problem+solution stringlengths 10 16.4k | index int64 0 96.2k |
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Alright, let's solve this problem step by step. We have 736389959 and 468168656, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 6 and the borrow 0 from 9 in column 1 and get 3.
3 is the first digit of our result.
Step 2: We'll start by subtracting the digit 5 and ... | 16,400 |
3 - 839 =
-836 | 16,401 |
Alright, let's solve this problem step by step. We have 1035 and 2228 and we're adding them together.
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 3 & 2 in column 2 and get 6.
Step... | 16,402 |
-693.2 ** 2.25 =
(1743479.1125861797+1743479.1125861788j) | 16,403 |
15521631 + 98458349 + -36823192 =
77156788 | 16,404 |
26833074 + 22073353 + 79823429 =
128729856 | 16,405 |
-52571846 * 98416184 / 53 =
-97621140927465.36 | 16,406 |
8974 + 1647 = ?
8974 + 1647 = 10621 | 16,407 |
76570430 * 15703151 / 44 =
27327205100566.59 | 16,408 |
3035 + 865 =
3900 | 16,409 |
2050 + 2416 =
4466 | 16,410 |
Let's break this down. We're going to add 9326806283 and 6685886808 together.
Step 1: We'll start by adding the digits 3 & 8 in column 1 and get 11.
We'll write down the last digit 1 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 8 & 0 in column 2 and get 9.
Step 3: We'll start by addin... | 16,411 |
-319.27 ** 4.95 =
(-2455854216051.5596+388969095527.9784j) | 16,412 |
Let's calculate 60508132 x 36320221
60508132 × 36320221 = 36320221 × (60508132)
+ 36320221 × 2 producing 72640442
+ 36320221 × 30 what gives us 1089606630
+ 36320221 × 100 which equals 3632022100
+ 36320221 × 8000 producing 290561768000
+ 36320221 × 00000 that results in 0
+ 36320221 × 500000 resulting in 1816011050000... | 16,413 |
-37871093 + -14568085 * -4550 =
66246915657 | 16,414 |
-401 * 1277 =
-512077 | 16,415 |
Let's get this math done. We have 653230 and 16811, 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 0 in column 1 and get -1.
We add -1 to 10 and get 9 as the first digit of the result.
Step 2: We'll start by subtracting the digit 1 an... | 16,416 |
Here we go! We're going to add 9961 and 2977 together.
Step 1: We'll start by adding the digits 1 & 7 in column 1 and get 8.
Step 2: We'll start by adding the digits 6 & 7 in column 2 and get 13.
We'll write down the last digit 3 and carry the 1 to the next column.
Step 3: We'll start by adding the digits 9 & 9 in c... | 16,417 |
Got it! So, we have 540353 and 31711, and we'll subtract the latter from the former.
Step 1: We'll start by subtracting the digit 1 and the borrow 0 from 3 in column 1 and get 2.
2 is the first digit of our result.
Step 2: We'll start by subtracting the digit 1 and the borrow 0 from 5 in column 2 and get 4.
4 is the ... | 16,418 |
47325 ÷ 8 = 5915 R5
We're going to perform division on 47325 with 8 as the divisor.
Step 1:
8 goes into 4 0 times with a remainder of 4.
Write down 0 as next digit of of the result.
Result so far: 0
Subtract 0 from 4 to get 4.
Bring next digit (7) of the dividend behind the 4 and repeat the process: 47 / 8
Step 2:
8... | 16,419 |
-487.99 ** 1.45 =
(-1237.451763418723-7812.962945622256j) | 16,420 |
947411 ÷ 45
The aim is to understand the frequency of 45 in 947411.
Let's proceed to step 1:
45 can be fit into 9 0 times, resulting in a remainder of 9.
Write down 0 as next digit of the result.
Result so far: 0.0
Deduct 0 from 9 and we're left with 9.
Include the next digit (4) from the dividend after 9, then repe... | 16,421 |
We're dividing 789495 by 50
We're looking to find how many times 50 goes into 789495.
