problem+solution stringlengths 10 16.4k | index int64 0 96.2k |
|---|---|
-441.41 ** 1.5 =
(-1.703591099380871e-12-9273.918001320748j) | 9,600 |
We look at the division of 17259881 by 606
We want to figure out the number of times 17259881 can be divided by 606.
Moving on to step 1:
606 can be fit into 1 0 times, resulting in a remainder of 1.
The number 0 becomes the next digit in our result.
Result so far: 0.0
The remainder is 1 after subtracting 0 from 1.
... | 9,601 |
271 * 342 =
92682 | 9,602 |
We're dividing 26158761 by 893
We want to divide 26158761 by 893.
Moving on to step 1:
If we divide 2 by 893, we get 0 and a remainder of 2.
Record the quotient 0 as the next digit in the result.
Result so far: 0.0
Subtracting 0 from 2 leaves us with 2.
Grab the next digit (6) from the dividend, add it to 2, then ca... | 9,603 |
Alright, let's work through 90054762 times 72671409 step by step
90054762 × 72671409 = 72671409 × (90054762)
+ 72671409 × 2 which equals 145342818
+ 72671409 × 60 that equals 4360284540
+ 72671409 × 700 that results in 50869986300
+ 72671409 × 4000 that equals 290685636000
+ 72671409 × 50000 what gives us 3633570450000... | 9,604 |
-73460843 - 63919321 - 10197705 =
-147577869 | 9,605 |
8782 + 3953 = ?
8782 + 3953 = 12735 | 9,606 |
57645879 + -57336853 / -1 =
114982732.0 | 9,607 |
We look at the division of 18029508 by 647
Our goal is to divide 18029508 by 647.
Step 1:
647 can be fit into 1 0 times, resulting in a remainder of 1.
The number 0 becomes the next digit in our result.
Result so far: 0.0
If we take 0 away from 1, we end up with 1.
Bring next digit (8) of the dividend behind the 1 a... | 9,608 |
86023447 + 14289161 + -68754 =
100243854 | 9,609 |
Let's divide 311573 by 72
We want to divide 311573 by 72.
On to step 1:
72 can be fit into 3 0 times, resulting in a remainder of 3.
The next digit of our result is 0.
Result so far: 0.0
Subtracting 0 from 3 leaves us with 3.
Take the next digit (1) from the dividend and append it to 3, then repeat: 31 / 72
Step 2:
... | 9,610 |
603 - 300 = ?
603 - 300 = 303 | 9,611 |
1720 * 2276 =
3914720 | 9,612 |
We're going to solve 5001 multiplied by 2911
5001 × 2911 = 2911 × (5001)
+ 2911 × 1 that results in 2911
+ 2911 × 00 which equals 0
+ 2911 × 000 that results in 0
+ 2911 × 5000 that is equal 14555000
= 14557911
| 9,613 |
Sure thing! Let's multiply 9706 and 5279 together
9706 × 5279 = 5279 × (9706)
+ 5279 × 6 that is equal 31674
+ 5279 × 00 that results in 0
+ 5279 × 700 producing 3695300
+ 5279 × 9000 resulting in 47511000
= 51237974
| 9,614 |
3048 + 2514 =
5562 | 9,615 |
108 / 1004 =
0.11 | 9,616 |
-69624394 + 10938860 / -5 =
-71812166.0 | 9,617 |
We look at the division of 20082773 by 312
The aim is to understand the frequency of 312 in 20082773.
Advancing to step 1:
2 divided by 312 is 0 with a remainder of 2.
The number 0 becomes the next digit in our result.
Result so far: 0.0
If we subtract 0 from 2, we get 2.
Grab the next digit (0) from the dividend, a... | 9,618 |
-550 - -261 = ?
-550 - -261 = -289 | 9,619 |
-93105713 + -8898331 + 70307363 + -53177828 + 50139974 =
-34734535 | 9,620 |
We can solve this together! We're beginning with 897638313 and removing 419446362 from it.
Step 1: We'll start by subtracting the digit 2 and the borrow 0 from 3 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 the borrow 0 from 1 in column 2 and get -5.
