nWhat is the third biggest value in 5, -2, -2/61, 3, -0.053?\n-2/61\nWhich is the second smallest value? (a) -1/3 (b) -6 (c) -20 (d) 1/3 (e) 3\nb\nWhat is the smallest value in -0.1, -93, 3, 27/7, 0.8?\n-93\nWhat is the second smallest value in -632, 0.3, -268?\n-268\nWhich is the second smallest value? (a) -1/5 (b) 3/2 (c) 3 (d) -15 (e) 0 (f) 41\na\nWhich is the third biggest value? (a) 3/2 (b) -0.1 (c) 2/11 (d) 0 (e) -1/2\nd\nWhich is the smallest" +" + f*g = -4, 2*g - 4 = 3*b for b.\n-4\nSuppose -s + 60 = s. Suppose 0 = c - 2. Solve -4*r = 4*f, 3*f + f = c*r - s for f.\n-5\nLet v(u) = -u**2 + 13*u - 2. Let n be v(12). Let c = -6 + n. Solve -2*l - c*j + 2 = 0, 3*j = 3*l - 1 - 2 for l.\n1\nSuppose 5 = c + 3. Solve c*w + 3*f = -3*w - 22, 18 = w - 5*f for w.\n-2\nLet o be ((-3)/9)/(3/(-45)). Solve -6*s + s + 3*p + 34 = 0, o*s - 10 = -5*p for s.\n5\nSuppose p + 157 = 161. Solve 5*v - 5 = p*o, 2*o + 2*v - 15 = o for o.\n5\nLet t be (-20)/(-15) - 240/(-9). Solve -t = -2*a - 0*m + 4*m, -10 = 2*m for a.\n4\nLet c = 34 + -48. Let l be 12/c*(-7)/2. Solve -3*x = q - 5 + 4, l*q = 12 for x.\n-1\nLet s be ((-2)/3)/(2/(-12)). Suppose -u + 15 = 2*y + 3*y, -28 = -2*y +" +"res are there in 8.970068 litres?\n8970.068\nWhat is one fifth of a millennium in years?\n200\nWhat is 54/5 of a kilogram in grams?\n10800\nHow many grams are there in 53/4 of a kilogram?\n13250\nConvert 2.0620167 seconds to minutes.\n0.034366945\nHow many millilitres are there in three eighths of a litre?\n375\nHow many days are there in 849106.26 minutes?\n589.657125\nHow many minutes are there in 88360.77 seconds?\n1472.6795\nHow many nanograms are there in twenty-seven quarters of a microgram?\n6750\nConvert 1.0728855 months to decades.\n0.0089407125\nWhat is 3/32 of a day in minutes?\n135\nWhat is 669985.8 micrometers in meters?\n0.6699858\nWhat is 5193.941mm in micrometers?\n5193941\nHow many seconds are there in 7.43368 microseconds?\n0.00000743368\nWhat is 57933.64 weeks in minutes?\n583971091.2\nHow many decades are there in 17/2 of a millennium?\n850\nHow many minutes are there in fourty-two fifths of a day?\n12096\nWhat is 7.367344 nanoseconds in microseconds?\n0.007367344\nHow many seconds are there in 1/6 of a day?\n14400\nConvert 6.4782 years to months.\n77.7384\nHow many seconds are there in ten thirds of a minute?\n200\nWhat is 943579.1 years in months?\n11322949.2\nWhat is 67904.32 millilitres in" +" order.\n2/13, -1/4, -145\nPut 5, 114, -10, -0.3 in descending order.\n114, 5, -0.3, -10\nSort -3, 1, 5, 16, 6.\n-3, 1, 5, 6, 16\nSort 2, 116, 3, 10 in descending order.\n116, 10, 3, 2\nSort -165, -5, -4, 0.\n-165, -5, -4, 0\nSort 2, -2, 2/225 in descending order.\n2, 2/225, -2\nSort 2, 18, 3, 5 in increasing order.\n2, 3, 5, 18\nPut 0.4, 3, 25/8 in decreasing order.\n25/8, 3, 0.4\nPut 63, -1, 10 in decreasing order.\n63, 10, -1\nSort 1, 17, -2, 0 in decreasing order.\n17, 1, 0, -2\nSort 1, 0, 7, -51 in decreasing order.\n7, 1, 0, -51\nPut -415, 2, -4 in ascending order.\n-415, -4, 2\nSort 4, 3, 1.5 in increasing order.\n1.5, 3, 4\nSort -4, 22, -10 in descending order.\n22, -4, -10\nSort -0.06, -1, -3, -1/8 in descending order.\n-0.06, -1/8, -1, -3\nSort 5, 3, 2/23, 0.08.\n0.08, 2/23, 3, 5\nPut -3, 3, -195 in ascending order.\n-195, -3, 3\nPut -0.285, -3, -1/7, -1/6 in descending order.\n-1/7, -1/6, -0.285, -3\nSort -2, 0.3, 1/3, -0.108 in ascending order.\n-2, -0.108, 0.3, 1/3\nSort" +" - 95. Is y a composite number?\nFalse\nSuppose -5*u - 2831 = 5599. Is (-28)/(-49) + u/(-14) prime?\nFalse\nIs 2775/4 + 12/48 a composite number?\nTrue\nLet h be 73 + 6/(-3) - 1. Let p be h/(-3) + (-2)/(-6). Let k = 36 + p. Is k composite?\nFalse\nSuppose -16 = 4*r, -r - 10 - 14 = -4*m. Suppose m*y = 5*s - 66 - 59, 0 = -2*s. Is (-2)/5 - 1985/y a prime number?\nTrue\nLet b = -2 - 0. Let m(c) = -19*c**3 + 2*c**2 - c - 1. Is m(b) a composite number?\nTrue\nLet o(t) = 3*t + 110. Let d(p) = -p - 37. Let z(j) = 17*d(j) + 6*o(j). Let q be z(0). Suppose q = -c + 2*c. Is c a composite number?\nFalse\nLet f(i) = -i**2 - 6*i + 6. Let u be f(-7). Let l be -1 + 191 + u + 1. Suppose 4*n = l + 22. Is n composite?\nFalse\nSuppose 16*t + 449 = 17*t. Is t prime?\nTrue\nLet s(y) = y**3 - 4*y**2 - 6*y + 3. Let q be s(5). Let p(w) be the first derivative" +"alculate the highest common divisor of 15011130 and 490.\n10\nCalculate the greatest common divisor of 216646722 and 36.\n18\nCalculate the greatest common factor of 22793859 and 26136.\n3267\nCalculate the highest common divisor of 150903662 and 13923.\n1547\nCalculate the highest common factor of 5864586 and 35025.\n1401\nWhat is the highest common divisor of 107 and 2003597?\n1\nWhat is the greatest common factor of 68 and 7860248?\n4\nWhat is the greatest common divisor of 834826 and 9287?\n251\nWhat is the greatest common divisor of 3004 and 1854219?\n751\nCalculate the greatest common divisor of 35 and 202321.\n7\nWhat is the highest common factor of 88227 and 220329?\n9\nCalculate the greatest common divisor of 739620 and 103362.\n42\nCalculate the greatest common divisor of 14643811 and 11284.\n2821\nCalculate the greatest common divisor of 45000 and 45940000.\n5000\nCalculate the greatest common divisor of 163 and 33526981.\n163\nWhat is the highest common factor of 2007 and 70166727?\n2007\nWhat is the greatest common divisor of 328 and 2344756?\n4\nWhat is the highest common factor of 1119 and 16014?\n3\nWhat is the highest common divisor of 5944 and 37793438?\n1486\nWhat" +"he prime factors of 163493?\n11, 89, 167\nList the prime factors of 3070318.\n2, 1031, 1489\nWhat are the prime factors of 646935?\n3, 5, 17, 43, 59\nWhat are the prime factors of 30660186?\n2, 3, 19, 61, 4409\nList the prime factors of 435278.\n2, 103, 2113\nWhat are the prime factors of 1263835?\n5, 252767\nList the prime factors of 8674939.\n7, 13, 7333\nList the prime factors of 217141.\n17, 53, 241\nList the prime factors of 39578.\n2, 7, 11, 257\nList the prime factors of 236763.\n3, 37, 79\nWhat are the prime factors of 23544821?\n2221, 10601\nWhat are the prime factors of 432076?\n2, 109, 991\nList the prime factors of 2100723.\n3, 700241\nWhat are the prime factors of 1854?\n2, 3, 103\nWhat are the prime factors of 239029?\n7, 34147\nList the prime factors of 296616.\n2, 3, 17, 727\nWhat are the prime factors of 158154?\n2, 3, 43, 613\nList the prime factors of 23105.\n5, 4621\nList the prime factors of 6991508.\n2, 1747877\nList the prime factors of 734309.\n29, 25321\nList the prime factors of 11416449.\n3, 11, 345953\nWhat are the prime" +" y, 1 in descending order.\n5, n, 1, y\nLet s = -28 + 57. Let p = -31 + s. Put -17, 0.1, p, 2 in decreasing order.\n2, 0.1, p, -17\nLet x be 6/36 + 17/(-306). Let h = 4.08 - 0.08. Sort -0.2, -3/5, h, x.\n-3/5, -0.2, x, h\nSuppose 36 - 48 = 4*j. Put 1, -4, j in decreasing order.\n1, j, -4\nSuppose -1118 + 3086 = 48*p. Sort 5, 3, -3, p.\n-3, 3, 5, p\nLet u = -493 - -488. Let l = 6/7 - 5/7. Sort l, 0.1, u, 0.5 in descending order.\n0.5, l, 0.1, u\nSuppose -4*o + 17 - 1 = 0. Suppose -8 = 2*x, -3*b = -8*b + o*x + 1. Sort 3/5, -3/2, b in decreasing order.\n3/5, -3/2, b\nSuppose -3*a = 3*b - 60, -2*a + 2 = -4*a. Put 0.5, b, -0.2, 0.4 in ascending order.\n-0.2, 0.4, 0.5, b\nLet c be 3 - ((-1027)/143 - 4/(-22)). Suppose 40 = -0*f - 4*f. Let d be 24/f - 6/(-15). Put c, d, 4 in decreasing order.\nc, 4, d\nLet u be 12/2*(-3)/6. Let k = 70 +" +"1 (base 9) to base 6.\n44\nConvert 10 (base 13) to base 2.\n1101\nConvert -2b (base 13) to base 16.\n-25\nWhat is 11b (base 12) in base 11?\n142\nConvert -26 (base 10) to base 2.\n-11010\nConvert 122 (base 3) to base 13.\n14\nWhat is -63 (base 9) in base 7?\n-111\nWhat is 1 (base 14) in base 4?\n1\na (base 13) to base 2\n1010\n-165 (base 7) to base 16\n-60\nConvert 101 (base 5) to base 11.\n24\nWhat is -a (base 13) in base 3?\n-101\nConvert -1 (base 15) to base 5.\n-1\nConvert 11 (base 4) to base 2.\n101\nWhat is 0 (base 2) in base 12?\n0\n3 (base 14) to base 2\n11\n-1001 (base 2) to base 15\n-9\n-6a (base 13) to base 11\n-80\nConvert -160 (base 9) to base 6.\n-343\nWhat is -3a (base 11) in base 2?\n-101011\n-11 (base 2) to base 16\n-3\nConvert 0 (base 3) to base 2.\n0\nConvert -7 (base 15) to base 10.\n-7\nConvert 101 (base 9) to base 11.\n75\nWhat is 101 (base 4) in base 11?\n16" +"or u.\n2\nLet n(s) = -s**2 - 25*s + 58. Let v be n(-27). Solve -3*z - 3*j - 12 = 6, -2*j = v for z.\n-4\nSuppose -2*u + 32 = -3*h, 5*u = 2*h - 0*u + 36. Let d = -5 - h. Solve -q = 2*q + d*m - 21, -3*m - 11 = -5*q for q.\n4\nLet c(i) = -i**3 - 22*i**2 + i + 28. Let k be c(-22). Solve 2 = 3*z + s, -5*z + 3*s = k*s - 6 for z.\n0\nSuppose 4*k - 4*z - 16 = 0, -2*k + z - 11 = -6*k. Let t = -14 + 24. Suppose -3*h = -2*h - 3*s, 0 = k*h + s - t. Solve -4*m = -h*x, -20 = -3*x - 2*x for m.\n3\nLet h be 3/((-45)/(-24))*5. Let g = h + -3. Suppose -g*l + 2*l = -c - 19, 6 = -2*l - 4*c. Solve -4*n = 3*u - 9, 3*u - l*n - 11 = -2 for u.\n3\nSuppose -2*h + 8 = 2*h. Let a(m) = -3*m - m**3 - h*m + 2 + 6*m - 2*m. Let" +" Sort -12, f, l in increasing order.\n-12, l, f\nSuppose -5*y = 4*o - 24, -3*y - o = o - 14. Let h = -2 + -3. Suppose -41*k = -61*k - 20. Sort h, k, 2, y in increasing order.\nh, k, 2, y\nSuppose 4*a - 13*z - 2 = -10*z, 3*a + 7 = -2*z. Sort 1, a, 3, 6 in descending order.\n6, 3, 1, a\nSuppose -13*a = 17*a + 32 - 122. Put -5, -9, 4, a, -1 in ascending order.\n-9, -5, -1, a, 4\nLet l = -172 - -177. Suppose 8*c - l*c = 2*g + 1, -3 = -3*g + 3*c. Put g, 0.05, 9 in ascending order.\n0.05, g, 9\nSuppose -3*v + 34 = -v. Let z be (-4*v - -1)/(-1). Suppose 62*j = z*j. Put j, 3, 24 in descending order.\n24, 3, j\nLet a = 1517897 + -1517895. Let g = -259 - -1291/5. Put -0.4, a, g, -0.05 in decreasing order.\na, -0.05, -0.4, g\nSuppose 6*k - 2*k + 74 = 2*x, 4*k - 5*x + 71 = 0. Suppose 0 = -7*p - 3*y - 13, 5*y - 11 =" +"-w*d + 12 = -8*d for d.\n-4\nLet v be 405/(-13) + (-94)/(-611). Let q = v + 33. Let h(y) = -y**3 + 5*y**2 - 4*y + 3. Let f be h(4). Solve -q*p - 3 = -f*p for p.\n3\nLet f(r) = -r + 32. Let u be f(22). Solve -u*x = -11*x - 4 for x.\n-4\nLet o be 8/(-60) + 534/135*-3. Let l = 17 + o. Solve 2*f = -l + 7 for f.\n1\nLet s(b) = 3*b - 43. Let l be s(16). Suppose -5*f = o - 5, f - 4*o = l + 17. Solve -6 = -4*k + f*k for k.\n3\nLet x(g) = -g + 3. Let i be x(1). Let r = 29 + -24. Let z = r + -1. Solve -i*v + v = z for v.\n-4\nLet q(o) be the first derivative of o**5/30 - o**2/2 + 16. Let p(j) be the second derivative of q(j). Let w be p(-1). Solve 0 = m + w*m - 15 for m.\n5\nSuppose 32 - 4 = 2*q. Suppose -34168 = -2350*m - 1921*m. Solve -q = -m*d + 2 for" +") = a**2 + 14*a + 19. What is the lowest common multiple of 18 and l(-13)?\n18\nWhat is the common denominator of ((-1914)/(-440))/((-3)/(-2)) and (16*4*1)/(-3)?\n30\nFind the common denominator of 87/20 and (-3)/(-54)*(-786)/(-14).\n420\nSuppose 70 + 38 = 4*j. Suppose 5*y - j = 13. What is the least common multiple of y and 28?\n56\nLet r = -8 + 14. Calculate the lowest common multiple of 2 and r.\n6\nLet g be (3 - 4 - 3)/(-2). Suppose 2*n - 36 = -g*n. Calculate the smallest common multiple of ((-6)/9)/((-4)/66) and n.\n99\nLet h(o) = o + 21. Let w(g) = g**3 + 6*g**2 + 3*g + 4. What is the smallest common multiple of w(-3) and h(-13)?\n88\nSuppose 53 = 11*j - 46. What is the smallest common multiple of 18 and j?\n18\nLet f = -23353849865/2581546 - -3919156/433. Let w = f + 91/271. Find the common denominator of w and -39/10.\n110\nLet r = 15 + 3. Calculate the lowest common multiple of 51 and r.\n306\nLet z = -757/3 - -2839/12. What is the common denominator of z and 99/14?\n28\nLet o be" +"68 to the nearest integer?\n131\nWhat is the cube root of 125506961 to the nearest integer?\n501\nWhat is the square root of 284799372 to the nearest integer?\n16876\nWhat is the third root of 331092924 to the nearest integer?\n692\nWhat is 16737506 to the power of 1/3, to the nearest integer?\n256\nWhat is 197066157 to the power of 1/2, to the nearest integer?\n14038\nWhat is 2365174493 to the power of 1/2, to the nearest integer?\n48633\nWhat is the square root of 170597540 to the nearest integer?\n13061\nWhat is the cube root of 95586149 to the nearest integer?\n457\nWhat is the tenth root of 50820177 to the nearest integer?\n6\nWhat is the square root of 540830567 to the nearest integer?\n23256\nWhat is 19570168 to the power of 1/2, to the nearest integer?\n4424\nWhat is 2334858991 to the power of 1/7, to the nearest integer?\n22\nWhat is the cube root of 2118065883 to the nearest integer?\n1284\nWhat is 67394490 to the power of 1/2, to the nearest integer?\n8209\nWhat is 310289860 to the power of 1/7, to the nearest integer?\n16\nWhat is the square root of 1965817" +"- -6.2. Let v = b + -5. Let h = -197/2 - -987/10. What is the closest to v in h, -2, -0.4?\nh\nLet h = -167 + 1501/9. What is the closest to -18 in -0.1, h, 5?\nh\nLet q = 394 + -394.02. Suppose -3*l = -b - 2*b - 18, -3*b = -4*l + 22. What is the nearest to 2 in q, b, -3?\nq\nLet j = -3.2 + 1.1. Let h = -6.1 - j. What is the closest to -0.4 in 1/4, h, 1/5?\n1/5\nLet h = 558 + -555. What is the nearest to -2 in 1/197, -4, h?\n-4\nSuppose 0 = -2*s + 3 + 3. Suppose s = 3*y - 0. Let w be (-2)/y + 65/26. Which is the nearest to 0.1? (a) -1 (b) w (c) 5/3\nb\nLet l = 12.7 - 12.3. What is the closest to 2 in l, -4, -0.7?\nl\nLet t be (-15)/50*-2 + 0. What is the closest to -0.1 in t, 0, 2?\n0\nLet y be (-10)/3*33/352*-6. Which is the closest to -1/3? (a) 1/2 (b) y (c) 0.1 (d) -1/4\nd\nLet i" +" Let i = u + -13. Is i at most -5/7?\nTrue\nLet h = 2.8 - -0.2. Let f = h + 1. Let c = -4 + f. Is c > 1/3?\nFalse\nLet d = 0.5 - 2.5. Let g = -5 - -3. Let h = g + d. Is 0.2 at least h?\nTrue\nLet t be (-2 - -1)*(-1)/(-3). Let b = 14 + -24. Let o = b - -9. Are t and o nonequal?\nTrue\nLet p be -34 + (5/3 - 2). Let t = 35 + p. Is -0.07 at least as big as t?\nFalse\nLet x be 64/(-48) - 2/(-6). Is -1 equal to x?\nTrue\nLet a = 1 + -4. Let b = 1 + -2. Let i be 0/(1 + b + a). Which is smaller: i or -1/5?\n-1/5\nLet i be 4/26 - 16/104. Is 0 at most i?\nTrue\nSuppose -5*l - 7 = -3*l - 5*m, 0 = 3*l + 5*m + 48. Let k(c) = c**2 + 10*c - 8. Let v be k(l). Is v < 3?\nFalse\nSuppose g + 4*t = 1, -4*g = -3*t - 0" +", 103\nWhat are the prime factors of 210627?\n3, 29, 269\nList the prime factors of 291904.\n2, 4561\nWhat are the prime factors of 746899?\n746899\nWhat are the prime factors of 1028105?\n5, 13, 15817\nList the prime factors of 221476.\n2, 17, 3257\nList the prime factors of 2914529.\n29, 100501\nList the prime factors of 1407450.\n2, 3, 5, 11, 853\nList the prime factors of 248836.\n2, 7, 8887\nList the prime factors of 2587564.\n2, 7, 92413\nList the prime factors of 728376.\n2, 3, 11, 31, 89\nWhat are the prime factors of 22623524?\n2, 7, 11, 73453\nList the prime factors of 2579666.\n2, 29, 79, 563\nWhat are the prime factors of 13995735?\n3, 5, 13, 5521\nList the prime factors of 12839671.\n13, 43, 103, 223\nList the prime factors of 232340.\n2, 5, 11617\nList the prime factors of 2722151.\n83, 32797\nList the prime factors of 48419.\n7, 6917\nWhat are the prime factors of 494554?\n2, 107, 2311\nWhat are the prime factors of 72296?\n2, 7, 1291\nList the prime factors of 14965556.\n2, 1361, 2749\nWhat are the prime factors of 878492?\n2, 17," +"ommon multiple of (-1 - -2)/(m/12) and 9?\n36\nLet z = -13 - -25. What is the least common multiple of 2 and z?\n12\nLet r = 5597/4 + -1390. Calculate the common denominator of -23/40 and r.\n40\nLet m = -113/66 + 52/33. Let h = 56/11 - 1671/110. What is the common denominator of m and h?\n110\nLet n = -116369/38168 + -402/367. Let h = n + 36/13. What is the common denominator of h and 9/(-6)*122/(-6)?\n8\nLet l = 27 - 26. What is the least common multiple of l and (4 - 3)*(-12)/(-2)?\n6\nLet y = -21 + 37. Calculate the smallest common multiple of 20 and y.\n80\nSuppose 2 - 8 = 3*g. Let w be (-2 - g) + 0 + 1. Suppose 0 = j + w - 13. What is the smallest common multiple of 14 and j?\n84\nCalculate the common denominator of -49/8 and (1/(-4))/(6/340).\n24\nLet c(i) = i**2 + 9*i + 11. Let p be c(-8). Suppose p*j - 8 = 2*h, 0 = 3*h - 23 + 8. Calculate the smallest common multiple of 2 and j.\n6\nLet" +"t is the least common multiple of l and c?\n9\nSuppose -23*f = -129 - 170. Calculate the lowest common multiple of 11 and f.\n143\nLet o = -2568623/12 + 214299. Let y = o + -243. Calculate the common denominator of y and 73/22.\n132\nSuppose 2*p = -4*o - 58, -8 = 3*o + 4*p + 48. Let j(y) = y**2 - 11*y - 43. Let v be j(14). Calculate the common denominator of 43/7 and v - -83*(-2)/o.\n42\nSuppose -2*f + 34 = -5*o - 31, 126 = 3*f + 2*o. Suppose x = m + 2 - 1, x = 4*m + 4. What is the common denominator of (-52)/f + 0 - m and 43/22?\n110\nSuppose 2*d + d = 18. Let f(s) = s**3 + 31*s**2 + 29*s - 17. What is the least common multiple of d and f(-30)?\n78\nLet b be (-30)/(-8)*16/2. Suppose 2*f = -4*t + 22, -2*f - 3*f - 5*t = -b. Let m = 31 - 22. What is the least common multiple of m and f?\n9\nLet m(i) = i**3 + 2. Let c be (6/(-10))/(19/(-95)). Suppose -c*n + 70 =" +"*s**2 + s. Let l be g(h). Does 13 divide l/(((-1)/5)/(-1))?\nFalse\nLet c be ((-194)/(-8))/((-3)/(-24)). Is 14 a factor of 4/14 - c/(-7)?\nTrue\nLet l(q) = q - 2. Let m be l(4). Suppose -2*a + 100 = m*a. Is a a multiple of 12?\nFalse\nSuppose 831 - 2921 = -10*r. Is r a multiple of 19?\nTrue\nLet x = -10 + 40. Is x a multiple of 9?\nFalse\nSuppose 4*m + 5*g - 7 = 6*g, 4*m + g - 1 = 0. Let k = -7 + 9. Is 2 + -2 + m + k even?\nFalse\nLet q(x) = 2*x - 6. Let w be q(5). Suppose -4*t + 13 = 5*r + w, -4*r + 2 = -2*t. Is ((-35)/4)/(r/(-4)) a multiple of 23?\nFalse\nLet g = -17 - -6. Let r = -8 + g. Let w = 31 + r. Is w a multiple of 6?\nTrue\nLet h be (-40)/(-12)*(16 + 2). Let s = h - 36. Is 12 a factor of s?\nTrue\nLet c(o) = 40*o + 29. Is 27 a factor of c(3)?\nFalse\nSuppose 5*r - 106 = -2*j + 143," +"\n-200\nRound 527 to the nearest one hundred.\n500\nWhat is 0.00000034 rounded to seven dps?\n0.0000003\nWhat is -4933700 rounded to the nearest 100000?\n-4900000\nWhat is -0.000029373 rounded to six decimal places?\n-0.000029\nRound -0.0014789 to four decimal places.\n-0.0015\nWhat is -182800 rounded to the nearest 10000?\n-180000\nWhat is 18936 rounded to the nearest one thousand?\n19000\nWhat is -5077 rounded to the nearest one hundred?\n-5100\nWhat is 2.26551 rounded to one dp?\n2.3\nWhat is 0.000061909 rounded to 6 decimal places?\n0.000062\nRound -31644 to the nearest one hundred.\n-31600\nWhat is 4483000 rounded to the nearest 100000?\n4500000\nRound 503500 to the nearest 100000.\n500000\nWhat is -0.003205 rounded to three dps?\n-0.003\nRound -3890.3 to the nearest one hundred.\n-3900\nWhat is -579.437 rounded to the nearest 100?\n-600\nRound -0.011835 to 4 decimal places.\n-0.0118\nRound -26.2 to the nearest ten.\n-30\nWhat is -1.065 rounded to one dp?\n-1.1\nWhat is -0.0258 rounded to 3 decimal places?\n-0.026\nRound 0.0011787 to 4 dps.\n0.0012\nWhat is -0.91 rounded to 0 dps?\n-1\nRound -116.541 to 0 dps.\n-117\nRound 0.0093 to 2 dps.\n0.01\nRound -0.05413 to 3 dps.\n-0.054" +"5 - (5 - 4) - -4))?\n-20\nWhat is 80 - ((-6 - -11) + -45 + (-5 - -23))?\n102\nCalculate 12 - ((13 - (-7 - 14)) + 6).\n-28\nWhat is -73 + 39 + 22 + -35?\n-47\nWhat is the value of -41 + 50 + -9 + (-10 - 5)?\n-15\nWhat is 0 + 3 + -62 + (-55 - 78 - -116)?\n-76\n-12 - ((-56 - -17) + -4)\n31\n5 + -4 + (-1 + 5 - 12) + 9\n2\n-517 - -538 - (-3 + 4)\n20\nWhat is (0 + 68 - (740 + -719)) + 2?\n49\n-15 - ((2 - 2 - -23) + (2490 - 2472))\n-56\nWhat is (13 - (25 + -2 - (40 - (-7 - -33)))) + 41?\n45\nCalculate -21 + 57 + -30 + -22 + 91.\n75\nWhat is the value of 11 - (36 - 35 - (-8 - (-1 + -2))) - 0?\n5\nCalculate 121 + -78 + -3 + 2.\n42\n14 + -115 + (-9 - (0 - 8) - -10)\n-92\nWhat is the value of (-1 - -1) +" +"s - 3*t - 12 for s.\n3\nLet r = 798 + -753. Suppose 0 = -7*o + r*o. Solve o = -3*g - 6, -g + 13 = -a - 2*a for a.\n-5\nSuppose 23*h = -4369 + 4461. Solve 25 = 4*n + m + 9, h*n - 32 = -5*m for n.\n3\nLet j = 501 + -500. Suppose -a + u - 4 = -j, -3*a + 4*u - 14 = 0. Solve a*l = 5*s + 23, -3*l + 4*s = -4*l - 21 for l.\n-1\nLet v be 218/8 + ((-1537)/116 - -13). Suppose q + 4*q = 15. Solve -q*t + v = 5*m - 5*t, -2*m - 2*t + 8 = 0 for m.\n5\nSuppose -n - 2*n + 11 = -2*x, n - 2*x - 5 = 0. Suppose -4*t + 110 = -4*c - t, t - 106 = 4*c. Let k = -23 - c. Solve k*w + 4*m - 21 = m, 3*w + n = 3*m for w.\n3\nSuppose 4*l = 3*m - 11, 2*l = -3*l + 5. Let f(d) = -4*d**2 + 42*d - 106. Let b be f(5)." +"Let c = b - y. Is c a multiple of 2?\nTrue\nIs -5 + 4 + 50/1 a multiple of 2?\nFalse\nSuppose -2*k + 2*x + 46 = 0, 2*k - 2*x - 103 = -3*k. Suppose -k - 7 = -m. Is 13 a factor of m?\nTrue\nLet b = 47 - 7. Is 8 a factor of b?\nTrue\nIs 33 a factor of (4/(-5))/((-12)/2910)?\nFalse\nLet b be -4*(3/4 - 2). Let k = b + -2. Suppose k*m - 53 = 76. Is 20 a factor of m?\nFalse\nLet q = -29 + 34. Let x(d) = d**3 - 4*d**2 + 5*d - 12. Does 19 divide x(q)?\nTrue\nLet z = 31 - -7. Suppose -u - u + z = 0. Is 19 a factor of u?\nTrue\nSuppose 3*u = 3 + 6. Suppose -2*l = u*l - 70. Is 7 a factor of l?\nTrue\nSuppose -53 = -2*a + 107. Let i = -36 + a. Is 11 a factor of i?\nTrue\nSuppose 0*t + 24 = 3*t. Is 8 a factor of t?\nTrue\nLet z = 8 - 14. Suppose 0 = -4*y" +"r u.\n2\nSolve 3*i + 3*h = -24, 0 = -5*i - 21*h + 17*h - 35 for i.\n-3\nSolve 2*l = -3*l + 15, 4*j - 4*l = 0 for j.\n3\nSolve -4*v + 1 = -3*n - 7, 0 = -4*n + 3*v + 1 for n.\n4\nSolve -19 = 2*j - 5*t, 12*t = 2*j + 13*t + 1 for j.\n-2\nSolve z = -5*v + 8, 0 = 5*z + 4*v - 15 - 4 for z.\n3\nSolve 169*x + 12 = 166*x + 2*l, 4*l - 4 = -4*x for x.\n-2\nSolve g = -2*k - 3, 3 = k + 34*g - 35*g for k.\n0\nSolve -4*y + 2*q = -0*q + 16, -q - 2 = 0 for y.\n-5\nSolve 168*v - 173*v - 5 = 4*f, 4*v - 2*f = -30 for v.\n-5\nSolve p - 61*v = -59*v - 6, 4*v - 28 = -2*p for p.\n4\nSolve -4*r + 4 = 15*k - 19*k, 0 = 3*r + 4*k - 31 for r.\n5\nSolve -8*m = -7*m - 5*s + 2, -8 = 4*m - 4*s for m." +"t t be (-12)/(-3)*(1 + 0). Let k(b) = b**2 - 4*b + 3. Let z be k(t). Suppose -33 + 462 = z*w. Is w prime?\nFalse\nSuppose t + 1 - 4 = 0. Let h(x) = 26*x**t + 3*x - 25*x**3 + x + 1 + 10*x**2 - 11. Is h(-7) composite?\nFalse\nLet j(v) = 7242*v + 229. Is j(8) prime?\nFalse\nIs -18 + 167178/24 - (-6)/(-8) prime?\nTrue\nIs (-7 + 1)*10566/(-108) prime?\nTrue\nSuppose -4*l + 963 = u, -7*l = -2*u - 2*l + 1991. Is u composite?\nFalse\nLet f(d) = -d**3 - d. Let v(r) = -10*r**3 + 4*r**2 + 7*r + 3. Let u(y) = 3*f(y) + v(y). Let x be u(-3). Suppose -92 = -5*g + x. Is g composite?\nTrue\nLet x = 2152 - 819. Let i = x - 641. Is i/8 + 1/2 composite?\nTrue\nSuppose -6*h + 146377 = 5*h. Is h prime?\nFalse\nLet g = 14993 + 3860. Is g prime?\nFalse\nLet k be ((-1012)/6)/(-2)*6/2. Let m = k - 126. Is m a prime number?\nTrue\nSuppose 19*v - 101004 = -18791. Is v prime?\nTrue\nLet v be" +" - d = -i + 272, -2*d + 126 = -2*i. Is d composite?\nFalse\nSuppose -4*p + 4*t + 16 = 0, -4*p - 4*t - 7 + 23 = 0. Suppose -5*j = -4*j + p*f - 159, 3*f = 5*j - 910. Is j composite?\nFalse\nLet g(a) = a**3 + 2*a**2 - 4*a. Let o be g(-3). Is (750 - (-4 + o))*1 a prime number?\nTrue\nSuppose 7*s - 10052 = 5894. Suppose 6263 - s = 5*n. Is n prime?\nTrue\nLet o(s) = 160*s + 11. Let d be o(6). Let v = 1053 + d. Is v/11 + (-6)/(-2) a composite number?\nTrue\nLet r(n) = -5*n + 4 - 7 + 4*n**2 - 3*n**2 - 2*n**2. Let l be r(-3). Suppose 2*y = -l*q + 3*y + 479, 2*q + 2*y - 314 = 0. Is q a composite number?\nTrue\nLet p = -4683 - -11272. Is p prime?\nFalse\nLet g be 13011/7 + 20/70. Let v = -1306 + g. Is v prime?\nFalse\nLet j = -16 - -5. Let i(w) = -6*w - 15. Let d be i(j). Let s = -32 + d. Is s" +"?\n101111\nIn base 9, what is 3 + -1848?\n-1845\nIn base 11, what is 29 + -1?\n28\nIn base 15, what is -537 - -4?\n-533\nIn base 4, what is -1232 + 2?\n-1230\nIn base 4, what is 130 - -102?\n232\nIn base 9, what is -1 - 13?\n-14\nIn base 9, what is 16 + -3?\n13\nIn base 3, what is 111 - -1112?\n2000\nIn base 5, what is -40 + 13?\n-22\nIn base 10, what is 12 - 33?\n-21\nIn base 15, what is -37 - 6?\n-3d\nIn base 14, what is 1015 + 4?\n1019\nIn base 5, what is -13102 + 0?\n-13102\nIn base 15, what is -a5 + 2?\n-a3\nIn base 7, what is -3 - -254?\n251\nIn base 5, what is -2 - 11212?\n-11214\nIn base 2, what is 1110 - -1101111?\n1111101\nIn base 3, what is 211221 + -120?\n211101\nIn base 10, what is 255 - -35?\n290\nIn base 10, what is 5321 - 5?\n5316\nIn base 2, what is -10101101110 + -11?\n-10101110001\nIn base 14, what is -63 + -3?\n-66" +"at is -1 - -20103?\n20102\nIn base 8, what is 63 + 0?\n63\nIn base 15, what is 5da + -1?\n5d9\nIn base 16, what is -188 + -1?\n-189\nIn base 14, what is 2 + 3c3?\n3c5\nIn base 7, what is -5 + -1113?\n-1121\nIn base 4, what is 11 - 1000?\n-323\nIn base 8, what is -4447 + -4?\n-4453\nIn base 3, what is -121100 - -1?\n-121022\nIn base 12, what is 131 - -1?\n132\nIn base 13, what is -2 + 23?\n21\nIn base 13, what is -4 - 822?\n-826\nIn base 7, what is -3 + -616?\n-622\nIn base 16, what is -3 + 11?\ne\nIn base 16, what is -2 - -24?\n22\nIn base 5, what is 12421 - -1?\n12422\nIn base 9, what is -2 - 56?\n-58\nIn base 12, what is 1 + 4a?\n4b\nIn base 3, what is -22020 - -10201?\n-11112\nIn base 6, what is 111 - -3?\n114\nIn base 5, what is -1120 - 1?\n-1121\nIn base 4, what is -2012 + -12?\n-2030\nIn base 12, what is" +"= 3*d, 0 = -9*r + 11*r + d - 18. Calculate the remainder when 46 is divided by (525/r)/5 - (-32)/(-48).