Moving on to step 1:
50 goes into 7 0 times with a remainder of 7.
Use 0 as the next digit of our solution.
Result so far: 0.0
Deduct 0 from 7 and we're left with 7.
Bring next digit (8) of the dividend behind the 7 and repeat the ... | 16,422 |
53805818 + 27675498 + 30848926 + 67548750 + 56698494 =
236577486 | 16,423 |
Alright, let's solve this problem step by step. We have 6155 and 8611 and we're adding them together.
Step 1: We'll start by adding the digits 5 & 1 in column 1 and get 6.
Step 2: We'll start by adding the digits 5 & 1 in column 2 and get 6.
Step 3: We'll start by adding the digits 1 & 6 in column 3 and get 7.
Step... | 16,424 |
We look at the division of 48712 by 49
Let's see how many times 49 fits into 48712.
Advancing to step 1:
When dividing 4 by 49, we get 0 with a remainder of 4.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
If we take 0 away from 4, we end up with 4.
Fetch the next digit (8) from the divid... | 16,425 |
No problem, we've got 2398 and 283 to multiply
2398 × 283 = 283 × (2398)
+ 283 × 8 which equals 2264
+ 283 × 90 resulting in 25470
+ 283 × 300 giving us 84900
+ 283 × 2000 producing 566000
= 678634
| 16,426 |
We can solve this together! We're beginning with 75347 and removing 23733 from it.
Step 1: We'll start by subtracting the digit 3 and the borrow 0 from 7 in column 1 and get 4.
4 is the first digit of our result.
Step 2: We'll start by subtracting the digit 3 and the borrow 0 from 4 in column 2 and get 1.
1 is the ne... | 16,427 |
41842603 + -67850223 + -37809335 =
-63816955 | 16,428 |
Got it! So, we have 542365442 and 363860854, and we'll subtract the latter from the former.
Step 1: We'll start by subtracting the digit 4 and the borrow 0 from 2 in column 1 and get -2.
We add -2 to 10 and get 8 as the first digit of the result.
Step 2: We'll start by subtracting the digit 5 and the borrow 1 from 4 ... | 16,429 |
27221 ÷ 3 = 9073 R2
Let's divide 27221 by 3.
Step 1:
3 goes into 2 0 times with a remainder of 2.
Write down 0 as next digit of of the result.
Result so far: 0
Subtract 0 from 2 to get 2.
Bring next digit (7) of the dividend behind the 2 and repeat the process: 27 / 3
Step 2:
3 goes into 27 9 times with a remainder ... | 16,430 |
-61255605 + -62905442 + -50094792 =
-174255839 | 16,431 |
-889 - -359 = ?
-889 - -359 = -530 | 16,432 |
1358 * 2296 =
3117968 | 16,433 |
We're going to solve 6274986 multiplied by 14178653
6274986 × 14178653 = 14178653 × (6274986)
+ 14178653 × 6 that equals 85071918
+ 14178653 × 80 giving us 1134292240
+ 14178653 × 900 that equals 12760787700
+ 14178653 × 4000 giving us 56714612000
+ 14178653 × 70000 resulting in 992505710000
+ 14178653 × 200000 produci... | 16,434 |
12214061 + 59487895 / 24 =
14692723.291666666 | 16,435 |
-9069575 + -34273190 + 2229770 =
-41112995 | 16,436 |
-86575052 + 92048905 - 80686427 =
-75212574 | 16,437 |
3381 + -6583 = ?
3381 + -6583 = -3202 | 16,438 |
Alright, let's work through 26710571 times 80103150 step by step
26710571 × 80103150 = 80103150 × (26710571)
+ 80103150 × 1 that results in 80103150
+ 80103150 × 70 yielding 5607220500
+ 80103150 × 500 giving us 40051575000
+ 80103150 × 0000 producing 0
+ 80103150 × 10000 that is equal 801031500000
+ 80103150 × 700000 ... | 16,439 |
Let's roll up our sleeves and solve this. We have 99 and we're going to multiply it by 28, essentially adding 99 to itself 28 times.