We... | 9,621 |
Sure thing! We've got 6572 and 7826 and we're gonna add them together.
Step 1: We'll start by adding the digits 2 & 6 in column 1 and get 8.
Step 2: We'll start by adding the digits 7 & 2 in column 2 and get 9.
Step 3: We'll start by adding the digits 5 & 8 in column 3 and get 13.
We'll write down the last digit 3 a... | 9,622 |
Okay, we are tasked with adding 9767 and 9968. 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 6 & 6 in column 2 and get 13.
We'll write down the last digit 3 and carry th... | 9,623 |
1235 / 1399 =
0.88 | 9,624 |
777 - -137 = ?
777 - -137 = 914 | 9,625 |
-297.19 ** 3.4 =
(-79122247.81281887-243513239.51781297j) | 9,626 |
Alright, let's solve this problem step by step. We have 651566471 and 530985210, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 0 and the borrow 0 from 1 in column 1 and get 1.
1 is the first digit of our result.
Step 2: We'll start by subtracting the digit 1 and ... | 9,627 |
Sure thing! Let's multiply 1142 and 1234 together
1142 × 1234 = 1234 × (1142)
+ 1234 × 2 that is equal 2468
+ 1234 × 40 that is equal 49360
+ 1234 × 100 what gives us 123400
+ 1234 × 1000 resulting in 1234000
= 1409228
| 9,628 |
Ready to do some math? We're starting with 1643 and 9007 and adding them up.
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 4 & 0 in column 2 and get 5.
Step 3: We'll start by adding... | 9,629 |
We divide 435096 by 5
The aim is to understand the frequency of 5 in 435096.
Advancing to step 1:
If we divide 4 by 5, we get 0 and a remainder of 4.
Put 0 as the next digit of the answer.
Result so far: 0.0
Subtract 0 from 4 to get 4.
Bring next digit (3) of the dividend behind the 4 and repeat the process: 43 / 5
... | 9,630 |
46847 ÷ 3 = 15615 R2
Let's divide 46847 by 3.
Step 1:
3 goes into 4 1 times with a remainder of 1.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 3 from 4 to get 1.
Bring next digit (6) of the dividend behind the 1 and repeat the process: 16 / 3
Step 2:
3 goes into 16 5 times with a remainder... | 9,631 |
2386 - 108 =
2278 | 9,632 |
Let's dive into this subtraction. We'll start with 900760161 and subtract 807113679 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 7 and the borrow 1 from 6... | 9,633 |
We're going to solve 36118210 multiplied by 690498
36118210 × 690498 = 690498 × (36118210)
+ 690498 × 0 that is equal 0
+ 690498 × 10 which equals 6904980
+ 690498 × 200 what gives us 138099600
+ 690498 × 8000 that equals 5523984000
+ 690498 × 10000 what gives us 6904980000
+ 690498 × 100000 that equals 69049800000
+ 6... | 9,634 |
Alright, ready to do some subtraction? We're taking 634039 and subtracting 91850 from it.
Step 1: We'll start by subtracting the digit 0 and the borrow 0 from 9 in column 1 and get 9.
9 is the first digit of our result.
Step 2: We'll start by subtracting the digit 5 and the borrow 0 from 3 in column 2 and get -2.
We ... | 9,635 |
209 * 1522 =
318098 | 9,636 |
88065701 - -82838249 - -19554583 =
190458533 | 9,637 |
OK, let's do this. We've got 687297896 and 368604624, 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 6 in column 1 and get 2.
2 is the first digit of our result.
Step 2: We'll start by subtracting the digit 2 and the borrow 0 from 9 in colu... | 9,638 |
-267 - -744 = ?
-267 - -744 = 477 | 9,639 |
-39187970 + 28697945 + 65387097 + -26246166 + 36905724 =
65556630 | 9,640 |
Alright, let's work through 8222 times 350 step by step
8222 × 350 = 350 × (8222)
+ 350 × 2 resulting in 700
+ 350 × 20 that results in 7000
+ 350 × 200 resulting in 70000
+ 350 × 8000 that equals 2800000
= 2877700
| 9,641 |
We have numbers 9231 and 2310. Let's start adding them together.
