problem+solution stringlengths 10 16.4k | index int64 0 96.2k |
|---|---|
-15775649 + 28397131 + 28993368 + 98605791 + -75124589 =
65096052 | 15,600 |
724 * 858 =
621192 | 15,601 |
-70342432 - -11443740 - -96609034 =
37710342 | 15,602 |
Alright, let's solve this problem step by step. We have 805315567 and 95581629, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 9 and the borrow 0 from 7 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 subt... | 15,603 |
7660 + 6763 = ?
7660 + 6763 = 14423 | 15,604 |
No problem, we've got 86680940 and 45526684 to multiply
86680940 × 45526684 = 45526684 × (86680940)
+ 45526684 × 0 which equals 0
+ 45526684 × 40 resulting in 1821067360
+ 45526684 × 900 producing 40974015600
+ 45526684 × 0000 giving us 0
+ 45526684 × 80000 that equals 3642134720000
+ 45526684 × 600000 giving us 273160... | 15,605 |
19315676 + 10403321 * 7064 =
73508375220 | 15,606 |
Alright, let's work through 932 times 4469 step by step
932 × 4469 = 4469 × (932)
+ 4469 × 2 that is equal 8938
+ 4469 × 30 which equals 134070
+ 4469 × 900 that equals 4022100
= 4165108
| 15,607 |
-792.22 ** 2.35 =
(2946689.665800974+5783204.094564448j) | 15,608 |
2752 / 947 =
2.91 | 15,609 |
Okay, let's tackle this math problem. We're starting with 422763 and subtracting 54941.
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 4 and the borrow 0 from 6 in column 2 and get 2.
2 is t... | 15,610 |
681 * 1895 =
1290495 | 15,611 |
859 - -635 = ?
859 - -635 = 1494 | 15,612 |
No problem, we've got 6439 and 966 to multiply
6439 × 966 = 966 × (6439)
+ 966 × 9 producing 8694
+ 966 × 30 that equals 28980
+ 966 × 400 giving us 386400
+ 966 × 6000 that is equal 5796000
= 6220074
| 15,613 |
-3644334 + -14573286 / 13 =
-4765356.0 | 15,614 |
44027083 + -62157688 - 7427636 =
-25558241 | 15,615 |
Here we go! We're going to add 7777518552 and 8576575119 together.
Step 1: We'll start by adding the digits 2 & 9 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 5 & 1 in column 2 and get 7.
Step 3: We'll start by adding the digit... | 15,616 |
OK, let's do this. We've got 515720566 and 43303053, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 3 and the borrow 0 from 6 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 the borrow 0 from 6 in colum... | 15,617 |
We divide 78267323 by 531
Our goal is to divide 78267323 by 531.
Advancing to step 1:
7 divided by 531 is 0 with a remainder of 7.
Write down 0 as next digit of the result.
Result so far: 0.0
Subtract 0 from 7 to get 7.
Fetch the next digit (8) from the dividend, attach it to 7 and continue: 78 / 531
Moving on to st... | 15,618 |
2520 * 1143 =
2880360 | 15,619 |
Alright, let's work through 98397189 times 74751931 step by step
98397189 × 74751931 = 74751931 × (98397189)
+ 74751931 × 9 resulting in 672767379
+ 74751931 × 80 resulting in 5980154480
+ 74751931 × 100 yielding 7475193100
+ 74751931 × 7000 yielding 523263517000
+ 74751931 × 90000 producing 6727673790000
+ 74751931 × ... | 15,620 |
83482744 + 35771245 + -71715320 =
47538669 | 15,621 |
98579584 ÷ 973
We want to divide 98579584 by 973.
Advancing to step 1:
When dividing 9 by 973, we get 0 with 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.
Grab the next digit (8) from the dividend, add it to 9, then carry on: 98 / 973
Moving on... | 15,622 |
Okay, we are tasked with adding 9337 and 3648. Let's begin!
Step 1: We'll start by adding the digits 7 & 8 in column 1 and get 15.
We'll write down the last digit 5 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 3 & 4 in column 2 and get 8.
Step 3: We'll start by adding the digits 3 & 6... | 15,623 |
-15267386 + 57284613 / -5 =
-26724308.6 | 15,624 |
222406 ÷ 77
We want to divide 222406 by 77.
On to step 1:
2 divided by 77 is 0 with a remainder of 2.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
Deduct 0 from 2 and we're left with 2.
