Find the quotient and remainder using long division calculator

How to do Long Division with Decimal

Solved Example for Long Division

Dividing Whole Numbers With No Remainder

Dividing Whole Numbers With Remainder

Dividing Decimal Numbers With No Remainder

Dividing Decimal Numbers With Decimal Remainder

Question

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How to do Long Division with Decimal
Solved Example for Long Division
How do you calculate Long Division step by step?

Long division calculator with step by step work for 3rd grade, 4th grade, 5th grade and 6th grade students to verify the results of long division problems with or without remainder. Generate work with steps for 2 by 1, 3 by 2, 3 by 1, 4 by 3, 4 by 2, 4 by 1, 5 by 4, 5 by 3, 5 by 2, 6 by 4, 6 by 3 and 6 by 2 digits long division practice or homework problems.

Result
Quotient :	859
Remainder :	3

Calculation and Summary

	859
11	945288 65 55 102 99 3

Dividend : 9452
Divisor : 11
Quotient : 859
Remainder : 3

Just supply the values of dividend, divisor and hit on ENTER button to find the Quotient and Remainder in decimal. The step by step work reveals how to do long division between different combination of dividend and divisor. By using this long division calculator, users can perform division with remainder or without remainder which comprises large numbers.

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What is the Quotient and Remainder for 9452 divided by 11 using long division method?

The below solved example of 4 by 2 digit long division with remainder may useful to understand how to do long division manually for assignment, classwork and homework problems.

Arrange the 4-digit dividend and 2-digit divisor numbers for long division method and compare if the the first two digits of dividend 9452 is bigger than the divisor 11.
Check how many times the divisor can be accommodated in the 94 and write the value as part of quotient. The divisor 11 can be accommodated 8-times in 94. Write 8 as the most significant digit of quotient.
Find the difference between 94 and product of 8 and 11, if any. 6 is the difference between 94 and 88.
Bring down the 3rd digit of initial dividend and append (not adding) it to the right side of remainder 6 to form the new dividend. Hence, the new dividend becomes 65
Compare if the new dividend 65 is greater than the divisor 11 and check how many times the divisor can be accommodated in the new dividend formed by brining down the 3rd digit. The divisor 11 can be accommodated 5-times in 65. Append the value 5 (number of times) right to the earlier quotient 8. Hence, the remainder becomes 85 now.
Find the difference between 65 and product of 5 and 11, if any. 10 is the difference between 65 and 55.
Bring down and append 4th digit 2 to the right side of earlier difference 10. Hence the new dividend becomes 102.
Check how many times the divisor 11 can be accommodated in the new dividend formed by brining down the 4th digit. The divisor 11 can be accommodated 9-times in 102. Append the value 9 (number of times) right to the earlier quotient 85. Hence, the remainder becomes 859 now.
Check for the difference between 102 and the product of 11 and 9. Due to no more digits available for bringing down, the final difference 3 is the decimal Remainder of dividend 9452 divided by 11.

This long division calculator supports large number divisions.Use this long division calculator which supports large numbers in divison. Users can supply up to 9-digit dividend and up to 7-digit divisor to perform or verify the long divison problems. You may go to long divison learning resources to enjoy countless practice problems to sharpen your math skills.

To show you how to do long division I will give the actual calculator results involving four common long division scenarios:

Dividing whole numbers with no remainder.
Dividing whole numbers with whole remainder.
Dividing decimal numbers with no remainder.
Dividing decimal numbers with decimal remainder.

To follow the steps I took as I proceeded through each long division example, tap the info (i) icon on each row of the division process.

	« Quotient
Divisor »	3	1443	« Dividend

Multiples of 3
1	3
2	6
3	9
4	12
5	15
6	18
7	21
8	24
9	27

		1	2	3	4
		0	4	8	1
	3	1	4	4	3
Since 3 is greater than 1 you enter a zero in the 1st answer position and then combine the digit 1 with the digit from the next position in the dividend (4 in column #2) in order to form a number that is greater than or equal to the 3. That new number is 14. Since the greatest multiple of 3 that divides into 14 without going over is 4 (4 x 3 = 12), you enter 4 in the 2nd answer position and 12 in the subtraction row. Since 14 minus 12 leaves a remainder of 2 you enter 2 on the next line. Then move the next dividend digit (4 in column #3) down to that line to form the new subtrahend of 24.	-	1	2
Since the greatest multiple of 3 that divides into 24 without going over is 8 (8 x 3 = 24), you enter 8 in the 3rd answer position and 24 in the subtraction row. Since 24 minus 24 leaves a remainder of 0 you enter 0 on the next line. Then move the next dividend digit (3 in column #4) down to that line to form the new subtrahend of 03.			2	4
-		2	4
Since the greatest multiple of 3 that divides into 3 without going over is 1 (1 x 3 = 3), you enter 1 in the 4th answer position and 3 in the subtraction row. Since 3 minus 3 leaves a remainder of 0 you enter 0 on the next line.				0	3
-				3
Since all dividend digits have been moved down, and the remainder is zero, the problem is solved.					0
-

Since 3 x 481 does equal 1443, our solution checks out.

