problem+solution stringlengths 10 16.4k | index int64 0 96.2k |
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51222775 + 21592486 + 86662449 + 51001351 + -87074345 =
123404716 | 4,400 |
-7120327 * -91231650 / 71 =
9149284235909.154 | 4,401 |
-69945652 + 95852862 + 15819016 + 32213636 + -5631527 =
68308335 | 4,402 |
50117098 ÷ 953
We want to divide 50117098 by 953.
Going ahead to step 1:
953 can be fit into 5 0 times, resulting in a remainder of 5.
The next digit of our result is 0.
Result so far: 0.0
If we subtract 0 from 5, we get 5.
Bring next digit (0) of the dividend behind the 5 and repeat the process: 50 / 953
On to ste... | 4,403 |
-415 - -978 = ?
-415 - -978 = 563 | 4,404 |
-49077681 - 94321507 - 45847693 =
-189246881 | 4,405 |
10 * 2336 =
23360 | 4,406 |
-1910050 + 24398574 + -19802895 =
2685629 | 4,407 |
1946 - 1338 =
608 | 4,408 |
129 - -840 = ?
129 - -840 = 969 | 4,409 |
Sure thing, let's get straight to it. We start with 82 and we're going to multiply it by 419, which means adding 82 to itself 419 times.
Step 1: 0 + 82 = 82
Step 2: 82 + 82 = 164
Step 3: 164 + 82 = 246
Step 4: 246 + 82 = 328
Step 5: 328 + 82 = 410
Step 6: 410 + 82 = 492
Step 7: 492 + 82 = 574
Step 8: 574 + 82 = 656
Ste... | 4,410 |
2268 / 895 =
2.53 | 4,411 |
Got it! So, we have 328057 and 20466, and we'll subtract the latter from the former.
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 6 and the borrow 0 from 5 in column 2 and get -1.
We add -... | 4,412 |
54041 ÷ 5 = 10808 R1
Alright, let's work through the division of 54041 by 5 step by step.
Step 1:
5 goes into 5 1 times with a remainder of 0.
Write down 1 as next digit of of the result.
Result so far: 1
Subtract 5 from 5 to get 0.
Bring next digit (4) of the dividend behind the 0 and repeat the process: 4 / 5
Step... | 4,413 |
7775 + 5925 = ?
7775 + 5925 = 13700 | 4,414 |
Alright, let's solve this problem step by step. We have 132124 and 12821, and we're subtracting the second number from the first.
Step 1: We'll start by subtracting the digit 1 and the borrow 0 from 4 in column 1 and get 3.
3 is the first digit of our result.
Step 2: We'll start by subtracting the digit 2 and the bor... | 4,415 |
Let's get this math done. We have 309286 and 22663, and we're going to subtract 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 6 and the borrow 0 from 8 in ... | 4,416 |
Okay, let's tackle this math problem. We're starting with 629442240 and subtracting 297089472.
Step 1: We'll start by subtracting the digit 2 and the borrow 0 from 0 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 7 and the borrow 1 from... | 4,417 |
-19214265 - -76324031 - -24518756 =
81628522 | 4,418 |
We have numbers 440413321 and 1195801719. Let's start adding them together.
Step 1: We'll start by adding the digits 1 & 9 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 2 & 1 in column 2 and get 4.
Step 3: We'll start by adding ... | 4,419 |
78872423 + -65389627 + 38542228 =
52025024 | 4,420 |
Got it! So, we have 172443926 and 124686107, and we'll subtract the latter from the former.
Step 1: We'll start by subtracting the digit 7 and the borrow 0 from 6 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 0 and the borrow 1 from 2 ... | 4,421 |
-413.96 ** 4.35 =
(109853958335.8345+215600532701.23312j) | 4,422 |
55931855 + -41961825 + -90890827 + -10972580 + 55879802 =
-32013575 | 4,423 |
No problem, let's work through this together. We're starting with 2240861168 and 8895755768 and adding them all up.
