problem+solution stringlengths 10 16.4k | index int64 0 96.2k |
|---|---|
82 - 3534 =
-3452 | 14,300 |
-8322 + 3081 = ?
-8322 + 3081 = -5241 | 14,301 |
1610 * 247 =
397670 | 14,302 |
-11503921 + -84125598 + -21926200 + 53531229 + -90767703 =
-154792193 | 14,303 |
-24552406 + 10371865 + 30165461 + -8616600 + -6631300 =
737020 | 14,304 |
No problem, let's work through this together. We're starting with 6255 and 4318 and adding them all up.
Step 1: We'll start by adding the digits 5 & 8 in column 1 and get 13.
We'll write down the last digit 3 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 5 & 1 in column 2 and get 7.
St... | 14,305 |
OK, let's work through this together. We're starting with 141 and we're going to multiply it by 357, which means we add 141 to itself 357 times.
Step 1: 0 + 141 = 141
Step 2: 141 + 141 = 282
Step 3: 282 + 141 = 423
Step 4: 423 + 141 = 564
Step 5: 564 + 141 = 705
Step 6: 705 + 141 = 846
Step 7: 846 + 141 = 987
Step 8: 9... | 14,306 |
-995 * -931 =
926345 | 14,307 |
99629668 + 44279521 + -42485900 + -69412031 + 44082750 =
76094008 | 14,308 |
1920 - 1142 =
778 | 14,309 |
Let's get this math done. We have 280 and we're going to multiply it by 67. This is the same as taking 280 and adding it to itself 67 times.
Step 1: 0 + 280 = 280
Step 2: 280 + 280 = 560
Step 3: 560 + 280 = 840
Step 4: 840 + 280 = 1120
Step 5: 1120 + 280 = 1400
Step 6: 1400 + 280 = 1680
Step 7: 1680 + 280 = 1960
Step 8... | 14,310 |
1794 + 1527 =
3321 | 14,311 |
-99 * 1355 =
-134145 | 14,312 |
2148 * 2383 =
5118684 | 14,313 |
Without delay, let's solve this. We've got 145 and we will be multiplying it by 404, that is, adding 145 to itself 404 times.
Step 1: 0 + 145 = 145
Step 2: 145 + 145 = 290
Step 3: 290 + 145 = 435
Step 4: 435 + 145 = 580
Step 5: 580 + 145 = 725
Step 6: 725 + 145 = 870
Step 7: 870 + 145 = 1015
Step 8: 1015 + 145 = 1160
S... | 14,314 |
-830 * 1653 =
-1371990 | 14,315 |
-96348734 - -73815429 - 24541039 =
-47074344 | 14,316 |
1657 ÷ 4 = 414 R1
No problem, we've got 1657 and 4 for the division.
Step 1:
4 goes into 1 0 times with a remainder of 1.
Write down 0 as next digit of of the result.
Result so far: 0
Subtract 0 from 1 to get 1.
Bring next digit (6) of the dividend behind the 1 and repeat the process: 16 / 4
Step 2:
4 goes into 16 4... | 14,317 |
OK, let's work through this together. We're starting with 431 and we're going to multiply it by 16, which means we add 431 to itself 16 times.
Step 1: 0 + 431 = 431
Step 2: 431 + 431 = 862
Step 3: 862 + 431 = 1293
Step 4: 1293 + 431 = 1724
Step 5: 1724 + 431 = 2155
Step 6: 2155 + 431 = 2586
Step 7: 2586 + 431 = 3017
St... | 14,318 |
57171042 divided by 785
The aim is to understand the frequency of 785 in 57171042.
Let's proceed to step 1:
5 divided by 785 is 0 with a remainder of 5.
The next digit of our result is 0.
Result so far: 0.0
Deduct 0 from 5 and we're left with 5.
Append the next digit (7) from the dividend to 5 and continue with: 57 ... | 14,319 |
8126 ÷ 7 = 1160 R6
We're going to perform division on 8126 with 7 as the divisor.