\n2\nCalculate the remainder when 8089 is divided by ((-3)/(-3))/((-29857)/(-4964) + (-1 - 5)).\n65\nLet n(t) = -2*t**3 - 10*t**2 + 24*t - 7. What is the remainder when (-5528)/(-56) - (-4)/14 is divided by n(-7)?\n15\nSuppose 5*w = -4*p + 283, 0*p = 2*w + p - 115. Let s = 80 - w. Calculate the remainder when 89 is divided by s.\n5\nSuppose 0 = 69*i - 75*i - 4752. Let m = i - -1021. What is the remainder when m is divided by 39?\n34\nLet q = -17336 - -17582. What is the remainder when 260 is divided by q?\n14\nLet c be (-16)/(-6)*(16 - 40). Let x = c - -89. Calculate the remainder when 92 is divided by x.\n17\nSuppose -31 + 78 = 3*l + 5*u, -29 = -l - 5*u. Calculate the remainder when -1 + 52 - (l - 15) is divided by -6*(3 + 11/(-2)).\n12\nLet c = 42 - 42. Suppose -4*p + d + 280 = -c*p, -70 =" +"+ 3.\n-2\n-4 - (-3 + 1 + 1 - 6)\n3\n-3 - (17 + -24 + (0 - 3))\n7\n(-5 - -1 - 4) + 14\n6\n27 + -22 + 0 + 0 + -5\n0\nWhat is 9 + (8 - 13 - 4)?\n0\nWhat is -16 + -3 + 5 + 4 + 6?\n-4\nWhat is the value of (10 - (33 - 10)) + 7?\n-6\nCalculate -1 - (-4 + -1 - (-32 + 22)).\n-6\n1 + -1 + (-14 - -8)\n-6\n(-1 - (3 - 0)) + 2 - -1\n-1\nEvaluate -4 + -3 + 7 + 1 - -7.\n8\n-3 + (0 + 4 - -3)\n4\nWhat is the value of (-9 + -12 - -21) + (-1 - 5)?\n-6\nEvaluate 2 + (-8 - (-2 + -1)) + 0.\n-3\nEvaluate 5 + -1 + 5 + (-3 - 3).\n3\nWhat is the value of (6 - 8) + (1 - -1) + -4?\n-4\nCalculate (-22 - -5) + 3 - (-8 + 2).\n-8\nCalculate 6 - (2 + -4) - (-45 - -63).\n-10\nWhat is" +"*q = -190*y - 55. Suppose 2*o - o - 2 = 0. Suppose 12 = -2*h + 4*d, 2*h - 1 = -d + 2. Solve -c - o*c + y = h for c.\n3\nSuppose 0 = -456*n + 474*n - 36. Solve -h = n*h for h.\n0\nSuppose 13 + 50 = 21*b. Solve 4 = b*x - 4*x for x.\n-4\nLet o be (3 - (-6)/(-2))/(-3 + 2). Solve o = -j - 0*j + 1 for j.\n1\nSuppose -2*f = 0, -5*n + 0*f = -3*f - 305. Suppose 3*k - 84 - 19 = 4*c, -2*k - 5*c = -n. Solve -4*l - k + 13 = 0 for l.\n-5\nSuppose -4*w + 2*w = -6*w. Suppose -4*p - 5 + 13 = w. Solve 8 = 2*d + p for d.\n3\nSuppose -4*h = h + x + 15, -9 = 3*h + 4*x. Let i be (-3)/5*(-90)/54. Let m be -2 + i - (h + 2). Solve -z + 0*z - 5 = m for z.\n-5\nLet x = 13 + -11. Let h = x + -2. Suppose w + h*w = 5." +" divided by -9?\n113\nDivide 11 by -18.\n-11/18\nCalculate -3 divided by -29.\n3/29\nCalculate 2242 divided by 1121.\n2\nCalculate 4000 divided by 1000.\n4\n1 divided by 17\n1/17\nWhat is 4 divided by -81?\n-4/81\nCalculate -33290 divided by 5.\n-6658\nWhat is -1688 divided by 844?\n-2\nWhat is -1 divided by 231?\n-1/231\nWhat is 3180 divided by 15?\n212\nDivide -85 by 11.\n-85/11\nDivide -307 by 1.\n-307\nDivide 0 by 679.\n0\nWhat is -13 divided by -8?\n13/8\nWhat is 231 divided by -2?\n-231/2\nDivide 2788 by -34.\n-82\nDivide 16209 by 5.\n16209/5\nWhat is -585 divided by 3?\n-195\nDivide -65 by -5.\n13\nDivide -1080 by 135.\n-8\nDivide 146 by 3.\n146/3\nWhat is 49 divided by 49?\n1\n5 divided by -10\n-1/2\nCalculate -6 divided by 25.\n-6/25\nWhat is 9030 divided by 105?\n86\nCalculate 216 divided by 54.\n4\nWhat is -1860 divided by -5?\n372\nWhat is -49 divided by -12?\n49/12\nWhat is 5 divided by -100?\n-1/20\nWhat is 226 divided by -4?\n-113/2\n176 divided by 1\n176\nWhat is 4 divided by 289?\n4/289\nDivide 81" +"2ec1 (base 15) in base 4?\n123131201233\n1111021222 (base 4) to base 10\n348778\nConvert -204388 (base 10) to base 9.\n-341327\n2c87d (base 16) to base 11\n115046\nConvert 1634641 (base 9) to base 4.\n3131320321\nWhat is 102233302323 (base 4) in base 14?\n91cd3d\n256738 (base 9) to base 12\n7625b\nWhat is 100110011001011010 (base 2) in base 16?\n2665a\ncd246 (base 15) to base 10\n651891\na5182 (base 11) to base 3\n21210020220\nConvert -66771 (base 8) to base 2.\n-110110111111001\nWhat is -1653221 (base 9) in base 6?\n-31423244\nWhat is 14536 (base 9) in base 12?\n58a3\n-11708222 (base 9) to base 8\n-25676607\n-5caab1 (base 15) to base 10\n-4440541\nConvert 20522531 (base 6) to base 9.\n1116671\nConvert 544312 (base 7) to base 4.\n113032333\nConvert 101303 (base 11) to base 15.\n3334d\nConvert 27a07 (base 12) to base 15.\n1147a\nWhat is -9eca9 (base 16) in base 6?\n-21535053\nWhat is -3321231231 (base 4) in base 15?\n-1530d9\nWhat is 10022002011012 (base 3) in base 14?\n338d9c\nWhat is -f244 (base 16) in base 2?\n-1111001001000100\n-10101100010111111101 (base 2) to base 16\n-ac5fd\n332020121 (base 4) to base 9\n427075\n4ccb0 (base" +"o.\n0\nLet t(c) = -36*c**3 + 4*c**2 + 11*c + 7. Let j be t(-1). Solve 1897*d + j = 1885*d for d.\n-3\nLet z = -195 - -103. Let b be z/138 - (-28)/6. Solve -b*w - 4 = 8 for w.\n-3\nLet u(v) = 3*v**2 + 12*v + 24. Let l = 108 + -111. Let r be u(l). Suppose r + 9 = 8*c. Solve c*x = -0*x for x.\n0\nSuppose 5*o - 127 = 23. Suppose 0 = -4*w + 5*t + o, 3*w - 2*t + 5*t = 9. Suppose -8*r - w + 21 = 0. Solve -r*u + 0*u = 2 for u.\n-1\nSuppose -5*l - 24 = -19. Let z be 4/12*(l + 1). Solve z = -w + 4*w - 15 for w.\n5\nSuppose 71010 = 59*c - 33647 + 11378. Solve -c*h + 1589*h = -32 for h.\n-4\nSuppose j = -2*k - 2 + 10, 16 = 4*k - 5*j. Let t = 0 + k. Solve -2 + t = 2*b for b.\n1\nLet r(h) = -h**2 - 5*h + 6. Let x be r(-6). Suppose x*b = -2*b +" +"est common factor of 16 and 848.\n16\nCalculate the greatest common divisor of 26 and 416.\n26\nCalculate the greatest common divisor of 120 and 340.\n20\nCalculate the greatest common divisor of 6728 and 464.\n232\nWhat is the greatest common divisor of 1295 and 70?\n35\nWhat is the highest common factor of 11 and 66?\n11\nCalculate the highest common divisor of 2261 and 5491.\n323\nCalculate the greatest common divisor of 9980 and 20.\n20\nCalculate the highest common divisor of 286 and 26.\n26\nCalculate the highest common factor of 2185 and 19.\n19\nWhat is the highest common divisor of 175 and 10?\n5\nWhat is the greatest common divisor of 24 and 15?\n3\nWhat is the highest common divisor of 616 and 112?\n56\nCalculate the highest common divisor of 84 and 476.\n28\nWhat is the highest common divisor of 175 and 420?\n35\nWhat is the highest common divisor of 378 and 119?\n7\nWhat is the highest common factor of 896 and 320?\n64\nWhat is the highest common divisor of 60 and 200?\n20\nCalculate the greatest common factor of 588 and 1344.\n84\nCalculate the greatest" +"t the prime factors of t.\n2\nLet r(d) = -d**3 + d + 3. Let b be r(0). Let q be 1 - (-39)/b - 1. Let a = -10 + q. What are the prime factors of a?\n3\nSuppose -2*r - 3*k - 5 = -2*k, -5 = 5*r + 5*k. Let f = r + 6. What are the prime factors of f?\n2\nSuppose 7*v - 4*v = 2*a + 64, 0 = -5*v - a + 85. Suppose 8 = -5*z + v. What are the prime factors of z/(-4) - (-38)/4?\n3\nSuppose 0 = -4*l + 6*s - s + 177, 101 = 2*l - 5*s. Let g = l - 19. List the prime factors of g.\n19\nLet w be 2/(-6) - (-31)/3. Let p(r) be the first derivative of -r**4/4 + 10*r**3/3 + r**2 - 6*r + 12. List the prime factors of p(w).\n2, 7\nLet x = 146 + -90. What are the prime factors of x?\n2, 7\nSuppose 2*j - 40 = -5*q, 3*j = -2*q + 7 + 20. Suppose -2*y = -0*y - q. List the prime factors of y.\n3\nSuppose g" +"-246/1338551?\n1\nIs -162458/11447 smaller than -15?\nFalse\nWhich is smaller: 1 or -17/43852522?\n-17/43852522\nIs -1 less than or equal to -22/4655643?\nTrue\nDo 56 and -1612716 have the same value?\nFalse\nWhich is smaller: -281901 or -281896?\n-281901\nIs 248135 >= 29/4?\nTrue\nAre -13489/1857 and -8 nonequal?\nTrue\nWhich is greater: -13/2 or 15596/15?\n15596/15\nWhich is smaller: 4528402 or 4528364?\n4528364\nWhich is smaller: 1482082 or 1482098?\n1482082\nIs 0 greater than -1/3660331?\nTrue\nIs 46632 != 46547?\nTrue\nWhich is smaller: -16898166 or 1?\n-16898166\nIs -87154521.6 <= -1?\nTrue\nIs 0.0514 at least as big as -265?\nTrue\nIs 238149179 > 238149181?\nFalse\nIs -948.0227 smaller than 2/121?\nTrue\nIs 5659357 greater than 5659374?\nFalse\nWhich is greater: -1 or -3/958346342?\n-3/958346342\nAre 41109/17530 and 3 nonequal?\nTrue\nIs 58739530 <= 58739531?\nTrue\nWhich is bigger: -2 or -699137263?\n-2\nIs 37/31763 <= 0?\nFalse\nDo -2 and -16059/12823 have the same value?\nFalse\nIs 73845.54 > 1/4?\nTrue\nIs 103.11948 <= -0.2?\nFalse\nIs 1 not equal to 123/1168964?\nTrue\nWhich is bigger: 0.04 or 5669884?\n5669884\nWhich is smaller: -2 or -5946763/48?\n-5946763/48\nIs 257124 less than 1542749/6?\nTrue\nIs 884539049 smaller" +" Which is smaller: -18 or p?\np\nLet s(o) = o**3 - 6*o**2 - 44*o + 20. Let j be s(10). Let l be (-16)/(-40) + (-12)/j. Is 15/41 != l?\nTrue\nSuppose 2*k + 4*q - 1 = 17, k - 2*q = -7. Let c be ((-2255)/55)/(0 - k*-5). Let a = -1527/185 - c. Is -1 > a?\nFalse\nLet h = -2874066/17 + 169164. Which is smaller: h or -1/2?\n-1/2\nLet r = 1.7 - 1.48. Let p = 0.0197 + -0.0197. Is r greater than or equal to p?\nTrue\nLet b = 61.9 - 87.6. Let s = b + 25.6. Are -1/16 and s unequal?\nTrue\nSuppose -3*w - 2*l + 34 = 0, -2*w - 7*l + 5*l = -24. Let z be 2/w - (-8 - 11172/(-35)). Which is bigger: z or -312?\nz\nLet r = 3973/118944 + 1/2016. Let k(y) = y**2 - 54*y. Let f be k(54). Is r less than or equal to f?\nFalse\nLet v = -0.151 + -14.849. Let k = -4 + -19. Let b = v - k. Is b less than or equal to 2/5?\nFalse\nSuppose -4*s + d" +"s greater: 1/12 or r?\nr\nLet a(z) = -z + 24. Let d be a(0). Let p be 102/d - (-2)/(-8). Which is greater: p or -0.2?\np\nLet i = -185/2 + 4259/46. Is i bigger than 0?\nTrue\nLet m = -409/12 - -34. Suppose x = -0*x. Which is bigger: x or m?\nx\nSuppose g + 0*g = -19. Let c = -8 - g. Do 10 and c have different values?\nTrue\nLet p(o) = -8*o. Let x be p(1). Is x at most as big as -8?\nTrue\nLet j be (-4 - -3) + -1 + 4. Suppose 2*v + 1 + 2 = 3*d, -j*v = d + 7. Suppose -3*p + 5*l = -7, 5*p - 1 + 4 = l. Which is smaller: p or v?\nv\nLet a be ((-9)/12)/3 - 87/4. Are -23 and a nonequal?\nTrue\nLet a = 200/309 + 2/103. Are a and 1 non-equal?\nTrue\nLet j = 171 - 1199/7. Which is smaller: j or 0?\nj\nLet t be -1*(-2)/6*1. Is t not equal to 19?\nTrue\nLet u = 4 + -4. Let k be u - (-2)/((-4)/(-2)). Which is" +"15 or u?\nu\nLet l be (-4)/8*-1 - (2/(-4) + 0). Which is smaller: 11/147 or l?\n11/147\nSuppose 0 = -2*m + 5*u + 451, -m - 3*u + 219 = u. Suppose 4*h = m + 349. Is h < 142?\nFalse\nLet f = -1848 - -1609.4. Let d = f - -240. Which is smaller: d or -7?\n-7\nLet d be 42/40*(-38)/133 + (-1)/(-10). Let h = 8 - 5. Let y = h + -2. Do d and y have different values?\nTrue\nSuppose 3*n + 4*h = 215, 0 = 7*n - 2*n - 3*h - 310. Let b = -15/2732 + -1958679/30052. Let j = n + b. Is 0.03 less than j?\nFalse\nSuppose 0 = -25*o + 27*o - 6. Suppose 10*h = -o*h - 2496. Are -192 and h unequal?\nFalse\nSuppose 5*k + 17*d = 21*d - 12, 3*k - 2*d = -6. Let l = 278305/32 + -8696. Is l >= k?\nTrue\nLet q = -11975 + 3137465/262. Which is greater: 0 or q?\nq\nLet b(k) = 1. Let m(w) = w**2 - 2*w + 3. Let z(t) = -2*b(t) + m(t). Let i" +"t is -3 + -99?\n-a0\nIn base 15, what is -12 + -1?\n-13\nIn base 14, what is 840 - 0?\n840\nIn base 9, what is -17 - 82?\n-110\nIn base 14, what is 6 + a?\n12\nIn base 2, what is 10 + 11000010?\n11000100\nIn base 13, what is -8 + 0?\n-8\nIn base 3, what is 112102 - 0?\n112102\nIn base 9, what is 4 + 545?\n550\nIn base 2, what is -10011 - -10101?\n10\nIn base 15, what is 4 - c5?\n-c1\nIn base 3, what is -102 - -1?\n-101\nIn base 13, what is -7 + -332?\n-339\nIn base 7, what is 5 + 2050?\n2055\nIn base 5, what is 131 - -113?\n244\nIn base 12, what is 2 + 1a?\n20\nIn base 14, what is 4 + 3b4?\n3b8\nIn base 3, what is -1 - 1122?\n-1200\nIn base 10, what is -4 + -103?\n-107\nIn base 7, what is -503 + 1?\n-502\nIn base 9, what is -1 - -84?\n83\nIn base 7, what is -15 + 143?\n125\nIn base 16, what is" +", -33, -76, -145, -246, -385, -568?\n-w**3 - w**2 + w\nWhat is the v'th term of 7, 5, -3, -17?\n-3*v**2 + 7*v + 3\nWhat is the r'th term of 18, 26, 32, 30, 14?\n-r**3 + 5*r**2 + 14\nWhat is the w'th term of -150, -309, -468, -627, -786?\n-159*w + 9\nWhat is the g'th term of 2, 86, 316, 764, 1502?\n12*g**3 + g**2 - 3*g - 8\nWhat is the r'th term of -749, -740, -725, -704, -677?\n3*r**2 - 752\nWhat is the x'th term of 17, 18, 37, 80, 153, 262, 413, 612?\nx**3 + 3*x**2 - 15*x + 28\nWhat is the b'th term of 63, 279, 647, 1173, 1863, 2723?\nb**3 + 70*b**2 - b - 7\nWhat is the n'th term of 38, 84, 138, 200, 270?\n4*n**2 + 34*n\nWhat is the d'th term of 17, 33, 57, 89, 129?\n4*d**2 + 4*d + 9\nWhat is the i'th term of -553, -551, -549, -547, -545?\n2*i - 555\nWhat is the o'th term of -42, -10, 44, 120, 218, 338, 480?\n11*o**2 - o - 52\nWhat is the u'th term of -170, -665, -1494," +" j = g + -56.00000098. Round j to seven dps.\n-0.000001\nLet u = -45.98 + 41. Let x = u - -5. What is x rounded to one decimal place?\n0\nSuppose 2*j - 13 = x - 0, -5*j = 10. Let y = -10 - x. What is y rounded to the nearest integer?\n7\nSuppose 7*c - 2*c = -35. Let v be (7 - -31)*c/2. Round v to the nearest 10.\n-130\nLet f = 553094 - 553094.1517685. Let u = -1.6517865 - f. Let z = u - -1.5. What is z rounded to five dps?\n-0.00002\nLet y be ((-3)/2)/(1/(-2)). Let r = 30 - y. Round r to the nearest ten.\n30\nLet r = 1.8 + -1.796. Let v = r + 11.696. Round v to the nearest integer.\n12\nLet b(k) = -k**3 - k - 2. Let o be b(-2). Suppose -5*g + 4*v = 34, 0 = -5*g - v - 29 - 0. Let h = g + o. What is h rounded to 0 dps?\n2\nLet g = -10 - -16. Let k = -6.03 + g. Round k to 1 dp.\n0\nLet r" +" -1.535635915 rounded to the nearest integer?\n-2\nWhat is -3.69275428 rounded to 0 dps?\n-4\nWhat is 3562694.4 rounded to the nearest 10000?\n3560000\nRound 1039.78845 to the nearest ten.\n1040\nWhat is -0.000006709327 rounded to 7 dps?\n-0.0000067\nRound 3.18389838 to four decimal places.\n3.1839\nRound -5.64190545 to 0 decimal places.\n-6\nRound 533.8528911 to 2 decimal places.\n533.85\nWhat is 2.92625351 rounded to the nearest integer?\n3\nRound 0.0029047547 to 3 decimal places.\n0.003\nWhat is 1.24091414 rounded to 2 dps?\n1.24\nRound -0.0152316332 to six decimal places.\n-0.015232\nRound 3549.38073 to the nearest one hundred.\n3500\nRound -0.00000472469674 to 6 dps.\n-0.000005\nRound 102929.585 to the nearest 1000.\n103000\nRound 6.7284437 to three decimal places.\n6.728\nWhat is 0.000330980552 rounded to 4 dps?\n0.0003\nRound 0.0183946784 to 4 dps.\n0.0184\nWhat is -884.4875 rounded to the nearest one hundred?\n-900\nRound 0.049203374 to 5 dps.\n0.0492\nWhat is -0.0003792646682 rounded to 7 dps?\n-0.0003793\nRound 156.837573 to two dps.\n156.84\nRound 62197.7973 to the nearest ten.\n62200\nWhat is -5561.737 rounded to the nearest one thousand?\n-6000\nWhat is 3742.74133 rounded to the nearest 100?\n3700\nRound 8654.3289 to the nearest one thousand.\n9000\nRound -10272.514386 to" +"/a)/((-6)/(-28)). Let g(s) = -4*s - 18. Let c be g(-7). Solve 4*i + 7 = -t - j, -3*t = 4*i + c for i.\n-4\nSuppose -19 = -g - 3*j, 2*g - 5*j + 8 - 2 = 0. Let z = 13 + -18. Let o = g + z. Solve 3*t - o*k + 16 = 0, -4*t - t - 3*k = 14 for t.\n-4\nLet s(q) = -21*q - 121. Let f be s(-6). Solve -n = y - 3*n + 1, f*y - 8 = -3*n for y.\n1\nLet z be ((-4)/(-3))/((-2)/3). Let l = z - -4. Let k be 3/l + (-2)/4. Solve 4*p = -2*h + k + 5, 2*h = 5*p - 21 for h.\n-3\nLet q(i) = 6*i - 61. Let k be q(11). Solve -3*m + d - 17 = m, m - 22 = -k*d for m.\n-3\nLet f(s) = -s**3 - 8*s**2 - 6*s + 9. Let l be f(-7). Let k be (-2)/12*l*-1*6. Solve 4*h + 3*q = 0, -h - q = k - 1 for h.\n3\nLet i(k) = -k - 1. Let q be i(-13)." +"ppose 5*o + 9 - d = 0. Solve o*h = 6 + v for h.\n2\nLet b be 29 + -30 - (-8 + 0). Solve -y = 2*y - b*y for y.\n0\nLet v be 18/3*3/6. Suppose 4*u = -f + 21, v*f = -0*u + 2*u - 7. Suppose u*r - 39 = 21. Solve 4*b + 0 = -r for b.\n-3\nLet p be (60/40)/(3/8). Suppose p*u = 3*j - 56, 2*j - 16 - 14 = -u. Solve j = 5*v - 9*v for v.\n-4\nLet d(i) = i**2 + 11*i + 18. Let k be d(-9). Solve -3*o + o + 6 = k for o.\n3\nSuppose -o = 4*u - 11, o + 2 = 2*u + 5*o. Suppose -2*q - 21 = -3*m, u*m - q = -2*m + 35. Let k = m + 3. Solve 0 = w + w - k for w.\n5\nLet s be (-64)/12*3/1. Let j = s - -27. Solve 3*x - j = -5 for x.\n2\nLet d = 231 - 210. Solve q = -d + 18 for q.\n-3\nLet a be 4 - ((-4" +"What is the next term in -50, -113, -236, -437, -734?\n-1145\nWhat is next in -423, -443, -471, -507, -551, -603, -663?\n-731\nWhat is the next term in -13160, -13297, -13434?\n-13571\nWhat is next in 1643, 3597, 5549, 7499?\n9447\nWhat is next in 383, 393, 405, 419?\n435\nWhat is the next term in 54455, 108911, 163367, 217823?\n272279\nWhat is the next term in 80797, 161594, 242391, 323188, 403985?\n484782\nWhat is the next term in -48313, -48304, -48283, -48244, -48181?\n-48088\nWhat is the next term in 586912, 586915, 586918?\n586921\nWhat comes next: 62, 35, 8, -13, -22?\n-13\nWhat comes next: 89, 37, -41, -145, -275?\n-431\nWhat comes next: 1656632, 3313266, 4969900, 6626534, 8283168?\n9939802\nWhat comes next: 4538, 4557, 4590, 4643, 4722, 4833?\n4982\nWhat is next in 155, 489, 823, 1157?\n1491\nWhat comes next: -321, -204, -87, 30, 147, 264?\n381\nWhat is the next term in -2838, -11298, -25388, -45102, -70434, -101378, -137928, -180078?\n-227822\nWhat is next in 26400, 26396, 26392, 26388, 26384?\n26380\nWhat is the next term in -205098, -410199, -615300, -820401, -1025502, -1230603?\n-1435704\nWhat is the next term in -701, -726, -747," +"7\nWhat is the greatest common divisor of 7620 and 120?\n60\nWhat is the greatest common divisor of 1600 and 50?\n50\nWhat is the greatest common factor of 50 and 1450?\n50\nWhat is the highest common factor of 2359 and 77?\n7\nCalculate the greatest common factor of 12 and 6.\n6\nWhat is the greatest common divisor of 140 and 11620?\n140\nWhat is the greatest common divisor of 2595 and 75?\n15\nCalculate the highest common factor of 75 and 135.\n15\nWhat is the greatest common divisor of 23 and 1127?\n23\nWhat is the highest common divisor of 870 and 2378?\n58\nCalculate the greatest common divisor of 66 and 10516.\n22\nCalculate the greatest common factor of 182 and 13.\n13\nWhat is the highest common factor of 41 and 4838?\n41\nCalculate the greatest common divisor of 315 and 207.\n9\nWhat is the highest common factor of 286 and 143?\n143\nWhat is the highest common divisor of 272 and 42296?\n136\nCalculate the highest common factor of 130 and 30.\n10\nCalculate the greatest common factor of 24 and 104.\n8\nWhat is the greatest common divisor of 209" +"= c - o. Round t to six decimal places.\n-0.000005\nLet a = 111 - 109.66. Let v = a - 0.24. What is v rounded to one dp?\n1.1\nLet b = -576 + 622.4. Let r = 52 - b. Round r to the nearest integer.\n6\nLet v = -14 - -8. Let u = -5.9 - v. Let c = u + -0.099935. Round c to five dps.\n0.00007\nLet x = 19907 + -19900.936939. Let m = 4.9830704 - x. Let w = -1.08 - m. What is w rounded to 6 dps?\n-0.000009\nLet q = -4 + 5.6. Let t = -3.3 + q. What is t rounded to the nearest integer?\n-2\nLet r = 118 + -118.077. Round r to 2 decimal places.\n-0.08\nLet r = 77227 - 152727. What is r rounded to the nearest 10000?\n-80000\nLet g = -28 - -27.99999946. Round g to seven dps.\n-0.0000005\nLet x = 20.80321114 + -20.77321. Let v = -0.03 + x. Round v to 7 decimal places.\n0.0000011\nLet m = 201.105794839 + -0.105875839. Let q = 201 - m. What is q rounded to five decimal places?" +" prime factors of 278666?\n2, 139333\nList the prime factors of 1449829.\n1449829\nWhat are the prime factors of 1655721?\n3, 20441\nWhat are the prime factors of 11112922?\n2, 727, 7643\nWhat are the prime factors of 244640?\n2, 5, 11, 139\nList the prime factors of 461453.\n19, 149, 163\nWhat are the prime factors of 103804?\n2, 25951\nWhat are the prime factors of 20098398?\n2, 3, 3349733\nList the prime factors of 12808152.\n2, 3, 7, 43, 197\nWhat are the prime factors of 8651953?\n8651953\nList the prime factors of 12384851.\n12384851\nList the prime factors of 1230672.\n2, 3, 25639\nList the prime factors of 3316183.\n13, 79, 3229\nList the prime factors of 1888694.\n2, 659, 1433\nWhat are the prime factors of 461707?\n461707\nWhat are the prime factors of 77850?\n2, 3, 5, 173\nWhat are the prime factors of 12551747?\n13, 965519\nWhat are the prime factors of 853546?\n2, 426773\nWhat are the prime factors of 945198?\n2, 3, 52511\nList the prime factors of 252680.\n2, 5, 6317\nList the prime factors of 3522274.\n2, 7, 47, 53, 101\nWhat are the prime factors of 603094?\n2, 151," +"*o = 3*o + 11. Solve -3 = w*x + 9 for x.\n-2\nSuppose 0*x + 352 = 8*x. Let a = 9 - -15. Let w = x - a. Solve 5*y - w = y for y.\n5\nSuppose 5*j - 3*k + 6*k + 75 = 0, -73 = 4*j + 5*k. Let r be 3*(j/9 - -1). Let z be 2 + 1 - 0/r. Solve 0 = -z*o - 0*o + 15 for o.\n5\nLet r be 6/5*(-240)/(-96). Suppose 15 = 3*w + a - 6, 5*w - 3*a = 21. Let s(p) = -p**3 + 5*p**2 + 6*p + 2. Let q be s(w). Solve -q*n = n + r for n.\n-1\nLet p(m) = 2*m**2 - 2*m - 3. Let l(g) = -2*g**2 + 2*g + 2. Let s(a) = -6*l(a) - 5*p(a). Let i be s(2). Solve -3 = -i*c + 4*c for c.\n1\nLet d = 17 + -12. Let m = 9 - d. Solve m*o = -0*o for o.\n0\nSuppose -2*q + 14 = 3*o - 5, -5*o + 30 = 3*q. Solve 0 = o*x - x for x.\n0\nLet r be" +" + 44. List the prime factors of z.\n11\nSuppose -y + 15 = -3*r + 2*r, 4*r + 5*y = -78. Let z = r - -46. What are the prime factors of z?\n29\nLet n = -127 - -403. What are the prime factors of n?\n2, 3, 23\nLet i = -2 + 5. Suppose -4*b - 4*n - 16 = 0, -5*n - 20 = -3*b + b. Suppose 0*s - 4*s + 14 = i*d, b = 3*s - 4*d + 2. What are the prime factors of s?\n2\nSuppose 5*o = o - 32. What are the prime factors of ((-3)/2)/(2/o)?\n2, 3\nLet r = 494 + -333. List the prime factors of r.\n7, 23\nSuppose 4*b - 4*t - 312 = 0, -3*b - t + 226 = 4*t. List the prime factors of b.\n7, 11\nLet p = 3 - -3. Suppose -3*v = 3*u - 6, -v - u - p = -2*v. List the prime factors of v.\n2\nSuppose 2*r + 15 = 1. Let k = 7 - r. What are the prime factors of k?\n2, 7\nLet h(k) be the third" +"11\nWhat is -3cd684 (base 15) in base 12?\n-b941ba\nWhat is -3543423 (base 12) in base 15?\n-d84213\n10000111000010100111 (base 2) to base 16\n870a7\nWhat is 1a6835 (base 16) in base 7?\n20465343\n-32a8340 (base 11) to base 6\n-324105122\nConvert 221122012221 (base 4) to base 8.\n51320651\nConvert -2210321211 (base 4) to base 14.\n-13820d\nConvert 2550aa (base 13) to base 6.\n31114312\n4e5da (base 15) to base 7\n2064004\nConvert 1463b1 (base 15) to base 8.\n3577666\nConvert 583097 (base 10) to base 15.\nb7b82\nConvert 18a80a7 (base 14) to base 10.\n12238387\nWhat is -26350 (base 15) in base 7?\n-1016262\n6056303 (base 7) to base 11\n452033\nWhat is 1a3310 (base 11) in base 14?\n818d6\nConvert 20123210310 (base 4) to base 8.\n10334464\nWhat is -101222012210 (base 3) in base 11?\n-13826a\n-1002120210200 (base 3) to base 13\n-175095\n1000001101100010100110 (base 2) to base 5\n1022340424\n321623 (base 9) to base 15\n3bb20\n10054661 (base 9) to base 10\n4819231\n-ae498 (base 15) to base 13\n-165542\n115a755 (base 11) to base 16\n1ed2c2\nWhat is -2f783 (base 16) in base 3?\n-100212201022\n28488 (base 16) to base 8\n502210\n2015521 (base 6)" +"a factor of 1723609805?\nFalse\nIs 2386310 even?\nTrue\nIs 47576060 a multiple of 7?\nTrue\nIs 42 a factor of 215838714?\nTrue\nIs 1242 a factor of 510085337?\nFalse\nIs 56156184 a multiple of 804?\nTrue\nDoes 39 divide 1200132309?\nFalse\nIs 163861048 a multiple of 26?\nTrue\nDoes 982 divide 98021276?\nTrue\nIs 105129420 a multiple of 60?\nTrue\nDoes 324 divide 37675234?\nFalse\nIs 4 a factor of 421929?\nFalse\nDoes 4 divide 346162426?\nFalse\nIs 4019520 a multiple of 316?\nTrue\nIs 13 a factor of 16701581?\nTrue\nIs 276023995 a multiple of 110?\nFalse\nIs 206 a factor of 20771824?\nFalse\nDoes 38 divide 2349239382?\nTrue\nIs 14810173 a multiple of 4?\nFalse\nDoes 19 divide 733581398?\nFalse\nIs 15 a factor of 790193856?\nFalse\nIs 67397936 a multiple of 934?\nFalse\nDoes 91 divide 91740376?\nTrue\nIs 4335259528 a multiple of 40?\nFalse\nDoes 13 divide 2390282?\nFalse\nIs 9 a factor of 34032406?\nFalse\nIs 17105886 a multiple of 2723?\nTrue\nIs 708959223 a multiple of 1103?\nFalse\nDoes 745 divide 14958855?\nTrue\nIs 7356085 a multiple of 3?\nFalse\nDoes 152 divide 195670672?\nFalse\nIs 35 a factor of 120098720?\nTrue\nIs" +"04122324323 + -3?\n-104122324331\nIn base 13, what is 2697124 - 3?\n2697121\nIn base 4, what is 1110122310 + 210112?\n1110333022\nIn base 14, what is -1b6 - -16773?\n1659b\nIn base 5, what is 1210444 - 24?\n1210420\nIn base 15, what is 1 - 4aab48?\n-4aab47\nIn base 4, what is -323232301 + -230201?\n-330123102\nIn base 12, what is 1476809 - -10?\n1476819\nIn base 8, what is 67 + -610111?\n-610022\nIn base 7, what is 51 - 411642?\n-411561\nIn base 9, what is 140708 + 1677?\n142486\nIn base 5, what is 24030 - 12404131?\n-12330101\nIn base 10, what is -37093387 - 0?\n-37093387\nIn base 10, what is 157016 - 35?\n156981\nIn base 2, what is -10001 - 10111111001101111110?\n-10111111001110001111\nIn base 12, what is -995392 + -21?\n-9953b3\nIn base 10, what is 4505 + -7223?\n-2718\nIn base 10, what is -4649 + 11001?\n6352\nIn base 13, what is -136 - 43287b?\n-4329b4\nIn base 5, what is 2 - -1430343414?\n1430343421\nIn base 13, what is 4c4c2 + 23?\n4c515\nIn base 11, what is 22a50181 + 2?\n22a50183\nIn base 6, what is 133052 +" +"0, 44 - 14 = 2*u - 3*j. Let m be 3/(0 + u/6). Suppose -h - m + 23 = 0. Is h a prime number?\nFalse\nSuppose -71 = s + 521. Let u = 36 - s. Suppose -15*p + 19*p = u. Is p a prime number?\nTrue\nIs (31667 - 3 - -6)/(4/2) a prime number?\nFalse\nSuppose -3*o - 3*y = -5*o - 3, 2*o - 2*y = -6. Let p(a) = -3*a + 11. Let w be p(o). Suppose w + 201 = 5*r. Is r prime?\nFalse\nSuppose 4*w + 4*v = 41552, 2*v - 5354 - 5031 = -w. Is w a composite number?