Step 1: 0 + 99 = 99
Step 2: 99 + 99 = 198
Step 3: 198 + 99 = 297
Step 4: 297 + 99 = 396
Step 5: 396 + 99 = 495
Step 6: 495 + 99 = 594
Step 7: 594 + 99 = 693
Step 8: 693 + 99 = 792
Step 9:... | 16,440 |
1607 - 460 =
1147 | 16,441 |
-73120379 - -43158524 - -75595594 =
45633739 | 16,442 |
-90341129 + 76065708 + 21748540 =
7473119 | 16,443 |
Let's get this math done. We have 1641 and 2746 and we're going to add them all together.
Step 1: We'll start by adding the digits 1 & 6 in column 1 and get 7.
Step 2: We'll start by adding the digits 4 & 4 in column 2 and get 8.
Step 3: We'll start by adding the digits 6 & 7 in column 3 and get 13.
We'll write down... | 16,444 |
OK, let's do this. We've got 831162 and 73835, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 5 and the borrow 0 from 2 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 3 and the borro... | 16,445 |
3652 - 2675 =
977 | 16,446 |
No problem, we've got 46412967 and 99578513 to multiply
46412967 × 99578513 = 99578513 × (46412967)
+ 99578513 × 7 yielding 697049591
+ 99578513 × 60 yielding 5974710780
+ 99578513 × 900 giving us 89620661700
+ 99578513 × 2000 giving us 199157026000
+ 99578513 × 10000 giving us 995785130000
+ 99578513 × 400000 yielding... | 16,447 |
Let's calculate 7507 x 2663
7507 × 2663 = 2663 × (7507)
+ 2663 × 7 that is equal 18641
+ 2663 × 00 giving us 0
+ 2663 × 500 yielding 1331500
+ 2663 × 7000 which equals 18641000
= 19991141
| 16,448 |
Let's divide 79555974 by 145
We want to divide 79555974 by 145.
Going ahead to step 1:
145 goes into 7 0 times with a remainder of 7.
Put 0 as the next digit of the answer.
Result so far: 0.0
If we subtract 0 from 7, we get 7.
Append the next digit (9) from the dividend to 7 and continue with: 79 / 145
On to step 2:... | 16,449 |
-7984250 + -20114223 - 95408401 =
-123506874 | 16,450 |
323132 ÷ 13
The aim is to understand the frequency of 13 in 323132.
Let's proceed to step 1:
If we divide 3 by 13, we get 0 and a remainder of 3.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
The remainder is 3 after subtracting 0 from 3.
Fetch the next digit (2) from the dividend, attach... | 16,451 |
3247 + 1615 =
4862 | 16,452 |
-77813391 + -48869081 * -6421 =
313710555710 | 16,453 |
Let's calculate 2974 x 1006
2974 × 1006 = 1006 × (2974)
+ 1006 × 4 that results in 4024
+ 1006 × 70 what gives us 70420
+ 1006 × 900 that equals 905400
+ 1006 × 2000 what gives us 2012000
= 2991844
| 16,454 |
Alright, ready to do some subtraction? We're taking 79941 and subtracting 9359 from it.
Step 1: We'll start by subtracting the digit 9 and the borrow 0 from 1 in column 1 and get -8.
We add -8 to 10 and get 2 as the first digit of the result.
Step 2: We'll start by subtracting the digit 5 and the borrow 1 from 4 in c... | 16,455 |
Let's roll up our sleeves and solve this. We have 104 and we're going to multiply it by 392, essentially adding 104 to itself 392 times.
Step 1: 0 + 104 = 104
Step 2: 104 + 104 = 208
Step 3: 208 + 104 = 312
Step 4: 312 + 104 = 416
Step 5: 416 + 104 = 520
Step 6: 520 + 104 = 624
Step 7: 624 + 104 = 728
Step 8: 728 + 104... | 16,456 |
46230694 + 54005269 / 5 =
57031747.8 | 16,457 |
71651444 + 80015897 - -53078567 =
204745908 | 16,458 |
-37231158 + -11105382 - 49974115 =
-98310655 | 16,459 |
We've got two numbers: 5135 and 2559. Let's find their sum.