Bring next digit (2) of the dividend behind the 2 and repeat the process: 22 / 77
Advancing to step 2... | 15,625 |
1996 / -218 =
-9.16 | 15,626 |
48753240 + 52320071 + -70694117 + 31670899 + 45970113 =
108020206 | 15,627 |
73591464 - -40772469 - -32692572 =
147056505 | 15,628 |
7455 + 1893 = ?
7455 + 1893 = 9348 | 15,629 |
OK, let's crack this. We're given 378 and our task is to multiply it by 316. Essentially, we'll be adding 378 to itself 316 times.
Step 1: 0 + 378 = 378
Step 2: 378 + 378 = 756
Step 3: 756 + 378 = 1134
Step 4: 1134 + 378 = 1512
Step 5: 1512 + 378 = 1890
Step 6: 1890 + 378 = 2268
Step 7: 2268 + 378 = 2646
Step 8: 2646 +... | 15,630 |
-17688351 + 69123703 + 18792700 =
70228052 | 15,631 |
6228148 * 26062867 / 56 =
2898632017505.643 | 15,632 |
-59 + 1666 =
1607 | 15,633 |
We are presented with 6705 and 8907. Let's work out the sum.
Step 1: We'll start by adding the digits 5 & 7 in column 1 and get 12.
We'll write down the last digit 2 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 0 & 0 in column 2 and get 1.
Step 3: We'll start by adding the digits 7 & ... | 15,634 |
Let's calculate 21005155 x 791072
21005155 × 791072 = 791072 × (21005155)
+ 791072 × 5 that results in 3955360
+ 791072 × 50 that is equal 39553600
+ 791072 × 100 producing 79107200
+ 791072 × 5000 which equals 3955360000
+ 791072 × 00000 resulting in 0
+ 791072 × 000000 that results in 0
+ 791072 × 1000000 producing 7... | 15,635 |
We can solve this together! We're beginning with 654429390 and removing 321212138 from it.
Step 1: We'll start by subtracting the digit 8 and the borrow 0 from 0 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 3 and the borrow 1 from 9 i... | 15,636 |
1827 / -768 =
-2.38 | 15,637 |
-55448462 - -15382213 - 99704629 =
-139770878 | 15,638 |
Sure thing! Let's multiply 5154 and 7223 together
5154 × 7223 = 7223 × (5154)
+ 7223 × 4 what gives us 28892
+ 7223 × 50 that equals 361150
+ 7223 × 100 resulting in 722300
+ 7223 × 5000 that is equal 36115000
= 37227342
| 15,639 |
OK, let's crack this. We're given 121 and our task is to multiply it by 82. Essentially, we'll be adding 121 to itself 82 times.
Step 1: 0 + 121 = 121
Step 2: 121 + 121 = 242
Step 3: 242 + 121 = 363
Step 4: 363 + 121 = 484
Step 5: 484 + 121 = 605
Step 6: 605 + 121 = 726
Step 7: 726 + 121 = 847
Step 8: 847 + 121 = 968
S... | 15,640 |
-21059430 + -90386513 * -191 =
17242764553 | 15,641 |
-86933700 + -19578537 / 16 =
-88157358.5625 | 15,642 |
72097873 + 28719423 / 23 =
73346543.56521739 | 15,643 |
638891 divided by 44
The aim is to understand the frequency of 44 in 638891.
Moving on to step 1:
44 goes into 6 0 times with a remainder of 6.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
Subtracting 0 from 6 leaves us with 6.
Bring next digit (3) of the dividend behind the 6 and repeat... | 15,644 |
47008802 * 58645114 / 85 =
32433371203452.094 | 15,645 |
-10598141 * -77958970 / 95 =
8697054276576.526 | 15,646 |
2025 - 1785 =
240 | 15,647 |
Sure thing! Let's multiply 63361969 and 9746812 together
63361969 × 9746812 = 9746812 × (63361969)
+ 9746812 × 9 producing 87721308
+ 9746812 × 60 that is equal 584808720
+ 9746812 × 900 that is equal 8772130800
+ 9746812 × 1000 which equals 9746812000
+ 9746812 × 60000 yielding 584808720000
+ 9746812 × 300000 that res... | 15,648 |
33411988 + 84691101 / 25 =
36799632.04 | 15,649 |
545.5 ** 4.65 =
5322254163692.417 | 15,650 |
90624 ÷ 6 = 15104 R0
Let's divide 90624 by 6.