\nFalse\nLet u be 48/36 - (-2)/3. Let b be (u - (-33)/(-6))*-2. Let t(a) = 8*a**2 - 2*a - 7. Is t(b) a prime number?\nFalse\nSuppose -3*o - 2 + 11 = 0. Suppose -4*d = -2*y + 1830, o*d = 7*d - 12. Suppose c + 2*c - y = 0. Is c composite?\nFalse\nSuppose 3*b = b + 1272. Suppose 0 = 4*o - 0*o - b. Is o a prime number?\nFalse\nLet u(r) = 5*r**2 + 18*r + 19. Let" +" the nearest 1000000?\n54000000\nLet k = 51.08 - 1.08. Let f = 50.036 - k. Round f to 2 dps.\n0.04\nLet s = -0.116 + 0.1159706. Round s to 5 dps.\n-0.00003\nLet p = 3463324.00046 + -3463273. Let z = 51 - p. What is z rounded to four dps?\n-0.0005\nLet d be 2/6 + 0 + (-34)/102. Suppose d = 5*n - 9*n - 588000. Round n to the nearest 10000.\n-150000\nLet u = 135555475 + -135555494.0000114. Let l = u + 19. What is l rounded to 6 decimal places?\n-0.000011\nLet d = -12 + 0. Let p = d - -12. Let i = 7 - p. Round i to zero decimal places.\n7\nLet x = 15.306 + -85.996. Let f = x - -71. Let a = -0.3100017 + f. Round a to 6 dps.\n-0.000002\nLet d = 0.365 + -0.37505. What is d rounded to three decimal places?\n-0.01\nLet g = -3.4031348 + 2.93914257. Let f = 0.464 + g. Round f to seven decimal places.\n0.0000078\nLet b = 1.5 + -6.9. Let w = b - -5.657. Round w to two decimal places.\n0.26" +"2 + 2*x - 9\nCollect the terms in -437063*j + 145691*j + 145691*j + 19*j**2 - 18*j**2 + 145685*j.\nj**2 + 4*j\nCollect the terms in -79408268625*w**2 - 3 + 3 + 79408268624*w**2.\n-w**2\nCollect the terms in -515*r - 509*r - 511*r - 510*r + 2604*r - 565*r.\n-6*r\nCollect the terms in 18*x**3 + 294 - 18*x**3 - x**3 - 31*x - 294.\n-x**3 - 31*x\nCollect the terms in 2 - 2 + 542*u - 257*u - 266*u.\n19*u\nCollect the terms in 9770028115892 - 9770028115892 - 2*d**2.\n-2*d**2\nCollect the terms in 24698 + 4425 - 49 + 19*p.\n19*p + 29074\nCollect the terms in -6336 + 6355 + 1200*g - 1201*g.\n-g + 19\nCollect the terms in -149607158636 + 149607158636 - 339*s.\n-339*s\nCollect the terms in 2828*f**3 - 1424*f**3 + 684 - 1415*f**3 - 684.\n-11*f**3\nCollect the terms in 7*l - 4*l - l**2 + 10*l + 9*l**2 - 13*l.\n8*l**2\nCollect the terms in 228*o + 18608*o**2 + 54 - 54.\n18608*o**2 + 228*o\nCollect the terms in -555634*r + 6*r**2 - 5 + 555634*r - 2*r**2 - 10.\n4*r**2 - 15\nCollect the terms in 120*g + 20*g**2" +"vided by 1079?\n0\nWhat is the remainder when 183 is divided by 49?\n36\nCalculate the remainder when 1906968 is divided by 9680.\n8\nCalculate the remainder when 42012 is divided by 44.\n36\nCalculate the remainder when 60615 is divided by 57.\n24\nWhat is the remainder when 107600 is divided by 213?\n35\nCalculate the remainder when 1555 is divided by 495.\n70\nCalculate the remainder when 197481 is divided by 388.\n377\nWhat is the remainder when 1228051 is divided by 4?\n3\nWhat is the remainder when 4111 is divided by 1534?\n1043\nCalculate the remainder when 18601 is divided by 37.\n27\nCalculate the remainder when 17733 is divided by 3543.\n18\nWhat is the remainder when 3955 is divided by 6?\n1\nWhat is the remainder when 1027 is divided by 188?\n87\nWhat is the remainder when 6852 is divided by 358?\n50\nCalculate the remainder when 12430 is divided by 3050.\n230\nWhat is the remainder when 23643 is divided by 101?\n9\nWhat is the remainder when 76953 is divided by 5919?\n6\nCalculate the remainder when 28005 is divided by 235.\n40\nCalculate the remainder when 407221 is divided" +"he value of -49 + -5 + -56 - -74?\n-36\n-32 + (-35 + -6 + 74 - -32)\n33\nEvaluate 5348 + -5453 + 34 + 2.\n-69\nWhat is the value of 2 - 14 - (63 - 73) - (-40 - -16)?\n22\nWhat is the value of 12 + (-1 - -1) - (-36 - (-60 - -4)) - 7?\n-15\nWhat is the value of -13 - ((107 - 65) + -21)?\n-34\nEvaluate (64 + -150 - -40) + 68.\n22\nCalculate 0 - -28 - (72 - 243 - -169).\n30\n63 - (104 + -36) - 56\n-61\n41 - (8 + -1 + 3 + (-40 - -38))\n33\nCalculate 68 + (7 - -6) + -21.\n60\nWhat is the value of -3 + (-5 - -9) + 10 - (44 + -87)?\n54\nCalculate -19 + (-48 - (-7 - 31)).\n-29\nEvaluate 153 + -51 + -168 + -33.\n-99\n-26 + (46 - (-11 + 16))\n15\nWhat is the value of 18 - (-26 + 128) - -144?\n60\nCalculate -11 + -8 - (-2 - (3 - 23)).\n-37\nCalculate (98 - 51) +" +" = -12*h - 5. Let f be x(0). Let m = -3 + 5. Let t be 4/(-3) + m/6. Put 0, t, f in ascending order.\nf, t, 0\nLet k = -0.2 - -0.1. Put 0.2, -1, k, -1/4 in descending order.\n0.2, k, -1/4, -1\nLet c = 7 + -9.06. Let g = -1 + 0.94. Let d = g - c. Sort 2/7, d, -1/4 in decreasing order.\nd, 2/7, -1/4\nLet w be ((-20)/(-3))/((-4)/(-9)). Put w, 1, 2 in decreasing order.\nw, 2, 1\nLet m(r) = -2*r. Let d be m(-7). Let u = 34 - d. Suppose -2*y - a + 15 = 0, -y - a = 2*y - u. Sort -5, 1, y.\n-5, 1, y\nSuppose 0 = 8*d - 4*d - 80. Let j be 2/(-4) + 25/d. Put 4, j, -2/3 in ascending order.\n-2/3, j, 4\nLet o be (10/3)/(2/3). Let b = 7 - o. Suppose 0*d = 5*d - 25. Sort b, d, -4.\n-4, b, d\nLet z = -4 - -6. Suppose -5*f + 3*x = -3, -2*f - z*f - 4*x + 28 = 0. Suppose -2*m + 0*m + 4" +" prime number?\nTrue\nLet o(t) = t**2 + 7*t - 6. Let l be o(-8). Suppose -l*f + 3*a = -f - 176, -3*f - a = -478. Is f a prime number?\nFalse\nSuppose 2*x + 3*s = -389 + 11458, 4*x = -s + 22153. Is x prime?\nFalse\nLet y = 27880 - 14037. Is y composite?\nTrue\nSuppose 112*y + 162189 = 139*y. Is y a prime number?\nTrue\nSuppose -3027 = 105*j - 108*j. Is j composite?\nFalse\nLet z be (-53)/(-4) - 1/4. Let u be (-2)/z + (-328)/(-104). Suppose -3*b + u*d - 22 = -4*b, -d = 5*b - 152. Is b composite?\nFalse\nSuppose 6*k - 7195 = -1033. Is k prime?\nFalse\nLet b(f) = 1043*f**2 + 7*f + 5. Is b(-1) composite?\nTrue\nSuppose 5*l = -150265 + 627800. Is l composite?\nFalse\nSuppose 142*r - 730561 = 129*r. Is r a prime number?\nTrue\nLet m = 253 - 181. Let y = m - 41. Let k = y + 20. Is k a composite number?\nTrue\nSuppose -3*v + 1104 + 2671 = -h, 3*h = -4*v + 5016. Is v prime?\nFalse\nLet f(p) =" +"many nanoseconds are there in 1/10 of a millisecond?\n100000\nWhat is 0.9586552 micrometers in millimeters?\n0.0009586552\nWhat is one quarter of a kilogram in grams?\n250\nWhat is 9/16 of a day in seconds?\n48600\nWhat is 0.480764 centuries in months?\n576.9168\nHow many milliseconds are there in 630999.4 minutes?\n37859964000\nWhat is 7/25 of a millennium in years?\n280\nConvert 1842.74 micrograms to grams.\n0.00184274\nWhat is five quarters of a tonne in kilograms?\n1250\nHow many millilitres are there in eleven eighths of a litre?\n1375\nWhat is 15.9655671 nanoseconds in days?\n0.00000000000018478665625\nWhat is 3/5 of a millennium in years?\n600\nConvert 75499.6m to kilometers.\n75.4996\nHow many grams are there in 4.632332kg?\n4632.332\nHow many minutes are there in 2/9 of a day?\n320\nWhat is 191.4772 millilitres in litres?\n0.1914772\nWhat is 3.305299 weeks in microseconds?\n1999044835200\nWhat is 976.1195 millennia in centuries?\n9761.195\nConvert 0.9526384 minutes to seconds.\n57.158304\nWhat is 10/3 of a year in months?\n40\nWhat is 0.0280551mg in micrograms?\n28.0551\nConvert 81555.37l to millilitres.\n81555370\nWhat is fourty-seven quarters of a tonne in kilograms?\n11750\nHow many nanoseconds are there in twenty-nine fifths of a microsecond?\n5800\nHow many" +"\nWhich is bigger: -162 or -169?\n-162\nWhich is greater: 679 or 683?\n683\nIs 171 > 171?\nFalse\nIs 184 <= 184?\nTrue\nWhich is greater: -3/4 or 262/11?\n262/11\nIs 34 bigger than -1/13?\nTrue\nWhich is smaller: -1 or 17.8?\n-1\nWhich is smaller: 1 or 54/121?\n54/121\nWhich is bigger: 8 or 16/7?\n8\nIs -2/27 > 1618?\nFalse\nIs 98 < 4?\nFalse\nWhich is smaller: 11 or -345?\n-345\nWhich is smaller: 28 or 13?\n13\nAre 277 and 124 equal?\nFalse\nWhich is bigger: -0.12 or -584?\n-0.12\nAre 25 and 15 nonequal?\nTrue\nWhich is smaller: 262/13 or 20?\n20\nIs -0.015 greater than -0.4?\nTrue\nIs 3535 greater than or equal to 0.1?\nTrue\nIs -88 greater than -84?\nFalse\nAre 1147/4 and 288 unequal?\nTrue\nIs 2389 > 2392?\nFalse\nIs 1086 less than or equal to 2?\nFalse\nIs -47 >= -43?\nFalse\nIs -45 at most -629/14?\nTrue\nDoes -1216/17 = -72?\nFalse\nAre -1993 and -1993 non-equal?\nFalse\nIs -46/31 < 0?\nTrue\nAre 48/89 and 2 unequal?\nTrue\nWhich is greater: 2650 or 2648?\n2650\nWhich is greater: 21 or -1/92?\n21\nWhich is smaller: 0.1" +"e 0 = -2*v - 0*v + 6. Suppose -4*q = -q - 3. Suppose -3*o = -5*x + 3, -3*o + v*x + 4 = q. Solve -2*p = -o*p for p.\n0\nSuppose 4*t - 15 = -t. Solve 2*o + t = 1 for o.\n-1\nLet m be (-3)/(-12) - 78/(-8). Solve -5*c + 5 + m = 0 for c.\n3\nSuppose 4*x + 2*v = x - 1, 4*v + 35 = 5*x. Suppose -6*w + 75 = -w. Suppose x = 3*s - w. Solve 0 = 3*p - s + 15 for p.\n-3\nSuppose -13*t + 16*t = 15. Solve 2*i = -1 - t for i.\n-3\nSuppose 5*o + 3*p - 7 = 0, 0 = o - 3*o + 4*p + 8. Suppose -o*u = -5*y + 13, 0 = 4*u - 0*y + 2*y - 10. Solve x + u + 3 = 0 for x.\n-4\nSuppose 5*q + 0 = 45. Suppose 0*o - 25 = -5*o. Solve o*f + q = -6 for f.\n-3\nLet m = 86 - 41. Suppose 0 = -0*d - 3*d + m. Let w = -19 -" +" Let b be v(2). List the prime factors of (507/b)/(6/16).\n2, 13\nLet t(r) = -r**2 + 0 + 2 + 2 + 9*r + 3. Let b be t(9). What are the prime factors of 18/(-63) - (-156)/b?\n2, 11\nLet z(g) = -131*g - 13. Let r be z(-3). Suppose 3*w + r = 7*w. What are the prime factors of w?\n5, 19\nSuppose 3*u + 4*o = -u, o = 4*u - 10. Suppose 0 = -u*p - 3*p - 615. List the prime factors of p/(-2)*(-12)/(-9).\n2, 41\nLet q = -2 + 10. Let r = -23 + q. Let n = r + 32. What are the prime factors of n?\n17\nLet h(r) be the second derivative of 0 + 1/3*r**3 + 11*r + 9*r**2. List the prime factors of h(12).\n2, 3, 7\nSuppose -2*l + 2*g = -20, g + 4 = 1. Let h = 7 - l. Suppose -s + 57 = 2*s - 5*p, h = 5*s - 5*p - 85. List the prime factors of s.\n2, 7\nLet y(b) = 42*b**2 - 82*b - 6. What are the prime factors of y(5)?\n2, 317\nLet" +" 5999 = w*g - 10736. Is g a composite number?\nFalse\nLet x(o) = -129*o + 4. Suppose 0*w = -3*w - 2*q - 12, 3*w + 27 = 3*q. Is x(w) a prime number?\nFalse\nSuppose -q = -169 - 1678. Is q a composite number?\nFalse\nIs ((-2334)/9)/(775/(-255) - -3) prime?\nFalse\nLet j = 4337 - 2560. Is j prime?\nTrue\nSuppose -5*s = -397 - 13273. Is s a prime number?\nFalse\nSuppose 5*k - 703 = -l + 1050, -4*k = 3*l - 5259. Is l composite?\nFalse\nLet l(y) = -556*y + 97. Is l(-7) composite?\nFalse\nLet y = 531 + 3552. Is y composite?\nTrue\nIs 2143086/(-171)*3/(-2) prime?\nFalse\nIs (-2 - -5)*2*(-5435)/(-30) a composite number?\nFalse\nIs (-4 - (-2 - 4)) + (3 - -9512) a composite number?\nTrue\nSuppose -4*i - 2735 = 15*v - 18*v, -v + 925 = 2*i. Is v a composite number?\nTrue\nLet x = 21 + -29. Let v be 16/x*14/(-4). Suppose -v*m + 633 = -4*m. Is m a composite number?\nFalse\nLet b(h) = -333*h - 2. Is b(-1) prime?\nTrue\nLet q = -3629 - -5226. Let w = 589" +"ast common multiple of 5 and 15.\n15\nCalculate the common denominator of -101/276 and -35/24.\n552\nCalculate the common denominator of 31/152 and -99/10.\n760\nWhat is the common denominator of -59/2590 and -127/42?\n7770\nCalculate the lowest common multiple of 2400 and 15.\n2400\nCalculate the common denominator of 10/33 and -23/33.\n33\nFind the common denominator of 73/36 and 25/78.\n468\nFind the common denominator of -22/117 and -19/63.\n819\nWhat is the common denominator of -45/3008 and -45/16?\n3008\nFind the common denominator of -64/315 and -81/10.\n630\nWhat is the least common multiple of 30 and 1065?\n2130\nWhat is the lowest common multiple of 3164 and 14?\n3164\nFind the common denominator of -25/32 and -31/27.\n864\nWhat is the lowest common multiple of 48 and 6?\n48\nCalculate the common denominator of -93/1762 and -117/20.\n17620\nFind the common denominator of -99/8 and 101/174.\n696\nWhat is the common denominator of 29/869 and -35/1738?\n1738\nCalculate the smallest common multiple of 198 and 5500.\n49500\nWhat is the common denominator of 77/75 and -67/4?\n300\nCalculate the lowest common multiple of 2 and 36.\n36\nWhat is the common denominator of 41/21 and" +")/((-8)/(-100)).\n60\nLet g be (-6679)/(-8) + 7/28. Let o = g - 833. Find the common denominator of -27/10 and o.\n40\nLet x = 383359/18 - 21291. Let u = x - 131/9. Find the common denominator of u and 149/12.\n12\nWhat is the common denominator of -27/10 and 16/88 + 1517/66?\n30\nFind the common denominator of 4/11 and (2/(-24))/(20/2840).\n66\nLet t = -4017/5 - -797. Find the common denominator of 7/6 and t.\n30\nLet m = -36/1253 - -110163/40096. What is the common denominator of 57/16 and m?\n32\nSuppose 3*m - 3 = 2*m. What is the common denominator of (-339)/72 + 1/m and -11/6?\n24\nLet q be (2/(-5))/((-2)/(-10)). Calculate the common denominator of 35/4 and (0 + q)*(-292)/(-16).\n4\nLet n = -77 - -168. Suppose -4*g + n = 27. Suppose 15 = o + 3*o - j, 2*j = -o + 6. What is the smallest common multiple of o and g?\n16\nLet j(a) = 2*a - 12. Let z be j(13). Find the common denominator of 2 - (-1)/z*1 and -17/18.\n126\nWhat is the common denominator of 0 + 3 - (-172)/(-20) and 52/(-42) +" +"82 + 165 + (6 - (-9 + -30))?\n28\nWhat is the value of 17 - 2 - (-39 - 4 - -91) - -13?\n-20\nCalculate -7 - 68 - -30 - -28.\n-17\nCalculate -1 + 0 + 0 + (-23 - -24) - (-4145 + 4201).\n-56\nWhat is -11 + ((-7 - 2) + (15 - (5 + 17)) - -9)?\n-18\nWhat is the value of -36 + 169 + -15 + (-33 - -14)?\n99\nWhat is -55 - 0 - (17059 - 17065)?\n-49\nWhat is -1 - (1 - 3) - (13496 - 13553)?\n58\nWhat is the value of -185 + 33 + 274 - -20?\n142\nEvaluate 26 - ((-14 - -18) + 0 + 9) - 26.\n-13\nEvaluate -6 + -6 - (-1 + -5) - (-131 + 43 + -9).\n91\nCalculate 11 + 0 - (-83 - (62 + -111)).\n45\nWhat is (-30 - -78) + -43 - (-2 - -19)?\n-12\nEvaluate (21 - -2) + 28 + -52 + 17.\n16\nWhat is -4204 + 4167 - (-14 - -1 - -1)?\n-25\nWhat is the value of -44 - 0 -" +"0 and 85/896.\n4480\nWhat is the least common multiple of 23 and 253?\n253\nFind the common denominator of -39/56 and -29/5.\n280\nCalculate the common denominator of -103/858 and 41/780.\n8580\nCalculate the lowest common multiple of 692 and 16.\n2768\nCalculate the lowest common multiple of 726 and 847.\n5082\nCalculate the common denominator of 127/680 and 79/5848.\n29240\nWhat is the smallest common multiple of 819 and 168?\n6552\nFind the common denominator of 37/224 and 15/868.\n6944\nCalculate the smallest common multiple of 504 and 146.\n36792\nFind the common denominator of -16/7 and 5/27.\n189\nCalculate the lowest common multiple of 576 and 80.\n2880\nCalculate the lowest common multiple of 180 and 36.\n180\nCalculate the least common multiple of 8848 and 6.\n26544\nWhat is the smallest common multiple of 56 and 14?\n56\nCalculate the common denominator of 109/3768 and -71/24.\n3768\nWhat is the common denominator of -29/2384 and -13/4?\n2384\nCalculate the lowest common multiple of 1785 and 45.\n5355\nCalculate the smallest common multiple of 6 and 210.\n210\nWhat is the lowest common multiple of 4 and 2040?\n2040\nWhat is the smallest common multiple of 71" +"?\n15002142125\nIn base 11, what is 2a - -4004742?\n4004771\nIn base 12, what is 2546728 - -5?\n2546731\nIn base 11, what is -43859 - -1460?\n-423a9\nIn base 4, what is -11 + -201232210?\n-201232221\nIn base 16, what is 68b - -748d?\n7b18\nIn base 3, what is -220201000001 + 20222?\n-220200202002\nIn base 11, what is -9308290 - 0?\n-9308290\nIn base 2, what is -1011100101 + 111110000011?\n110010011110\nIn base 13, what is 10 - -10c2b508?\n10c2b518\nIn base 14, what is 1d120801 + -2?\n1d1207dd\nIn base 15, what is -2 - 4ca91c?\n-4ca91e\nIn base 8, what is 16740 + 3427?\n22367\nIn base 9, what is -2 - -773820?\n773817\nIn base 6, what is 113231550 + 11?\n113232001\nIn base 11, what is -2589 + 134?\n-2455\nIn base 4, what is 130 - 2000323020?\n-2000322230\nIn base 5, what is 134422 + 2224?\n142201\nIn base 14, what is 2bc - 52b9?\n-4ddb\nIn base 14, what is -d + 143b8d?\n143b80\nIn base 7, what is -3 + -224102264?\n-224102300\nIn base 12, what is 7aa - 505a?\n-4470\nIn base 2, what is 11110011001111011 + -1010000?\n11110011000101011" +"n - 2. Let b be y(-5). Let r(i) = -5*i - b*i**2 - 58 + 55 - i**3 + 10*i**2. What is r(m)?\n3\nLet j(w) = -w + 8. Suppose -3*h + 18 = -5*q + 53, 3*q = h + 21. Give j(q).\n1\nLet z = -54 - -32. Let v be (-165)/z + (1/2)/(-1). Let a(w) = -w**3 + 6*w**2 + 7*w. Give a(v).\n0\nLet a(s) = 3*s + s + 1 - 11*s - 2*s + 4*s. Let h be (-2)/7 - (-81)/63. Determine a(h).\n-4\nLet u(o) = o - 5. Let h(g) = 5*g - 4. Let p be h(3). Let d = p - 7. Calculate u(d).\n-1\nLet h(n) = -4*n - 2. Let k(v) = 5*v - 21. Let c be k(4). Let o be ((-32)/12)/((-4)/(-6)) - c. Give h(o).\n10\nLet h = 74 - 69. Let p(u) = -2*u + 3 + 5*u - 2*u. Calculate p(h).\n8\nLet c be 0 + (2 - 2) + 2. Let j(q) = 15*q**2 + q**c - q + 2*q. What is j(-1)?\n15\nLet k(y) = -3*y - 7. Let p be 8/26 + (-22878)/1599. Determine k(p)." +"*d + 6. Let t be (1 - -2) + -6 + -5. Let n be u(t). Solve 2*h + h = -n for h.\n-2\nSuppose -3*n = 30 - 39. Solve -v = n - 4 for v.\n1\nLet u = 3 + 0. Let y = u - 2. Solve 2*r = y + 3 for r.\n2\nLet v(q) = q**2 + 3*q - 8. Let d be v(-6). Solve -i - i = d for i.\n-5\nSuppose -3*i - 3*t = 2 - 14, -4*t = 4. Suppose -p = -0*p - 3*m + 11, i*p + 2*m + 4 = 0. Let u be (1 + p)/((-1)/7). Solve u*f - 3*f - 20 = 0 for f.\n5\nSuppose -15*z = -12*z - 45. Solve -2*o = 3*o - z for o.\n3\nSuppose -k + 2*i - 6 = -0*i, 2*i = 8. Solve -k*o = o for o.\n0\nLet n be 2 + 0 - 0 - 5. Let u = 10 + -13. Let o = u - n. Solve o = c + 2*c - 3 for c.\n1\nLet z = 15 + -13. Solve 0*k" +"0\nWhat is -8814 divided by 6?\n-1469\nWhat is -14 divided by 12?\n-7/6\nCalculate 350 divided by 25.\n14\nCalculate -1164 divided by 388.\n-3\nCalculate -56 divided by -8.\n7\nCalculate 1 divided by 203.\n1/203\nCalculate -3252 divided by -6.\n542\nDivide 432 by 216.\n2\nDivide 450 by 23.\n450/23\n16 divided by 58\n8/29\nWhat is -1698 divided by 566?\n-3\nWhat is 0 divided by -134?\n0\nDivide -34 by 34.\n-1\n8545 divided by 5\n1709\nCalculate 296 divided by 2.\n148\n-41 divided by -6\n41/6\nCalculate -17988 divided by -6.\n2998\nDivide 5 by -6.\n-5/6\nDivide -155 by -30.\n31/6\nWhat is 33561 divided by 2?\n33561/2\nCalculate 444 divided by -12.\n-37\nCalculate 592 divided by 2.\n296\nDivide 61 by -5.\n-61/5\nCalculate -5220 divided by -87.\n60\n-4288 divided by -134\n32\nWhat is 2100 divided by -4?\n-525\nWhat is -147 divided by 2?\n-147/2\nWhat is 107 divided by 81?\n107/81\nCalculate -500 divided by -10.\n50\nWhat is -452 divided by 1?\n-452\nCalculate -304 divided by -3.\n304/3\n18 divided by -2\n-9\nDivide -2955 by -591.\n5\nDivide 582 by -2." +"8?\n-46\n-100 (base 2) to base 11\n-4\n-2 (base 8) to base 5\n-2\nConvert 10 (base 6) to base 4.\n12\n-1 (base 11) to base 10\n-1\nb (base 12) to base 4\n23\nWhat is -15 (base 12) in base 7?\n-23\nConvert -3b (base 12) to base 2.\n-101111\n2 (base 5) to base 9\n2\nConvert 2 (base 14) to base 8.\n2\nConvert 8 (base 15) to base 16.\n8\nConvert 1100 (base 2) to base 8.\n14\nConvert -2 (base 8) to base 10.\n-2\nWhat is -167 (base 11) in base 9?\n-235\nWhat is 20 (base 12) in base 3?\n220\nWhat is -1 (base 3) in base 11?\n-1\nWhat is 4 (base 12) in base 14?\n4\nWhat is -5 (base 9) in base 3?\n-12\nConvert -2320 (base 4) to base 8.\n-270\n110 (base 5) to base 12\n26\nWhat is 0 (base 4) in base 14?\n0\n5 (base 7) to base 14\n5\nConvert 11 (base 3) to base 15.\n4\nWhat is -3 (base 6) in base 10?\n-3\nConvert 21 (base 16) to base 10.\n33\nConvert -10 (base 12) to" +" -266, -537, -808, -1079, -1350, -1621?\n-1892\nWhat is next in 41, 47, 63, 95, 149, 231?\n347\nWhat is next in 33, 61, 89, 117, 145, 173?\n201\nWhat is next in 61, 52, 67, 118, 217, 376, 607?\n922\nWhat is next in 2559, 5115, 7671?\n10227\nWhat is the next term in -13, -121, -315, -607, -1009, -1533, -2191?\n-2995\nWhat is next in -29, -69, -113, -161?\n-213\nWhat comes next: 32, 25, 18?\n11\nWhat comes next: -308, -616, -922, -1226, -1528, -1828?\n-2126\nWhat comes next: -13, -2, 43, 140, 307, 562, 923?\n1408\nWhat is the next term in -86, -183, -280, -377?\n-474\nWhat is the next term in -468, -933, -1398, -1863, -2328?\n-2793\nWhat is the next term in -983, -978, -967, -950, -927?\n-898\nWhat is the next term in 208, 412, 610, 802, 988, 1168, 1342?\n1510\nWhat comes next: -3513, -3510, -3507, -3504, -3501?\n-3498\nWhat comes next: -803, -3192, -7165, -12716, -19839, -28528, -38777?\n-50580\nWhat is next in -32, -41, -62, -101, -164, -257, -386, -557?\n-776\nWhat comes next: 11, 82, 273, 644, 1255, 2166?\n3437\nWhat is the next term in 250, 494," +"-6*v + 6134 + q = 0. Is v composite?\nFalse\nLet d be (-123)/15 - (-10)/50. Let b = d + 16. Let k(w) = 18*w - 10. Is k(b) composite?\nTrue\nLet d be ((-39)/6)/13*-1*4. Suppose 2*q + q = d*v - 5268, 2*v = 5*q + 5272. Is v prime?\nFalse\nLet p = 119405 + 100749. Suppose -23*g + g + p = 0. Is g a composite number?\nFalse\nIs 23146 + ((-1)/(-3) - (5 + 15/(-9))) prime?\nTrue\nLet n be (-12)/(-24)*10/(-1). Let b(z) = 20*z**2 + 11*z + 4. Let l(w) = -21*w**2 - 12*w - 5. Let u(v) = 3*b(v) + 2*l(v). Is u(n) a composite number?\nTrue\nLet r be 50/(-150)*(-7 + 1). Suppose p - g - 1539 = -5*g, -r*g = 2. Is p composite?\nFalse\nLet o(s) be the second derivative of 0 + 13*s + 43/6*s**3 + 1/2*s**2. Is o(2) composite?\nTrue\nLet c be (-1 - 8)/(1/(-3)). Let u be (c/54)/((-2)/(-32)). Suppose 4*n + 1324 = u*n. Is n prime?\nTrue\nLet t(y) = -y**2 - 5*y + 393331. Let h be t(0). Suppose -720459 = 4*f - m, -4*m + 33115 - h = 2*f." +"se -3*p - 25*b - 11 = -26*b, -2*p + 16 = 4*b. Let u be (12/(-10))/((-1)/(-5)). Let z be (u - (1 + -2)) + 1. Is z <= p?\nTrue\nSuppose -12 = 3*l - 4*l. Which is greater: l or 25/2?\n25/2\nLet j = 0.2 - 1.2. Let r = -1 + 1. Let m = r - -1. Which is smaller: j or m?\nj\nLet v = -0.11 + -0.19. Let m = 0.7 + -1. Let y = v - m. Which is bigger: y or -1/4?\ny\nLet z = -0.165 - -0.192. Do 1 and z have different values?\nTrue\nLet b = 16772/39 + -430. Which is smaller: b or 0?\n0\nLet j = -13 - -17.5. Is 0 at most j?\nTrue\nLet x(o) = -2*o + 32. Let b be x(16). Which is smaller: 7/6 or b?\nb\nLet m = 0 - 0. Let x = -3 - -4. Which is smaller: m or x?\nm\nLet r(m) be the second derivative of m**4/12 - 2*m**3/3 - 2*m**2 - 2*m. Let k be r(5). Which is bigger: 0 or k?\nk\nLet i = 0.3 -" +"- (4 + 11 + -15 + (-5 - (-1 - 0)))\n-46\nWhat is 486 + -415 - (59 - -1)?\n11\nCalculate 21 + (-3 + -11 - (-18 - -6)).\n19\nCalculate 88 - (-43 + 87) - 50.\n-6\nWhat is -32 + (-14 - (64 + -73))?\n-37\n-21 - (41 + -24 + 11)\n-49\nWhat is the value of 11 + (0 - (-19 + 15)) + 15?\n30\nWhat is (4 - 7) + 2 + -2 - ((9 - 41) + 38)?\n-9\nCalculate 11 + 54 - (5 + 24) - (2 + -1).\n35\nCalculate (14 - (9 - 5) - 8) + 33 - (19 + -11).\n27\nWhat is 379 - 339 - (3 - 2)?\n39\nEvaluate -69 + (-12 + 115 - -10).\n44\nCalculate -159 - -161 - (-12 + 3 + (0 - 5)).\n16\nCalculate (-29 - (-24 - 98)) + (-11 + -1 - -4).\n85\nWhat is the value of -95 - (-12 - (-15 + 38 + -39))?\n-99\nWhat is 239 - 205 - (10 + 46)?\n-22\nWhat is the value of -9 + (12 - (-2" +"s of 764259050.\n2, 5, 37, 413113\nList the prime factors of 9128734.\n2, 4564367\nList the prime factors of 71015438.\n2, 13, 1009, 2707\nWhat are the prime factors of 56797517?\n7, 19, 61007\nList the prime factors of 674326519.\n107, 6302117\nList the prime factors of 9002623636.\n2, 71, 31699379\nWhat are the prime factors of 2596209053?\n1493, 1738921\nWhat are the prime factors of 7856493?\n3, 2618831\nWhat are the prime factors of 3245922225?\n3, 5, 7, 13, 47, 3373\nWhat are the prime factors of 799502779?\n799502779\nList the prime factors of 47064643.\n47064643\nList the prime factors of 75336227.\n3253, 23159\nList the prime factors of 341073684.\n2, 3, 7, 67, 20201\nWhat are the prime factors of 122775980?\n2, 5, 127, 48337\nWhat are the prime factors of 420314734?\n2, 7, 163, 184187\nWhat are the prime factors of 85410553?\n61, 1400173\nList the prime factors of 102547765.\n5, 41, 500233\nWhat are the prime factors of 3001999042?\n2, 7, 214428503\nWhat are the prime factors of 366076960?\n2, 5, 107, 21383\nList the prime factors of 2237982371.\n2237982371\nWhat are the prime factors of 67729532?\n2, 13, 1302491\nWhat are the prime factors" +"t i be (-3)/3 + (10 - 1). Suppose 3*u - 87 = 2*q, -2*u + 3*q - i*q + 39 = 0. Calculate the greatest common divisor of u and 297.\n27\nSuppose 6*h = r + h - 4, 5*r = 4*h + 20. Suppose r*s = 20 + 92. Calculate the highest common factor of s and 4.\n4\nSuppose 3*k + 221 = -4*h, -278 = 7*h - 2*h + 2*k. Let u be 2/(2/(-5) + h/(-90)). What is the highest common divisor of u and 9?\n9\nLet b(d) = -120*d + 1. Let z(w) = -119*w + 1. Let x(c) = 6*b(c) - 5*z(c). Let r be x(-1). Calculate the greatest common factor of 18 and r.\n18\nLet s(m) be the second derivative of m**3/6 - 6*m**2 + 6*m. Let h be s(14). Suppose 5*k = h*k + 9. Calculate the highest common factor of 33 and k.\n3\nLet i(d) = 3*d + 9*d - 1 - d - 3*d. Let v be i(3). Calculate the highest common factor of v and 46.\n23\nLet a(n) = -n**3 + 18*n**2 + 173*n + 42. Let d be a(24). What is the greatest" +"\nWhat is 1401033 (base 6) in base 10?\n77997\nWhat is -165096 (base 11) in base 8?\n-763251\nWhat is -1a4934 (base 13) in base 16?\n-a2e77\n110101000110011100 (base 2) to base 4\n311012130\n9a1a4 (base 11) to base 15\n2d0c9\nWhat is -347236 (base 9) in base 12?\n-a0929\n-1065262 (base 7) to base 16\n-20b18\nWhat is 115403 (base 9) in base 12?\n34326\nWhat is -11002010211 (base 3) in base 12?\n-3a571\n-20300030232 (base 4) to base 7\n-25334502\nConvert -8296598 (base 10) to base 11.\n-47573a2\nWhat is 12253100 (base 6) in base 12?\n171190\nConvert 3408418 (base 9) to base 16.