Step 1: We'll start by adding the digits 5 & 9 in column 1 and get 14.
We'll write down the last digit 4 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 3 & 5 in column 2 and get 9.
Step 3: We'll start by adding the digits 1 & 5... | 16,460 |
Let's break this down. We're going to add 147760601 and 8274354673 together.
Step 1: We'll start by adding the digits 1 & 3 in column 1 and get 4.
Step 2: We'll start by adding the digits 0 & 7 in column 2 and get 7.
Step 3: We'll start by adding the digits 6 & 6 in column 3 and get 12.
We'll write down the last dig... | 16,461 |
-77407842 + 29289897 + 59824701 + -94750995 + -66101243 =
-149145482 | 16,462 |
90312190 + -40378221 - -94293072 =
144227041 | 16,463 |
We have numbers 5033 and 9603. Let's start adding them together.
Step 1: We'll start by adding the digits 3 & 3 in column 1 and get 6.
Step 2: We'll start by adding the digits 3 & 0 in column 2 and get 3.
Step 3: We'll start by adding the digits 0 & 6 in column 3 and get 6.
Step 4: We'll start by adding the digits ... | 16,464 |
10828 ÷ 9 = 1203 R1
Sure thing! Let's divide 10828 by 9 together.
Step 1:
9 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 (0) of the dividend behind the 1 and repeat the process: 10 / 9
Step 2:
9 goes into 10 1 ti... | 16,465 |
Sure thing! We've got 933523544 and 779673674, and we're going to subtract the second number from the first.
Step 1: We'll start by subtracting the digit 4 and the borrow 0 from 4 in column 1 and get 0.
0 is the first digit of our result.
Step 2: We'll start by subtracting the digit 7 and the borrow 0 from 4 in colum... | 16,466 |
-31 - 2503 =
-2534 | 16,467 |
71346297 + 80660620 + -16201829 + -13805492 + 59098499 =
181098095 | 16,468 |
913 * -136 =
-124168 | 16,469 |
Sure thing! Let's multiply 42093381 and 65079658 together
42093381 × 65079658 = 65079658 × (42093381)
+ 65079658 × 1 that is equal 65079658
+ 65079658 × 80 giving us 5206372640
+ 65079658 × 300 what gives us 19523897400
+ 65079658 × 3000 producing 195238974000
+ 65079658 × 90000 which equals 5857169220000
+ 65079658 × ... | 16,470 |
-80 - -399 = ?
-80 - -399 = 319 | 16,471 |
We're going to solve 1810 multiplied by 5223
1810 × 5223 = 5223 × (1810)
+ 5223 × 0 giving us 0
+ 5223 × 10 that results in 52230
+ 5223 × 800 producing 4178400
+ 5223 × 1000 that equals 5223000
= 9453630
| 16,472 |
-349 - -658 = ?
-349 - -658 = 309 | 16,473 |
Alright, ready to do some subtraction? We're taking 889999 and subtracting 77784 from it.
Step 1: We'll start by subtracting the digit 4 and the borrow 0 from 9 in column 1 and get 5.
5 is the first digit of our result.
Step 2: We'll start by subtracting the digit 8 and the borrow 0 from 9 in column 2 and get 1.
1 is... | 16,474 |
-38637677 * -44778679 / 90 =
19223823729874.254 | 16,475 |
-87756156 + -15940416 * -3503 =
55751521092 | 16,476 |
-993 - -860 = ?
-993 - -860 = -133 | 16,477 |
253 + 843 =
1096 | 16,478 |
-645.13 ** 0.75 =
(-90.51497393604967+90.51497393604969j) | 16,479 |
78805563 ÷ 226
Let's see how many times 226 fits into 78805563.
Moving on to step 1:
226 goes into 7 0 times with a remainder of 7.
The number 0 becomes the next digit in our result.
Result so far: 0.0
Subtracting 0 from 7 leaves us with 7.