Step 1:
7 goes into 8 1 times with a remainder of 1.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 7 from 8 to get 1.
Bring next digit (1) of the dividend behind the 1 and repeat the process: 11 / 7
Step 2:
7 g... | 14,320 |
57539288 + 8035829 + 43094218 + 86221512 + 56034877 =
250925724 | 14,321 |
1387 + 2909 =
4296 | 14,322 |
3512 + 589 =
4101 | 14,323 |
Let's get this math done. We have 722810812 and 276876671, and we're going to subtract the second number from the first.
Step 1: We'll start by subtracting the digit 1 and the borrow 0 from 2 in column 1 and get 1.
1 is the first digit of our result.
Step 2: We'll start by subtracting the digit 7 and the borrow 0 fro... | 14,324 |
70040183 * -21900243 / 69 =
-22230391702383.61 | 14,325 |
-684.7 ** 4.0 =
219786650982.52817 | 14,326 |
27548992 + 51546203 + -3041502 + -50104488 + 65127415 =
91076620 | 14,327 |
Here we go! We're going to add 2403 and 2154 together.
Step 1: We'll start by adding the digits 3 & 4 in column 1 and get 7.
Step 2: We'll start by adding the digits 0 & 5 in column 2 and get 5.
Step 3: We'll start by adding the digits 4 & 1 in column 3 and get 5.
Step 4: We'll start by adding the digits 2 & 2 in c... | 14,328 |
59816650 + 16811077 + -78764573 + -15517944 + 95683669 =
78028879 | 14,329 |
717 - -101 = ?
717 - -101 = 818 | 14,330 |
We're going to solve 90383595 multiplied by 84228383
90383595 × 84228383 = 84228383 × (90383595)
+ 84228383 × 5 which equals 421141915
+ 84228383 × 90 producing 7580554470
+ 84228383 × 500 yielding 42114191500
+ 84228383 × 3000 producing 252685149000
+ 84228383 × 80000 producing 6738270640000
+ 84228383 × 300000 giving... | 14,331 |
-63711833 + -27155799 - 26179277 =
-117046909 | 14,332 |
-32655211 + -89835783 * 2714 =
-243846970273 | 14,333 |
33044476 + -70483017 + 84131916 + -62522282 + -57840922 =
-73669829 | 14,334 |
Got it! So, we have 721908370 and 360776749, and we'll subtract the latter from the former.
Step 1: We'll start by subtracting the digit 9 and the borrow 0 from 0 in column 1 and get -9.
We add -9 to 10 and get 1 as the first digit of the result.
Step 2: We'll start by subtracting the digit 4 and the borrow 1 from 7 ... | 14,335 |
-66183885 + -240200 + -87576574 =
-154000659 | 14,336 |
65117724 * -21851242 / 58 =
-24532812855400.137 | 14,337 |
Sure thing, let's get straight to it. We start with 436 and we're going to multiply it by 25, which means adding 436 to itself 25 times.
Step 1: 0 + 436 = 436
Step 2: 436 + 436 = 872
Step 3: 872 + 436 = 1308
Step 4: 1308 + 436 = 1744
Step 5: 1744 + 436 = 2180
Step 6: 2180 + 436 = 2616
Step 7: 2616 + 436 = 3052
Step 8: ... | 14,338 |
98931562 + -20736314 + 48414303 =
126609551 | 14,339 |
We're going to solve 55569669 multiplied by 35573068
55569669 × 35573068 = 35573068 × (55569669)
+ 35573068 × 9 giving us 320157612
+ 35573068 × 60 what gives us 2134384080
+ 35573068 × 600 that results in 21343840800
+ 35573068 × 9000 resulting in 320157612000
+ 35573068 × 60000 which equals 2134384080000
+ 35573068 ×... | 14,340 |
No problem, we've got 2572 and 1738 to multiply
2572 × 1738 = 1738 × (2572)
+ 1738 × 2 yielding 3476
+ 1738 × 70 producing 121660
+ 1738 × 500 what gives us 869000
+ 1738 × 2000 resulting in 3476000
= 4470136
| 14,341 |
895.9 ** 3.2 =
2800467371.8926373 | 14,342 |
13139941 * -71255597 / 80 =
-11703679256247.213 | 14,343 |
-80313841 - 72681377 - -21887073 =
-131108145 | 14,344 |
Let's dive into this subtraction. We'll start with 688327870 and subtract 265636803 from it.