Step 1: We'll start by adding the digits 1 & 0 in column 1 and get 1.
Step 2: We'll start by adding the digits 3 & 1 in column 2 and get 4.
Step 3: We'll start by adding the digits 2 & 3 in column 3 and get 5.
Step 4: We'll start by adding the digits ... | 9,642 |
32582 ÷ 2 = 16291 R0
Alright, let's work through the division of 32582 by 2 step by step.
Step 1:
2 goes into 3 1 times with a remainder of 1.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 2 from 3 to get 1.
Bring next digit (2) of the dividend behind the 1 and repeat the process: 12 / 2
Ste... | 9,643 |
We can solve this together! We're beginning with 673650808 and removing 236457403 from it.
Step 1: We'll start by subtracting the digit 3 and the borrow 0 from 8 in column 1 and get 5.
5 is the first digit of our result.
Step 2: We'll start by subtracting the digit 0 and the borrow 0 from 0 in column 2 and get 0.
0 i... | 9,644 |
We can solve this together! We're beginning with 601605242 and removing 223649482 from it.
Step 1: We'll start by subtracting the digit 2 and the borrow 0 from 2 in column 1 and get 0.
0 is the first digit of our result.
Step 2: We'll start by subtracting the digit 8 and the borrow 0 from 4 in column 2 and get -4.
We... | 9,645 |
11599156 + -64033563 * 1639 =
-104939410601 | 9,646 |
We're going to solve 6361 multiplied by 8259
6361 × 8259 = 8259 × (6361)
+ 8259 × 1 giving us 8259
+ 8259 × 60 that equals 495540
+ 8259 × 300 what gives us 2477700
+ 8259 × 6000 which equals 49554000
= 52535499
| 9,647 |
-68451485 + 79168790 * 5939 =
470114992325 | 9,648 |
1106 - 3215 =
-2109 | 9,649 |
Let's divide 68598065 by 977
We want to figure out the number of times 68598065 can be divided by 977.
On to step 1:
When dividing 6 by 977, we get 0 with a remainder of 6.
The next digit of our result is 0.
Result so far: 0.0
Deduct 0 from 6 and we're left with 6.
Grab the next digit (8) from the dividend, add it to... | 9,650 |
Ready to do some math? We're starting with 451600478 and 2618272990 and adding them up.
Step 1: We'll start by adding the digits 8 & 0 in column 1 and get 8.
Step 2: We'll start by adding the digits 7 & 9 in column 2 and get 16.
We'll write down the last digit 6 and carry the 1 to the next column.
Step 3: We'll star... | 9,651 |
10808214 + 77647549 + -63004658 =
25451105 | 9,652 |
52882 ÷ 4 = 13220 R2
Sure thing! Let's divide 52882 by 4 together.
Step 1:
4 goes into 5 1 times with a remainder of 1.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 4 from 5 to get 1.
Bring next digit (2) of the dividend behind the 1 and repeat the process: 12 / 4
Step 2:
4 goes into 12 3 t... | 9,653 |
We're dividing 69910150 by 756
We want to divide 69910150 by 756.
Let's proceed to step 1:
If we divide 6 by 756, we get 0 and a remainder of 6.
Use 0 as the next digit of our solution.
Result so far: 0.0
If we take 0 away from 6, we end up with 6.
Take the next digit (9) from the dividend and append it to 6, then r... | 9,654 |
-72965599 + -83317457 - -3487028 =
-152796028 | 9,655 |
We're dividing 518484 by 79
Our goal is to divide 518484 by 79.
On to step 1:
If we divide 5 by 79, we get 0 and a remainder of 5.
Put 0 as the next digit of the answer.
Result so far: 0.0
Deduct 0 from 5 and we're left with 5.
Append the next digit (1) from the dividend to 5 and continue with: 51 / 79
Step 2:
The ... | 9,656 |
Let's roll up our sleeves and solve this. We have 431 and we're going to multiply it by 82, essentially adding 431 to itself 82 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
Step 8: 30... | 9,657 |
We can solve this together! We're beginning with 958643087 and removing 106398156 from it.