Include the next digit (8) from the dividend after 7, then repeat: 78 / 226
... | 16,480 |
OK, let's do this. We've got 9149 and 6851 and we're adding them all together.
Step 1: We'll start by adding the digits 9 & 1 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 4 & 5 in column 2 and get 10.
We'll write down the last d... | 16,481 |
85706 ÷ 6 = 14284 R2
Sure thing! Let's divide 85706 by 6 together.
Step 1:
6 goes into 8 1 times with a remainder of 2.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 6 from 8 to get 2.
Bring next digit (5) of the dividend behind the 2 and repeat the process: 25 / 6
Step 2:
6 goes into 25 4 t... | 16,482 |
Ready to do some math? We're starting with 1726940106 and 4636210775 and adding them up.
Step 1: We'll start by adding the digits 6 & 5 in column 1 and get 11.
We'll write down the last digit 1 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 0 & 7 in column 2 and get 8.
Step 3: We'll sta... | 16,483 |
Let's get this math done. We have 1408 and 8181 and we're going to add them all together.
Step 1: We'll start by adding the digits 8 & 1 in column 1 and get 9.
Step 2: We'll start by adding the digits 0 & 8 in column 2 and get 8.
Step 3: We'll start by adding the digits 4 & 1 in column 3 and get 5.
Step 4: We'll st... | 16,484 |
-73280815 + 52238554 / 4 =
-60221176.5 | 16,485 |
-67487041 * 47945833 / 88 =
-36769572698297.195 | 16,486 |
-75821623 + -88085085 / 9 =
-85608854.66666667 | 16,487 |
3453 + -4536 = ?
3453 + -4536 = -1083 | 16,488 |
26923 ÷ 3 = 8974 R1
Let's divide 26923 by 3.
Step 1:
3 goes into 2 0 times with a remainder of 2.
Write down 0 as next digit of of the result.
Result so far: 0
Subtract 0 from 2 to get 2.
Bring next digit (6) of the dividend behind the 2 and repeat the process: 26 / 3
Step 2:
3 goes into 26 8 times with a remainder ... | 16,489 |
430 - 687 =
-257 | 16,490 |
Not to worry, we've got 7824 and 1774. Let's get to adding them!
Step 1: We'll start by adding the digits 4 & 4 in column 1 and get 8.
Step 2: We'll start by adding the digits 2 & 7 in column 2 and get 9.
Step 3: We'll start by adding the digits 8 & 7 in column 3 and get 15.
We'll write down the last digit 5 and car... | 16,491 |
-77249156 + 5826379 / 4 =
-75792561.25 | 16,492 |
Let's calculate 5353 x 2853
5353 × 2853 = 2853 × (5353)
+ 2853 × 3 giving us 8559
+ 2853 × 50 giving us 142650
+ 2853 × 300 giving us 855900
+ 2853 × 5000 that results in 14265000
= 15272109
| 16,493 |
We look at the division of 38552579 by 958
The aim is to understand the frequency of 958 in 38552579.
Step 1:
3 divided by 958 is 0 with a remainder of 3.
The next digit of our result is 0.
Result so far: 0.0
Deduct 0 from 3 and we're left with 3.
Append the next digit (8) from the dividend to 3 and continue with: 3... | 16,494 |
OK, let's crack this. We're given 114 and our task is to multiply it by 449. Essentially, we'll be adding 114 to itself 449 times.
Step 1: 0 + 114 = 114
Step 2: 114 + 114 = 228
Step 3: 228 + 114 = 342
Step 4: 342 + 114 = 456
Step 5: 456 + 114 = 570
Step 6: 570 + 114 = 684
Step 7: 684 + 114 = 798
Step 8: 798 + 114 = 912... | 16,495 |
478 + -4198 = ?
478 + -4198 = -3720 | 16,496 |
693.23 ** 2.55 =
17548388.457367353 | 16,497 |
333 + 3952 = ?
333 + 3952 = 4285 | 16,498 |
-64517141 + 108741 - 52486463 =
-116894863 | 16,499 |
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