Step 1: We'll start by adding the digits 8 & 8 in column 1 and get 16.
We'll write down the last digit 6 and carry the 1 to the next column.
Step 2: We'll start by adding the digits 6 & 6 in column 2 an... | 4,424 |
884.27 ** 0.75 =
162.15810796983686 | 4,425 |
98528071 ÷ 633
We're looking to find how many times 633 goes into 98528071.
Let's proceed to step 1:
When dividing 9 by 633, we get 0 with a remainder of 9.
The next digit of our result is 0.
Result so far: 0.0
The remainder is 9 after subtracting 0 from 9.
Fetch the next digit (8) from the dividend, attach it to 9 ... | 4,426 |
No problem, let's work through this together. We're starting with 621838 and are subtracting 92386 from it.
Step 1: We'll start by subtracting the digit 6 and the borrow 0 from 8 in column 1 and get 2.
2 is the first digit of our result.
Step 2: We'll start by subtracting the digit 8 and the borrow 0 from 3 in column... | 4,427 |
2434802 - 75490381 - -88047008 =
14991429 | 4,428 |
Okay, we are given 8672 and 8290. Let's add them up step by step.
Step 1: We'll start by adding the digits 2 & 0 in column 1 and get 2.
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 start by adding the digits... | 4,429 |
804 + 703 =
1507 | 4,430 |
535 - 570 =
-35 | 4,431 |
-72785387 + 45709409 / 9 =
-67706563.77777778 | 4,432 |
32726877 + -34123643 * -5143 =
175530622826 | 4,433 |
50908429 + 69356080 / 5 =
64779645.0 | 4,434 |
Alright, let's work through 7536 times 2561 step by step
7536 × 2561 = 2561 × (7536)
+ 2561 × 6 which equals 15366
+ 2561 × 30 what gives us 76830
+ 2561 × 500 that results in 1280500
+ 2561 × 7000 that is equal 17927000
= 19299696
| 4,435 |
97362 ÷ 2 = 48681 R0
Let's divide 97362 by 2.
Step 1:
2 goes into 9 4 times with a remainder of 1.
Write down 4 as next digit of of the result.
Result so far: 4
Subtract 8 from 9 to get 1.
Bring next digit (7) of the dividend behind the 1 and repeat the process: 17 / 2
Step 2:
2 goes into 17 8 times with a remainder... | 4,436 |
-1454319 - -72454738 - 67251761 =
3748658 | 4,437 |
OK, let's do this. We've got 457778 and 48893, 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 8 in column 1 and get 5.
5 is the first digit of our result.
Step 2: We'll start by subtracting the digit 9 and the borrow 0 from 7 in column 2 an... | 4,438 |
We can solve this together! We're beginning with 879372003 and removing 521695182 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 8 and the borrow 0 from 0 in column 2 and get -8.
We... | 4,439 |
Sure thing, let's get straight to it. We start with 551 and we're going to multiply it by 419, which means adding 551 to itself 419 times.
Step 1: 0 + 551 = 551
Step 2: 551 + 551 = 1102
Step 3: 1102 + 551 = 1653
Step 4: 1653 + 551 = 2204
Step 5: 2204 + 551 = 2755
Step 6: 2755 + 551 = 3306
Step 7: 3306 + 551 = 3857
Step... | 4,440 |
762 - 3206 =
-2444 | 4,441 |
Alright, ready to do some subtraction? We're taking 683308872 and subtracting 414792617 from it.
Step 1: We'll start by subtracting the digit 7 and the borrow 0 from 2 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 1 and the borrow 1 fr... | 4,442 |
1478 - 518 =
960 | 4,443 |
68804042 * 33474675 / 59 =
39037168553158.48 | 4,444 |
2764 / 1763 =
1.57 | 4,445 |
-5765459 - 90538164 - -25239680 =
-71063943 | 4,446 |
1924 * -394 =
-758056 | 4,447 |
-720 * 866 =
-623520 | 4,448 |
-10517558 + 15359523 + 42150944 + -84222340 + 5055001 =
-32174430 | 4,449 |
-31464375 * 84456575 / 23 =
-115537971609375.0 | 4,450 |
Alright, let's solve this problem step by step. We have 9500678953 and 2704090039 and we're adding them together.