Step 1: We'll start by subtracting the digit 3 and the borrow 0 from 0 in column 1 and get -3.
We add -3 to 10 and get 7 as the first digit of the result.
Step 2: We'll start by subtracting the digit 0 and the borrow 1 from 7... | 14,345 |
-80525995 - -98647988 - 41596870 =
-23474877 | 14,346 |
54973094 + -73519398 * -8421 =
619161823652 | 14,347 |
Let's dive into this subtraction. We'll start with 991080 and subtract 97184 from it.
Step 1: We'll start by subtracting the digit 4 and the borrow 0 from 0 in column 1 and get -4.
We add -4 to 10 and get 6 as the first digit of the result.
Step 2: We'll start by subtracting the digit 8 and the borrow 1 from 8 in col... | 14,348 |
OK, let's work through this together. We're starting with 834 and we're going to multiply it by 472, which means we add 834 to itself 472 times.
Step 1: 0 + 834 = 834
Step 2: 834 + 834 = 1668
Step 3: 1668 + 834 = 2502
Step 4: 2502 + 834 = 3336
Step 5: 3336 + 834 = 4170
Step 6: 4170 + 834 = 5004
Step 7: 5004 + 834 = 583... | 14,349 |
9560 ÷ 5 = 1912 R0
No problem, we've got 9560 and 5 for the division.
Step 1:
5 goes into 9 1 times with a remainder of 4.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 5 from 9 to get 4.
Bring next digit (5) of the dividend behind the 4 and repeat the process: 45 / 5
Step 2:
5 goes into 45 ... | 14,350 |
Let's roll up our sleeves and solve this. We have 262 and we're going to multiply it by 397, essentially adding 262 to itself 397 times.
Step 1: 0 + 262 = 262
Step 2: 262 + 262 = 524
Step 3: 524 + 262 = 786
Step 4: 786 + 262 = 1048
Step 5: 1048 + 262 = 1310
Step 6: 1310 + 262 = 1572
Step 7: 1572 + 262 = 1834
Step 8: 18... | 14,351 |
Alright, let's work through 73079880 times 8394741 step by step
73079880 × 8394741 = 8394741 × (73079880)
+ 8394741 × 0 which equals 0
+ 8394741 × 80 what gives us 671579280
+ 8394741 × 800 what gives us 6715792800
+ 8394741 × 9000 that equals 75552669000
+ 8394741 × 70000 producing 587631870000
+ 8394741 × 000000 prod... | 14,352 |
2104 + 1035 =
3139 | 14,353 |
5255500 divided by 385
Our goal is to divide 5255500 by 385.
On to step 1:
385 goes into 5 0 times with a remainder of 5.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
Deduct 0 from 5 and we're left with 5.
Append the next digit (2) from the dividend to 5 and continue with: 52 / 385
Let'... | 14,354 |
-988 - -796 = ?
-988 - -796 = -192 | 14,355 |
-259.66 ** 0.65 =
(-16.84263546830316+33.05553331048546j) | 14,356 |
-1335 + -8045 = ?
-1335 + -8045 = -9380 | 14,357 |
85044401 ÷ 497
Our goal is to divide 85044401 by 497.
Let's proceed to step 1:
497 goes into 8 0 times with a remainder of 8.
The next digit of our result is 0.
Result so far: 0.0
If we take 0 away from 8, we end up with 8.