\n1c0694\nWhat is 242522 (base 10) in base 6?\n5110442\nWhat is 123240256 (base 7) in base 12?\n2746767\nWhat is 1330350 (base 8) in base 10?\n372968\nConvert 51652 (base 11) to base 5.\n4402234\n155a3 (base 12) to base 6\n351523\nWhat is 10100212201200 (base 3) in base 6?\n102201200\n66581 (base 9) to base 6\n540414\n-80271 (base 12) to base 6\n-3321421\n7528164 (base 11) to base 15\n1269c6d\nConvert -13640257 (base 8) to base 2.\n-1011110100000010101111\nWhat is 1077121 (base 9) in base 4?\n2032032223\nWhat is 20102200022 (base" +"q be f(p). Solve -3*u + 7 = -h, 4*h + 0 = -q*u + 2 for u.\n2\nLet k = 57 - 53. Solve -k*f + 4*r - 8*r = 0, 2*r + 12 = f for f.\n4\nSuppose 5 = t + u, -6 = -2*u - 0. Solve a - z - 2 = 1, 0 = 5*a + t*z + 20 for a.\n-2\nLet c = 17 - 12. Suppose -4*s + 0 + 0 = 0. Solve c*z - 5*g + 20 = -s*z, -5*z - 5*g = 30 for z.\n-5\nLet k be (-27)/(-12) + (-1)/4. Solve -n - 3*l - k*l - 6 = 0, -12 = -2*n + 2*l for n.\n4\nSuppose 5*u = 4*m - 0 - 5, -4*m + 14 = -2*u. Let r be (-2)/(-8) - 20/16. Let b be r/(1/(-1)) + 3. Solve i - b*f = -3, -4*f - u = i - 0*i for i.\n-3\nLet t = 4 + -7. Let k = 3 + t. Suppose -2*d + 15 = 3*j, -9 = -k*d - 2*d - j. Solve -7 = 4*v - 3*q + d, 6 =" +"531 - 307 = -a*r. Is 38 a factor of r?\nFalse\nIs 179 - 1 - (-3 + 38 + -27) a multiple of 2?\nTrue\nSuppose 55 = 3*y + 52. Let n = 5 - y. Suppose -n*k = -4*j - 748, 923 = 2*k + 3*k + j. Does 16 divide k?\nFalse\nLet j = -15937 + 18009. Is 37 a factor of j?\nTrue\nLet p(v) = v**3 + 12*v**2 - 10*v + 34. Let a be p(-13). Let r = a + -9. Is (-21)/r*(-376)/(-12) a multiple of 25?\nFalse\nSuppose 0 = -5*w + l + 22, -2*w + 16 = -6*l + 2*l. Is 32 a factor of (4/(-6))/(11464/2868 - w)?\nFalse\nIs 24 a factor of (-20)/(-14)*(-16825830)/(-475)?\nFalse\nIs (93240/33)/((-58)/(-319)) a multiple of 60?\nTrue\nDoes 67 divide 73022/20 - 1/10?\nFalse\nLet j(a) = -a + 19. Suppose 10*v + 4 = 9*v, -4*x + 16 = v. Suppose 3*d = -x*d - 128. Is j(d) a multiple of 7?\nTrue\nSuppose -960 + 3996 = 6*b. Suppose -k = -2, 4*k = t + 2*k - b. Is 10 a factor of t?\nTrue\nSuppose -48*c + 144*c" +"olve 0 = 17385*h - 16895*h + 18130 for h.\n-37\nSolve -280035 + 263031 = 156*q for q.\n-109\nSolve 141*y = 62*y - 23 - 2268 for y.\n-29\nSolve -3574*m + 74904 = 1182*m - 414964 for m.\n103\nSolve 0 = -63*l - 125*l + 220*l + 1248 for l.\n-39\nSolve -141 = -28*z - 605 - 824 for z.\n-46\nSolve -663*l - 22490 = -2018*l + 49325 for l.\n53\nSolve 4229*g + 65721 = -348*g - 543020 for g.\n-133\nSolve -13582 = -1917*v - 53839 for v.\n-21\nSolve 4158*s - 2834 - 334 - 9551 + 245 = 0 for s.\n3\nSolve 7744 = 62*y - 1030*y for y.\n-8\nSolve 1247*b + 17425 = 1672*b for b.\n41\nSolve -128*w - 758*w - 9746 = 0 for w.\n-11\nSolve 3756*o = -244225 + 45157 for o.\n-53\nSolve 1853*l = 16218 + 37519 for l.\n29\nSolve -3021*j - 1116 = -76641 for j.\n25\nSolve 0 = -240*l + 9742 - 1646 - 2816 for l.\n22\nSolve -313565 = -2759*c - 51460 for c.\n95\nSolve 704 = 57*a - 1234 for a.\n34\nSolve" +"1611?\n5271615\nIn base 16, what is -880e + -270?\n-8a7e\nIn base 6, what is -30403332 - 21?\n-30403353\nIn base 9, what is -28466616 + 4?\n-28466612\nIn base 10, what is 504998 - -68?\n505066\nIn base 5, what is -33 + -323302124?\n-323302212\nIn base 2, what is 101 + -111011100101001000001?\n-111011100101000111100\nIn base 16, what is -e6d + -2277?\n-30e4\nIn base 7, what is -10146 + 1054214?\n1044035\nIn base 6, what is 115 + 1240023545?\n1240024104\nIn base 6, what is 30 + -22133325?\n-22133255\nIn base 2, what is 1001000001100100001111110001 - 1?\n1001000001100100001111110000\nIn base 15, what is -12d8376 - -2?\n-12d8374\nIn base 15, what is -e + -15b2d1?\n-15b2e0\nIn base 14, what is -3c8d8cb + -3?\n-3c8d8d0\nIn base 8, what is 6207262 + -30?\n6207232\nIn base 16, what is 1 + 9ff99f?\n9ff9a0\nIn base 4, what is 3022110 - -11?\n3022121\nIn base 13, what is -3 - -191492?\n19148c\nIn base 3, what is -12210110011021221 + 22?\n-12210110011021122\nIn base 11, what is 345250 - 25?\n345226\nIn base 10, what is 50569 + -29?\n50540\nIn base 6, what is 1 + 1414122245?\n1414122250" +"-99 - -97.98. Let j = 11.1789 - -0.0011. Let s = j - u. What is s rounded to 0 dps?\n12\nLet t be 14025/30*32/5. What is t rounded to the nearest 100?\n3000\nLet h(o) = -216*o + 53. Let i be h(-4). Let b = i - -53083. What is b rounded to the nearest 10000?\n50000\nLet r = 2.095 + 30.845. Let s = 33 - r. Let z = -0.05999912 + s. What is z rounded to seven dps?\n0.0000009\nLet y = -61.573 + -13.723. Let x = 75 + y. What is x rounded to two decimal places?\n-0.3\nLet l = 15.2354 - -0.0846. Let f = -0.32 + l. Let d = f - 15.00035. What is d rounded to four dps?\n-0.0004\nLet l(a) be the second derivative of 11*a - 12*a**2 + 0 - 1/2*a**3. Let h be l(-19). Round h to the nearest ten.\n30\nLet t = 8605581.300254 + -8605598. Let f = t - -16.7. What is f rounded to five decimal places?\n0.00025\nLet q = 8833 - 8459.1. Round q to the nearest one hundred.\n400\nLet f = 8.8 + 2.2." +"025746?\n4\nWhat is the millions digit of 826127274?\n6\nWhat is the ten millions digit of 21254506?\n2\nWhat is the ten thousands digit of 4773318732?\n1\nWhat is the hundred thousands digit of 7044928006?\n9\nWhat is the tens digit of 196181756?\n5\nWhat is the tens digit of 1047549475?\n7\nWhat is the hundreds digit of 184510680?\n6\nWhat is the hundred millions digit of 122767329?\n1\nWhat is the units digit of 29300724?\n4\nWhat is the hundred thousands digit of 1237354954?\n3\nWhat is the tens digit of 312935?\n3\nWhat is the units digit of 49051288?\n8\nWhat is the thousands digit of 1637649772?\n9\nWhat is the ten thousands digit of 7293094?\n9\nWhat is the tens digit of 451001114?\n1\nWhat is the ten thousands digit of 431428609?\n2\nWhat is the ten thousands digit of 1674333818?\n3\nWhat is the units digit of 1337964699?\n9\nWhat is the ten thousands digit of 31872542?\n7\nWhat is the thousands digit of 86615025?\n5\nWhat is the units digit of 766486795?\n5\nWhat is the millions digit of 55106529?\n5\nWhat is the ten millions digit of 3039105615?\n3\nWhat is the ten" +"0\nRound 0.00000540657923 to seven decimal places.\n0.0000054\nRound 99330.985 to the nearest 10000.\n100000\nWhat is 0.024226304 rounded to 3 decimal places?\n0.024\nWhat is -23665.1333 rounded to the nearest 100?\n-23700\nWhat is 34769213.3 rounded to the nearest ten thousand?\n34770000\nRound 1828677.76 to the nearest one thousand.\n1829000\nWhat is -1480.49606 rounded to the nearest integer?\n-1480\nRound -5566839.4 to the nearest 1000000.\n-6000000\nRound -0.00471106379 to 5 dps.\n-0.00471\nRound -0.03103472735 to 2 decimal places.\n-0.03\nWhat is 20092573.02 rounded to the nearest one thousand?\n20093000\nWhat is -423757.469 rounded to the nearest ten thousand?\n-420000\nWhat is 101808520 rounded to the nearest 1000000?\n102000000\nWhat is -0.1280367916 rounded to four dps?\n-0.128\nWhat is -65072743 rounded to the nearest 10000?\n-65070000\nWhat is -41447.55 rounded to the nearest ten thousand?\n-40000\nWhat is -0.0000948416319 rounded to 5 dps?\n-0.00009\nRound -0.5050195376 to 3 decimal places.\n-0.505\nWhat is -0.01178326 rounded to four decimal places?\n-0.0118\nRound 0.0036138592 to five dps.\n0.00361\nWhat is 38.6821283 rounded to the nearest ten?\n40\nWhat is 8030.623084 rounded to the nearest integer?\n8031\nWhat is -0.000000709829557 rounded to 7 decimal places?\n-0.0000007\nWhat is 25.5689699 rounded to 1 dp?" +"(v/(-7))/(10/35). Does 2 divide 9/a + (-11)/(-2)?\nFalse\nLet g(t) = -t**3 - 2*t**2 - t. Let m be g(-1). Suppose m*h - 12 = -4*h. Suppose -2*l = -h*l + 65. Is 14 a factor of l?\nFalse\nLet v be 7/((-35)/(-100)) - 0. Suppose m = -5*n - v, -4*n = -m + 5*m. Is m a multiple of 5?\nTrue\nLet p be 2/9 + (-312)/(-54). Suppose -5*q - 99 - p = 0. Let c = 13 - q. Is c a multiple of 17?\nTrue\nLet i = 81 + -371. Let l = -204 - i. Does 7 divide l?\nFalse\nLet t = 27 - 7. Suppose 3*a + t - 56 = 0. Does 8 divide a?\nFalse\nSuppose -3426 = -4*f + 2*m, m - 855 = 48*f - 49*f. Does 8 divide f?\nTrue\nLet x be 4/18 - 6945/27. Let y = x - -361. Is y a multiple of 26?\nTrue\nLet g(n) = n**3 - n**2 - 2*n + 3. Let u be g(2). Suppose -u*l = 2*l - 20, -4*z = l - 56. Does 4 divide z?\nFalse\nLet y be 6 + -2 +" +"What is the remainder when t is divided by (-18)/36*(-36)/(-10)*-10?\n17\nLet g(b) = -3*b + 12. Let c be g(3). Let m be 0 + 1 - (-6 - (c + -9)). Suppose -41 = -3*q + m. What is the remainder when 41 is divided by q?\n13\nLet w be 136 + 1/(-1) + -5 + 4. Let s = -40 + w. What is the remainder when s is divided by 16?\n14\nCalculate the remainder when 964 is divided by 9/(-3)*((-735)/18 - (-10)/20).\n117\nLet n = 15952 - 15819. What is the remainder when 6649 is divided by n?\n132\nLet s(b) = 388*b + 6. Let k(w) = 583*w + 10. Let v(u) = -5*k(u) + 8*s(u). Calculate the remainder when v(1) is divided by 44.\n11\nLet u = 2119 - 1642. Calculate the remainder when 482 is divided by u.\n5\nLet f(p) be the first derivative of -10 + 19/2*p**2 + 2*p**3 - 1/4*p**4 - 11*p. Calculate the remainder when 23 is divided by f(8).\n10\nCalculate the remainder when (-1)/(1/(-7)) + ((-29520)/(-10))/8 is divided by 45.\n16\nLet c(y) = y**3 - 6*y**2 + 2. Let k be c(6)." +" - -131. Put l, -3, 14 in increasing order.\n-3, l, 14\nSuppose -2*p - 5*v + 5 = 0, -p - 5*v + 10*v = 20. Sort -4, p, 1.\np, -4, 1\nLet m = 22 - 21. Sort m, 1/4, -3.\n-3, 1/4, m\nSuppose -22 = 4*q - 6. Let v(f) = 2*f + 5. Let m be v(q). Let r = 0 - 0.2. Put m, 1/2, r in decreasing order.\n1/2, r, m\nLet h = -53 + 53.3. Sort 3, -3, h in decreasing order.\n3, h, -3\nLet w(y) = y**2 + 15*y + 3. Let g be w(-15). Put -4, g, -5, 5 in ascending order.\n-5, -4, g, 5\nSuppose 5*z = -2*s - 0*z - 39, -5*z - 60 = 5*s. Sort -3, 4, s in decreasing order.\n4, -3, s\nSuppose -13 = 2*v - 3*j, v - 2*v - 5*j + 13 = 0. Suppose 0*q = -5*q - 5*p + 20, 0 = -2*q - p + 7. Suppose 8*h = q*h + 10. Sort 1, v, h.\nv, 1, h\nLet c = -12 + 26. Suppose -m - f = 9, f + c" +"\nIs 23144473529 a composite number?\nTrue\nIs 121742977 prime?\nTrue\nIs 1442177819 prime?\nTrue\nIs 402122093 a prime number?\nFalse\nIs 50623749617 a composite number?\nTrue\nIs 6570496979 a composite number?\nTrue\nIs 1309114187 a composite number?\nFalse\nIs 3775465081 a prime number?\nTrue\nIs 4531157621 a composite number?\nFalse\nIs 50306903 a composite number?\nTrue\nIs 106515828373 a composite number?\nFalse\nIs 51953310163 a prime number?\nFalse\nIs 434233847797 prime?\nTrue\nIs 7202993603 prime?\nFalse\nIs 13429148539 a prime number?\nFalse\nIs 3805469279 prime?\nTrue\nIs 2658884707 prime?\nTrue\nIs 594908243 a prime number?\nTrue\nIs 3535632521 a composite number?\nFalse\nIs 9537023 a prime number?\nTrue\nIs 3613479787 composite?\nTrue\nIs 49662283027 prime?\nFalse\nIs 5658003779 a prime number?\nFalse\nIs 3186732566 a prime number?\nFalse\nIs 672167929 composite?\nFalse\nIs 34473225169 a prime number?\nTrue\nIs 2031136942 composite?\nTrue\nIs 3145199107 a prime number?\nTrue\nIs 5253455213 composite?\nFalse\nIs 479256721 composite?\nTrue\nIs 583212379 a prime number?\nFalse\nIs 899183447 a prime number?\nTrue\nIs 88113595697 a prime number?\nTrue\nIs 20884764671 a composite number?\nTrue\nIs 62733200141 a prime number?\nTrue\nIs 1815502993 a composite number?\nFalse\nIs 2066935207 composite?\nTrue\nIs 4768478503 prime?\nFalse" +"ppose 6*r - 34 = 566. Suppose -r = -17*i + 13*i. Suppose 3*o = 4*s + 18, -o + i = 5*s - 0*s. What are the prime factors of o?\n2, 5\nSuppose -7*j - 40 = -2*j. Let o(s) = -6*s + 15. List the prime factors of o(j).\n3, 7\nSuppose 0 = -42*r + 9086 + 66850. List the prime factors of r.\n2, 113\nSuppose 3*h + 5*z = 2027, -5*h - 2*z + 3844 - 434 = 0. What are the prime factors of h?\n2, 3, 19\nLet k = -17 - -23. Suppose k*b - b - 155 = 0. Let u = -21 + b. What are the prime factors of u?\n2, 5\nLet k be 62/8 + (-1)/(-4). Suppose 5 = k*v - 459. List the prime factors of v.\n2, 29\nLet v = 471 - -140. What are the prime factors of v?\n13, 47\nSuppose -6 = -8*b - 158. Let h = b - -38. What are the prime factors of h?\n19\nSuppose 38*h - 20610 = 28*h. List the prime factors of h.\n3, 229\nSuppose 2*s - 11 = -2*q -" +"er: -1/15575119 or 1?\n1\nWhich is greater: -16661 or -183270/11?\n-183270/11\nIs -953/57 less than -16?\nTrue\nWhich is smaller: -261727 or -261722?\n-261727\nIs -1559 at least -1514?\nFalse\nIs 0 greater than or equal to -2/4990917?\nTrue\nIs -881271 equal to -881265?\nFalse\nIs -9/1385734 less than -1?\nFalse\nDo -3/29 and -820.93 have the same value?\nFalse\nWhich is smaller: 11 or 3829/379?\n3829/379\nIs 202552 at least as big as 202553?\nFalse\nIs 14/5 greater than -31/1859?\nTrue\nWhich is smaller: 0.941 or -229?\n-229\nWhich is bigger: 37043 or 37048?\n37048\nWhich is greater: -56820 or -54?\n-54\nWhich is greater: 18347 or -80?\n18347\nWhich is greater: 161000 or 1770993/11?\n161000\nIs -2167/36 greater than -60?\nFalse\nIs 642/305 > 2?\nTrue\nWhich is greater: -68904 or -68903?\n-68903\nWhich is smaller: 53118 or 53089?\n53089\nDoes 6/33641 = 0?\nFalse\nWhich is bigger: -1305639 or 2/7?\n2/7\nWhich is smaller: -1578.4 or -6/11?\n-1578.4\nWhich is bigger: 6381 or 141?\n6381\nWhich is greater: 47317 or 5?\n47317\nWhich is bigger: 0 or -1320/1651?\n0\nWhich is smaller: -1230/29 or -43?\n-43\nWhich is smaller: 81993 or 491965/6?\n81993\nWhich is bigger:" +"alse\nDoes 7 divide -6 - -3 - (-8 + -2)?\nTrue\nLet u be (4 - -1)/(1 - 0). Suppose 2*f = -u*c + f + 117, -4*c - 2*f = -90. Is 8 a factor of c?\nTrue\nSuppose -2*h = -10, 0 = -3*p + 3*h + 2 - 5. Let a = 0 + p. Suppose -3*j + a*y + 4 = -9, 0 = 5*j - 4*y - 19. Is 3 a factor of j?\nTrue\nLet y(r) = -r**2 + 6*r - 3. Let q be y(5). Suppose q = i - 1. Suppose -i*h + 105 = 2*h. Does 10 divide h?\nFalse\nIs 10/(-45)*-3*180 a multiple of 19?\nFalse\nSuppose o = 17 + 15. Is o a multiple of 16?\nTrue\nSuppose 3*u + u - 36 = 0. Is 11 a factor of (50/(-3))/((-6)/u)?\nFalse\nLet p = 33 - -55. Is 22 a factor of p?\nTrue\nLet w(f) = f**2 + f + 11. Does 14 divide w(8)?\nFalse\nLet r(s) be the second derivative of 1/6*s**3 + 0 - 2*s + 2/3*s**4 - 1/20*s**5 + s**2. Is r(8) a multiple of 10?\nTrue\nSuppose -18 = -2*w" +"ppose -4*s - 3 + 6 = 5*y, -2*y + 3*s = -15. Suppose 4*h - 56 = -o + y, 2*h + 383 = 5*o. Is 15 a factor of o?\nTrue\nSuppose -5*n - 1 + 14 = r, -5*n = -5*r + 5. Suppose 2*y - 4*p = -710 + 3514, 3*y - 4166 = -n*p. Is y a multiple of 24?\nTrue\nLet v(r) = r**3 - 8*r**2 - 34*r + 13. Let f be v(11). Is 10 a factor of 17510/374 - f/(-11)?\nFalse\nSuppose 1152 = 5*m + 4*t, -m + 99 = 2*t - 129. Let r(y) = 2*y**2 - 3*y**2 + m - 201 + 0*y**2 - 16*y. Does 14 divide r(-13)?\nTrue\nSuppose 295*d - 292*d = -2*x + 101334, -3*d - 4*x + 101346 = 0. Is 276 a factor of d?\nFalse\nSuppose -298*c = -19*c - 2161971. Is c a multiple of 27?\nTrue\nLet s be ((-8)/(-40))/(46/103270). Suppose -r + 2*r - 1933 = 0. Suppose s = -7*k + r. Is 14 a factor of k?\nFalse\nSuppose -5*z + 16 = -4*a - 8, 4*a = -3*z + 8. Is 44 + -5 + (-12)/a" +"a composite number?\nFalse\nSuppose 24*n - 20*n = 5524. Is n prime?\nTrue\nLet l(y) = 420*y**2 - 17*y - 5. Is l(6) a composite number?\nFalse\nSuppose -3*d + 134 = 5*z, d - 116 = -d + 2*z. Let k(l) = -l**2 + 3. Let n be k(0). Suppose n*f = 2*a + d, -5*f + 93 = -3*a + 2*a. Is f composite?\nFalse\nLet d be (0 - 1)*(-3)/(-3). Let l be 4*d/12*-15. Suppose 0 = 5*g - l*x - 110, -2*g - 3*x = x - 26. Is g prime?\nTrue\nSuppose -4*t + 4*u = -u - 15, 4*t + 5*u - 65 = 0. Is 2136/t + 9/(225/10) composite?\nTrue\nLet v(z) = z**2 + 12*z + 10. Let y be v(-11). Let r(p) = 22*p**2 + p + 2. Let w(o) = -21*o**2 - o - 3. Let u(x) = 3*r(x) + 2*w(x). Is u(y) composite?\nFalse\nLet m be 5/15*-3 - -4. Suppose p + 4*u = -m*p, -4*p + 2*u = 0. Suppose -5*f + s - 817 = -4710, 4*f + 2*s - 3120 = p. Is f composite?\nTrue\nLet c be ((-1)/(-1))/(8/40). Suppose 0*d + d" +"*i for u.\n4\nSuppose -4*y + 4*c = -72, 0 = -0*c - 2*c - 8. Let t be ((-4)/6)/(y/(-63)). Solve 0 = -2*i - 4*b - 0*b + 6, t*i = -4*b + 1 for i.\n-5\nLet u be (16/(-4) - (4 + -4)) + 6. Solve 11 = -2*g - 5*n - 4, g + 3 = u*n for g.\n-5\nSuppose 5 - 3 = i. Suppose i*j + 26 = 2*w, 0*w - 74 = -5*w - 4*j. Suppose -3*c = -w - 7. Solve -g - 13 = -4*d, c*d - 3*d + 3*g = 9 for d.\n3\nLet l(j) = -j**3 + 16*j**2 + 16*j + 18. Let h be l(17). Suppose 7 + 8 = 3*y. Solve 5*g = 2*r + 14 + h, 0 = -4*r - y*g + 45 for r.\n5\nSuppose 4*v = 2*v. Suppose -12*u + 13*u - 26 = v. Let h = u + -24. Solve 0 = -5*g + h*r - 8, 0 = g - 0*g - 2*r for g.\n-2\nSuppose 2*t - 2 = 0, -k + 2 + 2 = 2*t. Solve j = k*p + 2*p -" +"-0.23. Let i = -0.07 - p. Let x = -0.02 - i. Round x to 2 decimal places.\n-0.04\nLet h = 66.5 + -54. Let s = -12.50000057 + h. Round s to 7 dps.\n-0.0000006\nLet w be (-5)/4*2*-2. Suppose 3*i + 4*l + 427 = 0, w*l + 280 = -4*i + 2*i. What is i rounded to the nearest ten?\n-150\nLet w = 34941 - 34962.989. Let n = w - -0.189. Round n to the nearest integer.\n-22\nLet y = 5 + -4.8. Let t = -1171613 - -1171612.79999904. Let o = y + t. What is o rounded to 7 decimal places?\n-0.000001\nLet p = 0.6 + -1.4. Let a = -0.137 - -1.407. Let i = a + p. What is i rounded to one decimal place?\n0.5\nLet z = 23.9 + -25. Let v = z - -5.1. Let u = -4.0004 + v. What is u rounded to 4 decimal places?\n-0.0004\nLet b = 0.043 + 0.087. What is b rounded to one decimal place?\n0.1\nLet o = 9.41 + -17.3. What is o rounded to the nearest integer?\n-8\nLet z = -16.98" +" 140*v + 171 = 591. Solve v*k - 5*z = 0, 0*z = -4*k + 4*z for k.\n0\nLet a(g) = -6*g**2 - 114*g + 96. Let m(j) = -j**2 - 23*j + 19. Let z(q) = -3*a(q) + 14*m(q). Let d be z(-6). Solve -5*y + 3*v + 8 = d*v, 3*y - 5*v = -4 for y.\n2\nLet d be 16/32 + (-28)/(-8). Solve 3*x - n = -8, 10*x - 5*x + 3*n = -d for x.\n-2\nLet t = -32536 - -32541. Solve -3*p + 10 = 4*o, p + t*o = 10*o - 3 for p.\n2\nSuppose 13 - 38 - 59 = -4*r. Solve 5*f + r = -4*p, -2*f + p - 8 = 3*p for f.\n-5\nSuppose 18 = 21*o - 12*o. Suppose -4*r + 22 = -3*j + 5, 0 = -o*j + 2. Solve -3*t - 2 - 14 = z, 40 = -5*z - r*t for z.\n-4\nSuppose x - 2*g = -0*g + 4, -12 = -3*x + 2*g. Suppose 2*t - x*t + 5 = i, 5*i - 5 = -5*t. Solve 13 = t*j - 0*j + 5*o, -2 =" +"6362776.\n2, 8969, 58763\nList the prime factors of 588442134.\n2, 3, 7, 397, 35291\nWhat are the prime factors of 367313579?\n7043, 52153\nWhat are the prime factors of 69488190?\n2, 3, 5, 772091\nWhat are the prime factors of 1299997670?\n2, 5, 19, 6842093\nWhat are the prime factors of 8377383?\n3, 7, 56989\nList the prime factors of 6645890938.\n2, 37, 89809337\nList the prime factors of 2169321580.\n2, 5, 19, 97, 229, 257\nList the prime factors of 113215340.\n2, 5, 7, 808681\nList the prime factors of 199204591.\n59, 439, 7691\nWhat are the prime factors of 15558073?\n3803, 4091\nList the prime factors of 3172716441.\n3, 37, 9527677\nList the prime factors of 256443836.\n2, 11, 19, 23, 13337\nWhat are the prime factors of 259036135?\n5, 51807227\nList the prime factors of 1497697127.\n17, 73, 70991\nWhat are the prime factors of 161624640?\n2, 3, 5, 19, 8861\nWhat are the prime factors of 231766877?\n61, 599, 6343\nList the prime factors of 36603375.\n3, 5, 97609\nList the prime factors of 357188512.\n2, 2897, 3853\nList the prime factors of 347048437.\n347048437\nWhat are the prime factors of 194764107?\n3, 64921369\nWhat" +"-721 = -3*s + d, 5*s - 1204 = -0*s + 4*d. Is s a multiple of 13?\nFalse\nLet j(l) = l**3 + 4*l**2. Let h be j(-4). Suppose h*w + 120 = 3*w. Let c = -24 + w. Is c a multiple of 6?\nFalse\nSuppose -5*p = -2*y + 1823, -277 = y + 2*p - 1211. Is 11 a factor of y?\nTrue\nLet m be (-5 - (-12)/4)*-1. Suppose 5*y = 10*y. Suppose -m*d + 45 + 13 = y. Is 15 a factor of d?\nFalse\nLet c = 641 + -201. Is 4 a factor of c?\nTrue\nSuppose -7*h + 4*h = -99. Let u = h - 13. Let o = u - 14. Does 2 divide o?\nTrue\nLet g(r) = 100*r - 187. Is 14 a factor of g(10)?\nFalse\nSuppose u - 4*m - 6 = 0, -19 = u + m - 0*m. Let t be (-18 - u) + (-4)/(-1). Suppose 2*z - 155 = -5*d - 0*d, t = -4*d + z + 137. Is d a multiple of 33?\nTrue\nLet y = -411 + 501. Is 5 a factor of y?\nTrue" +" 0.3116 to 2 decimal places.\n0.31\nRound 0.000004785 to seven decimal places.\n0.0000048\nRound -6870000 to the nearest one million.\n-7000000\nRound -23.837 to the nearest ten.\n-20\nWhat is -68141000 rounded to the nearest 1000000?\n-68000000\nRound -0.00000045 to six decimal places.\n0\nWhat is 0.0141636 rounded to three decimal places?\n0.014\nRound -0.00008205 to 5 dps.\n-0.00008\nWhat is 0.000002362 rounded to seven decimal places?\n0.0000024\nRound 2871 to the nearest 100.\n2900\nRound -15411000 to the nearest 100000.\n-15400000\nWhat is 2630700 rounded to the nearest 10000?\n2630000\nRound 0.000002929 to 6 dps.\n0.000003\nRound 0.00447756 to five dps.\n0.00448\nWhat is 480 rounded to the nearest one thousand?\n0\nRound 1529000 to the nearest one hundred thousand.\n1500000\nWhat is -0.00001516 rounded to six decimal places?\n-0.000015\nRound -0.0002742 to five decimal places.\n-0.00027\nRound -61.27 to the nearest ten.\n-60\nWhat is 9207800 rounded to the nearest 1000000?\n9000000\nRound 108860000 to the nearest 1000000.\n109000000\nRound 0.00025275 to 5 dps.\n0.00025\nWhat is 272.2 rounded to the nearest ten?\n270\nWhat is -0.0002793 rounded to 5 decimal places?\n-0.00028\nWhat is 3882.7 rounded to the nearest one hundred?\n3900\nRound 0.0783 to three decimal" +"e i = -3*z + 24. Solve 0*g = t + z*g + 21, -2*t + 33 = -5*g for t.\n4\nLet m = 963 - 958. Suppose 3*y - 20 = -4*j - 0*j, -10 = -2*j + 4*y. Solve j*r - 2*l - 17 = 0, m*r + 0*r + l = 14 for r.\n3\nLet x = -5733 + 5733. Solve -4*g = -s - 3, 3*s - 7*g + 3*g + 9 = x for s.\n-3\nLet x be 14/(-6)*(-2 - (-1 - 4)). Let r(g) = -g**2 - 3*g + 28. Let c be r(x). Suppose -3*z + 9 = c, 1 = y - z - 0*z. Solve t = -l, 4*t - y*l = -7*l - 3 for t.\n-3\nLet x = -161 - -166. Suppose -4*n + 31 + 2 = -x*j, 0 = n - 3*j - 17. Suppose 0 = 4*g + 3*t - 8, 3*g - 4 = g - t. Solve -w = n*v - 7, -16 = -g*v - 3*v - w for v.\n3\nLet y(m) = -m**3 + 40*m**2. Let b be y(40). Solve b = 2*c + d - 1," +"= 2*l - 28. Calculate the remainder when y is divided by z.\n16\nSuppose d = -5*r - 0*d + 11, d + 7 = 4*r. Suppose 5*h = r*h + 9. What is the remainder when 5 is divided by -2*h/(-6) - -1?\n1\nWhat is the remainder when 38 is divided by (-6 + 3)*((-30)/9 + -1)?\n12\nSuppose k + 276 = 2*s + 3*k, 5*k + 597 = 4*s. Suppose s = 5*z + 53. Let n(p) = p**2 + 2*p - 1. Calculate the remainder when n(-7) is divided by z.\n16\nSuppose -5*h = -5*a + 395, 0*h = 3*a - 4*h - 239. Let k = -54 + a. Calculate the remainder when k is divided by 13.\n10\nCalculate the remainder when ((-1)/(-3) - -1) + (-106)/(-6) is divided by 7.\n5\nLet c(f) = 9*f - 17. What is the remainder when 70 is divided by c(6)?\n33\nLet q(v) = v**2 - v + 16. Suppose 431 = 5*f - 149. Suppose 0 = -2*z + 4*z + 5*b - 119, 3*z - 5*b = f. What is the remainder when z is divided by q(0)?\n15\nLet t(i)" +" to 0? (a) i (b) o (c) 21\nb\nLet f = 15341/3 - 5113. Let l = 7.97 + -8. Let t = 3.03 + l. What is the closest to 4 in t, f, -0.1?\nt\nLet t be -5*4/12*36/330. Let m be (-56)/261 - 3/(-27). What is the closest to m in -5, -2, t?\nt\nLet x = -0.1 + -0.1. Let z = -2.2 - x. Suppose -22*u = 3*u. Which is the closest to z? (a) 1/2 (b) -5 (c) u\nc\nLet m be 3780/200 + (-19)/1. What is the nearest to -0.04 in m, -1/3, 36?\nm\nLet f be (-58)/(-87)*(-1 - -4). Let m be (3 - 7)*(f + 122/(-60)). Which is the nearest to m? (a) 4 (b) -2/11 (c) -3\nb\nLet w be (10/(-15))/(40/(-306)). Let k be ((-2)/6)/(20/(-96)) - -3. Let s = k - w. Which is the nearest to -0.2? (a) s (b) 5 (c) -2/7\nc\nLet c = -0.04613 - 0.15387. What is the nearest to -15.2 in c, 2/31, 5?\nc\nSuppose 128*j = 129*j + 1. Let i be j - 0 - 210/(-126). Which is the nearest to -0.1? (a) -0.3" +".241739. What is u rounded to two decimal places?\n-0.1\nLet f = 38.41 + -39. Let k = -7.41 + f. Let d = k - -6.88. Round d to 1 decimal place.\n-1.1\nLet x = 10.1575880671 + -10.1576. What is x rounded to seven decimal places?\n-0.0000119\nLet x be ((-63)/24)/7 - 812670/(-80). Let d = -7248 + x. What is d rounded to the nearest one thousand?\n3000\nSuppose 0 = -5*t + i + 206, -3*t - 5*i = 25 - 143. Let m(s) = 2726*s + t*s - 6 + 5. Let h be m(3). Round h to the nearest 1000.\n8000\nLet u = 5155 - 5155.0000164. Round u to 5 decimal places.\n-0.00002\nLet i = 416.4521002 - -54.5479257. Let s = 471 - i. Round s to six decimal places.\n-0.000026\nLet p be (-27)/18 - 14581287/2. Let i = p - -1290645. Round i to the nearest 1000000.\n-6000000\nLet o = -284.1 + 280.572. What is o rounded to zero dps?\n-4\nLet l = 1.5020030562 + -1.502. Round l to 6 dps.\n0.000003\nLet y = 239.77 + -176500.77. Let b = -176108.9928 - y. Let q =" +") = q**2 - 9*q + 10. Let f be b(8). Suppose p = f*p - 44. Calculate the common denominator of 113/10 and 3/12 - 79/p.\n110\nFind the common denominator of 49/2 and ((5/5)/(-1))/((-4)/49).\n4\nLet p = 84 - 19. Suppose 2*g = 5*k - g - 85, 5*k + g - p = 0. Calculate the lowest common multiple of 6 and k.\n42\nSuppose -3*l = -2*l - 1, -5*j = 3*l - 6403. Let d = j + -811. What is the common denominator of 10/12*d/35 and 18/7?\n42\nSuppose 4*n = -n + 5. What is the smallest common multiple of n and 4?\n4\nWhat is the smallest common multiple of (-3)/(-3 - -9)*-22 and 21?\n231\nLet v = -32 - -35. Suppose -3*n + 44 = n + 2*z, z - 32 = -3*n. Calculate the least common multiple of n and v.\n30\nLet w(f) = f**2 - 12*f - 37. Calculate the lowest common multiple of w(16) and 12.