Step 1: We'll start by subtracting the digit 6 and the borrow 0 from 7 in column 1 and get 1.
1 is the first digit of our result.
Step 2: We'll start by subtracting the digit 5 and the borrow 0 from 8 in column 2 and get 3.
3 i... | 9,658 |
-665 * 2705 =
-1798825 | 9,659 |
We are presented with 6550 and 7697. Let's work out the sum.
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 5 & 9 in column 2 and get 14.
We'll write down the last digit 4 and carry the 1 to the next column.
Step 3: We'll start by adding the digits 5 & ... | 9,660 |
60787288 + 6168366 + 14842518 + -2806878 + -75465254 =
3526040 | 9,661 |
-76320782 + -48768202 + 5867865 =
-119221119 | 9,662 |
-85584401 + -40227670 * -1362 =
54704502139 | 9,663 |
-18888661 + -32395811 + 25072413 =
-26212059 | 9,664 |
We are presented with 4387 and 6910. Let's work out the sum.
Step 1: We'll start by adding the digits 7 & 0 in column 1 and get 7.
Step 2: We'll start by adding the digits 8 & 1 in column 2 and get 9.
Step 3: We'll start by adding the digits 3 & 9 in column 3 and get 12.
We'll write down the last digit 2 and carry t... | 9,665 |
191 - 923 =
-732 | 9,666 |
Let's divide 9151894 by 99
Let's see how many times 99 fits into 9151894.
On to step 1:
99 goes into 9 0 times with a remainder of 9.
Put 0 as the next digit of the answer.
Result so far: 0.0
Subtract 0 from 9 to get 9.
Grab the next digit (1) from the dividend, add it to 9, then carry on: 91 / 99
Moving on to step ... | 9,667 |
2419 - 1921 =
498 | 9,668 |
Alright, let's solve this problem step by step. We have 557764979 and 372992372, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 2 and the borrow 0 from 9 in column 1 and get 7.
7 is the first digit of our result.
Step 2: We'll start by subtracting the digit 7 and ... | 9,669 |
3699 + 3146 =
6845 | 9,670 |
43195541 + 3082794 * -477 =
-1427297197 | 9,671 |
OK, let's work through this together. We're starting with 372 and we're going to multiply it by 224, which means we add 372 to itself 224 times.
Step 1: 0 + 372 = 372
Step 2: 372 + 372 = 744
Step 3: 744 + 372 = 1116
Step 4: 1116 + 372 = 1488
Step 5: 1488 + 372 = 1860
Step 6: 1860 + 372 = 2232
Step 7: 2232 + 372 = 2604
... | 9,672 |
-90276351 - -90462932 - 61351637 =
-61165056 | 9,673 |
323 * 583 =
188309 | 9,674 |
539 * -828 =
-446292 | 9,675 |
-53746384 * -29556839 / 19 =
83609116774746.11 | 9,676 |
34855759 + -68391236 / 23 =
31882227.0 | 9,677 |
We divide 351001 by 29
Our goal is to divide 351001 by 29.
Going ahead to step 1:
29 can be fit into 3 0 times, resulting in a remainder of 3.
Write down 0 as next digit of the result.
Result so far: 0.0
If we subtract 0 from 3, we get 3.
Append the next digit (5) from the dividend to 3 and continue with: 35 / 29
St... | 9,678 |
Let's calculate 94278857 x 38982682
94278857 × 38982682 = 38982682 × (94278857)
+ 38982682 × 7 that is equal 272878774
+ 38982682 × 50 that results in 1949134100
+ 38982682 × 800 that results in 31186145600
+ 38982682 × 8000 resulting in 311861456000
+ 38982682 × 70000 that equals 2728787740000
+ 38982682 × 200000 whic... | 9,679 |
We've got two numbers: 9992 and 3164. Let's find their sum.
Step 1: We'll start by adding the digits 2 & 4 in column 1 and get 6.
Step 2: We'll start by adding the digits 9 & 6 in column 2 and get 15.