Grab the next digit (5) from the dividend, add it to 8, then carry on: 85 / 497
On to step 2... | 14,358 |
OK, let's crack this. We're given 140 and our task is to multiply it by 400. Essentially, we'll be adding 140 to itself 400 times.
Step 1: 0 + 140 = 140
Step 2: 140 + 140 = 280
Step 3: 280 + 140 = 420
Step 4: 420 + 140 = 560
Step 5: 560 + 140 = 700
Step 6: 700 + 140 = 840
Step 7: 840 + 140 = 980
Step 8: 980 + 140 = 112... | 14,359 |
We're going to solve 3897 multiplied by 3938
3897 × 3938 = 3938 × (3897)
+ 3938 × 7 resulting in 27566
+ 3938 × 90 that results in 354420
+ 3938 × 800 producing 3150400
+ 3938 × 3000 that equals 11814000
= 15346386
| 14,360 |
-98209093 + -29028103 + 69706445 + 68326221 + 45187348 =
55982818 | 14,361 |
1771263 * -37176640 / 44 =
-1496581974916.3635 | 14,362 |
OK, let's do this. We've got 2870 and 7057 and we're adding them all together.
Step 1: We'll start by adding the digits 0 & 7 in column 1 and get 7.
Step 2: We'll start by adding the digits 7 & 5 in column 2 and get 12.
We'll write down the last digit 2 and carry the 1 to the next column.
Step 3: We'll start by addi... | 14,363 |
23090468 + -6082929 * -6344 =
38613192044 | 14,364 |
Sure thing! We've got 193 and we're gonna multiply it by 313. That's the same as adding 193 to itself 313 times.
Step 1: 0 + 193 = 193
Step 2: 193 + 193 = 386
Step 3: 386 + 193 = 579
Step 4: 579 + 193 = 772
Step 5: 772 + 193 = 965
Step 6: 965 + 193 = 1158
Step 7: 1158 + 193 = 1351
Step 8: 1351 + 193 = 1544
Step 9: 1544... | 14,365 |
829 * -384 =
-318336 | 14,366 |
-6412765 + -70872141 + 18531682 + 70545038 + -88494262 =
-76702448 | 14,367 |
226 / 2368 =
0.1 | 14,368 |
Let's get this math done. We have 72 and we're going to multiply it by 140. This is the same as taking 72 and adding it to itself 140 times.
Step 1: 0 + 72 = 72
Step 2: 72 + 72 = 144
Step 3: 144 + 72 = 216
Step 4: 216 + 72 = 288
Step 5: 288 + 72 = 360
Step 6: 360 + 72 = 432
Step 7: 432 + 72 = 504
Step 8: 504 + 72 = 576... | 14,369 |
Let's calculate 4858 x 643
4858 × 643 = 643 × (4858)
+ 643 × 8 giving us 5144
+ 643 × 50 resulting in 32150
+ 643 × 800 that is equal 514400
+ 643 × 4000 producing 2572000
= 3123694
| 14,370 |
Let's calculate 61252997 x 63595366
61252997 × 63595366 = 63595366 × (61252997)
+ 63595366 × 7 what gives us 445167562
+ 63595366 × 90 producing 5723582940
+ 63595366 × 900 what gives us 57235829400
+ 63595366 × 2000 giving us 127190732000
+ 63595366 × 50000 resulting in 3179768300000
+ 63595366 × 200000 yielding 12719... | 14,371 |
53026895 + -35878985 - -49353869 =
66501779 | 14,372 |
We divide 29362842 by 654
We want to figure out the number of times 29362842 can be divided by 654.
Going ahead to step 1:
654 can be fit into 2 0 times, resulting in a remainder of 2.
Put 0 as the next digit of the answer.
Result so far: 0.0
Subtract 0 from 2 to get 2.
Include the next digit (9) from the dividend af... | 14,373 |
Sure thing! We've got 969 and we're gonna multiply it by 290. That's the same as adding 969 to itself 290 times.