\n108\nSuppose 0 = -5*z + 2 + 8. What is the least common multiple of z and 7?\n14\nFind the common denominator of 13/22 and (-3060)/(-400) -" +" (a) -0.3 (b) 2 (c) 25\na\nWhat is the nearest to 0 in 5, 1, 2/31, 8.4?\n2/31\nWhat is the closest to -1 in 0.3, -1, -3/7, -2/21?\n-1\nWhat is the closest to 0.3 in 0.3, -1, 1, -0.6?\n0.3\nWhat is the nearest to 3/5 in 3/7, 16/11, 2/7?\n3/7\nWhich is the closest to 0.4? (a) 0.041 (b) 0.4 (c) 5\nb\nWhat is the closest to -2 in 163, -0.2, 0.3, 1?\n-0.2\nWhat is the nearest to -8 in -2/7, 2/3, -11?\n-11\nWhat is the nearest to 0.1422 in 2/5, 1, -0.4?\n2/5\nWhat is the closest to -0.2 in -0.1, -0.4, -2/31, -1?\n-0.1\nWhich is the nearest to 4/3? (a) -3 (b) 0.4 (c) -5 (d) 5\nb\nWhat is the nearest to -1 in -2, 271, 0.1?\n-2\nWhat is the nearest to 40/3 in 1, 3, 3/4, 5?\n5\nWhich is the closest to -0.02? (a) 69 (b) 7 (c) 0.4\nc\nWhich is the nearest to 2? (a) -2/11 (b) 397 (c) 2 (d) -0.1\nc\nWhat is the closest to 0 in 1/6, 0, -1/49, -3?\n0\nWhat is the closest to 8/145 in 2/3, -3/7," +"s the r'th term of 731, 1425, 2123, 2825, 3531?\n2*r**2 + 688*r + 41\nWhat is the i'th term of -2092, -4199, -6306, -8413, -10520?\n-2107*i + 15\nWhat is the w'th term of 9549, 19122, 28707, 38310, 47937, 57594?\nw**3 + 9566*w - 18\nWhat is the y'th term of -54, -116, -192, -282?\n-7*y**2 - 41*y - 6\nWhat is the u'th term of 363, 1409, 3147, 5577, 8699, 12513?\n346*u**2 + 8*u + 9\nWhat is the o'th term of 149845, 299688, 449531, 599374?\n149843*o + 2\nWhat is the i'th term of 19512, 39027, 58542, 78057?\n19515*i - 3\nWhat is the g'th term of -4998722, -4998723, -4998724, -4998725, -4998726?\n-g - 4998721\nWhat is the x'th term of -150505, -150504, -150503, -150502?\nx - 150506\nWhat is the g'th term of -1836, -3441, -5046, -6651, -8256?\n-1605*g - 231\nWhat is the b'th term of 21138, 21180, 21222, 21264, 21306?\n42*b + 21096\nWhat is the x'th term of -1625, -3366, -5163, -7022, -8949, -10950, -13031?\n-x**3 - 22*x**2 - 1668*x + 66\nWhat is the c'th term of 456558, 1826239, 4109042, 7304967?\n456561*c**2 - 2*c - 1\nWhat is the n'th term of" +" 1\nLet t be (7 - 1)*25/(-75). Let p be t + (-7)/(-3) - (-203)/(-87). Let j(s) = 3*s**2 + 8*s. Let h(y) = y. Give p*j(l) + 18*h(l).\n-6*l**2 + 2*l\nSuppose -10*u - 8*u = -126. Suppose -8 = -u*y + 27. Let z(c) = -8*c. Let f(s) = 88*s. What is y*f(o) + 56*z(o)?\n-8*o\nLet y(a) = -15*a + 99. Suppose 5*q + 2*u - 34 = 0, 5*u + 5 = 4*q - 9. Let v be y(q). Let n(l) = l + 3. Let z(t) = -4*t - 13. Calculate v*n(p) + 2*z(p).\np + 1\nLet b(f) = -f**2 - 2*f - 5. Let c(v) = 21*v**2 - 4*v + 6. What is 2*b(n) - c(n)?\n-23*n**2 - 16\nLet l(o) = -3*o + 2. Let v = -296 - -1646. Let u(d) = v*d + 8 - 1352*d - 7. Determine 4*l(m) - 7*u(m).\n2*m + 1\nLet v(r) = 2*r**2 + 7*r - 16. Let j(u) be the second derivative of u**4/12 + u**3/3 - 5*u**2/2 - 505*u. What is -7*j(y) + 2*v(y)?\n-3*y**2 + 3\nSuppose -4*b = 2*l - 8, -8*b = -3*b. Suppose 16*a + l = 18*a." +"at is the common denominator of (0 - 130/(-28))*(-49)/(-42) and -53/15?\n60\nLet s(n) = n + 23. Suppose 7*k - 15*k = 96. Calculate the lowest common multiple of 23 and s(k).\n253\nLet a = 190 - 592/3. Suppose 2*k = -3*k - 24535. Let o = k - -63833/13. Calculate the common denominator of o and a.\n39\nLet q be 4 - 3/(3/(-22)). What is the common denominator of 29 and (-18)/(-117) - (-1179)/q?\n2\nLet b be 64*((-6)/3)/8*2. Let d = 36 + b. Calculate the least common multiple of 3 and d.\n12\nLet g = -2/9969 - 368837/79752. What is the common denominator of 31/48 and g?\n48\nLet n = -30/293117 + 42766063777/3517404. Let u = -12150 + n. Calculate the common denominator of 75/26 and u.\n156\nLet z = 59189/2802 + 20/467. Calculate the common denominator of -98/255 and z.\n510\nLet i be 591/5 - (-6)/(-30). Let n = 69 - i. Calculate the common denominator of -7 + 4 + n/10 and 73/16.\n80\nSuppose 3*m + 5353 = 4*y, 2*m - 56 = 3*y - 3624. Let b = m - -1253. Find the common denominator of" +"te the least common multiple of l(u) and 8.\n8\nLet p = -4631037539/9165330 - 2/509185. Let n = p + 508. Calculate the common denominator of n and 59/(-14) + 2 + -1.\n126\nSuppose -w + 2 = 4, m = -5*w. Calculate the lowest common multiple of 94 and m.\n470\nCalculate the common denominator of (-2)/1 - 2010/(-450) and 88/21.\n105\nCalculate the common denominator of -79/4 and (-472)/(-48) - 2/(-3).\n4\nWhat is the common denominator of ((-15)/(-6) + -2)/((-44)/52) and -43/22?\n22\nLet z(w) = -w**3 + 6*w**2 - 2*w - 3. Suppose -k - s = 3*s - 9, -3*k + 4*s = -11. Calculate the lowest common multiple of z(k) and 16.\n48\nLet n(u) = 7*u - 1. Let y = -6 + 7. What is the lowest common multiple of n(y) and 7?\n42\nLet y = 208/59 + -9473/1298. Find the common denominator of y and 4/(-14) + 2382/(-336).\n88\nLet u(r) = r**2 + 5*r - 31. What is the lowest common multiple of u(-9) and 10?\n10\nCalculate the common denominator of (-8)/(-32) + 214/56 and -45/14.\n14\nLet v be ((-8)/(-6))/((-2)/(-603)). Let p = 2247 -" +"is divided by a(30)?\n5\nWhat is the remainder when ((-78816)/(-64))/((-5)/(-2) + -1) is divided by 232?\n125\nLet i(c) = -12*c - 1. Suppose 0 = -8*j + 792 - 40. Let f = 122 - j. What is the remainder when f is divided by i(-1)?\n6\nLet q(h) = h**3 + 8*h**2 + 8*h + 47. Calculate the remainder when 166 is divided by q(-7).\n6\nLet v = -191 + 191. Suppose v = 109*u - 110*u + 29. What is the remainder when 173 is divided by u?\n28\nLet r = -215 + 268. Calculate the remainder when 69 is divided by r.\n16\nLet j = 6154 - 5792. What is the remainder when 1456 is divided by j?\n8\nWhat is the remainder when 1844 is divided by (-61)/(-8) + 8/(-64)*-3 - -65?\n19\nSuppose -34874 = -54*y - 52*y. Calculate the remainder when y is divided by 11.\n10\nSuppose l - 26 = -2*p - 4*l, 0 = 3*p - 2*l - 77. Let x = p - -2. Calculate the remainder when x is divided by 16.\n9\nLet r(t) = 230*t + 149. What is the remainder when" +"r dps?\n-0.0006\nWhat is 0.001441 rounded to four dps?\n0.0014\nWhat is -0.0000004869 rounded to seven dps?\n-0.0000005\nRound -78600 to the nearest ten thousand.\n-80000\nRound 32.294 to 0 decimal places.\n32\nWhat is 150000 rounded to the nearest one hundred thousand?\n200000\nRound 0.000000213 to 7 decimal places.\n0.0000002\nWhat is 1.31548 rounded to three decimal places?\n1.315\nRound -1.24297 to one dp.\n-1.2\nRound -1138 to the nearest 100.\n-1100\nRound -217.36 to the nearest ten.\n-220\nWhat is -1692 rounded to the nearest 1000?\n-2000\nRound 42058 to the nearest one hundred.\n42100\nRound -287000 to the nearest one hundred thousand.\n-300000\nWhat is -23600 rounded to the nearest one hundred thousand?\n0\nRound -33.092 to the nearest integer.\n-33\nRound -356 to the nearest one hundred.\n-400\nWhat is -0.08364 rounded to 3 decimal places?\n-0.084\nWhat is -4334000 rounded to the nearest one hundred thousand?\n-4300000\nWhat is 6312.3 rounded to the nearest 10?\n6310\nWhat is 301.6 rounded to the nearest integer?\n302\nWhat is -161200 rounded to the nearest 10000?\n-160000\nRound -0.00216832 to 5 decimal places.\n-0.00217\nWhat is 0.00005366 rounded to five decimal places?\n0.00005\nRound 19193000 to the" +" h.\n-1\nLet d(w) = 3*w**3 - 2*w**2 + 2*w - 1. Let r be d(1). Suppose -2*f - r = -30. Let c(t) = -3*t - 34. Let b be c(-12). Solve -b*x + 4 = f, -o + x + 6 = 0 for o.\n1\nSuppose -23 = -52*y + 81. Solve 0 = -5*l + 5*s - 13 - y, -3*l + 5*s - 19 = 0 for l.\n2\nLet d = -1882 - -1885. Solve 3*t + 6 = 4*n + 11, -7 = -d*t + 5*n for t.\n-1\nLet g = -41 - -37. Let j be g/(-14) - (-24)/14. Solve j*q + 14 = 4, 14 = t - 3*q for t.\n-1\nLet n be (((-12)/(-15))/(-2))/((-62)/2635). Solve 3*g + 5*o - n = 0, -o = g + 4*o - 19 for g.\n-1\nLet p = -23 - -26. Solve 6 = -p*r + 5*k, 0 = 5*r - 0*k - k - 12 for r.\n3\nLet k(r) = 3*r - 42. Let s(m) = 2*m - 42. Let u(n) = 4*k(n) - 5*s(n). Let w be u(-21). Solve -2*y + 4 = 0, 4*q - 3*y +" +"4 take away 0.06?\n-9.5\nSum -2487 and 4.26.\n-2482.74\nWhat is 518 - -0.4?\n518.4\nWhat is 0.5 less than -10784?\n-10784.5\nAdd together -0.4 and -127.431.\n-127.831\nAdd 0 and -0.0085.\n-0.0085\nAdd together 5 and -103.\n-98\nWhat is -674 plus 0.149?\n-673.851\nWhat is 5 plus 68.4998?\n73.4998\nWhat is 95.57 + 9?\n104.57\nWhat is -12 less than 23?\n35\nWhat is -8 less than -0.0368?\n7.9632\nCalculate -0.34 + 0.0364.\n-0.3036\nWhat is -0.037 less than 1.9?\n1.937\nWhat is 1258 + 30?\n1288\nCalculate -0.01 - 143.7.\n-143.71\nWhat is the difference between -2041 and 0.052?\n2041.052\nCalculate -0.01 - 0.61.\n-0.62\nWhat is 620 less than 0.56?\n-619.44\nTotal of 37.9772 and 3.\n40.9772\nWhat is -1578.187 less than 0.03?\n1578.217\nSum 8277.9 and 0.4.\n8278.3\nCalculate 0.045754 + -0.93.\n-0.884246\nWhat is -935 minus -2?\n-933\nCalculate 253001 - -0.1.\n253001.1\nAdd together 66 and 0.089.\n66.089\nWhat is the distance between -6.2 and 6?\n12.2\nCalculate 4.6 + 7428.\n7432.6\nWhat is the difference between 15 and 0.089147?\n14.910853\n-0.5 - 1117723\n-1117723.5\nWhat is the difference between -344340 and 8?\n344348\nWork out 19 + -173.\n-154\nCalculate -166" +"/23?\n-45/23\nIs -1459 < -1396?\nTrue\nWhich is smaller: -301 or -316?\n-316\nWhich is smaller: -0.1 or -224431?\n-224431\nIs 2 >= 446/375?\nTrue\nAre 1/5 and 23502 equal?\nFalse\nIs -144499 greater than or equal to -144499?\nTrue\nWhich is smaller: 1 or 2/1055377?\n2/1055377\nWhich is greater: 0.2 or 3.19824?\n3.19824\nAre 1 and 1113/2414 equal?\nFalse\nWhich is smaller: 33990/19 or 1789?\n33990/19\nIs 4/1527 < -2.66?\nFalse\nAre 482480/7 and 68927 equal?\nFalse\nIs 2528 smaller than 2547?\nTrue\nIs -593 equal to -11249/19?\nFalse\nWhich is bigger: -0.2 or -14725/7?\n-0.2\nIs 13444 smaller than 13447?\nTrue\nWhich is smaller: -175 or -115?\n-175\nDoes 3213 = 3243?\nFalse\nWhich is greater: 8222/71 or 116?\n116\nIs -0.453 less than 154?\nTrue\nIs 1 at least 184/6475?\nTrue\nDoes 88 = -27?\nFalse\nWhich is smaller: -69670 or -69650?\n-69670\nAre 13 and 2716 nonequal?\nTrue\nWhich is greater: 11006 or 10902?\n11006\nWhich is greater: -607450 or -607448?\n-607448\nWhich is greater: -3009 or -2976?\n-2976\nWhich is bigger: 5 or 3375/613?\n3375/613\nWhich is smaller: -508582 or -508584?\n-508584\nAre -551561 and -0.1 equal?\nFalse\nWhich is greater: 1 or 3/98272?" +"e y = -0*y - 5*i + w, -4*i = -3*y - 23. Is (187 + y)*8/16 a prime number?\nFalse\nLet i(m) = 5 - 4*m - 16*m**2 + 1 - 9*m - 1. Let o be i(-13). Let c = o + 4185. Is c a prime number?\nFalse\nLet f = 25363 + -5922. Is f composite?\nFalse\nLet y(g) = g**3 - 10*g**2 + 7*g - 4. Let h be y(11). Let u = -19 + h. Suppose 757 = 6*s + u. Is s composite?\nFalse\nSuppose 17*v = 6*v + 1320. Let x be v/1*(-84)/(-8). Suppose -2*y = -w + 145 + x, -4*y - 7019 = -5*w. Is w composite?\nTrue\nIs (-2 - (-42)/18)*1*(565674 - -15) a prime number?\nTrue\nSuppose 5*h - q + 3912 = -3*q, -4*q - 3132 = 4*h. Let p = h + 1308. Is p a prime number?\nFalse\nLet j = 529 + 477. Let y = 11079 - j. Is y prime?\nFalse\nSuppose -118*l + 105*l = -535847. Is l composite?\nTrue\nIs 26573*(-4)/(-48)*12 a prime number?\nTrue\nSuppose -2*p - 4*x - 6 = -3*p, 2*p - 3*x - 7 = 0." +"35969, 36536, 37265?\n81*n**2 + 35240\nWhat is the l'th term of -301714, -301716, -301718, -301720, -301722?\n-2*l - 301712\nWhat is the x'th term of 32600, 130379, 293344, 521495, 814832, 1173355, 1597064?\n32593*x**2 + 7\nWhat is the u'th term of -13426, -13416, -13392, -13348, -13278, -13176?\nu**3 + u**2 - 13428\nWhat is the a'th term of -147, -510, -1123, -1986, -3099?\n-125*a**2 + 12*a - 34\nWhat is the j'th term of -29007, -57982, -86907, -115758, -144511, -173142?\n4*j**3 + j**2 - 29006*j - 6\nWhat is the r'th term of 1434, 2878, 4322?\n1444*r - 10\nWhat is the j'th term of 191, 725, 1599, 2801, 4319, 6141, 8255, 10649?\n-2*j**3 + 182*j**2 + 2*j + 9\nWhat is the v'th term of 4947, 9874, 14801, 19728?\n4927*v + 20\nWhat is the b'th term of 838, 891, 1030, 1297, 1734?\n7*b**3 + b**2 + b + 829\nWhat is the y'th term of 21440, 21422, 21370, 21266, 21092, 20830, 20462?\n-3*y**3 + y**2 + 21442\nWhat is the z'th term of -99, -222, -427, -714?\n-41*z**2 - 58\nWhat is the i'th term of 9485, 18971, 28455, 37937?\n-i**2 + 9489*i - 3\nWhat is" +"mainder when 6619 is divided by 77?\n74\nCalculate the remainder when 183 is divided by 10.\n3\nCalculate the remainder when 6317 is divided by 40.\n37\nWhat is the remainder when 7158 is divided by 179?\n177\nCalculate the remainder when 83 is divided by 28.\n27\nCalculate the remainder when 8715 is divided by 4353.\n9\nWhat is the remainder when 223 is divided by 57?\n52\nWhat is the remainder when 523 is divided by 22?\n17\nCalculate the remainder when 155 is divided by 53.\n49\nWhat is the remainder when 705 is divided by 16?\n1\nWhat is the remainder when 39062 is divided by 13?\n10\nCalculate the remainder when 164 is divided by 43.\n35\nWhat is the remainder when 4658 is divided by 421?\n27\nCalculate the remainder when 530 is divided by 135.\n125\nWhat is the remainder when 620 is divided by 194?\n38\nWhat is the remainder when 379 is divided by 19?\n18\nWhat is the remainder when 1759 is divided by 117?\n4\nCalculate the remainder when 97 is divided by 39.\n19\nCalculate the remainder when 154 is divided by 12.\n10\nWhat is the" +"ase 13) in base 6?\n-43\nWhat is 2 (base 6) in base 10?\n2\nConvert -15 (base 11) to base 5.\n-31\nConvert 10 (base 4) to base 3.\n11\n37 (base 15) to base 4\n310\nWhat is 10 (base 13) in base 4?\n31\n1 (base 14) to base 8\n1\n-1 (base 13) to base 16\n-1\n40 (base 9) to base 11\n33\nConvert 16 (base 7) to base 14.\nd\nWhat is -21 (base 11) in base 3?\n-212\n-23 (base 4) to base 13\n-b\nConvert 100 (base 2) to base 9.\n4\nWhat is 2 (base 7) in base 15?\n2\nConvert 0 (base 4) to base 13.\n0\nConvert 0 (base 2) to base 10.\n0\nd (base 15) to base 14\nd\nConvert -4 (base 5) to base 8.\n-4\nConvert 5 (base 16) to base 6.\n5\n-4 (base 15) to base 12\n-4\nConvert 28 (base 9) to base 10.\n26\nWhat is -8 (base 12) in base 8?\n-10\nWhat is 2a (base 15) in base 2?\n101000\nConvert -1 (base 3) to base 4.\n-1\nWhat is -b (base 13) in base 14?\n-b\nWhat is" +"\nWhat is the value of (0 - (-6 + -2 + (-7 - -15))) + 37?\n37\nWhat is (4 - 10) + (0 - 0 - (-28 + 22))?\n0\nWhat is the value of 4 + (-2 - 0) - 6 - (10 - 4)?\n-10\nEvaluate 3 + 3 + 1 + (-4 - -6) + -3.\n6\n(-1 - ((-4 - -6) + 2 + 3)) + 11\n3\n0 - (0 - -12) - -1\n-11\n(-8 - (1 - 1)) + (36 - 37) + 15\n6\nEvaluate -3 - (9 - (-6 - 4 - -13)).\n-9\nEvaluate 2 + -15 - (-126 + 125).\n-12\nEvaluate 1 - 1 - ((-16 - -26) + (-1 - 1)).\n-8\nWhat is 10 - (-2 + -1) - (26 + (23 - 39))?\n3\nWhat is the value of -6 + (-3 - (-4 + 1) - (0 - -5))?\n-11\nCalculate 35 + -14 - 22 - 2.\n-3\nEvaluate 26 - -17 - (1 + 30).\n12\nCalculate 60 + -59 + -1 + -2 + 2.\n0\nWhat is -8 + -5 + 16 - 5?\n-2\nEvaluate (-17 - -5)" +" is the i'th term of -1138, -2273, -3408, -4543, -5678, -6813?\n-1135*i - 3\nWhat is the m'th term of -669, -1338, -2007, -2676, -3345?\n-669*m\nWhat is the m'th term of -31, -42, -43, -34, -15, 14?\n5*m**2 - 26*m - 10\nWhat is the s'th term of 277, 272, 263, 250, 233, 212?\n-2*s**2 + s + 278\nWhat is the y'th term of -53, -194, -429, -758, -1181?\n-47*y**2 - 6\nWhat is the g'th term of -176, -189, -202, -215, -228?\n-13*g - 163\nWhat is the g'th term of -1836, -1837, -1838, -1839, -1840, -1841?\n-g - 1835\nWhat is the h'th term of -345, -608, -871, -1134, -1397?\n-263*h - 82\nWhat is the j'th term of -105, -93, -71, -33, 27, 115?\nj**3 - j**2 + 8*j - 113\nWhat is the h'th term of -2784, -2785, -2786, -2787, -2788?\n-h - 2783\nWhat is the a'th term of 43, 71, 93, 109, 119, 123, 121?\n-3*a**2 + 37*a + 9\nWhat is the z'th term of 22, 54, 98, 160, 246?\nz**3 + 25*z - 4\nWhat is the u'th term of 4, 27, 78, 169, 312, 519, 802?\n2*u**3 + 2*u**2" +"-49 - t. Suppose 3*a = -s*a + 50. Solve 3*p = -3, -a = n - 5*n - 2*p for n.\n3\nLet x(c) = -5*c**3 - 214*c**2 + 42*c - 38. Let r be x(-43). Let j(y) = -5*y - 33. Let s be j(-7). Solve r*l + 2*g - 17 = 0, -l - 9 = -s*l + g for l.\n5\nSuppose -98*u - 90*u + 196*u - 152 = 0. Solve -x - 5*t = u - 17, 5*t = 3*x + 6 for x.\n-2\nLet w = -6070 + 6081. Solve 30 = -2*y - 4*t, w = 5*t + 36 for y.\n-5\nSuppose 191 = 2*m - k, 2*k - 108 = m - 2*m. Suppose -2*z = 3*z - 10, -2*g - z + m = 0. Let d = g - 44. Solve -3*t = d*j - 8, -3*t - j + 4 = 2 for t.\n0\nLet u be (1/(0 + 1))/(12 - 253/22). Solve -2*z + 10 = -3*x, u*x - 5*z + z + 4 = 0 for x.\n-4\nSuppose 1853 = -13*p + 30*p. Let g = 113 - p. Solve -g*y =" +"of 624 and 22191.\n39\nWhat is the greatest common factor of 378 and 13392?\n54\nCalculate the greatest common divisor of 7992 and 6021.\n27\nCalculate the highest common factor of 8786 and 437.\n23\nCalculate the highest common divisor of 2914 and 4136.\n94\nCalculate the greatest common divisor of 344 and 8815.\n43\nCalculate the greatest common divisor of 32665 and 2363.\n139\nCalculate the highest common divisor of 3199 and 497.\n7\nCalculate the highest common divisor of 38930 and 34.\n34\nCalculate the greatest common factor of 62826 and 1036.\n74\nCalculate the greatest common factor of 4160 and 69680.\n1040\nCalculate the highest common factor of 48 and 134824.\n8\nCalculate the highest common divisor of 15948 and 36.\n36\nWhat is the greatest common factor of 259243 and 205?\n41\nWhat is the highest common factor of 96 and 881520?\n48\nCalculate the greatest common divisor of 1898 and 1950.\n26\nCalculate the greatest common divisor of 1126466 and 22.\n22\nCalculate the highest common factor of 5340 and 820.\n20\nWhat is the highest common divisor of 16176 and 1397202?\n2022\nCalculate the highest common divisor of 639 and 90.\n9\nWhat" +" smallest common multiple of 8 and l(-18).\n8\nLet l = -53541/20 - -2678. Calculate the common denominator of -2 + ((-57)/66)/(-1) and l.\n220\nLet b be 2 - (-1 - -2 - 0). Let q(n) = 10*n**3 - 1. What is the least common multiple of q(b) and 14?\n126\nLet g be 350 - (4 + -1) - 2. Let j = g - 4159/12. What is the common denominator of 49/6 and j?\n12\nCalculate the smallest common multiple of 8*((-4)/28)/(4/(-14)) and 4.\n4\nWhat is the common denominator of 25/6 and (-6)/15*790/24?\n6\nLet p = -6 + -24. What is the common denominator of 6/15 - (-87)/p and (-3)/18 + 43/(-48)?\n16\nSuppose -2*n = n - 9. Let k be (0/(-2) - 1) + n. Suppose -3*m + 68 = 2*j, k*m - m - 17 = 5*j. Calculate the lowest common multiple of m and 14.\n154\nLet g = 2 + -1. Suppose 5*p - 5*v = 35, 5*v + 6 = 3*p - 19. What is the least common multiple of (-1)/g*(3 + -4) and p?\n5\nFind the common denominator of 10/27 and ((-10)/7)/((-72)/(-105)).\n108\nLet i(y) = 4*y**2" +"e 16, what is -7 - -10e?\n107\nIn base 4, what is 1001 - 11?\n330\nIn base 10, what is -18 - 6?\n-24\nIn base 8, what is -11 + -6?\n-17\nIn base 3, what is 2 - 120?\n-111\nIn base 10, what is 11831 + 4?\n11835\nIn base 3, what is -11 + -2120?\n-2201\nIn base 5, what is 2 + 11434?\n11441\nIn base 7, what is -44 - 2?\n-46\nIn base 7, what is 3 + 1424?\n1430\nIn base 4, what is 1001 + -303?\n32\nIn base 16, what is 2 - -506?\n508\nIn base 10, what is 10 - -18?\n28\nIn base 12, what is 323 - -1?\n324\nIn base 11, what is 148 - -7?\n154\nIn base 15, what is -12 - 12?\n-24\nIn base 6, what is -250040 - 5?\n-250045\nIn base 4, what is -30 - 21?\n-111\nIn base 3, what is 2 + -2200?\n-2121\nIn base 6, what is 44 - 13?\n31\nIn base 11, what is 4 + -528?\n-524\nIn base 8, what is -420 - 3?\n-423\nIn base 12," +"\nIs -2 less than -0.014175?\nTrue\nWhich is smaller: 2/7 or 14110?\n2/7\nAre 360058/21 and 17147 equal?\nFalse\nWhich is smaller: -10395 or -51977/5?\n-51977/5\nWhich is smaller: 1181/1814 or 2?\n1181/1814\nWhich is smaller: -780336/5 or -156067?\n-780336/5\nWhich is greater: -1 or -6/18289?\n-6/18289\nIs 23337 >= 23341?\nFalse\nIs 0 <= -11276/27?\nFalse\nAre -695 and -693 unequal?\nTrue\nWhich is bigger: -8681 or -8734?\n-8681\nIs 2 smaller than -191?\nFalse\nWhich is smaller: 0 or 13/187736?\n0\nIs 332/463 != 0?\nTrue\nWhich is greater: 16599 or 16597?\n16599\nDo 20209 and 20203 have different values?\nTrue\nWhich is greater: 108654 or 108656?\n108656\nWhich is smaller: 19644 or 19607?\n19607\nIs 92.3 less than 86.1?\nFalse\nDo 58734 and 58753 have different values?\nTrue\nAre 1892 and 1816 equal?\nFalse\nWhich is bigger: 57267 or 57271?\n57271\nWhich is smaller: -85012/11 or -7729?\n-7729\nIs 1 bigger than 71/12249?\nTrue\nWhich is smaller: -437/8 or 7?\n-437/8\nWhich is smaller: 1 or -644/34283?\n-644/34283\nWhich is bigger: -14522 or -14523?\n-14522\nWhich is bigger: 1/448 or 0.19?\n0.19\nIs -62715 >= -1/3?\nFalse\nIs 8621 bigger than 8278?\nTrue\nIs 0 < 172/289?" +"n'th term of 475, 1926, 4345, 7732?\n484*n**2 - n - 8\nWhat is the r'th term of -548, -536, -522, -506, -488, -468?\nr**2 + 9*r - 558\nWhat is the g'th term of 751, 1513, 2273, 3031, 3787, 4541, 5293?\n-g**2 + 765*g - 13\nWhat is the j'th term of 52, 125, 210, 313, 440, 597?\nj**3 + 66*j - 15\nWhat is the t'th term of -274, -273, -272, -271, -270?\nt - 275\nWhat is the z'th term of -493, -485, -471, -451, -425?\n3*z**2 - z - 495\nWhat is the f'th term of 385, 383, 379, 373, 365, 355?\n-f**2 + f + 385\nWhat is the n'th term of -321, -327, -325, -309, -273, -211?\nn**3 - 2*n**2 - 7*n - 313\nWhat is the y'th term of 330, 331, 332, 333, 334?\ny + 329\nWhat is the f'th term of 104, 102, 100, 98, 96?\n-2*f + 106\nWhat is the y'th term of -10, -3, 4?\n7*y - 17\nWhat is the l'th term of -543, -544, -545, -546?\n-l - 542\nWhat is the o'th term of 1137, 1139, 1139, 1137, 1133?\n-o**2 + 5*o + 1133\nWhat" +"o**2 - 6*o + 4. Let i be c(q). Suppose -26 = -5*y + i. List the prime factors of y.\n2, 3\nLet q be 0/(4/3*3). What are the prime factors of 2 + 1/2*q?\n2\nSuppose -2*d + 0*c - 10 = -2*c, -d = 2*c + 2. Let n = 14 + -5. Let s = d + n. List the prime factors of s.\n5\nLet k be (-2)/(-4) - (-121)/(-2). Let j = -35 - k. List the prime factors of j.\n5\nLet y = 35 + -24. Let b be (1 - 1) + 2 - y. Let u = 20 + b. What are the prime factors of u?\n11\nLet x be ((-1)/(-2))/((-5)/(-30)). Suppose -4*h = -x*h - 3. List the prime factors of h.\n3\nLet z be (-3)/(-2 + (3 - 2)). Suppose -z = -y + 7. List the prime factors of y.\n2, 5\nLet a(k) = -k**2 - 4*k + 3. Let q = -6 - -2. List the prime factors of a(q).\n3\nSuppose -6 + 25 = h. What are the prime factors of h?\n19\nLet j(o) = -o**3 - o**2 - o." +" -2, -3, f, 4 in decreasing order.\n4, f, -2, -3\nLet m = -1 - -1. Let h = -3.26 - -0.26. Let s = 26 + -26.1. Put s, h, m in increasing order.\nh, s, m\nLet l(a) = a + 6. Let x be l(-2). Put -4, x, -25 in descending order.\nx, -4, -25\nSuppose -38 = -29*a + 49. Put a, -3, -2, 19 in decreasing order.\n19, a, -2, -3\nLet y = -386 + 389. Sort -4, y, -0.04, 0.1 in increasing order.\n-4, -0.04, 0.1, y\nSuppose 19*i - 3465 = -26*i. Put 2, i, 4, -1 in decreasing order.\ni, 4, 2, -1\nSuppose 2*p - x - x - 6 = 0, -3*p - 2*x - 11 = 0. Let g be 2*(2/(8/(-6)) + p). Let s = 23 - 39. Sort s, g, 1 in descending order.\n1, g, s\nLet j be ((-16)/(-40))/(1/15). Suppose -7*c = -c - j. Sort 0, 2, c in descending order.\n2, c, 0\nLet z be 0 + ((-39)/(-65))/(1/(-5)). Let d be ((0 - z)*-1)/((-42)/56). Put d, 10, -1 in ascending order.\n-1, d, 10\nLet a be (4/8)/((-1)/2). Suppose 0*s" +"o 0.2 in 0.5, -6, s, -2/13?\n0.5\nLet o = -6 + 10. Let i be (605/(-10))/(6/(-36)). Let w be ((-44)/i)/(o/6). Which is the closest to 2? (a) w (b) -2 (c) -4\na\nLet y = -3227 - -3228. What is the closest to 1 in -0.1, -5, y, -188?\ny\nLet n = -1274 + 1323. Let o = -0.47 + -53.53. Let d = n + o. What is the nearest to 2 in 0.5, -2/7, d?\n0.5\nLet v = -11614.95 - -11615. What is the nearest to -2 in 2, v, 3, -1?\n-1\nLet k = 7.95 + -7.55. Let m = -0.12 - -0.06. Let n = m + -1.94. Which is the nearest to -0.7? (a) k (b) 1/3 (c) n\nb\nLet f = -89.74 + 91.74. Which is the nearest to -1/3? (a) -4/9 (b) f (c) 4\na\nSuppose 5*c - 26 - 19 = -3*o, o + 2*c = 17. Let k be -2 + (-3 - -3)*-1. What is the closest to -7 in k, o, 2/9?\nk\nLet r = -48712 + 48712.2. Let z = 0 - -0.06. What is the closest to z" +"**2 + 28959*d - 4\nWhat is the i'th term of 24, -26, -150, -354, -644?\n-i**3 - 31*i**2 + 50*i + 6\nWhat is the a'th term of 2061, 4126, 6189, 8250, 10309, 12366, 14421?\n-a**2 + 2068*a - 6\nWhat is the p'th term of 36, 38, 40, 42?\n2*p + 34\nWhat is the g'th term of -97, -214, -343, -490, -661, -862, -1099, -1378?\n-g**3 - 110*g + 14\nWhat is the u'th term of 28, 45, 50, 37, 0, -67?\n-u**3 + 24*u + 5\nWhat is the k'th term of 49, 98, 147, 196, 245, 294?\n49*k\nWhat is the a'th term of 13, 378, 1369, 3298, 6477, 11218?\n52*a**3 + a**2 - 2*a - 38\nWhat is the u'th term of -7, 23, 93, 203?\n20*u**2 - 30*u + 3\nWhat is the c'th term of 38, 74, 114, 158, 206?\n2*c**2 + 30*c + 6\nWhat is the s'th term of 3, 9, 21, 39?\n3*s**2 - 3*s + 3\nWhat is the b'th term of -53, -258, -813, -1892, -3669?\n-29*b**3 - b**2 + b - 24\nWhat is the s'th term of -10878, -21754, -32630, -43506, -54382, -65258?\n-10876*s -" +"*g - 2 = -n for n.\n-4\nLet s be (64/(-144))/(12/(-54)). Solve -4*z - 5 = 3*b, -s*b = -8*z + 9*z + 5 for b.\n-3\nSuppose o + 539 = 2*p, -4*o - 2136 = -p + 3*p. Let t = o + 536. Solve 2*f + 2*a = 10, -f - 3*a + t = -10 for f.\n2\nLet b = 27 + -21. Let a be 19/((-19)/(-6)) - b. Solve a = 5*y - 4*i - 21, -3*y = -y - i - 6 for y.\n1\nLet d = -9599 - -9600. Solve 2*w - 20*k + 16*k + 2 = 0, -k = w + d for w.\n-1\nLet y be ((-1)/2)/(-1)*-50. Let a = 28 + y. Suppose -2*d = 3*f - 1, -3*d + 12 = -12*f + 13*f. Solve -d*r - a*x = -x + 18, -4*x + 4 = 0 for r.