Step 1:
6 goes into 9 1 times with a remainder of 3.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 6 from 9 to get 3.
Bring next digit (0) of the dividend behind the 3 and repeat the process: 30 / 6
Step 2:
6 goes into 30 5 times with a remainder... | 15,651 |
-675 - -895 = ?
-675 - -895 = 220 | 15,652 |
No problem, we've got 3115 and 1934 to multiply
3115 × 1934 = 1934 × (3115)
+ 1934 × 5 that is equal 9670
+ 1934 × 10 that equals 19340
+ 1934 × 100 yielding 193400
+ 1934 × 3000 that results in 5802000
= 6024410
| 15,653 |
-3536 + -8508 = ?
-3536 + -8508 = -12044 | 15,654 |
Let's solve this addition problem. We have 9629734117 and 4998497652, and we need to add them together.
Step 1: We'll start by adding the digits 7 & 2 in column 1 and get 9.
Step 2: We'll start by adding the digits 1 & 5 in column 2 and get 6.
Step 3: We'll start by adding the digits 1 & 6 in column 3 and get 7.
St... | 15,655 |
-541.54 ** 1.65 =
(14707.44242320034-28864.98100888513j) | 15,656 |
32176124 - 94140238 - -11823612 =
-50140502 | 15,657 |
2352 * 1997 =
4696944 | 15,658 |
194 - 812 = ?
194 - 812 = -618 | 15,659 |
Okay, let's tackle this math problem. We're starting with 12045 and subtracting 7041.
Step 1: We'll start by subtracting the digit 1 and the borrow 0 from 5 in column 1 and get 4.
4 is the first digit of our result.
Step 2: We'll start by subtracting the digit 4 and the borrow 0 from 4 in column 2 and get 0.
0 is the... | 15,660 |
We can solve this together! We're beginning with 308296 and removing 50199 from it.
Step 1: We'll start by subtracting the digit 9 and the borrow 0 from 6 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 9 and the borrow 1 from 9 in colum... | 15,661 |
Let's divide 564133 by 78
Our goal is to divide 564133 by 78.
Moving on to step 1:
If we divide 5 by 78, we get 0 and a remainder of 5.
Write down 0 as next digit of the result.
Result so far: 0.0
If we take 0 away from 5, we end up with 5.
Grab the next digit (6) from the dividend, add it to 5, then carry on: 56 / 7... | 15,662 |
Okay, we are tasked with adding 9894377577 and 1853908447. Let's begin!
Step 1: We'll start by adding the digits 7 & 7 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 7 & 4 in column 2 and get 12.
We'll write down the last digit 2 ... | 15,663 |
We look at the division of 403474 by 47
We want to divide 403474 by 47.
Advancing to step 1:
The number 47 fits into 4 0 times, leaving a remainder of 4.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
Deduct 0 from 4 and we're left with 4.
Append the next digit (0) from the dividend to 4 a... | 15,664 |
OK, let's do this. We've got 224021403 and 14009458, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 8 and the borrow 0 from 3 in column 1 and get -5.
We add -5 to 10 and get 5 as the first digit of the result.
Step 2: We'll start by subtracting the digit 5 and the... | 15,665 |
1158 * 686 =
794388 | 15,666 |
Let's calculate 4130 x 6654
4130 × 6654 = 6654 × (4130)
+ 6654 × 0 that is equal 0
+ 6654 × 30 producing 199620
+ 6654 × 100 which equals 665400
+ 6654 × 4000 that is equal 26616000
= 27481020
| 15,667 |
We are presented with 6278503694 and 2327124038. Let's work out the sum.
Step 1: We'll start by adding the digits 4 & 8 in column 1 and get 12.
We'll write down the last digit 2 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 9 & 3 in column 2 and get 13.
We'll write down the last digit 3... | 15,668 |
We're going to solve 4764 multiplied by 6613
4764 × 6613 = 6613 × (4764)
+ 6613 × 4 yielding 26452
+ 6613 × 60 that equals 396780
+ 6613 × 700 what gives us 4629100
+ 6613 × 4000 giving us 26452000
= 31504332
| 15,669 |
We're dividing 39936197 by 320
We want to divide 39936197 by 320.
Going ahead to step 1:
320 can be fit into 3 0 times, resulting in a remainder of 3.
Use 0 as the next digit of our solution.