Step 1: We'll start by adding the digits 3 & 9 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 5 & 3 in column 2 and ... | 4,451 |
Okay, we are tasked with adding 1663692641 and 2079087757. Let's begin!
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 4 & 5 in column 2 and get 9.
Step 3: We'll start by adding the digits 6 & 7 in column 3 and get 13.
We'll write down the last digit 3 ... | 4,452 |
No problem, we've got 90202291 and 58317626 to multiply
90202291 × 58317626 = 58317626 × (90202291)
+ 58317626 × 1 what gives us 58317626
+ 58317626 × 90 what gives us 5248586340
+ 58317626 × 200 resulting in 11663525200
+ 58317626 × 2000 which equals 116635252000
+ 58317626 × 00000 yielding 0
+ 58317626 × 200000 produ... | 4,453 |
We are presented with 4797 and 8677. Let's work out the sum.
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 9 & 7 in column 2 and get 17.
We'll write down the last digit 7 and carry t... | 4,454 |
51841144 + -76530755 * -2699 =
206608348889 | 4,455 |
50327223 + -84672641 * -8915 =
754906921738 | 4,456 |
3732 - 15 =
3717 | 4,457 |
-681 - 588 = ?
-681 - 588 = -1269 | 4,458 |
1184 + -5650 = ?
1184 + -5650 = -4466 | 4,459 |
We are presented with 9110 and 9732. Let's work out the sum.
Step 1: We'll start by adding the digits 0 & 2 in column 1 and get 2.
Step 2: We'll start by adding the digits 1 & 3 in column 2 and get 4.
Step 3: We'll start by adding the digits 1 & 7 in column 3 and get 8.
Step 4: We'll start by adding the digits 9 & ... | 4,460 |
673 * 439 =
295447 | 4,461 |
-517.41 ** 3.8 =
(16616132753.57756-12072327096.45693j) | 4,462 |
-22845493 + -17734766 + 64917385 + -48115084 + 23464465 =
-313493 | 4,463 |
Okay, we are tasked with adding 2525 and 9948. Let's begin!
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 2 & 4 in column 2 and get 7.
Step 3: We'll start by adding the digits 5 & 9... | 4,464 |
81408575 - -42160766 - -65298849 =
188868190 | 4,465 |
OK, let's do this. We've got 797912245 and 489885024, 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 2 and the borrow 0 from 4 in colu... | 4,466 |
Sure thing! Let's multiply 25949011 and 88318146 together
25949011 × 88318146 = 88318146 × (25949011)
+ 88318146 × 1 that is equal 88318146
+ 88318146 × 10 that results in 883181460
+ 88318146 × 000 that results in 0
+ 88318146 × 9000 that results in 794863314000
+ 88318146 × 40000 that is equal 3532725840000
+ 8831814... | 4,467 |
739029 divided by 12
We want to figure out the number of times 739029 can be divided by 12.
Going ahead to step 1:
If we divide 7 by 12, we get 0 and a remainder of 7.
The number 0 becomes the next digit in our result.
Result so far: 0.0
If we subtract 0 from 7, we get 7.
Include the next digit (3) from the dividend... | 4,468 |
-40769658 + 74506552 / 24 =
-37665218.333333336 | 4,469 |
Alright, let's solve this problem step by step. We have 331512 and 63090, 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 2 in column 1 and get 2.
2 is the first digit of our result.
Step 2: We'll start by subtracting the digit 9 and the bor... | 4,470 |
2296 - 2779 =
-483 | 4,471 |
-38224797 + -24871286 * -3514 =
87359474207 | 4,472 |
No problem, we've got 5084 and 426 to multiply
5084 × 426 = 426 × (5084)
+ 426 × 4 yielding 1704
+ 426 × 80 that results in 34080
+ 426 × 000 giving us 0
+ 426 × 5000 that is equal 2130000
= 2165784
| 4,473 |
-602 - -29 = ?