\n-4\nLet r = 77 - 77. Suppose -2*q + f = -99, 6*q - q - 2*f - 248 = r. Suppose -4*u - 34 = -q. Solve -5*c + 15 + 26 = -u*g, 3*g - 3*c = -27 for g.\n-4\nLet" +"Do -110/31 and 6/5 have the same value?\nFalse\nIs -13/1083 > -1?\nTrue\nIs -163 at least -120?\nFalse\nIs -51 less than or equal to -12634?\nFalse\nWhich is greater: -508899/2 or -254450?\n-508899/2\nIs -55039 equal to -55027?\nFalse\nWhich is greater: -142 or -0.03027?\n-0.03027\nWhich is greater: 172401/8 or 21551?\n21551\nWhich is greater: 0.26 or -957?\n0.26\nDo 2/35 and -144/29 have the same value?\nFalse\nWhich is smaller: -17/739 or 0?\n-17/739\nAre -19880/51 and -390 unequal?\nTrue\nIs -504/1577 at most as big as -1?\nFalse\nIs 3/44 >= -991?\nTrue\nIs -284026 smaller than -2556224/9?\nTrue\nWhich is smaller: -25/5784 or -1?\n-1\nWhich is smaller: -0.33 or -0.289?\n-0.33\nWhich is greater: 2/7 or 314331?\n314331\nWhich is smaller: 1637 or 880?\n880\nWhich is smaller: 0.034765 or 2?\n0.034765\nIs 113 greater than or equal to 3331?\nFalse\nIs 2/7 equal to -0.346257?\nFalse\nIs -338 at most as big as 50?\nTrue\nIs 2 <= 169537?\nTrue\nWhich is smaller: -13/26331 or 0?\n-13/26331\nWhich is smaller: -3484 or -73181/21?\n-73181/21\nIs 68 <= 4?\nFalse\nWhich is smaller: 0.1 or -111598?\n-111598\nWhich is greater: 464 or" +"0, -z + 2*x + 20742 = -61995. Is z prime?\nFalse\nLet p(m) = 27*m - 53 + 69 + 2*m**2 - 10*m. Let u = -29 + 10. Is p(u) a composite number?\nTrue\nSuppose -a = -5*q - 6385 - 3637, 2*a - 20020 = -2*q. Let t = a + -4845. Is t a prime number?\nTrue\nSuppose -262204 = 42*s - 1445050. Is s a composite number?\nFalse\nSuppose -2*w - 3*y + 0*y = -330, -494 = -3*w - 5*y. Suppose 0 = -12*k + 5*k - w. Is -1 + 2 + 1 + 791 + k a composite number?\nFalse\nSuppose 7*b + 3633 = -0*b. Let d = b + 1073. Is d prime?\nFalse\nLet o = 102966 - 67975. Is o a composite number?\nTrue\nLet i(b) = 294085*b**3 - 95*b**2 + 193*b + 1. Is i(2) a composite number?\nTrue\nLet n = -225197 - -330636. Is n prime?\nFalse\nSuppose 8*u - 37 = -13. Let c be (9/(-5))/(1/(-5)). Is u/9 + 24/c a prime number?\nTrue\nLet s = 18131 + 431336. Is s composite?\nTrue\nLet u(a) = 11245*a**2 - 32*a + 207. Is u(4)" +"divisor of 160 and m?\n32\nLet h(g) = -g + 5. Let m be h(0). Let k be -2 + 1 + -2 + m. Suppose 3*a + 0*a - 9 = 0. Calculate the highest common divisor of k and a.\n1\nSuppose 3*i - 29 = 106. Calculate the greatest common factor of i and 9.\n9\nSuppose 0 = 4*j - 10 - 2. Let m be (j/1)/1 - -105. Calculate the highest common factor of 27 and m.\n27\nLet g(i) = -11*i + 1. Let c be g(-4). Let v = -20 + c. What is the greatest common factor of 10 and v?\n5\nLet g = 27 + -15. What is the highest common factor of 3 and g?\n3\nLet z = -95 + 207. What is the greatest common factor of 14 and z?\n14\nSuppose 3 = 5*q + 18, 0 = 3*j - 5*q - 21. What is the highest common divisor of 10 and j?\n2\nLet z be (0 - -1)*60/24*6. Calculate the greatest common divisor of z and 120.\n15\nLet y(v) = v**2 - 9*v - 7. Suppose 2*l - 10 = -n, -3*n" +"+ 482*w - 3\nWhat is the p'th term of 19737, 19721, 19705, 19689, 19673?\n-16*p + 19753\nWhat is the a'th term of -4005, -7658, -11313, -14970, -18629, -22290?\n-a**2 - 3650*a - 354\nWhat is the p'th term of -40710, -40708, -40706, -40704, -40702?\n2*p - 40712\nWhat is the u'th term of 3, 28, 83, 168, 283?\n15*u**2 - 20*u + 8\nWhat is the u'th term of 474, 1572, 2670, 3768?\n1098*u - 624\nWhat is the b'th term of -200237, -400470, -600703?\n-200233*b - 4\nWhat is the b'th term of -1711, -1710, -1707, -1702, -1695?\nb**2 - 2*b - 1710\nWhat is the j'th term of 1, 147, 429, 853, 1425, 2151, 3037?\nj**3 + 62*j**2 - 47*j - 15\nWhat is the t'th term of -1688, -3391, -5120, -6887, -8704, -10583, -12536, -14575?\n-2*t**3 - t**2 - 1686*t + 1\nWhat is the i'th term of -96961, -193887, -290813, -387739, -484665?\n-96926*i - 35\nWhat is the a'th term of -25658, -25733, -25798, -25847, -25874, -25873?\na**3 - a**2 - 79*a - 25579\nWhat is the i'th term of -13472, -26916, -40362, -53810, -67260, -80712, -94166?\n-i**2 - 13441*i - 30\nWhat is" +"7069 + -7229. Is q < c?\nTrue\nLet v = 1613805/631124 - -8/12137. Is 3 smaller than v?\nFalse\nLet a = 29781 + -29789. Suppose -3*r = 3*n + 29 - 8, 0 = -5*r - 25. Let k be 68/(-6) + (1 - n). Is k greater than a?\nFalse\nLet u be (-18)/36*(-1 + 134 + -1). Let k = 72 + u. Let l = k - 15. Is l > -11?\nTrue\nSuppose -4*h + 110 = -2*k, -h = 3*k + 3*h + 185. Let v = k + 99. Let c be (-4)/40*4 - (-36)/v. Do c and -2/165 have different values?\nTrue\nSuppose 5*i + 7 = 77. Suppose -3*y + 0*y = -4*b - 25, 0 = -5*b + 4*y - 30. Let q = i + b. Is 0.2 <= q?\nTrue\nLet x be (5/2235)/((2/(-12))/(95/38)). Is x equal to 1?\nFalse\nLet p(r) = r + 15. Let x be p(-7). Suppose 12 = t + x. Let y(z) = 4*z**2 - 5*z + 3. Let g be y(t). Is 46 at least as big as g?\nFalse\nLet c = -119 + 151. Let h(m) = -m**3" +"he tens digit of k?\n4\nSuppose 2*l - 4*d - 15931 = 8611, l = 4*d + 12259. What is the thousands digit of l?\n2\nLet k be (383/(-15))/((-4)/10)*6. Let t = -376 + k. What is the units digit of t?\n7\nLet l = 291 - 289. What is the units digit of 685 + l - 1*(-4 - -2)?\n9\nLet k(j) = -2553*j + 3131. What is the units digit of k(-10)?\n1\nSuppose 17*k - 68 = 15*k. Let g be 2/(-13) - (-2 - (-2430)/(-78)). Suppose -k*m + 6 = -g*m. What is the units digit of m?\n6\nSuppose -6481 = -6*f + 1121. Suppose -f = 10*v - 3677. What is the tens digit of v?\n4\nSuppose 0 = -o - 3*p + 1236 + 20526, -108844 = -5*o + 2*p. What is the thousands digit of o?\n1\nLet g = -546 + 311. What is the tens digit of (-3)/((-3)/(-4)) - g/5?\n4\nLet b(j) be the second derivative of -8/3*j**3 + 0 + 19*j + 3/2*j**2. What is the tens digit of b(-1)?\n1\nLet c be (112/3)/7*3. What is the hundreds digit of (-4)/c +" +" in base 9?\n-5347\nWhat is -232215 (base 7) in base 13?\n-15c30\nWhat is 144 (base 8) in base 16?\n64\nConvert -101001000110110 (base 2) to base 14.\n-7954\nWhat is -21000 (base 4) in base 3?\n-210100\nConvert 112035 (base 6) to base 11.\n7181\n-35170 (base 10) to base 9\n-53217\nConvert -196 (base 16) to base 7.\n-1120\nWhat is 348 (base 15) in base 5?\n10433\nWhat is 11312000 (base 4) in base 5?\n1231221\nWhat is 2a1b (base 14) in base 7?\n30534\n1011 (base 4) to base 10\n69\n-4087 (base 10) to base 3\n-12121101\nWhat is -11111011 (base 2) in base 14?\n-13d\nConvert -1112312 (base 4) to base 6.\n-41422\n216112 (base 7) to base 6\n452311\nConvert 15701 (base 11) to base 7.\n121363\nConvert 7871 (base 13) to base 4.\n10012313\nWhat is -1243 (base 5) in base 9?\n-240\nConvert -221 (base 11) to base 9.\n-324\nConvert -768 (base 14) to base 2.\n-10110111000\nWhat is -13531 (base 14) in base 6?\n-1004411\n-333 (base 13) to base 7\n-1413\nConvert 364 (base 7) to base 6.\n521\nWhat is -11010012 (base 3) in base 4?" +"asing order.\nw, h, -4, -7\nLet o = 12/35 - 1/7. Let c = -23.6 - -19. Let r(q) = 11*q**2 + 1534*q - 35085. Let t be r(20). Sort o, t, c, 0.3 in decreasing order.\n0.3, o, c, t\nLet o(i) = 2*i**3 + 28*i**2 + 8*i - 23. Let l be o(-14). Let g be (8/(-20))/((-72)/l). Put g, 3, -0.5 in decreasing order.\n3, -0.5, g\nLet o = 11661 + -11662. Put -3, 7, 43, o, 1 in decreasing order.\n43, 7, 1, o, -3\nLet i be 220/(-6) + (798/63)/19. Put 3, i, -3, 4 in decreasing order.\n4, 3, -3, i\nLet g(s) = s**2 - 19*s + 63. Let c be g(4). Put -2, c, 2/255, -1, 0.5 in decreasing order.\nc, 0.5, 2/255, -1, -2\nLet t = 14 + -13. Let f = -800 - -797. Suppose 2*s = 12 - 2. Put s, f, -1, t in ascending order.\nf, -1, t, s\nLet a be (44/(-3))/(-44)*1*-3. Put a, -4, 56 in descending order.\n56, a, -4\nLet a = 320 - 321. Suppose 0 = l, -3*l + 3 = -5*y - 2. Let o be (a -" +"ate the remainder when 16810 is divided by 2399.\n17\nCalculate the remainder when 2001 is divided by 167.\n164\nCalculate the remainder when 5975 is divided by 1482.\n47\nWhat is the remainder when 7636 is divided by 1686?\n892\nWhat is the remainder when 26318 is divided by 26175?\n143\nWhat is the remainder when 213427 is divided by 441?\n424\nCalculate the remainder when 6534 is divided by 2175.\n9\nCalculate the remainder when 358304 is divided by 13.\n11\nWhat is the remainder when 2184 is divided by 121?\n6\nWhat is the remainder when 896 is divided by 41?\n35\nCalculate the remainder when 3592 is divided by 3281.\n311\nCalculate the remainder when 63222 is divided by 1470.\n12\nCalculate the remainder when 262 is divided by 7.\n3\nCalculate the remainder when 531198 is divided by 256.\n254\nCalculate the remainder when 10004 is divided by 386.\n354\nCalculate the remainder when 8877 is divided by 1640.\n677\nCalculate the remainder when 59208 is divided by 191.\n189\nWhat is the remainder when 1213 is divided by 54?\n25\nCalculate the remainder when 29939 is divided by 1035.\n959\nWhat is the remainder" +"e prime factors of ((-145)/(-25) - 3)/((-15)/(-3675))?\n2, 7\nList the prime factors of 334 - (5/20 + (-2)/8).\n2, 167\nLet q be ((-32)/16)/((1/2)/(-1)). Suppose 2*k = q*r - 142, -44 - 77 = -4*r - 5*k. List the prime factors of r.\n2, 17\nLet f be 6/(-5)*(-5)/2. Suppose c + 4*g = 0, -g + f = 2*c - 4. What are the prime factors of c?\n2\nSuppose 3026 = 2*r + 3*p, -5*p = 4*r - 5720 - 334. List the prime factors of r.\n2, 379\nLet r(j) = 7*j**2 + 34*j - 2. What are the prime factors of r(-22)?\n2, 1319\nLet l(m) be the third derivative of m**5/60 + m**4/6 + 23*m**3/3 + 30*m**2. List the prime factors of l(0).\n2, 23\nLet f = 124 - 40. Let j = -58 + f. What are the prime factors of j?\n2, 13\nLet z(b) = -8*b + 8. Suppose -28 = -0*g + 4*g. Let h be z(g). Let x = -44 + h. List the prime factors of x.\n2, 5\nLet a(k) = k**3 + 3*k**2 - k + 1. Let b be a(-3). Let v be b/(-16)" +"on multiple of b(c) and 5?\n5\nCalculate the common denominator of 99/20 and 90/8*66/(-75).\n20\nLet a = 2/609 - 3067/6699. Suppose 4*x - 64 = 2*x. Calculate the common denominator of a and x.\n11\nSuppose -5*t + 10*t = 0. Suppose t = -2*u + 5*u - 54. Calculate the smallest common multiple of 6 and u.\n18\nSuppose 21*y - 21 = -0*y. Suppose 3*h - 12 = 0, 3*g + h = 19 - 3. Calculate the smallest common multiple of y and g.\n4\nSuppose 4 = -4*q + 4*x, 4*q - 5*x + 7 = -0*q. Let a = 39 + -9. Suppose n - a = -2*n. Calculate the least common multiple of n and q.\n10\nWhat is the common denominator of 11/28 and (-5)/(-2)*55/(-40)?\n112\nLet m be 9886*(1 + (-27)/21). Let y = -2818 - m. Calculate the common denominator of y and -33/5.\n35\nSuppose 0*o - 24 = 3*o. Let d be 9/15 - o/20. Let j(i) = 13*i - 1. What is the smallest common multiple of 2 and j(d)?\n12\nFind the common denominator of -25/12 and 2/1 - 465/990.\n132\nLet b(j) = j" +"519\nWhat is the remainder when 5247772 is divided by 280?\n12\nWhat is the remainder when 19648539 is divided by 15?\n9\nCalculate the remainder when 383797 is divided by 757.\n755\nWhat is the remainder when 56142 is divided by 18521?\n579\nCalculate the remainder when 624129196 is divided by 1939.\n1937\nCalculate the remainder when 90622 is divided by 2625.\n1372\nCalculate the remainder when 41824013 is divided by 464711.\n23\nWhat is the remainder when 44397145 is divided by 23?\n15\nCalculate the remainder when 2298235 is divided by 790.\n125\nWhat is the remainder when 21225 is divided by 91?\n22\nWhat is the remainder when 36555 is divided by 302?\n13\nWhat is the remainder when 35082072 is divided by 1425?\n1422\nCalculate the remainder when 3005215 is divided by 150259.\n35\nCalculate the remainder when 981009 is divided by 205.\n84\nCalculate the remainder when 416295 is divided by 1735.\n1630\nCalculate the remainder when 92401 is divided by 21364.\n6945\nCalculate the remainder when 189222 is divided by 13514.\n26\nWhat is the remainder when 10086175 is divided by 5003?\n127\nWhat is the remainder when 894647 is divided by 99?\n83" +"8\nDivide -348 by -58.\n6\nDivide -4 by 54.\n-2/27\nDivide -3 by -368.\n3/368\n-90 divided by 18\n-5\nCalculate 0 divided by 31.\n0\n-752 divided by -1\n752\n-1675 divided by -4\n1675/4\nWhat is 229 divided by 6?\n229/6\nWhat is 870 divided by -30?\n-29\nWhat is 912 divided by -152?\n-6\nWhat is -760 divided by -2?\n380\nCalculate -1 divided by -3184.\n1/3184\nDivide 6 by -361.\n-6/361\nDivide 4 by 694.\n2/347\n-129 divided by 1\n-129\nWhat is 0 divided by -217?\n0\n-40 divided by 8\n-5\nWhat is -8606 divided by 2?\n-4303\nCalculate -200 divided by -1.\n200\nDivide 3 by 14.\n3/14\nCalculate 102 divided by -1.\n-102\nDivide 4900 by -350.\n-14\n76 divided by 1\n76\nWhat is -3370 divided by -337?\n10\nCalculate 3 divided by -1425.\n-1/475\nDivide 1 by -130.\n-1/130\nCalculate 0 divided by 179.\n0\nDivide -6215 by 1243.\n-5\n-7 divided by -13\n7/13\nWhat is 5 divided by -1560?\n-1/312\nWhat is 1 divided by 475?\n1/475\n-14 divided by 5\n-14/5\nDivide -624 by -52.\n12\n50 divided by -50\n-1\n840 divided by -14\n-60" +"e 92 = i + 2*j, i - 3*j = -i + 212. What is the greatest common factor of g and i?\n20\nLet r(x) = -x**3 + 10*x**2 + x. Let n be r(-4). Suppose 8*l - 4*l - n = 0. Let y be 603 - 14/(-35)*5. What is the highest common divisor of l and y?\n55\nLet a(g) = -296*g - 7604. Let n be a(-27). Calculate the highest common factor of 36 and n.\n4\nSuppose -490*c + 526*c = 24948. Calculate the greatest common divisor of 63 and c.\n63\nSuppose 103 = -2*t + 85. Let l(z) = -5*z + 6. Let b be l(t). What is the highest common divisor of 153 and b?\n51\nLet y = 1659 + -915. Suppose -24*m + 178*m = 81*m + 1752. What is the greatest common factor of m and y?\n24\nLet b(z) = -6*z**2 + 80*z + 18. Let r be b(16). Let n = 260 + r. Calculate the greatest common factor of 440 and n.\n22\nSuppose -6 = -5*t + 9. Let y be 6*t*(2 + -1). Let u be (65/(-25) - 1)*-15. Calculate the greatest common divisor" +" the second derivative of 19*h**3 - h**2/2 - 6*h. Let k be b(-1). Let o = k - -350/3. Which is greater: o or 2?\n2\nSuppose -37*p + 6 = 43. Which is bigger: p or -332?\np\nSuppose -7 = 5*h - 42. Suppose -5*r = -4*p + 169, p = -3*r - h + 62. Which is smaller: p or 47?\np\nLet m = -4109/10 - -411. Let b be (0 + 18)*6/12. Suppose 7*c - 4*c - b = 0, -5*c + 20 = 5*j. Which is bigger: j or m?\nj\nLet t(y) = 7*y**3 - y. Let a be t(1). Let l = -1 - -6. Suppose o + 19 = -l*q, -q = -4*o - 6*q - 1. Are o and a non-equal?\nFalse\nSuppose 2 = 8*a - 6*a. Let d = -3 - -4. Suppose -2 = 4*b + p + d, -2*b + 4*p - 6 = 0. Is a > b?\nTrue\nLet y = -2679 - -2560. Which is greater: -125 or y?\ny\nLet m be (0 + 2/10)/(-1). Let q be 8 + 1*(-56)/7. Is q equal to m?\nFalse\nLet q = 881 +" +"-48 - (-1 - -1) - (-7 + 13).\n1\nCalculate ((-2 + 5 - -5) + -9 - 0) + 19.\n18\nCalculate 8 - (-1 - 2 - (44 - 41)).\n14\nWhat is the value of 13 - (1 + (8 - (-10 - -26)))?\n20\nCalculate 18 - (28 - (22 + 1)).\n13\nWhat is -3 - ((1 - 5) + (0 - 13) - -6)?\n8\nWhat is -44 + 40 + 24 + 3?\n23\nCalculate (0 - -15 - 40) + 16.\n-9\nEvaluate 3 + (-1 - -6) + (-2 + -9 - 0).\n-3\nWhat is (-7 - (5 + 0 - 9)) + 13?\n10\nWhat is the value of -5 - (-15 + (8 - 2) + 8)?\n-4\nWhat is the value of (-5 - -5) + -7 - (-4 + -2 + 2)?\n-3\nEvaluate 9 - (-2 - -8 - -18).\n-15\nWhat is the value of (9 + 0 - 14) + (6 - 2)?\n-1\nEvaluate -10 + -7 + (2 - (-4 - 2)).\n-9\nEvaluate 11 + -23 + 16 - -17.\n21\nEvaluate (-17 - -15) + -6 - -13." +"10*r + 12 = -4*m, 5*m - r - 14 = 0. Suppose m*d + 0*d - 254 = 0. Is d a prime number?\nTrue\nLet s = 701 + -702. Let k = 1393 - 699. Is -10 + k + (-1)/s a composite number?\nTrue\nLet p = 637 - -2586. Is p prime?\nFalse\nLet g(j) = 5*j**3 - 2*j**2 + 1. Let m be g(1). Let k be (0 + -3 + m)*0. Suppose -5*p = -w - 5485, -2*w + 3*w = k. Is p composite?\nFalse\nLet p(n) be the first derivative of -513*n**2/2 - 14*n - 7. Is p(-1) a prime number?\nTrue\nLet j be (-10)/(-8) + 17178/56. Suppose 2*d - j = -10. Is d composite?\nFalse\nLet p(b) = 18*b**2 - 3*b - 7. Suppose 5*s = x - 16, -2*s - 1 = 7. Is p(x) a composite number?\nFalse\nSuppose -g + 15226 = 2*g + b, b = -g + 5072. Is g a composite number?\nFalse\nLet h = 4 - 7. Let l be h/(-2)*5404/3. Is (-2)/(-5) - l/(-70) a prime number?\nFalse\nSuppose 355 = -4*o + 1243. Suppose 0 = -0*j +" +"54?\nTrue\nDoes 73 divide 881768?\nFalse\nIs 67 a factor of 3504376?\nFalse\nIs 38 a factor of 335859?\nFalse\nIs 1129732 a multiple of 23?\nFalse\nIs 181 a factor of 14459185?\nTrue\nDoes 567 divide 4868262?\nTrue\nIs 55566 a multiple of 343?\nTrue\nIs 24505 a multiple of 377?\nTrue\nIs 17 a factor of 935102?\nTrue\nIs 2924 a multiple of 731?\nTrue\nDoes 65 divide 41145?\nTrue\nIs 18 a factor of 365886?\nTrue\nIs 973349 a multiple of 13?\nTrue\nIs 254744 a multiple of 56?\nTrue\nIs 1857752 a multiple of 52?\nTrue\nIs 2424032 a multiple of 104?\nTrue\nDoes 69 divide 3677266?\nFalse\nIs 13594 a multiple of 23?\nFalse\nIs 1208690 a multiple of 217?\nTrue\nIs 2721122 a multiple of 381?\nFalse\nDoes 12 divide 83260?\nFalse\nIs 7 a factor of 1155483?\nTrue\nIs 164927 a multiple of 68?\nFalse\nIs 10 a factor of 3584060?\nTrue\nIs 540 a factor of 1186423?\nFalse\nIs 50945 a multiple of 5?\nTrue\nIs 3960036 a multiple of 333?\nTrue\nIs 30995 a multiple of 171?\nFalse\nIs 55016 a multiple of 261?\nFalse\nIs 4 a factor of" +"(-21)?\nTrue\nLet i = 14 + -10. Let m be ((-4)/(-24)*-4)/(i/(-84)). Suppose -26 = -7*s + 4*s + v, m = 2*s + v. Is 2 a factor of s?\nTrue\nLet m = -3 - -19. Let r = -13 + m. Suppose -r*t + 62 = -82. Is t a multiple of 8?\nTrue\nLet j(l) = 3*l**3 + l**2 - l + 9. Let i be j(-3). Let f = i - -64. Suppose n - 373 = -5*t, 308 = f*t - n - 3*n. Does 15 divide t?\nTrue\nLet j(i) = 17*i**2 + 6*i + 21. Is 16 a factor of j(7)?\nTrue\nSuppose 6*l = -7429 + 30643. Suppose 9*f + 179 = l. Suppose 2*t - f = -8*t. Is 17 a factor of t?\nFalse\nSuppose -27*l - 3971 = -31*l + 5*s, 5*l = -2*s + 4972. Is l a multiple of 2?\nTrue\nSuppose 4*z - 9978 = -l, 3615 = 5*l - 2*z - 46209. Does 25 divide l?\nFalse\nLet x be 3 + -5 + (5 - 1) + -1. Is 45 a factor of 1*93 + x/3*-9?\nTrue\nSuppose -10*p = -57*p + 446594." +" the units digit of p?\n3\nSuppose 5*c = 3*n - 58223, 5*n - 97015 = 28*c - 23*c. What is the tens digit of n?\n9\nLet u be 3*(18/(-3) - -7). Suppose -5*t - 3*n + 569 = -762, u*t + 5*n - 789 = 0. What is the tens digit of t?\n6\nLet r = -30 - -35. Suppose l + 239 = r*u, 0*l = 2*u - 4*l - 92. Suppose -198 + u = -3*m. What is the units digit of m?\n0\nLet f = -4429 - -9124. What is the hundreds digit of f?\n6\nLet k(p) = -p**3 + 22*p**2 - 40*p + 4. Let z be k(20). Suppose 237 = z*b + 3*d, 0 = 2*b - 3*b - 4*d + 69. What is the units digit of b?\n7\nLet i be ((-10026)/34 - 6/51) + 2. Let m = i + 1512. What is the thousands digit of m?\n1\nSuppose -44*r = 32*r - 1911918 + 333474. What is the hundreds digit of r?\n7\nLet p(o) be the first derivative of -3*o**4/4 - 3*o**3 + 9*o**2 + o + 81. What is the tens digit of" +"es?\n0.000021\nWhat is 0.000274696 rounded to six dps?\n0.000275\nWhat is 6.53478 rounded to 0 decimal places?\n7\nWhat is 0.650054 rounded to 1 dp?\n0.7\nWhat is -35.588518 rounded to one decimal place?\n-35.6\nRound -6.71467 to 2 dps.\n-6.71\nWhat is 41.6137 rounded to the nearest 10?\n40\nRound 50.3778 to one dp.\n50.4\nWhat is 0.0291005 rounded to 3 dps?\n0.029\nWhat is -56809693 rounded to the nearest one hundred thousand?\n-56800000\nRound 0.0001743537 to seven decimal places.\n0.0001744\nWhat is -0.000008967148 rounded to six decimal places?\n-0.000009\nWhat is 187.30094 rounded to the nearest 10?\n190\nRound -0.0001122762 to 7 decimal places.\n-0.0001123\nWhat is 29334.7 rounded to the nearest one thousand?\n29000\nWhat is 249.8349 rounded to the nearest 10?\n250\nRound -0.3357615 to 4 dps.\n-0.3358\nRound -67282.937 to the nearest one thousand.\n-67000\nWhat is -0.00000225693 rounded to 6 decimal places?\n-0.000002\nRound 5.06729 to the nearest integer.\n5\nRound 10.3368719 to 1 dp.\n10.3\nWhat is -31121.9 rounded to the nearest ten?\n-31120\nWhat is -231.4711 rounded to the nearest ten?\n-230\nRound -261475.9 to the nearest 100000.\n-300000\nWhat is 9748590 rounded to the nearest 1000000?\n10000000\nRound 0.00000047277 to" +" b be o(-2). Suppose -1 = -2*i + 2*z - 23, -3*i - 5*z = b. What is the remainder when 8/6*(-306)/i is divided by 12?\n10\nWhat is the remainder when -4*(-4 - -1) - -1 is divided by 5?\n3\nSuppose y + 7 - 19 = 0. What is the remainder when 21 is divided by y?\n9\nSuppose 0 = -3*k + 4 + 8. Suppose 2*x - 7*x - c = -115, -2*c = 0. Suppose 4*z - 40 = -2*s, -40 = -5*z + 4*s + x. Calculate the remainder when z is divided by k.\n3\nWhat is the remainder when 51 + 1 - (-8 - -7) is divided by 14?\n11\nLet h(p) = 7*p + 5. Let z be h(4). Suppose 0 = -0*w - 2*w + 2*j + 34, -w + 5*j = -z. What is the remainder when 24 is divided by w?\n11\nLet x(y) = y - 11. Let h be x(9). Suppose 2*q - 6 = -2. What is the remainder when q is divided by 1/h - 5/(-2)?\n0\nLet t(h) = -h**3 + 5*h**2 + 2*h + 4. What is the remainder when" +"\nSolve -24*f = -22*f + 4*q + 24, 3*f = -q - 16 for f.\n-4\nSolve q - l = -0*l + 5, l = 4*q - 11 for q.\n2\nSolve s + 0*s = 3*i + 20, 3*i = -5*s + 10 for s.\n5\nSolve -3*j = -5*j - 4*n + 18, 0 = j - 4*n + 21 for j.\n-1\nSolve 0*g - 2*i = -3*g - 6, -2*i - 8 = 4*g for g.\n-2\nSolve 0 = -4*c + 12, -5*g + 2*c - 14 = -c for g.\n-1\nSolve 3*a - 6*a + 4 = -4*x, -a = 2*x + 12 for x.\n-4\nSolve -4*c + 31 = -5*i - 9, -5*c - 4*i = -9 for c.\n5\nSolve -5*j + t = -10, -2*j + 0*j - t = -4 for j.\n2\nSolve -4*j - 5*h = -3, -7*h - 10 = -3*j - 3*h for j.\n2\nSolve 4*w + 28 = -4*h, 6*h - 7*h + 3*w + 17 = 0 for h.\n-1\nSolve 0 = a + 4*v + 22, 0*v + 2*v = -10 for a.\n-2\nSolve 0 = -k" +"ainder when 94 is divided by 16.\n14\nCalculate the remainder when 2111 is divided by 141.\n137\nCalculate the remainder when 246 is divided by 21.\n15\nWhat is the remainder when 3061 is divided by 78?\n19\nCalculate the remainder when 104 is divided by 51.\n2\nWhat is the remainder when 195 is divided by 66?\n63\nWhat is the remainder when 756 is divided by 446?\n310\nWhat is the remainder when 484 is divided by 157?\n13\nCalculate the remainder when 833 is divided by 70.\n63\nWhat is the remainder when 35718 is divided by 94?\n92\nWhat is the remainder when 580 is divided by 198?\n184\nCalculate the remainder when 496 is divided by 5.\n1\nCalculate the remainder when 21251 is divided by 46.\n45\nCalculate the remainder when 282 is divided by 137.\n8\nWhat is the remainder when 667 is divided by 168?\n163\nWhat is the remainder when 1314 is divided by 14?\n12\nCalculate the remainder when 146 is divided by 75.\n71\nCalculate the remainder when 1006 is divided by 41.\n22\nCalculate the remainder when 313 is divided by 146.\n21\nCalculate the remainder when" +"0\nLet t = -17.99999936 - -18. What is t rounded to seven dps?\n0.0000006\nLet v = -0.3 - -0.29. Let t = v - -0.04. Let w = t + -0.0265. What is w rounded to 3 decimal places?\n0.004\nLet n = 59313.0076 - 59355. Let k = 0.5 + -42.5. Let u = n - k. What is u rounded to three decimal places?\n0.008\nSuppose -2*k = 3*c + 2 + 4, 5*c = -10. Suppose 5*q = -4*d + 165 + 54, -2*q - 4*d + 90 = k. Round q to the nearest 10.\n40\nLet i(a) be the second derivative of 0 + 13/2*a**3 + 2*a + 2*a**2. Let h be i(4). What is h rounded to the nearest 100?\n200\nLet u = -28.9 + 22. Let s = -12.6 - -2.6. Let l = s - u. Round l to 0 decimal places.\n-3\nLet u = 0.05 - -0.95. Let b = 1.23 + u. What is b rounded to 1 dp?\n2.2\nLet p = 1554671029.954768732 - 1554671033. Let f = -0.045231368 - p. Let c = f - 3. What is c rounded to seven dps?\n-0.0000001" +"e 10, what is -250 - -1?\n-249\nIn base 6, what is -1303 - -20?\n-1243\nIn base 7, what is -33 - -2033?\n2000\nIn base 12, what is 267 - 2b?\n238\nIn base 5, what is 10 - 212040?\n-212030\nIn base 10, what is -1022 + 3?\n-1019\nIn base 5, what is -13 + 30?\n12\nIn base 8, what is -757 - -1?\n-756\nIn base 12, what is -b6 + 1?\n-b5\nIn base 14, what is 30 - c?\n22\nIn base 14, what is 1 + 42b?\n42c\nIn base 14, what is ad3 + 1?\nad4\nIn base 9, what is 6 + -3?\n3\nIn base 16, what is -2ef - -2?\n-2ed\nIn base 12, what is 2 + -45?\n-43\nIn base 7, what is -5 - -2101?\n2063\nIn base 5, what is 1204 + 10?\n1214\nIn base 5, what is 10 + -10?\n0\nIn base 12, what is -2 + 42?\n40\nIn base 7, what is -2 - 13202?\n-13204\nIn base 6, what is 40 + -1?\n35\nIn base 4, what is 33 - -210?\n303\nIn base 12," +"00\nRound -0.4663 to 3 decimal places.\n-0.466\nWhat is 2076 rounded to the nearest one hundred?\n2100\nWhat is -0.17279 rounded to 2 decimal places?\n-0.17\nWhat is -1131.26 rounded to the nearest 10?\n-1130\nRound 0.000052721 to six decimal places.\n0.000053\nWhat is 0.0000019567 rounded to 6 dps?\n0.000002\nWhat is -0.2583 rounded to 1 decimal place?\n-0.3\nRound 0.041411 to 3 dps.\n0.041\nRound 9209 to the nearest 100.\n9200\nWhat is 0.00000024829 rounded to 7 decimal places?\n0.0000002\nWhat is -0.0031 rounded to 1 decimal place?\n0\nRound -3158 to the nearest one hundred.\n-3200\nRound -0.783 to one dp.\n-0.8\nWhat is -1.388 rounded to zero decimal places?\n-1\nRound 96.25 to the nearest 10.\n100\nRound 108062 to the nearest one thousand.\n108000\nWhat is -11.706 rounded to 1 dp?\n-11.7\nRound -7615 to the nearest 100.\n-7600\nRound -1924000 to the nearest 1000000.\n-2000000\nRound -15.43 to 0 decimal places.\n-15\nWhat is 25.4994 rounded to the nearest integer?\n25\nRound 0.001795 to four dps.\n0.0018\nWhat is -2532.1 rounded to the nearest 1000?\n-3000\nWhat is -395.1 rounded to the nearest 100?\n-400\nRound 47.11 to the nearest 10.\n50\nRound -0.000008033" +"et t be x(7). Solve 8*q = t*q - 10 for q.