Result so far: 0.0
If we take 0 away from 3, we end up with 3.
Include the next digit (9) from the dividend after 3, then rep... | 15,670 |
Okay, let's tackle this math problem. We're starting with 881910874 and subtracting 557650588.
Step 1: We'll start by subtracting the digit 8 and the borrow 0 from 4 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... | 15,671 |
OK, let's crack this. We're given 579 and our task is to multiply it by 77. Essentially, we'll be adding 579 to itself 77 times.
Step 1: 0 + 579 = 579
Step 2: 579 + 579 = 1158
Step 3: 1158 + 579 = 1737
Step 4: 1737 + 579 = 2316
Step 5: 2316 + 579 = 2895
Step 6: 2895 + 579 = 3474
Step 7: 3474 + 579 = 4053
Step 8: 4053 +... | 15,672 |
Alright, ready to do some subtraction? We're taking 448553 and subtracting 45570 from it.
Step 1: We'll start by subtracting the digit 0 and the borrow 0 from 3 in column 1 and get 3.
3 is the first digit of our result.
Step 2: We'll start by subtracting the digit 7 and the borrow 0 from 5 in column 2 and get -2.
We ... | 15,673 |
Okay, we are tasked with adding 8637 and 5723. Let's begin!
Step 1: We'll start by adding the digits 7 & 3 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 3 & 2 in column 2 and get 6.
Step 3: We'll start by adding the digits 6 & 7... | 15,674 |
Alright, let's work through 8983 times 108 step by step
8983 × 108 = 108 × (8983)
+ 108 × 3 resulting in 324
+ 108 × 80 that equals 8640
+ 108 × 900 producing 97200
+ 108 × 8000 that is equal 864000
= 970164
| 15,675 |
1446 + 3490 =
4936 | 15,676 |
38487270 + 76389686 + -89430814 + 73308778 + -10460529 =
88294391 | 15,677 |
-6292921 + -91823886 / 2 =
-52204864.0 | 15,678 |
Without delay, let's solve this. We've got 188 and we will be multiplying it by 157, that is, adding 188 to itself 157 times.
Step 1: 0 + 188 = 188
Step 2: 188 + 188 = 376
Step 3: 376 + 188 = 564
Step 4: 564 + 188 = 752
Step 5: 752 + 188 = 940
Step 6: 940 + 188 = 1128
Step 7: 1128 + 188 = 1316
Step 8: 1316 + 188 = 1504... | 15,679 |
Okay, let's tackle this math problem. We're starting with 858269288 and subtracting 16143105.
Step 1: We'll start by subtracting the digit 5 and the borrow 0 from 8 in column 1 and get 3.
3 is the first digit of our result.
Step 2: We'll start by subtracting the digit 0 and the borrow 0 from 8 in column 2 and get 8.
... | 15,680 |
2752 + 3665 =
6417 | 15,681 |
85948368 + -31641795 - 2768452 =
51538121 | 15,682 |
1526 / 2843 =
0.54 | 15,683 |
1387648 + -88781823 / 21 =
-2840057.8571428573 | 15,684 |
-5512 + -1607 = ?
-5512 + -1607 = -7119 | 15,685 |
2402 + 2592 =
4994 | 15,686 |
2217 - 3314 =
-1097 | 15,687 |
-46984186 + -94260324 + 97298525 =
-43945985 | 15,688 |
-515.03 ** 2.25 =
(893528.0445241221+893528.0445241218j) | 15,689 |
-48566934 + 74571123 / -7 =
-59219951.57142857 | 15,690 |
-10033578 + 75652868 - 92217680 =
-26598390 | 15,691 |
2120 - 3251 =
-1131 | 15,692 |
1410 + 2045 =
3455 | 15,693 |
Sure thing! Let's multiply 4819 and 2494 together
4819 × 2494 = 2494 × (4819)
+ 2494 × 9 that equals 22446
+ 2494 × 10 that results in 24940
+ 2494 × 800 which equals 1995200
+ 2494 × 4000 producing 9976000
= 12018586
| 15,694 |
321 - 621 =
-300 | 15,695 |
380 - 91 =
289 | 15,696 |
21906532 + -58545836 + 24397077 =
-12242227 | 15,697 |
72981904 - 98308948 - -6493382 =
-18833662 | 15,698 |
-7867 + -9356 = ?
-7867 + -9356 = -17223 | 15,699 |
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