-602 - -29 = -573 | 4,474 |
-675.84 ** 2.45 =
(1341065.4602442936+8467154.080895824j) | 4,475 |
33344539 + -25428389 + 63836060 =
71752210 | 4,476 |
2564 * 2839 =
7279196 | 4,477 |
We're dividing 61122587 by 251
Our goal is to divide 61122587 by 251.
On to step 1:
If we divide 6 by 251, we get 0 and a remainder of 6.
Write down 0 as next digit of the result.
Result so far: 0.0
If we take 0 away from 6, we end up with 6.
Grab the next digit (1) from the dividend, add it to 6, then carry on: 61 ... | 4,478 |
57676154 + -7202737 - 84816577 =
-34343160 | 4,479 |
OK, let's crack this. We're given 648 and our task is to multiply it by 293. Essentially, we'll be adding 648 to itself 293 times.
Step 1: 0 + 648 = 648
Step 2: 648 + 648 = 1296
Step 3: 1296 + 648 = 1944
Step 4: 1944 + 648 = 2592
Step 5: 2592 + 648 = 3240
Step 6: 3240 + 648 = 3888
Step 7: 3888 + 648 = 4536
Step 8: 4536... | 4,480 |
91516767 + 38756165 + 50628259 =
180901191 | 4,481 |
46262060 * -29932966 / 88 =
-15735916693976.818 | 4,482 |
-201 * -207 =
41607 | 4,483 |
1473 - 912 =
561 | 4,484 |
41206290 + -82470689 * 4563 =
-376272547617 | 4,485 |
31658947 + -70869304 / 13 =
26207462.076923076 | 4,486 |
121.95 ** 3.2 =
4740037.471018488 | 4,487 |
1643 / -126 =
-13.04 | 4,488 |
-9403 + -9114 = ?
-9403 + -9114 = -18517 | 4,489 |
55786093 + 33387290 * -2601 =
-86784555197 | 4,490 |
-101 - -268 = ?
-101 - -268 = 167 | 4,491 |
895 / 282 =
3.17 | 4,492 |
879.92 ** 3.15 =
1883631937.7451894 | 4,493 |
Let's calculate 80776800 x 91758795
80776800 × 91758795 = 91758795 × (80776800)
+ 91758795 × 0 resulting in 0
+ 91758795 × 00 resulting in 0
+ 91758795 × 800 that is equal 73407036000
+ 91758795 × 6000 giving us 550552770000
+ 91758795 × 70000 which equals 6423115650000
+ 91758795 × 700000 that is equal 64231156500000
... | 4,494 |
97224079 divided by 434
We want to figure out the number of times 97224079 can be divided by 434.
Advancing to step 1:
If we divide 9 by 434, we get 0 and a remainder of 9.
Use 0 as the next digit of our solution.
Result so far: 0.0
Deduct 0 from 9 and we're left with 9.
Include the next digit (7) from the dividend ... | 4,495 |
67013479 ÷ 756
We're looking to find how many times 756 goes into 67013479.
Moving on to step 1:
756 can be fit into 6 0 times, resulting in a remainder of 6.
Use 0 as the next digit of our solution.
Result so far: 0.0
If we subtract 0 from 6, we get 6.
Fetch the next digit (7) from the dividend, attach it to 6 and ... | 4,496 |
Alright, let's solve this math problem step by step. First, we have the number 844. Next, we see the multiplication sign, which means we need to multiply something. And what are we multiplying it by? We multiply it by 280. So, we're going to take the number 844 and add it to itself 280 times.
Step 1: 0 + 844 = 844
Step... | 4,497 |
-21883084 - 9936871 - -22645955 =
-9174000 | 4,498 |
-41754435 + 98901497 + 11575060 + -79060642 + 90078780 =
79740260 | 4,499 |
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