Step 1: 0 + 969 = 969
Step 2: 969 + 969 = 1938
Step 3: 1938 + 969 = 2907
Step 4: 2907 + 969 = 3876
Step 5: 3876 + 969 = 4845
Step 6: 4845 + 969 = 5814
Step 7: 5814 + 969 = 6783
Step 8: 6783 + 969 = 7752
Step... | 14,374 |
-8769 + -4957 = ?
-8769 + -4957 = -13726 | 14,375 |
-579 + -5205 = ?
-579 + -5205 = -5784 | 14,376 |
1478 / 1809 =
0.82 | 14,377 |
85514654 * 20163518 / 31 =
55621815006218.45 | 14,378 |
1215 / 120 =
10.12 | 14,379 |
Without delay, let's solve this. We've got 389 and we will be multiplying it by 131, that is, adding 389 to itself 131 times.
Step 1: 0 + 389 = 389
Step 2: 389 + 389 = 778
Step 3: 778 + 389 = 1167
Step 4: 1167 + 389 = 1556
Step 5: 1556 + 389 = 1945
Step 6: 1945 + 389 = 2334
Step 7: 2334 + 389 = 2723
Step 8: 2723 + 389 ... | 14,380 |
718 + 1470 =
2188 | 14,381 |
62292103 - -11914972 - 28962593 =
45244482 | 14,382 |
We're going to solve 26970310 multiplied by 69341431
26970310 × 69341431 = 69341431 × (26970310)
+ 69341431 × 0 producing 0
+ 69341431 × 10 that equals 693414310
+ 69341431 × 300 resulting in 20802429300
+ 69341431 × 0000 yielding 0
+ 69341431 × 70000 that is equal 4853900170000
+ 69341431 × 900000 that results in 6240... | 14,383 |
Let's roll up our sleeves and solve this. We have 560 and we're going to multiply it by 224, essentially adding 560 to itself 224 times.
Step 1: 0 + 560 = 560
Step 2: 560 + 560 = 1120
Step 3: 1120 + 560 = 1680
Step 4: 1680 + 560 = 2240
Step 5: 2240 + 560 = 2800
Step 6: 2800 + 560 = 3360
Step 7: 3360 + 560 = 3920
Step 8... | 14,384 |
-82358480 - -61770781 - -55736402 =
35148703 | 14,385 |
2024 * -676 =
-1368224 | 14,386 |
627 - -81 = ?
627 - -81 = 708 | 14,387 |
We divide 97490967 by 431
The aim is to understand the frequency of 431 in 97490967.
Going ahead to step 1:
The number 431 fits into 9 0 times, leaving a remainder of 9.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
Deduct 0 from 9 and we're left with 9.
Take the next digit (7) from the di... | 14,388 |
Alright, let's solve this problem step by step. We have 864791745 and 124771064, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 4 and the borrow 0 from 5 in column 1 and get 1.
1 is the first digit of our result.
Step 2: We'll start by subtracting the digit 6 and ... | 14,389 |
3803593 + 51136170 * -5327 =
-272398573997 | 14,390 |
-69 - 3601 =
-3670 | 14,391 |
327.42 ** 3.3 =
199456031.4772968 | 14,392 |
-57386868 + -12802900 - -47513530 =
-22676238 | 14,393 |
230 / 2355 =
0.1 | 14,394 |
-676.97 ** 4.8 =
(-31238550677678.723+22696135580584.305j) | 14,395 |
229 + -1650 = ?
229 + -1650 = -1421 | 14,396 |
-22118071 + 83546477 * -6192 =
-517341903655 | 14,397 |
-36.02 ** 2.55 =
(-1457.1991122480852+9200.393102139547j) | 14,398 |
We have numbers 7473 and 1617. Let's start adding them together.
Step 1: We'll start by adding the digits 3 & 7 in column 1 and get 10.
We'll write down the last digit 0 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 7 & 1 in column 2 and get 9.
Step 3: We'll start by adding the digits ... | 14,399 |
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