\n-5\nSuppose 3*l - 10 = -s + 1, 5*s + 5 = 5*l. Suppose m - 3*u = 0, 42*u - 24 = 3*m + 45*u. Let y be (0/(-4))/(m/s). Solve -p = -y*p for p.\n0\nSuppose 5*l + 0*l - 10 = 0. Let s(k) = k**2 + 5*k + 20. Let t be s(6). Let o = 87 - t. Solve -l = -x - o for x.\n1\nSuppose 2*d - 10 + 2 = 0. Suppose -d*l + 10 = 6. Solve -3*h - l = -7 for h.\n2\nSuppose -24 = -4*i + i. Solve 2*p - 16 = -i for p.\n4\nSuppose -1 + 3 = 2*b, 2*b - 47 = -3*v. Solve 5*a - 2*a + v = 0 for a.\n-5\nSuppose 4*k - 14 = -2*y, -5*k + 2*k + 6 = 3*y. Let i(d) = d**3 - d**2 - d + 1. Let v be i(2). Let c = y + v. Solve c = -5*g + g for g.\n0\nSuppose 0*a = -3*a + 24. Suppose 2 = a*q - 6*q. Solve" +"False\nIs 444 a factor of 53713661?\nFalse\nDoes 44 divide 245256308?\nTrue\nIs 285 a factor of 669954265?\nFalse\nIs 3152 a factor of 295014592?\nTrue\nIs 56 a factor of 18902093?\nFalse\nIs 10 a factor of 2268531670?\nTrue\nIs 4585162 a multiple of 10?\nFalse\nIs 1188 a factor of 71739756?\nTrue\nIs 433271489 a multiple of 93?\nFalse\nIs 2524188 a multiple of 38?\nTrue\nIs 260749 a multiple of 304?\nFalse\nDoes 108 divide 68509456?\nFalse\nDoes 2703 divide 783432343?\nFalse\nIs 149550987 a multiple of 1338?\nFalse\nIs 9603 a factor of 274540167?\nTrue\nIs 164745322 a multiple of 950?\nFalse\nDoes 26 divide 97706425?\nFalse\nIs 150130636 a multiple of 226?\nFalse\nDoes 91 divide 204498145?\nFalse\nIs 7142 a factor of 766428300?\nFalse\nDoes 14 divide 26487775?\nFalse\nIs 2090237916 a multiple of 1236?\nTrue\nIs 6203453 a multiple of 396?\nFalse\nIs 2347801192 a multiple of 50?\nFalse\nIs 1195 a factor of 1023725430?\nTrue\nDoes 419 divide 39338653?\nTrue\nIs 1429542672 a multiple of 76?\nTrue\nDoes 219 divide 56216660?\nFalse\nIs 133 a factor of 67573751?\nFalse\nIs 21269016 a multiple of 402?\nTrue\nDoes 37 divide 4104336?\nTrue" +"*c - 2. What is 7*o(r) - 4*s(r)?\n2*r + 1\nLet m(y) = -y + 1. Let v(t) = 15*t - 4. Give -5*m(o) - v(o).\n-10*o - 1\nLet g(k) = -482*k + 5. Let q(t) = 162675*t - 1687. Give 1687*g(w) + 5*q(w).\n241*w\nLet t(k) = 3*k + 2. Suppose 5*a - 9*a + s - 38 = 0, 5*a + 4*s = -37. Let c(h) = 5*h + 5. Calculate a*t(d) + 4*c(d).\n-7*d + 2\nLet t(n) = n. Let w(h) = 7*h - 6. Let d(y) = 1. Let m(f) = -4*d(f) - w(f). Let k = 7 + -47. Let p = k + 39. Determine p*m(s) - 6*t(s).\ns - 2\nLet r(s) = -18*s**3 - 4*s**2 + 7*s. Let t(l) = -9*l**3 - 2*l**2 + 3*l. Let n(x) = 11*x**2 - 37*x + 9. Let c be n(3). Give c*r(w) + 7*t(w).\n-9*w**3 - 2*w**2\nSuppose s + 7 = -0*s. Let x(n) = -n**3 + n**2 + 2*n. Let m(o) = 4*o - 6*o**2 - 16*o**3 + 14*o**3 + 8*o**2. Give s*x(i) + 3*m(i).\ni**3 - i**2 - 2*i\nLet q(s) = -3*s**2 - s + 3. Let p(t)" +". Let b = -0.77 + 39.77. Let x = b - w. What is x rounded to five decimal places?\n-0.00006\nLet m = 1586006.786 + -510.786. Let r = 1585505.9999936 - m. Let a = -10 + r. What is a rounded to six dps?\n-0.000006\nLet d = -43 - -345. Let s = 4219519.66 + -4219217.6599867. Let l = s - d. What is l rounded to 6 decimal places?\n0.000013\nLet l = 292311.11 - 373.11. Let j = l - 291938.799929. Let p = 0.8 + j. What is p rounded to five decimal places?\n0.00007\nLet g = 4.38 + -9.38. Let n = 28462.3 - 28467.30009. Let d = g - n. What is d rounded to 5 dps?\n0.00009\nLet j = -541.82 - -518. Let z = j - -27. Round z to 1 dp.\n3.2\nLet d be (-2)/(-8) + 248/32. Let q be (-2559998)/d + 8/(-32). Round q to the nearest one hundred thousand.\n-300000\nLet i = 29.47 + -29.51908. What is i rounded to two decimal places?\n-0.05\nLet u = -118 - 364. Let b = 485.94 + u. Let f = b + -2.67." +"9*h - 11. Let m be y(-15). Solve o + 2 = 3*o + m*p, -4*p - 16 = -4*o for o.\n3\nSuppose -4*q + 2*c - 3 = -3*c, 4*q - c = 9. Solve 4*u + 5*y - 11 = 0, -3*y - 11 = u - q*u for u.\n4\nSuppose 4*f - 4*a - 20 = 0, -4*f + 0*a = 2*a - 2. Solve 2*p = -k + 2*k - 3, -3*p - 7 = -f*k for p.\n1\nLet z(r) = -r - 2. Let t be (-15)/(-6)*8/5. Suppose 2*y + 0*y + 8 = -t*q, 0 = 5*y + 4*q + 26. Let h be z(y). Solve 3*l - 2*s - 7 = 0, 3*l + 2*s = h*l - 5 for l.\n1\nLet r(z) = 8*z**2 + z + 1. Let c be 1*(0 - -1)*-1. Let x be r(c). Solve -3*p - 2*k - 8 = -p, -p - 3*k - x = 0 for p.\n-2\nLet w(q) = q**3 - 10*q**2 + 10*q - 4. Let j be w(9). Solve 3*t + 11 = -2*d, -12 = j*t + 3 for d.\n-1\nSuppose -11 = -p" +"Solve -5*v + 3*m + 993 = -470*v, 0 = v - 5*m - 103 for v.\n-2\nSolve -924*m + 926*m + i - 17 = 1, -8*i = -13*m - 86 for m.\n2\nSolve 0 = k + g - 5, -2*g = 5*k - 116918 + 116887 for k.\n7\nSolve 0 = -q - 6, -38 = 18645*s - 18640*s + 3*q for s.\n-4\nSolve -1337*j = -11*y - 1334*j - 39, -j = y + 1 for y.\n-3\nSolve 2*c = 29*d - 143, -2*c - 4510*d + 4514*d - 13 = 5 for c.\n1\nSolve -38 = -k - 117*l + 121*l, -54*l - 60*l + 6 = -3*k - 116*l - 6 for k.\n2\nSolve -14 = 5*c - 17*z + 13*z, -23 = -7*z + 29 + 30 - 75 for c.\n-2\nSolve 3*p + 93 = -3*b, -2*b = 3*p + 2*b - 78150 + 78271 for p.\n-3\nSolve -5*x - 16 = -9*s, -2*x = s - 255123 + 255134 for x.\n-5\nSolve 179 = -3*d - 2*u, -8408*d = -8409*d - 2*u - 181 for d.\n1\nSolve 6*k = -a" +" terms in 23*h + 18*h + 1885 - 1885 - 42*h.\n-h\nCollect the terms in 153*k + 60*k + 257*k + 142*k.\n612*k\nCollect the terms in 320*j - 130*j - 116*j - 115*j.\n-41*j\nCollect the terms in 593*g**2 - 298*g**2 - 300*g**2 - 24*g**3.\n-24*g**3 - 5*g**2\nCollect the terms in -87568*k**2 - 87571*k**2 - 8*k**3 + 175139*k**2.\n-8*k**3\nCollect the terms in -14 + o - 2*o + 66 + 45.\n-o + 97\nCollect the terms in 207 - 590 - 8*d**3 + 199 + 181.\n-8*d**3 - 3\nCollect the terms in -3*b**2 + 13*b**2 - 8*b**2 - 1397 - 117.\n2*b**2 - 1514\nCollect the terms in 782*a**3 - 258*a**3 - a**2 + 7*a**2 - 263*a**3 - 259*a**3.\n2*a**3 + 6*a**2\nCollect the terms in -57576*w**3 - 46*w**2 + 46*w**2 + 57568*w**3.\n-8*w**3\nCollect the terms in -111*t**3 - 222 + 222 + 147*t**3.\n36*t**3\nCollect the terms in 12092059180*r - 12092059180*r + 6*r**2.\n6*r**2\nCollect the terms in -57*m - 49*m - 58*m + 166*m.\n2*m\nCollect the terms in 10*c**2 - 11*c + 23*c + 9*c**2 - 16*c**2.\n3*c**2 + 12*c\nCollect the terms in -9*t**2 - 9*t**2 - 16*t**2 -" +"k - 8*k = 12. Suppose -2*o + k = -10. List the prime factors of o.\n2\nSuppose -12*v - 26 - 82 = 0. Let j be (-1)/(-2)*0*(-3)/v. Suppose j = b + 8*b - 1197. What are the prime factors of b?\n7, 19\nLet n(b) = 527*b**2 + 27*b + 44. List the prime factors of n(5).\n2, 11, 607\nLet d(t) = 20*t**2 + 432*t - 15. What are the prime factors of d(16)?\n61, 197\nList the prime factors of -3 - (-10 - -10) - (-2 + -60370).\n3, 20123\nSuppose -90 = 10*h - 10. What are the prime factors of 150/h*(-56)/14?\n3, 5\nLet r(v) = 60*v**2 + 171*v - 6994. List the prime factors of r(35).\n71, 1021\nLet s(q) be the first derivative of 29*q**2 - 30*q - 24. Let b be s(6). Suppose -b = -6*d + 192. List the prime factors of d.\n5, 17\nLet w = 25 + -17. Let y = w + -33. Let h = y - -51. What are the prime factors of h?\n2, 13\nSuppose -6*c - 21 = -27. What are the prime factors of 29 - (c" +"22659 = 89907. Suppose 26188 = -s - i. Round s to the nearest one hundred thousand.\n0\nLet j = 476 - -37. Suppose 3*i + 99 = -j. Round i to the nearest 100.\n-200\nLet k = 2170.8102 - 2171. Let a = k - -0.201. Round a to 3 dps.\n0.011\nLet w = -21432.9975324 - -21433. Round w to 4 decimal places.\n0.0025\nLet l = -36 - -46. Suppose -124*r = -126*r + l. Suppose -4*w = -4*d - 3822 + 30, r*d + 4760 = -5*w. Round d to the nearest 100.\n-1000\nSuppose -5*f = w + 780234603, -5*f - 7*w - 780234595 = -2*w. Let s = f + 106946921. What is s rounded to the nearest one million?\n-49000000\nLet t = 3531.34 - 3518.640145. Let u = t + -12.7. Round u to 5 dps.\n-0.00015\nSuppose 10 = -5*s, 2*s = -7*m + 4*m + 65. Suppose -8*a + 63 = m. Suppose 0 = -a*x + 2*x - 1050000. Round x to the nearest 100000.\n-400000\nLet d = 103135.994662 + -103027.995. Let i = -758 - -866. Let r = i - d. What is r" +" by 504?\n502\nCalculate the remainder when 261 is divided by 24.\n21\nCalculate the remainder when 1198 is divided by 396.\n10\nWhat is the remainder when 13896 is divided by 532?\n64\nCalculate the remainder when 11259 is divided by 3735.\n54\nWhat is the remainder when 1296 is divided by 683?\n613\nCalculate the remainder when 724 is divided by 181.\n0\nWhat is the remainder when 7057 is divided by 93?\n82\nCalculate the remainder when 47084 is divided by 239.\n1\nCalculate the remainder when 6818 is divided by 757.\n5\nWhat is the remainder when 14185 is divided by 591?\n1\nWhat is the remainder when 4317 is divided by 3900?\n417\nWhat is the remainder when 921571 is divided by 282?\n277\nCalculate the remainder when 26795 is divided by 176.\n43\nWhat is the remainder when 107939 is divided by 15?\n14\nWhat is the remainder when 2962259 is divided by 1633?\n1630\nCalculate the remainder when 85997 is divided by 200.\n197\nCalculate the remainder when 8020 is divided by 573.\n571\nCalculate the remainder when 1548893 is divided by 77444.\n13\nWhat is the remainder when 25209 is divided by" +"t b = 12 + p. What is b rounded to three decimal places?\n-0.01\nLet l(x) be the third derivative of -1375*x**4/3 + 2*x**2. Suppose 16 = 4*a + 8. Let q be l(a). What is q rounded to the nearest 10000?\n-20000\nLet d = 910.000231 + -910. Round d to four dps.\n0.0002\nLet j = -2521 + 2075.7. Let f = j + 464. Round f to the nearest integer.\n19\nLet z = -1497 + 1497.00261. What is z rounded to 3 dps?\n0.003\nLet q = 82.48 + -82. Let s = q - 0.47999853. What is s rounded to 7 dps?\n0.0000015\nLet p = -110 + 159. Let l = 432745 - 432695.9942. Let h = l - p. Round h to three decimal places.\n0.006\nLet r = 19.7 + -22.687. Let p = 3.06 + -0.06. Let s = r + p. Round s to three decimal places.\n0.013\nSuppose 10*x = 7*x + 33. Suppose i = 4*j - 0*i + 14, 0 = -3*j + i - x. Let u be (j + 6)*2/(-6). What is u rounded to the nearest ten?\n0\nLet w = -21 -" +"tors of 9042690.\n2, 3, 5, 301423\nWhat are the prime factors of 95017654?\n2, 2063, 23029\nList the prime factors of 119289524.\n2, 19, 1569599\nList the prime factors of 140032879.\n7, 1609, 12433\nWhat are the prime factors of 463113307?\n149, 191, 16273\nList the prime factors of 312589016.\n2, 43, 743, 1223\nList the prime factors of 2724981360.\n2, 3, 5, 41, 276929\nList the prime factors of 178289005.\n5, 35657801\nWhat are the prime factors of 464473104?\n2, 3, 1289, 7507\nWhat are the prime factors of 873527189?\n23, 4679, 8117\nWhat are the prime factors of 254874531?\n3, 19, 61, 73303\nWhat are the prime factors of 286211939?\n13, 41, 61, 8803\nWhat are the prime factors of 129302375?\n5, 1034419\nWhat are the prime factors of 3137320507?\n151, 20776957\nList the prime factors of 73748084.\n2, 18437021\nWhat are the prime factors of 48145437?\n3, 47, 113819\nWhat are the prime factors of 59868692?\n2, 13, 41, 28081\nWhat are the prime factors of 3273836274?\n2, 3, 29, 1399, 4483\nList the prime factors of 782182173.\n3, 31, 641, 13121\nList the prime factors of 1225890810.\n2, 3, 5, 13621009\nList the prime factors" +"- 678*q + 37324 for q.\n86\nSolve -2132*k + 1372 = -1111*k - 1070*k for k.\n-28\nSolve 0 = 5193*j - 78319 + 727444 for j.\n-125\nSolve -74*l + 2106 - 2769 = 134*l + 8073 for l.\n-42\nSolve 353*u = -355*u + 696*u + 120 for u.\n10\nSolve 264*z - 48455 = -2526*z - 18776 + 134931 for z.\n59\nSolve -871*b = -1743*b + 881*b - 12 + 264 for b.\n-28\nSolve 922829*x = 923950*x + 110979 for x.\n-99\nSolve 19871*u - 1097395 = 218956 + 432297 for u.\n88\nSolve 51708 + 2592 = 2715*a for a.\n20\nSolve -19332 = -5609*g + 6683*g for g.\n-18\nSolve 1233*v + 1430 = 1275*v - 796 for v.\n53\nSolve -247*d + 1504 + 2942 = 0 for d.\n18\nSolve -71*i = -140*i - 197*i + 9516 + 2720 for i.\n46\nSolve 0 = -2678574*j + 2678579*j + 210 for j.\n-42\nSolve -545262 = 3629*h + 5362*h - 263*h + 838*h for h.\n-57\nSolve 4287 - 38926 = -517*v for v.\n67\nSolve 37144 + 94568 = -3430*z - 1174*z + 488*z for z.\n-32\nSolve -2652*z" +"e? (a) -3 (b) -0.12 (c) y (d) -10\na\nSuppose -2*z = 2*z. Let l = -29.9 + 31.9. Let c = 0.37 + -0.4. What is the second smallest value in c, z, l?\nz\nLet m = -38591/19 + 2031. What is the second smallest value in m, 210, 0.3?\n0.3\nLet f = 18931 + -18936. Which is the smallest value? (a) 47/11 (b) -1 (c) -2 (d) f\nd\nLet x = 703 + -707.836. Let k = -0.036 - x. Let f = k + -5.1. Which is the third smallest value? (a) f (b) 0.3 (c) -1\nb\nLet n = 27.00636 - 0.03636. Let v = -28 + n. Let y = 1.23 + v. What is the biggest value in 0.3, y, 2/77?\n0.3\nLet x(g) = g**2 + 23*g + 123. Let t be x(-14). What is the second smallest value in t, -4, -101?\n-4\nLet h be (156/(-18) - -9) + 3/(-36)*-4. Which is the smallest value? (a) 2/5 (b) 0.37 (c) h (d) 13\nb\nLet r be (-5)/(-6) - 6/9. Let d = -68 + 156. Let n = -351/4 + d. Which is the third" +" k - 93, 55 + 56 = -3*o - 5*k. Let x(t) = -5*t + 6. Is 16 a factor of x(o)?\nFalse\nSuppose 4*q - 3*q - 90 = 5*r, -90 = 5*r + 3*q. Let g be 22/5 + r/45. Suppose 185 = g*h - 15. Does 25 divide h?\nTrue\nLet b(u) = 244*u**2 + 20*u + 74. Is 10 a factor of b(-3)?\nTrue\nSuppose 9*v - 13*v = 12*v - 103584. Is v a multiple of 78?\nTrue\nLet i(l) = -l**3 + 22*l**2 + 82*l - 30. Let z be ((-6)/(-6))/(7/175). Is 29 a factor of i(z)?\nTrue\nLet x = -7547 - -10679. Is x a multiple of 27?\nTrue\nLet f be 36/180 + 20074/5. Suppose 4*o - 5*k - f = 0, -1999 = -5*o - 4*k + 3030. Does 8 divide o?\nFalse\nLet m(k) be the first derivative of -k**3/3 - 3*k**2/2 + 8*k - 9. Let g be m(0). Suppose 2*x = g*x - 450. Does 11 divide x?\nFalse\nSuppose 2*l - 7565 = -8*d + 7*d, 4*l - 15100 = 4*d. Is 105 a factor of l?\nTrue\nSuppose -511903 = -87*o + 452666. Does 246" +" - k - 102 = 0. What are the prime factors of y?\n2, 3, 11\nSuppose -888 = 114*i - 117*i. What are the prime factors of i?\n2, 37\nSuppose 7*n - 576 = 124. Suppose -3*z + v + 41 = -27, 5*z + 5*v = n. List the prime factors of z.\n2, 11\nLet d = 250 + -117. Suppose -3*x = -56 - d. List the prime factors of x.\n3, 7\nLet r = -1102 + 1816. List the prime factors of r.\n2, 3, 7, 17\nWhat are the prime factors of 3 + 0 + (-5 - (-1681 + 1))?\n2, 839\nLet g = -107 - -183. Suppose -3*o + 4*z = -1, 1 = -4*o + o + 5*z. Suppose -o*f = f - g. What are the prime factors of f?\n19\nSuppose -2*q = -4*h + 22, -7*h + 3*q = -8*h - 12. List the prime factors of h.\n3\nLet q(r) = -r**3 - 2*r**2 + 3*r + 4. Let b be q(-3). Suppose -111 - 333 = -b*i. What are the prime factors of i?\n3, 37\nSuppose 3*q - q = 0. Suppose" +" 0 for t.\n6\nSolve -c = -3*c - 2*l + 66, 30*l + 14*l = 11*c - 16*c - 30 for c.\n38\nSolve -5*x + 3*g - 19 = 21, -4*g + 48393 = -5*x + 48348 for x.\n-5\nSolve -29 = 9*k + 6*h + 163, 186*h - 71*h + 56 = 5*k + 123*h + 186 for k.\n-18\nSolve -7*z - 44 = i, i - 801169*z + 801173*z + 29 = 0 for i.\n-9\nSolve -3*u - 4*d = -4*u + 33, -13*d - 130 = -83*u + 78*u for u.\n13\nSolve -2*f - 3*h = 15, 4*f - 6 = -594*h + 599*h - 47 for f.\n-9\nSolve -5*n = 2*x - 9, 2*x = 32*n - 119720 + 119692 for x.\n2\nSolve -46*s - z + 189 = 0, -187*s + 9*z = -186*s + 14*z - 29 for s.\n4\nSolve 2*b + 9*r + 278 = 9*r + 6*r, 0 = -18*r + 864 for b.\n5\nSolve -5*q - 4*j + 1186 - 1166 = 0, 3*q - 57*j + 62*j + 1 = 0 for q.\n8\nSolve v - 50 = 8*f" +" = -r + 4, 0 = -j + 2*r + 9 for j.\n5\nSolve 0 = -b + 3*h - 10, b - 51*h = -56*h + 14 for b.\n-1\nSolve 5*o - 5 = -3*j + 7, -20 = 3*o - 5*j for o.\n0\nSolve -3*p - 4*k + 3 = 0, 14*k = -5*p + 12*k - 9 for p.\n-3\nSolve -7*r - t = -9*r - 2, 0 = -2*t + 8 for r.\n1\nSolve 0*h - h + 2*a = -7, 0 = -4*h + 2*a + 22 for h.\n5\nSolve 0*m - 15 = 4*m + i, 4*m - 3*i = -35 for m.\n-5\nSolve z + o - 35 = 5*o, 0 = 4*z - 5*o - 52 for z.\n3\nSolve -3*c + 10 = 2*t, -20*c + 25*c - 4*t - 24 = 0 for c.\n4\nSolve 5*a = -5*s, -3*s + 3*a = 8*a + 4 for s.\n2\nSolve 0 = 252*a - 255*a + 4*r - 34, -5*a - 34 = -r for a.\n-6\nSolve -2*s + 2 = 0, 0 = 3*a - 5*s - 7 + 6 for" +"-4*r + 4*h for r.\n-2\nSuppose 13*y - 11*y = 10. Solve -2*z = -z - 5*r - 20, 0 = -z - y*r - 20 for z.\n0\nSuppose 2*t - 31 = 3*v, t - 4*v = 5*t - 12. Suppose 2*r = t, 3*o + 4*r - 6 = 19. Solve y + n - 7 = -3*y, -o*y - 5*n = 16 for y.\n3\nSuppose 48 = 19*l - 15*l. Suppose 0 - 5 = -5*p. Let o be ((-4)/10)/(p/(-15)). Solve -2*t = 2*s + 4, -2*s + o*s = -l for t.\n1\nSuppose 8 = o + o. Let s be 18/2*(-2 + o). Let q(j) = j**3 + 4*j**2 + 2*j - 1. Let g be q(-3). Solve -4*b = -2*v + s, 0*v + g*b = 3*v - 7 for v.\n-1\nSuppose c = 5*d - 3 + 26, 5*c - 3*d - 27 = 0. Solve -4*i = -c*v - 26, 2*v = v - 5*i + 23 for v.\n-2\nLet b(u) = -112*u + 63. Let i(l) = 7*l - 4. Let t(y) = -4*b(y) - 63*i(y). Let z be t(1). Solve -4*m + 3*f -" +"ate the highest common divisor of c and a.\n26\nSuppose 12*g = 7*g + 25. Suppose -3*n - 434 = -g*n. Calculate the greatest common factor of n and 7.\n7\nLet z(x) = -3*x**3 + 114*x**2 + 1. Let j be z(38). Suppose o = -2*o + 183. Calculate the highest common factor of j and o.\n1\nSuppose -162*y = 16*y - 3916. Calculate the greatest common divisor of y and 99.\n11\nLet p be 15/(-5) + 18/(-3)*-1. Suppose -153 = -4*h + p*s, 0 = -6*h + 3*h - 4*s + 146. Calculate the greatest common factor of h and 28.\n14\nSuppose -4*o - 26 = -266. Suppose 4*y - 12 = -4, -4*y - 92 = -k. Calculate the highest common factor of o and k.\n20\nLet m(z) = -125*z + 3780. Let n be m(-18). What is the greatest common factor of 54 and n?\n18\nLet q(o) = 7*o**2 + 20*o + 6942. Let r be q(0). What is the highest common divisor of r and 156?\n78\nLet a = 716 + -712. Let z(b) = 1. Let g(k) = -9*k + 13. Let t(r) = -g(r) + 5*z(r)." +"\nLet l = -45 + 173. Let f = l + -61. Is f prime?\nTrue\nSuppose r + 834 = 3*r - z, 3*r = -z + 1261. Is r composite?\nFalse\nSuppose -9*p + 268 = -5*p. Is p composite?\nFalse\nLet y be -2 + (2 - 3 - -2). Let j = y - -4. Is 17 + (-3 - 2) + j a composite number?\nTrue\nSuppose 1285 = 3*l + 2*c, -3*l + l + 864 = 5*c. Is l a prime number?\nFalse\nLet l(c) = -c**3 + 15*c + 19. Is l(-10) a composite number?\nTrue\nLet i = -23 + 126. Suppose i = v + 9. Let q = 33 + v. Is q a prime number?\nTrue\nIs 7 + -4 - -3 - -17461 a composite number?\nFalse\nLet s = -243 + 112. Let k = s - -276. Is k prime?\nFalse\nSuppose 7*p + 5*u + 1988 = 8*p, 4*p + 3*u - 7883 = 0. Is p prime?\nTrue\nLet m(z) = 62*z**2 + 8*z + 5. Is m(3) a composite number?\nFalse\nLet w(a) = 2*a**3 - a**2 - 1. Is w(2) a" +"-38 at least as big as l?\nTrue\nLet g = -18.9 + 12.9. Is g smaller than -32?\nFalse\nLet v(k) = -k**3 - k**2 - 4*k + 8. Let d be v(-4). Let g = 66 - d. Is g <= -3?\nTrue\nLet s = 1566 + -1577.19. Let z = s - -1.19. Which is greater: -1/5 or z?\n-1/5\nLet k be (-11)/7*(-12 + 5). Suppose -3*l + 4 = -2*l. Suppose -20 = l*p, -3*w - 3*p - 6 = -2*w. Which is greater: w or k?\nk\nLet c = 12 - 9. Let v(t) = 7 - 2 - 3 + 4*t + 2*t**2 - c*t**2. Let g be v(4). Does g = 3/5?\nFalse\nLet t = -0.1 + 3.1. Let m = t - -14. Which is bigger: 0.1 or m?\nm\nLet f be ((-88)/(-28) + -6)/((-44)/14). Is f equal to 0?\nFalse\nLet c = 7 + -15. Let b be (-1830)/c*7/35. Let v = b + -46. Which is smaller: 1 or v?\nv\nLet g = 44 - 25. Which is smaller: 23 or g?\ng\nLet d = -41524/23 + 1805. Which is smaller: d" +"order.\nu, 0.5, v\nSuppose 3*o + 100 = 2*p, -2*o - 52 = -p + 15. Let j = -65 - -78. Let q(w) = 2*w - 24. Let a be q(j). Sort 5, -1, o, a in ascending order.\no, -1, a, 5\nLet j be 1/(-2*4/24). Suppose w + 11 = 28. Let x = w + -22. Put x, 3, j, 1 in ascending order.\nx, j, 1, 3\nLet c = 37.08 - 40. Let a = c - 0.08. Let y be (-10)/18 + 2/6. Sort y, a, 4 in decreasing order.\n4, y, a\nLet q = 152/75 + -92/75. Sort 2/5, q, -2, 11 in increasing order.\n-2, 2/5, q, 11\nLet w be (-32 - (4 + -20)) + (0 - -1) + 6. Sort 3, 54, w in descending order.\n54, 3, w\nLet b(t) = t**2 + 11. Let v be b(-4). Suppose -3*h + v = 4*i, 0 = 2*h - i - 14 - 4. Let r be 3 - -1 - ((2 - 2) + h). Put 5, 2, r, 3 in ascending order.\nr, 2, 3, 5\nSuppose 0 = -2*v + 3*u - 17," +"40 - -1?\n-43094183a\nIn base 15, what is 1e85a7 - 48?\n1e855e\nIn base 9, what is -11371052 + 48?\n-11371003\nIn base 14, what is 18a48 + -1d6?\n18852\nIn base 15, what is 6b - -1841d?\n18489\nIn base 2, what is 110010 - 110110010111100000000101?\n-110110010111011111010011\nIn base 10, what is 434761 - 1?\n434760\nIn base 12, what is 154 + 2767a5?\n276939\nIn base 16, what is 11 - -45d58c?\n45d59d\nIn base 10, what is -76 + -66859?\n-66935\nIn base 13, what is -12c - ba474?\n-ba5a3\nIn base 15, what is -19dcb271 - 3?\n-19dcb274\nIn base 13, what is 2920c80 - -81?\n2921031\nIn base 2, what is -1100011110000 - 110011110111?\n-10010111100111\nIn base 12, what is 367161033 - 3?\n367161030\nIn base 13, what is -70 - -25a79?\n25a09\nIn base 10, what is 961752 - -7?\n961759\nIn base 2, what is 10000100010111101110010110 - 100?\n10000100010111101110010010\nIn base 13, what is -7 + 488301?\n4882c7\nIn base 14, what is -110 - 1a9968?\n-1a9a78\nIn base 12, what is -3 - -87a63a?\n87a637\nIn base 16, what is -37be0 + -88a?\n-3846a\nIn base 10, what is -1250 -" +"by 28.\n0\nWhat is 867 divided by 289?\n3\nCalculate -140 divided by 11.\n-140/11\nCalculate 14075 divided by 5.\n2815\nWhat is 13 divided by -34?\n-13/34\nDivide -70 by -7.\n10\n-16266 divided by -6\n2711\nWhat is 1680 divided by 420?\n4\n-400 divided by 100\n-4\n4928 divided by -704\n-7\nWhat is -397 divided by -11?\n397/11\nDivide 35 by -2.\n-35/2\nCalculate -104 divided by -4.\n26\nDivide 1 by 1.\n1\nCalculate -3 divided by -37.\n3/37\n26 divided by 1\n26\n3 divided by 316\n3/316\nCalculate -690 divided by 5.\n-138\nWhat is -102 divided by -3?\n34\nCalculate -3 divided by -269.\n3/269\nCalculate -23 divided by -186.\n23/186\nWhat is 3 divided by 2353?\n3/2353\nWhat is -5308 divided by 1327?\n-4\nCalculate -6870 divided by -6.\n1145\nCalculate -2 divided by 1176.\n-1/588\nDivide -15552 by -18.\n864\n4345 divided by -11\n-395\nWhat is -576 divided by 6?\n-96\nDivide 3304 by 2.\n1652\n-9820 divided by -2\n4910\n-127 divided by 13\n-127/13\nCalculate -2 divided by 3278.\n-1/1639\nWhat is -54 divided by -25?\n54/25\nCalculate 0 divided by 79.\n0\n460 divided by" +"and 102?\n204\nWhat is the least common multiple of 6 and 389?\n2334\nCalculate the common denominator of 79/2 and 119/100.\n100\nCalculate the least common multiple of 156 and 4.\n156\nCalculate the common denominator of 149/4860 and 101/900.\n24300\nFind the common denominator of 143/6 and -23/36.\n36\nWhat is the lowest common multiple of 162 and 45?\n810\nCalculate the least common multiple of 3 and 320.\n960\nCalculate the common denominator of 37/5394 and -10/39.\n70122\nWhat is the least common multiple of 20 and 618?\n6180\nCalculate the common denominator of 83/102 and 13/204.\n204\nWhat is the smallest common multiple of 24 and 57?\n456\nFind the common denominator of -47/10 and -20/14229.\n142290\nWhat is the lowest common multiple of 4536 and 3024?\n9072\nWhat is the lowest common multiple of 5 and 7715?\n7715\nCalculate the common denominator of 63/92 and 121/80.\n1840\nCalculate the smallest common multiple of 70 and 7.\n70\nWhat is the common denominator of -63/100 and -73/1100?\n1100\nWhat is the common denominator of 77/144 and -23/6?\n144\nCalculate the least common multiple of 2610 and 261.\n2610\nCalculate the least common multiple of 1 and" +"e nearest integer?\n209\nWhat is the third root of 1563855 to the nearest integer?\n116\nWhat is the fourth root of 553970 to the nearest integer?\n27\nWhat is the square root of 2784965 to the nearest integer?\n1669\nWhat is the cube root of 714290 to the nearest integer?\n89\nWhat is the fourth root of 22269323 to the nearest integer?\n69\nWhat is 92058 to the power of 1/5, to the nearest integer?\n10\nWhat is 375432 to the power of 1/3, to the nearest integer?\n72\nWhat is the cube root of 967163 to the nearest integer?\n99\nWhat is 132711 to the power of 1/2, to the nearest integer?\n364\nWhat is the cube root of 359980 to the nearest integer?\n71\nWhat is the cube root of 14918994 to the nearest integer?\n246\nWhat is 5401866 to the power of 1/4, to the nearest integer?\n48\nWhat is the third root of 186646 to the nearest integer?\n57\nWhat is the cube root of 1731920 to the nearest integer?\n120\nWhat is 1147924 to the power of 1/2, to the nearest integer?\n1071\nWhat is the third root of 617759 to the nearest integer?" +"minator of 89/1155640 and 83/400?\n11556400\nFind the common denominator of 33/8752 and 1/8.\n8752\nCalculate the common denominator of -53/598 and -9/43888.\n1009424\nFind the common denominator of 103/9900 and 119/2250.\n49500\nCalculate the common denominator of -19/1560 and 103/55640.\n166920\nFind the common denominator of -2/2499 and -89/69972.\n69972\nCalculate the smallest common multiple of 1197 and 91485.\n640395\nCalculate the smallest common multiple of 10 and 7161408.\n35807040\nCalculate the least common multiple of 7182 and 25032.\n4280472\nWhat is the common denominator of 49/39770 and 69/4100?\n397700\nFind the common denominator of 193/660 and -91/165.\n660\nCalculate the least common multiple of 1044 and 162.\n9396\nWhat is the common denominator of -199/19530 and -37/396?\n429660\nWhat is the lowest common multiple of 24 and 912?\n912\nWhat is the smallest common multiple of 4131 and 1800?\n826200\nCalculate the lowest common multiple of 129690 and 115280.\n1037520\nCalculate the smallest common multiple of 88491 and 1326.\n3008694\nWhat is the common denominator of 103/7128 and -43/704?\n57024\nCalculate the smallest common multiple of 336 and 888.\n12432\nWhat is the common denominator of 65/16 and 35/335256?\n670512\nWhat is the least common multiple of 9678" +"?\nFalse\nLet b be (-106)/10 - 10/25. Let i be (-2)/(-11) + (-75)/b. Is 12 a factor of (26/7 + -2)*i?