We'll write down the last digit 5 and carry the 1 to the next column.
Step 3: We'll start by adding the digits 9 & 1... | 9,680 |
914468 divided by 75
Let's see how many times 75 fits into 914468.
Advancing to step 1:
The number 75 fits into 9 0 times, leaving a remainder of 9.
The next digit of our result is 0.
Result so far: 0.0
Deduct 0 from 9 and we're left with 9.
Append the next digit (1) from the dividend to 9 and continue with: 91 / 75... | 9,681 |
We're going to solve 20297103 multiplied by 7721249
20297103 × 7721249 = 7721249 × (20297103)
+ 7721249 × 3 producing 23163747
+ 7721249 × 00 what gives us 0
+ 7721249 × 100 that equals 772124900
+ 7721249 × 7000 producing 54048743000
+ 7721249 × 90000 producing 694912410000
+ 7721249 × 200000 that results in 154424980... | 9,682 |
531 - 832 = ?
531 - 832 = -301 | 9,683 |
Sure thing! We've got 260 and we're gonna multiply it by 43. That's the same as adding 260 to itself 43 times.
Step 1: 0 + 260 = 260
Step 2: 260 + 260 = 520
Step 3: 520 + 260 = 780
Step 4: 780 + 260 = 1040
Step 5: 1040 + 260 = 1300
Step 6: 1300 + 260 = 1560
Step 7: 1560 + 260 = 1820
Step 8: 1820 + 260 = 2080
Step 9: 20... | 9,684 |
-246 - -850 = ?
-246 - -850 = 604 | 9,685 |
We look at the division of 55563059 by 71
Our goal is to divide 55563059 by 71.
Advancing to step 1:
If we divide 5 by 71, we get 0 and a remainder of 5.
The number 0 becomes the next digit in our result.
Result so far: 0.0
If we subtract 0 from 5, we get 5.
Fetch the next digit (5) from the dividend, attach it to 5... | 9,686 |
27338737 + -28132136 * 9177 =
-258141273335 | 9,687 |
Let's calculate 8760 x 9783
8760 × 9783 = 9783 × (8760)
+ 9783 × 0 giving us 0
+ 9783 × 60 that results in 586980
+ 9783 × 700 what gives us 6848100
+ 9783 × 8000 resulting in 78264000
= 85699080
| 9,688 |
-766 - 771 = ?
-766 - 771 = -1537 | 9,689 |
-985 - -111 = ?
-985 - -111 = -874 | 9,690 |
Let's get this math done. We have 882 and we're going to multiply it by 417. This is the same as taking 882 and adding it to itself 417 times.
Step 1: 0 + 882 = 882
Step 2: 882 + 882 = 1764
Step 3: 1764 + 882 = 2646
Step 4: 2646 + 882 = 3528
Step 5: 3528 + 882 = 4410
Step 6: 4410 + 882 = 5292
Step 7: 5292 + 882 = 6174
... | 9,691 |
-78392087 - 74221930 - -69562045 =
-83051972 | 9,692 |
2873 + 116 =
2989 | 9,693 |
-9126 + 6699 = ?
-9126 + 6699 = -2427 | 9,694 |
4547 + -6464 = ?
4547 + -6464 = -1917 | 9,695 |
962 * 107 =
102934 | 9,696 |
51912 ÷ 1 = 51912 R0
No problem, we've got 51912 and 1 for the division.
Step 1:
1 goes into 5 5 times with a remainder of 0.
Write down 5 as next digit of of the result.
Result so far: 5
Subtract 5 from 5 to get 0.
Bring next digit (1) of the dividend behind the 0 and repeat the process: 1 / 1
Step 2:
1 goes into 1... | 9,697 |
Alright, let's solve this math problem step by step. First, we have the number 723. Next, we see the multiplication sign, which means we need to multiply something. And what are we multiplying it by? We multiply it by 249. So, we're going to take the number 723 and add it to itself 249 times.
Step 1: 0 + 723 = 723
Step... | 9,698 |
93545876 + -94919532 + -48721543 + 44957352 + -13092558 =
-18230405 | 9,699 |
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