\nTrue\nLet p = 100 + -45. Does 35 divide p?\nFalse\nSuppose -12*q + 11*q = -2. Suppose g - 67 = -3*z, -3*g - q*g + z = -255. Is 13 a factor of g?\nTrue\nLet c = 40 - 21. Let k = c + -14. Is k a multiple of 3?\nFalse\nLet g = 20 - -12. Let j be 2/(-8) - (-205)/4. Let r = j - g. Is r a multiple of 16?\nFalse\nLet k(t) = -t + 7. Let o be k(3). Let l(x) = -3*x - o*x + 2*x + 1. Does 13 divide l(-5)?\nTrue\nLet v = 12 - -4. Is v/6*54/8 a multiple of 9?\nTrue\nLet a(d) = -d**3 + 13*d**2 - 8*d + 2. Is a(12) a multiple of 10?\nTrue\nLet o = -133 + 284. Is o a multiple of 13?\nFalse\nLet t(b) = b**3 + 5*b**2 + 2. Let x be t(-5). Let q = x - -2. Suppose 2*i + 45 = 3*s, -3*i = -q*s -" +"Which is the smallest value? (a) -7540/3 (b) 2 (c) 4/3 (d) -3\na\nWhat is the second biggest value in 1/5, 0.5, 6, 0.014693?\n0.5\nWhich is the biggest value? (a) -793 (b) 1 (c) -18754\nb\nWhat is the fourth smallest value in 6, -15014, 0.7, 2?\n6\nWhat is the second biggest value in -1/5, -429183, -14?\n-14\nWhat is the second smallest value in 81031.73, -0.5, 2/9, 3/7, -3?\n-0.5\nWhat is the second smallest value in 6, -3, 0.6671, 12, -5?\n-3\nWhat is the second biggest value in -2/17, -7, 3/782, -5, 1?\n3/782\nWhich is the third biggest value? (a) 58494 (b) 2/5 (c) 0.41 (d) -3/2\nb\nWhat is the fifth smallest value in 0, 5, -1/2, -5, -393, 0.2, -17/3?\n0\nWhich is the biggest value? (a) 2/27 (b) -0.086 (c) -1 (d) -6 (e) 21 (f) -1/8 (g) 3\ne\nWhich is the fifth biggest value? (a) -2 (b) 3 (c) 28 (d) -0.5 (e) -4 (f) 441/2\na\nWhich is the fourth smallest value? (a) -87/5 (b) -4 (c) -2 (d) 17574 (e) 0.3 (f) -0.2\nf\nWhat is the fourth biggest value in 4/3, -291, -0.2, -24920?\n-24920" +" 5, x = 4*a - 15 for a.\n5\nSuppose 0 = 5*s - 5*h - 40, -5*h - 9 = 3*s + 7. Solve -i - 1 = -s*m - 2, 5*m = -2*i - 20 for i.\n-5\nLet i = -2 + 4. Suppose -4*k = 2*j - 20, -i*k - 4*j + 11 = -11. Solve -k*v = -3*r - 6, 0*v + v = 2*r + 6 for r.\n-4\nLet z(c) = -4*c**2 + 25*c + 17. Let u(f) = -f**2 + 6*f + 4. Let p(t) = 9*u(t) - 2*z(t). Let r be p(4). Solve d + 6 = -0*y + y, y - 11 = r*d for d.\n-5\nLet r be (-4)/(-10) - 69/(-15). Suppose -4*l + 38 = -0*q + r*q, -3*q = 3*l - 27. Solve 3*u - 6*u - v - 3 = 0, -v = 5*u + l for u.\n-2\nLet h = 24 - 24. Let a = -4 + 6. Solve -3*b = -5*i + 12, 5*i - a*b = -h*b + 13 for i.\n3\nLet j be 3 - (2 + (-10)/5). Solve 2*h = -o + 11, 0 = -j*o -" +"Solve -n = -4*z + r, 6 = -2*n + 4*z - 10 for n.\n0\nSuppose -2*c = -p - 4, -5*c + 4*p + 10 = 2*p. Let o be (-47)/(-4) + ((-132)/(-16))/(-11). Suppose -3*t = c - o. Solve -7 + 2 = t*h + f, -5*h - 7 = 3*f for h.\n-2\nLet n be 24/14*(-7)/(-2) + -3. Let j(l) = -l + 2. Let k(v) = -v + 10. Let f be k(9). Let a be j(f). Solve 0 = -b + n*y - 6, 3*y - 2 = a for b.\n-3\nLet y = 3 + 0. Suppose -20 = -y*m - 2*m. Solve s = -2*q + 13, 5*q + m*s = q + 32 for q.\n5\nLet n be (-4)/(-16) - (-14)/8. Let w be 26/8 + (-3)/12. Solve i = -2, -n*s - s + w*i = 3 for s.\n-3\nLet n(g) = 2*g**2 + 4*g + 12. Let q be n(-3). Solve 4*x + 14 = 4*o + 5*x, -4*o + x + q = 0 for o.\n4\nLet n be 14/4 - 7/(-14). Solve -n*j - 8 = -k + 3*k, 0 = 4*j" +"e -4*g + 2*g = -2. Let s be ((-6)/(-4) - g)*38. Suppose 0 = -4*h + 5*n - s, 5*n - 18 = 6*h - 3*h. Is 1/5 at least h?\nTrue\nLet x = -3 + 24. Let z be x/10 + (2 - 4). Let k = 17 - 16. Which is bigger: z or k?\nk\nLet a(v) = -v**3 + 14*v**2 - 15*v + 13. Let b be a(13). Is -11 at most as big as b?\nFalse\nLet t = 1919/15 - 128. Let j(f) = f - 5. Let x be j(5). Which is bigger: x or t?\nx\nLet k = 0.7 - 0.57. Is k equal to 1?\nFalse\nLet s = 0.05 - 0.05. Which is greater: -1/4 or s?\ns\nSuppose -2*v + 12 = 7*h - 3*h, 0 = -2*h. Are v and 6 non-equal?\nFalse\nSuppose 0 = -j + 2*u + 137, 2*j = j - 3*u + 162. Let o be j/30*(-5)/(-6). Let v = -13/3 + o. Which is bigger: -1 or v?\nv\nSuppose 2*x - 49 = -5*g + 4*x, -5*g = 5*x - 35. Let t be (6/9)/(2/g). Suppose -2*y =" +"at is the remainder when 3194 is divided by 17?\n15\nWhat is the remainder when 207 is divided by 53?\n48\nWhat is the remainder when 268 is divided by 56?\n44\nCalculate the remainder when 380 is divided by 77.\n72\nWhat is the remainder when 151 is divided by 2?\n1\nCalculate the remainder when 692 is divided by 73.\n35\nWhat is the remainder when 971 is divided by 61?\n56\nCalculate the remainder when 887 is divided by 96.\n23\nWhat is the remainder when 541 is divided by 77?\n2\nCalculate the remainder when 11450 is divided by 11.\n10\nCalculate the remainder when 61 is divided by 13.\n9\nWhat is the remainder when 5919 is divided by 80?\n79\nCalculate the remainder when 123 is divided by 45.\n33\nCalculate the remainder when 638 is divided by 32.\n30\nCalculate the remainder when 61 is divided by 31.\n30\nWhat is the remainder when 180 is divided by 37?\n32\nCalculate the remainder when 976 is divided by 237.\n28\nCalculate the remainder when 194 is divided by 10.\n4\nCalculate the remainder when 335 is divided by 8.\n7\nWhat is" +"7\nSuppose 5*b + 2*l - 910 - 805 = 0, -4*b + 1385 = -l. Let z = b - -123. List the prime factors of z.\n2, 3, 13\nLet l(y) = -15*y - 72. Let i be l(-5). Suppose 4*g + i*a - 616 = -a, -2*a = -2*g + 300. What are the prime factors of g?\n2, 19\nSuppose 4*s - 18*s = 2688. Let q = -2 - s. What are the prime factors of q?\n2, 5, 19\nSuppose -o = -3*q - 14, 0 = 5*o + 3*q - q - 19. Suppose 80 = 1145*m - 1150*m. What are the prime factors of 598/o - m/40?\n2, 3, 5\nSuppose 16 = c - 3*y - 2, -2*c - 4*y - 14 = 0. Let j be (-14)/21 - 7/c. List the prime factors of j/2 + 1 + (-1316)/(-8).\n2, 41\nLet z = 8350 - -2106. List the prime factors of z.\n2, 1307\nLet u(k) = -72*k + 29*k + 39 + 35 + 120*k. What are the prime factors of u(13)?\n5, 43\nSuppose -12*u - 5 = -7*u, -2*f - 1968 = 2*u. Let s =" +"15*l**2 + 6*l + 7. Let u(r) = -25*r**3 + 49*r**2 + 20*r + 22. Let v(j) = -7*d(j) + 2*u(j). Give v(q).\n9\nLet v(y) = -7*y + 9*y + 1 - y. Let u be (72/16 + -6)/(6/(-16)). Suppose 5*t - 4*x = -31, -x = u*t - 5*t - 7. Calculate v(t).\n-2\nLet v = 4 + -7. Let n = 2 + v. Let k(y) = 12*y - 42. Let r(q) = 45*q - 154. Let f(b) = -22*k(b) + 6*r(b). Calculate f(n).\n-6\nLet b(p) = 7 - 6 - p**3 - 9*p + 7 + 8*p**2. Let a(t) = 2*t - 1. Let n(o) = 3*o - 98. Let f(l) = -6*a(l) + n(l). Let s be f(-11). Determine b(s).\n-6\nLet z(n) = 8 - 4911203*n - 106 + 4911213*n. Give z(8).\n-18\nLet j(h) = 42 + 58*h + 58*h - 119*h + 27 + 29. Calculate j(31).\n5\nLet j(h) = 58 + 19*h - 83 + 14 - 47 - 93. Determine j(8).\n1\nLet m(p) = -p**2 - 3*p - 7. Let d(t) = 4*t**3 + 2*t**2 - 14*t - 7. Let u be d(0). Determine m(u).\n-35" +" the greatest common divisor of 52 and 89063.\n13\nCalculate the greatest common factor of 3706 and 230426.\n218\nWhat is the greatest common factor of 4968 and 96768?\n216\nCalculate the highest common divisor of 16050 and 24610.\n1070\nWhat is the highest common factor of 3150 and 900?\n450\nCalculate the greatest common divisor of 1952 and 27816.\n488\nWhat is the greatest common factor of 12304 and 48?\n16\nCalculate the highest common divisor of 14 and 188174.\n14\nWhat is the greatest common factor of 1712 and 74365?\n107\nWhat is the highest common divisor of 26 and 1354?\n2\nCalculate the greatest common factor of 777 and 3329445.\n777\nCalculate the highest common factor of 34 and 51529.\n1\nCalculate the greatest common factor of 1592 and 404965.\n199\nWhat is the highest common factor of 1053 and 147303?\n117\nWhat is the greatest common factor of 132 and 63534?\n6\nCalculate the greatest common divisor of 4176 and 17532.\n36\nCalculate the greatest common divisor of 1350 and 825.\n75\nWhat is the greatest common divisor of 137940 and 220?\n220\nWhat is the greatest common divisor of 9532 and 4?\n4\nCalculate the" +"-4*x - 44 = 2*w + 2*w, -2*w + o*x - 15 = 0. What is w rounded to the nearest integer?\n-10\nLet n = -409 + 573.2. Let f = n - 150.99. Round f to the nearest integer.\n13\nLet o = -15.05 + 18.2. Let s = 2.773 - o. Round s to one dp.\n-0.4\nLet o(c) = 188750*c**2 - 137*c - 548. Let w be o(-4). Round w to the nearest ten thousand.\n3020000\nLet g = 115833 - 115958.117. Let c = g - -0.117. Let r = -124.99999992 - c. What is r rounded to seven decimal places?\n0.0000001\nLet m = 8.032 + -8.0335608. Round m to four decimal places.\n-0.0016\nLet c(l) = 9327*l + 190. Suppose 4*y + 400 - 520 = 0. Let u be c(y). What is u rounded to the nearest one hundred thousand?\n300000\nLet s(p) = -25*p**2 - 30*p - 368. Let k be s(29). What is k rounded to the nearest 1000?\n-22000\nLet f be (-24)/(-8) + -3 - (-20896)/2. Let k = -5488 + f. Round k to the nearest 100.\n5000\nLet y = -47166 - -31860. What is y" +"e 9*z - 13*z = -4. Calculate the lowest common multiple of (b/6)/(1/2) and z.\n5\nSuppose 2*l = 9 - 5. Let i = 12 + l. Calculate the smallest common multiple of i and 16.\n112\nSuppose -4*y + 344 = -2*v - 2*v, v = 0. Calculate the common denominator of y/(-4) + (-1 - 1) and 8225/(-4410) - (-4)/18.\n14\nLet a = 16 + -11. Suppose 4*l = -n - n - 10, 0 = a*l + 3*n + 11. What is the smallest common multiple of 2 + l - (-22 - -4) and 16?\n16\nLet r = -60 + 78. Let n(a) = 3*a + 4. Let m be (6/2)/(3/4). What is the smallest common multiple of n(m) and r?\n144\nLet w = 169 - 160. Let i = -3 - -23. Suppose 2*m + 9 = 2*b + 35, -4*b = 4*m - i. What is the least common multiple of w and m?\n9\nWhat is the smallest common multiple of 3 - (1 - -3) - -4 and 25?\n75\nLet v(i) = -i**2 - 4*i + 1. Let y be v(-4). Find the common denominator of -109/40" +" hundreds digit of 6264316386?\n3\nWhat is the thousands digit of 299208473?\n8\nWhat is the hundred millions digit of 8098831529?\n0\nWhat is the ten thousands digit of 31781769?\n8\nWhat is the tens digit of 633968751?\n5\nWhat is the hundred thousands digit of 30926404?\n9\nWhat is the units digit of 639764102?\n2\nWhat is the millions digit of 167902928?\n7\nWhat is the ten millions digit of 1878265021?\n7\nWhat is the tens digit of 62193604?\n0\nWhat is the ten millions digit of 6969083625?\n6\nWhat is the ten thousands digit of 5286408760?\n0\nWhat is the ten millions digit of 128185148?\n2\nWhat is the thousands digit of 2443878052?\n8\nWhat is the hundreds digit of 2243677039?\n0\nWhat is the millions digit of 575646139?\n5\nWhat is the tens digit of 155309859?\n5\nWhat is the thousands digit of 8947330?\n7\nWhat is the units digit of 153782366?\n6\nWhat is the millions digit of 241080630?\n1\nWhat is the tens digit of 32874105?\n0\nWhat is the units digit of 23386481?\n1\nWhat is the hundreds digit of 569420117?\n1\nWhat is the millions digit of 1442775421?\n2\nWhat is the millions" +" r*i = 17*i + 34. Let v = i + -23. Is v prime?\nTrue\nIs (-13894 - -4)/(-6) - -6 a prime number?\nFalse\nSuppose -4*h - 4*h = -32. Suppose h*d + 563 = 5*m, d = -0*m + m - 112. Is m prime?\nFalse\nLet g(c) = 116*c - 51. Is g(8) composite?\nFalse\nLet a(n) = 0 + 1 + 6 - 36*n. Suppose 2*i = 10*i + 48. Is a(i) a prime number?\nTrue\nLet n be 6/27*3*9507. Let r = n - 4353. Is r a prime number?\nFalse\nLet o = -8 - -10. Let q be (3/o)/(6/12). Suppose 0 = -2*p + q*p - 211. Is p composite?\nFalse\nIs 123*19 - (-27 + 25) composite?\nFalse\nLet t(p) = 2671*p - 221. Is t(10) a prime number?\nTrue\nSuppose -2*f + 225 = -p - 66, -5*p - 2*f - 1491 = 0. Let o = p - -631. Is o composite?\nTrue\nLet v(a) be the first derivative of a**4/4 - 8*a**3/3 + 3*a**2/2 + 10*a - 6. Let s be v(7). Is (-12)/s - 151/(-3) a composite number?\nTrue\nLet w be 18/(-3) - -3 - -1. Let" +"-431426?\nTrue\nWhich is smaller: -542 or -521?\n-542\nIs 2/363621 smaller than -1?\nFalse\nWhich is greater: -17577 or 2?\n2\nAre 1 and -1/1120385 equal?\nFalse\nWhich is greater: 58816 or 58830?\n58830\nDo 309846 and -1 have different values?\nTrue\nAre -15426 and -138830/9 non-equal?\nTrue\nIs -20/286753 > -1?\nTrue\nIs 1/6 > 51361?\nFalse\nWhich is greater: 2025/15601 or 1?\n1\nWhich is smaller: 1 or 2/1341287?\n2/1341287\nWhich is smaller: 2/41019 or 1?\n2/41019\nWhich is bigger: -13 or -1065/89?\n-1065/89\nWhich is bigger: 640 or 4486/7?\n4486/7\nIs -3/104 < -0.02?\nTrue\nDo 1 and -377/4266 have different values?\nTrue\nWhich is smaller: 0.07 or -104689?\n-104689\nWhich is smaller: -69094 or -69091?\n-69094\nWhich is greater: -13/322872 or -1?\n-13/322872\nWhich is greater: 2176177/3 or 725393?\n725393\nWhich is greater: 1527 or 1498?\n1527\nIs -1928 < -15431/8?\nFalse\nIs -0.0228 at most 0.39?\nTrue\nIs -145 <= -466?\nFalse\nIs -14633 smaller than -14639?\nFalse\nIs -3440897 greater than -3440897?\nFalse\nIs -2 greater than or equal to -21339?\nTrue\nIs 282/30641 > 0?\nTrue\nIs -1485 greater than -877?\nFalse\nIs 85 < 28/85?\nFalse\nIs 0.01 bigger than 499.3?" +"3*t - 488 + 46 = 11*y for t.\n-9\nSolve -108*g + 120*g = -2*v - 234, -46 = 2*g + 6*v - 5*v - 3*v for g.\n-20\nSolve 1862*p - 90 = 1864*p - 2*x, 7*x + 261 = 4*p - 9*p for p.\n-48\nSolve 0 = -17*d + 3*d - 3*h + 160, 0*h = -7*d + 2*h - 6*h + 225 for d.\n-1\nSolve 2*b + 168 = 2*i - 4*b, 75*i - 14*b - 392 = 70*i for i.\n0\nSolve -8128*o - 6 = 5*q - 8130*o - 20, -5*q - 5*o + 35 = 0 for q.\n4\nSolve 10045*z - 10044*z + 14 = d, -2*d - 3*z + 43 = 0 for d.\n17\nSolve -60 = -4*x - 24*g + 27*g, 140*x + 0*g = g + 1684 for x.\n12\nSolve -3*p - r - 87 = -4*r, -31*p = 27*p - r + 1568 for p.\n-27\nSolve -5*u - 10464 = -10*q - 10959, 2*q + 95 = -3*u for u.\n1\nSolve -3*h + 4*j - 63 = 0, -309*h - 7*j = -307*h - 103 for h.\n-1\nSolve -k = -6*j" +"for o.\n2\nSolve -3*d + 34*b = 35*b - 10, 4*d - 3*b + 4 = 0 for d.\n2\nSolve -5 = 5*n + g - 9, -3*n - 4*g - 1 = 0 for n.\n1\nSolve u = 4*s - 9, 0 = u + 2*u + 5*s + 10 for u.\n-5\nSolve 5 = -p - 3*i - 2*i, 2*p = 5*i + 20 for p.\n5\nSolve 12 - 2 = -2*n + 4*w, -4*w = -5*n - 1 for n.\n3\nSolve -5*r - 15 = 4*k, -2*r - 1 = -5*k + 5 for k.\n0\nSolve 2*b + 0 = 4*c - 6, 5*b + 24 = c for b.\n-5\nSolve -23 = y - 5*a, 6*y = 2*y + a - 16 for y.\n-3\nSolve -g + 2*p - 4 + 1 = 0, 5*g + 2*p + 15 = 0 for g.\n-3\nSolve 0 = 2*n - 3*o - 14, o - 3 = -3*n - 4 for n.\n1\nSolve -4*h = 5*t - 16 - 12, -5*t = h - 22 for t.\n4\nSolve 4*w + 5 = 3*v, 0 = 2*v" +" 2124?\n1062\nWhat is the greatest common factor of 33626363 and 207598?\n4513\nWhat is the highest common divisor of 4494760 and 21830?\n370\nCalculate the highest common divisor of 29244 and 90864.\n12\nCalculate the highest common factor of 642 and 363586.\n214\nCalculate the greatest common divisor of 1311535 and 4068549.\n5581\nWhat is the highest common divisor of 296452 and 10348?\n52\nWhat is the highest common divisor of 574273 and 4984?\n7\nWhat is the highest common factor of 10503 and 4788979?\n389\nWhat is the highest common divisor of 478 and 13103653?\n239\nWhat is the greatest common divisor of 99336056 and 16?\n8\nCalculate the greatest common factor of 53312600 and 220.\n220\nWhat is the highest common factor of 16339323 and 63?\n21\nWhat is the greatest common divisor of 9576 and 17130400?\n1064\nCalculate the highest common divisor of 3599397 and 333.\n333\nWhat is the highest common factor of 156 and 68895606?\n78\nWhat is the highest common factor of 21307352 and 308?\n44\nCalculate the highest common factor of 40152 and 787416.\n168\nWhat is the greatest common factor of 2 and 205219586?\n2\nCalculate the greatest common divisor of" +"02 - (335 + -390).\n-46\n(-1 - (4 - 21)) + -14 + 3 + -95\n-90\nCalculate -13 - (15 + (-7 + 17 - (157 + -13 + 2))).\n108\nEvaluate -9 + (47 - 6) + -17 + (0 - -4 - 3).\n16\nCalculate (-109 + 46 + 75 - (2 + -2)) + 35 + -3.\n44\nEvaluate -9 + -38 - (33 - 41 - -31).\n-70\nEvaluate 5 + (-10 - ((-4 - (14 - 9)) + 2 + -75)).\n77\nWhat is -41 - (37 + (-2 - -12) + -22)?\n-66\nWhat is 68 - (103 + -49) - -34?\n48\n(-121 - -128) + -34 - (3 + -8)\n-22\nWhat is the value of 141 + (-282 + 107 - -52)?\n18\n7 + (27 + -3 - -9) + -7 + -4\n29\nEvaluate -10 + 4 + (33 - 36) - (0 + -52).\n43\n15 + (-1 - -6 - (4 + -2) - -2)\n20\n-3 + -8 + 3 + (-39 - (10 - 17)) + -2\n-42\nWhat is the value of (-2 - 0) + 670 + -689 - -11?\n-10" +"101542, -101545?\n-3*z - 101527\nWhat is the r'th term of 7863, 15829, 23795, 31761, 39727?\n7966*r - 103\nWhat is the f'th term of -9962, -19913, -29864, -39815, -49766?\n-9951*f - 11\nWhat is the l'th term of 6580, 13157, 19728, 26293?\n-3*l**2 + 6586*l - 3\nWhat is the k'th term of -20076, -20082, -20088, -20094?\n-6*k - 20070\nWhat is the j'th term of 16673, 16735, 16807, 16895, 17005?\nj**3 - j**2 + 58*j + 16615\nWhat is the b'th term of -16070, -16081, -16104, -16145, -16210, -16305, -16436, -16609?\n-b**3 - 4*b - 16065\nWhat is the v'th term of 221, 200, 165, 110, 29, -84, -235, -430?\n-v**3 - v**2 - 11*v + 234\nWhat is the d'th term of -241, -537, -859, -1219, -1629, -2101, -2647?\n-2*d**3 - d**2 - 279*d + 41\nWhat is the c'th term of -75, -60, -7, 96, 261, 500, 825, 1248?\n2*c**3 + 7*c**2 - 20*c - 64\nWhat is the m'th term of 2405, 2409, 2395, 2357, 2289, 2185?\n-m**3 - 3*m**2 + 20*m + 2389\nWhat is the d'th term of 1044, 1022, 984, 930?\n-8*d**2 + 2*d + 1050\nWhat is the b'th term of" +"2010\nIn base 6, what is -12515110 - 3?\n-12515113\nIn base 11, what is -70107 + 0?\n-70107\nIn base 9, what is 262 + 2357?\n2630\nIn base 3, what is -20220012 + 12?\n-20220000\nIn base 16, what is 3 - 85a7?\n-85a4\nIn base 16, what is -aa34 - -5?\n-aa2f\nIn base 9, what is -2 + 320703?\n320701\nIn base 4, what is -1313 + -1112?\n-3031\nIn base 15, what is 0 - 4876?\n-4876\nIn base 3, what is 112022211 + 1010?\n112100221\nIn base 7, what is -302 - 103605?\n-104210\nIn base 2, what is -11110010111100001 - -1101?\n-11110010111010100\nIn base 16, what is -59 - f7?\n-150\nIn base 16, what is -d64 + 364?\n-a00\nIn base 11, what is 263 - 82?\n191\nIn base 7, what is -25 + -215?\n-243\nIn base 6, what is 45 + -4044?\n-3555\nIn base 12, what is 105 + -b46?\n-a41\nIn base 14, what is 601 + -143a?\n-c39\nIn base 12, what is -117 - -32a?\n213\nIn base 13, what is 120 + 32?\n152\nIn base 10, what is -685 - -497?\n-188\nIn" +"to 2/7 in 2.3, x, 1/3?\n1/3\nLet w = 0.039 + -0.039. Let j = 1058 - 1001. Which is the nearest to w? (a) j (b) -5 (c) 3\nc\nLet s = 1397/24 - 479/8. What is the closest to -30 in 3, s, 1, 0?\ns\nLet b = 2350/17 + -2352/17. What is the nearest to -1 in b, -23.5, -2?\nb\nLet q(l) = 13*l + 182. Let x be q(-14). What is the closest to -0.6 in x, 1.9, 1/6, 2/5?\nx\nLet o be 2/(-5) + (-429)/65. Let i(j) = 6*j + 37. Let z be i(o). What is the closest to 0.27 in 1/2, -1, z?\n1/2\nLet l(i) = 5*i - 16. Let s(n) = 3*n + 3. Let g be s(2). Let k be l(g). Let p = k + -34. What is the closest to 0.1 in 1/12, p, 2?\n1/12\nLet u be 6/8 - (-2)/8. Let i = 468 + -467. Let d = 121 + -1088/9. What is the nearest to i in u, 3, d?\nu\nLet u = 9.183 - 8.383. What is the closest to -4 in 2, -5, u, -4?\n-4" +"dps.\n-0.03621\nWhat is 27015440 rounded to the nearest 10000?\n27020000\nWhat is -216342100 rounded to the nearest one million?\n-216000000\nRound 196996700 to the nearest one hundred thousand.\n197000000\nRound -245786500 to the nearest 100000.\n-245800000\nWhat is -0.00004616974 rounded to 6 decimal places?\n-0.000046\nRound -2012390 to the nearest 100000.\n-2000000\nWhat is 0.00788054 rounded to 4 decimal places?\n0.0079\nRound 1965690000 to the nearest 1000000.\n1966000000\nRound -32082499 to the nearest one hundred thousand.\n-32100000\nRound -0.8635136 to three dps.\n-0.864\nWhat is 2.523815 rounded to 3 dps?\n2.524\nWhat is 0.001068221 rounded to 6 dps?\n0.001068\nRound 53534.82 to the nearest 10.\n53530\nWhat is -21309800 rounded to the nearest one hundred thousand?\n-21300000\nRound 0.000008771252 to six dps.\n0.000009\nRound -202.353 to 0 decimal places.\n-202\nRound -2006996.9 to the nearest one million.\n-2000000\nRound 222.324 to the nearest 100.\n200\nWhat is -0.5515382 rounded to three decimal places?\n-0.552\nRound -0.00018113503 to 7 dps.\n-0.0001811\nWhat is -40.824241 rounded to the nearest ten?\n-40\nRound -15788470 to the nearest 10000.\n-15790000\nRound 809.974 to the nearest integer.\n810\nRound 935.1238 to the nearest 100.\n900\nWhat is -0.00000967681 rounded to six decimal places?\n-0.00001" +"*a**2/2 + 1247*a. Differentiate t(d) wrt d.\n2014\nLet s(d) = 5*d**3 - 204*d**2 + 9*d + 913. Let h(p) = 14*p**3 - 610*p**2 + 24*p + 2737. Let l(b) = 3*h(b) - 8*s(b). Differentiate l(i) with respect to i.\n6*i**2 - 396*i\nSuppose 3*u + 11 = m - 5, 5*u - 4*m + 22 = 0. Let c be (-8)/u*9/6. Find the third derivative of -19*p**2 + 42*p**c - 26*p**2 + 4*p**4 wrt p.\n96*p\nWhat is the third derivative of v**2 - 7*v**2 - 3025*v**5 - 11*v + 357*v wrt v?\n-181500*v**2\nLet c(b) be the first derivative of 103*b**4/4 + 394*b**2 - 302. Find the second derivative of c(w) wrt w.\n618*w\nLet m(y) be the first derivative of 489*y**4 - 5*y**3 + 2*y**2 - 2*y + 5935. Find the third derivative of m(c) wrt c.\n11736\nLet a(g) = -734*g**3 + 101*g + 1008. Let k(y) = -1467*y**3 + 185*y + 2016. Let h(f) = -11*a(f) + 6*k(f). Differentiate h(i) wrt i.\n-2184*i**2 - 1\nLet l(u) = -2735*u**2 - 5646*u + 27. Let d(k) = 2739*k**2 + 5646*k - 36. Let r(h) = -3*d(h) - 4*l(h). What is the second derivative of r(v) wrt" +"+ 7*n - 5. Let w = -287 + 429. Calculate the remainder when w is divided by (2 + -6)/(t*1/9).\n34\nLet b(t) = t**3 + 70*t**2 - 69*t + 292. Let p(f) = -14*f - 5. Calculate the remainder when b(-71) is divided by p(-4).\n48\nSuppose -10*i = 5*k - 7*i - 3629, -2*k - 5*i + 1444 = 0. Calculate the remainder when k is divided by 9.\n7\nLet r = -110 - -192. Let n(d) = 3*d**3 + 79*d**2 + 89*d - 247. Calculate the remainder when r is divided by n(-25).\n26\nLet q be (2142/(-6 + 13))/(4/2). Suppose 10*h = 97 + q. What is the remainder when -305*1/(5/(-2)) is divided by h?\n22\nLet o(g) = 5*g - 19. Let x be o(4). Suppose -q + x = -3*z, 5*z - 6*z = q - 5. Calculate the remainder when q*2/8*(-2 + 5) is divided by 2.\n1\nSuppose 11 = 2*v - 11. Let g be -2*(12/9 - (-4)/(-12)). Let f(i) = 47*i + 100. Calculate the remainder when v is divided by f(g).\n5\nLet a be -3 + -2 + -1 + 2236/2. Suppose -273*f = -269*f -" +"o for o.\n0\nSuppose 5*g - 35 = -0*g. Solve 3*d = g - 19 for d.\n-4\nLet i(c) = 2*c**2 - 3. Let r be i(2). Solve 2*m = m - r for m.\n-5\nSuppose -c = 4*i + 2*c + 33, 4*i + 30 = -2*c. Let w = i + 6. Solve 2*k + k = w for k.\n0\nLet c be 8/14 + (-153)/(-63). Suppose 20 = c*v + 2*v. Solve 2 = -2*j - v for j.\n-3\nLet c(p) = -1 - p + 1 - 4*p**2 - 4*p**2 + 11 + p**3. Let t be c(8). Solve -3*m = -6*m + t for m.\n1\nSuppose 0*n + 2*n - 8 = 0. Solve 0 = -3*d + 1 - n for d.\n-1\nSuppose -4*p - 25 = -2*i - 9, 5*i = -2*p + 16. Let q be 0 - 3 - (p - 1). Solve q*r = -2*r for r.\n0\nSuppose 2*j - j - 2 = 0. Solve -4 = -2*k - j for k.\n1\nLet s(v) = 2*v + 1. Let w be s(-1). Let r be 6/1 + 4 + w." +" - v = 3*o - 3. Let x = 22 - v. Solve 2*z + 3*z - 4*n = 23, -3*z - x*n = -1 for z.\n3\nLet d be 1961/371 + 5/7 + -1. Solve -i = -d*u - 18, -6 = 2*u - i - 0*i for u.\n-4\nLet s(w) = -87*w**3 - 2*w**2 + 3. Let j be s(-1). Let m = j - 86. Solve -5*h = 20, -10 = -0*f + m*f + 4*h for f.\n3\nLet i(h) = -h + 22. Let u be i(17). Solve -j - 3*o - u = 0, 10 = 4*j - 0*j + 2*o for j.\n4\nLet f(y) = -y**2 - 12*y - 9. Let l be f(-11). Suppose 4*i + 0*t - 4*t = 36, -l*i = -t - 13. Suppose 2 = 2*p - 2. Solve i*j + 1 = -p*m + 3, 2*m - 2 = -3*j for j.\n0\nLet i be 301/49 + 2/(-14). Suppose 2*j = -s, 5*s - i*j = -3*j. Suppose -3*v + s*v = 0. Solve c = -0*b - b + 2, v = 5*c + 3*b - 12 for c.\n3\nSuppose 0" +"is 121645801 divided by -5?\n-121645801/5\nDivide 253 by 7039.\n253/7039\nWhat is 161711 divided by -1053?\n-161711/1053\nCalculate -128156880 divided by 4.\n-32039220\nDivide -17175546 by -6.\n2862591\nDivide 3946800 by 1150.\n3432\nWhat is -34099362 divided by 66?\n-516657\nCalculate 1098435 divided by 1965.\n559\nCalculate -8078124 divided by -2019531.\n4\n-13086379 divided by 13086379\n-1\nDivide 296 by 609.\n296/609\nWhat is 10 divided by -505239?\n-10/505239\n-1396007 divided by 1\n-1396007\n177 divided by 1550334\n59/516778\n-6161130 divided by 114095\n-54\nCalculate -176509732 divided by 4.\n-44127433\n-9407775 divided by -25\n376311\n-5766816 divided by 10922\n-528\n18706395 divided by 18706395\n1\nCalculate -255 divided by -139914.\n85/46638\nWhat is 17850960 divided by 16?\n1115685\nCalculate -1 divided by -3260545.\n1/3260545\n-131894584 divided by -1\n131894584\n68665704 divided by -8583213\n-8\nCalculate -495083 divided by 26057.\n-19\nCalculate 12197 divided by 4857.\n12197/4857\nDivide 6 by 3058888.\n3/1529444\nDivide 568372 by -284186.\n-2\n-19105694 divided by 1\n-19105694\nWhat is 0 divided by 30608704?\n0\nCalculate -16 divided by -1732209.\n16/1732209\nDivide 9480602 by -277.\n-34226\n551424720 divided by 22976030\n24\n9957909 divided by -6\n-3319303/2\nDivide -57245830 by -106.\n540055\nDivide 4 by -3847136.\n-1/961784" +" 5 - (-1 - (-5 + 2)))?\n9\nEvaluate (-10 - -14) + -3 + -9 + 17.\n9\n(-2 - (12 - 17)) + -5 - (0 - -1)\n-3\nWhat is the value of (16 - (33 - 13)) + -12?\n-16\nCalculate 1 + 5 - (5 + -1 + -155 + 136).\n21\nCalculate -5 - (-2 + -2) - (-4 - 8).\n11\n-59 + 59 + (-6 - (-2 + 4 - 4))\n-4\nEvaluate 4 + (-2 + (3 - 8) - -13).\n10\nWhat is the value of 0 + (5 - ((-4 - -14) + -6)) + -3?\n-2\nWhat is -9 + -1 + (99 - 86)?\n3\nCalculate (43 + -30 - 9) + -5.\n-1\nCalculate 151 + -120 - (9 + 0) - 9.\n13\nCalculate -1 + (14 - 2) + -19.\n-8\nCalculate (7 - -24 - -7) + -43.\n-5\n18 + -13 + -19 - -26\n12\nEvaluate -36 + 32 - (3 - 18).\n11\nWhat is the value of 1 + -1 + -6 + -8 + 5 + 1?\n-8\nCalculate 0 - (17 - ((3 - 9) + 17))."