	« Quotient
Divisor »	5	123	« Dividend

Multiples of 5
1	5
2	10
3	15
4	20
5	25
6	30
7	35
8	40
9	45

		1	2	3
		0	2	4
	5	1	2	3
Since 5 is greater than 1 you enter a zero in the 1st answer position and then combine the digit 1 with the digit from the next position in the dividend (2 in column #2) in order to form a number that is greater than or equal to the 5. That new number is 12. Since the greatest multiple of 5 that divides into 12 without going over is 2 (2 x 5 = 10), you enter 2 in the 2nd answer position and 10 in the subtraction row. Since 12 minus 10 leaves a remainder of 2 you enter 2 on the next line. Then move the next dividend digit (3 in column #3) down to that line to form the new subtrahend of 23.	-	1	0
Since the greatest multiple of 5 that divides into 23 without going over is 4 (4 x 5 = 20), you enter 4 in the 3rd answer position and 20 in the subtraction row. Since 23 minus 20 leaves a remainder of 3 you enter 3 on the next line.			2	3
-		2	0
Since all dividend digits have been moved down and you are left with the number 3, the remainder is 3.				3

Since 5 x 24 + 3 does equal 123, our solution checks out.

	« Quotient
Divisor »	5.5	220	« Dividend

Multiples of 55
1	55
2	110
3	165
4	220
5	275
6	330
7	385
8	440
9	495

Since 5.5 x 40 does equal 220, our solution checks out.

The first step in solving the problem is to get rid of the decimal point in the divisor 5.5.
To do that, you move the decimal point 1 place to the right in both the divisor 5.5 and the dividend 220.
Moving the decimal point 1 place to the right in the divisor changes it to 55.
Since the dividend (220) has no decimal places, you simply add a zero for each decimal place you moved in the divisor. This leaves you with a new dividend of 2200.
Note that a vertical red line indicates the position of the decimal point within the quotient (if applicable).

Since 55 is greater than 2 you enter a zero in the 1st quotient position and then combine the digit 2 with the digit from the next position in the dividend (2 in column #2) in an attempt to form a number that is greater than or equal to the 55. That new number is 22.
Since 55 is greater than 22 you enter a zero in the 2nd quotient position and then combine the digits 22 with the digit from the next position in the dividend (0 in column #3) in an attempt to form a number that is greater than or equal to the 55. That new number is 220.
Since the greatest multiple of 55 that divides into 220 without going over is 4 (4 x 55 = 220), you enter 4 in the 3rd quotient position and 220 in the subtraction row.
Since 220 minus 220 leaves a remainder of 0 you enter 0 on the next line. Then move the next dividend digit (0 in column #4) down to that line to form the new subtrahend of 00.

The problem appears to be solved.

	« Quotient
Divisor »	3.33	99.99	« Dividend

Multiples of 333

1	333
2	666
3	999
4	1332
5	1665
6	1998
7	2331
8	2664
9	2997

				1	2	3	4	5	6	7	8	9	10	11	12	13
				0	0	3	0	0	2	7	0	2	7	0	2	7
The first step in solving the problem is to get rid of the decimal point in the divisor 3.33. To do that, you move the decimal point 2 places to the right in both the divisor 3.33 and the dividend 99.99. Moving the decimal point 2 places to the right in the divisor changes it to 333. Since the dividend (99.99) already has 2 decimal places, you simply move the decimal point 2 places to the right. This leaves you with a new dividend of 9999. Next, continue to add zeros to the dividend as needed until you either solve the division, or you reach the desired number of decimal places. Note that a vertical red line indicates the position of the decimal point within the quotient (if applicable).	3	3	3	9	9	9	9	0	0	0	0	0	0	0	0	0
Since 333 is greater than 9 you enter a zero in the 1st quotient position and then combine the digit 9 with the digit from the next position in the dividend (9 in column #2) in an attempt to form a number that is greater than or equal to the 333. That new number is 99. Since 333 is greater than 99 you enter a zero in the 2nd quotient position and then combine the digits 99 with the digit from the next position in the dividend (9 in column #3) in an attempt to form a number that is greater than or equal to the 333. That new number is 999. Since the greatest multiple of 333 that divides into 999 without going over is 3 (3 x 333 = 999), you enter 3 in the 3rd quotient position and 999 in the subtraction row. Since 999 minus 999 leaves a remainder of 0 you enter 0 on the next line. Then move the next dividend digit (9 in column #4) down to that line to form the new subtrahend of 09.	-	9	9	9
Since 333 is greater than 9 you enter a zero in the 4th quotient position and then combine the digits 9 with the digit from the next position in the dividend (0 in column #5) in an attempt to form a number that is greater than or equal to the 333. That new number is 90. Since 333 is greater than 90 you enter a zero in the 5th quotient position and then combine the digits 90 with the digit from the next position in the dividend (0 in column #6) in an attempt to form a number that is greater than or equal to the 333. That new number is 900. Since the greatest multiple of 333 that divides into 900 without going over is 2 (2 x 333 = 666), you enter 2 in the 6th quotient position and 666 in the subtraction row. Since 900 minus 666 leaves a remainder of 234 you enter 234 on the next line. Then move the next dividend digit (0 in column #7) down to that line to form the new subtrahend of 2340.				0	9	0	0
-				6	6	6
Since the greatest multiple of 333 that divides into 2340 without going over is 7 (7 x 333 = 2331), you enter 7 in the 7th quotient position and 2331 in the subtraction row. Since 2340 minus 2331 leaves a remainder of 9 you enter 9 on the next line. Then move the next dividend digit (0 in column #8) down to that line to form the new subtrahend of 90.					2	3	4	0
-				2	3	3	1
Since 333 is greater than 90 you enter a zero in the 8th quotient position and then combine the digits 90 with the digit from the next position in the dividend (0 in column #9) in an attempt to form a number that is greater than or equal to the 333. That new number is 900. Since the greatest multiple of 333 that divides into 900 without going over is 2 (2 x 333 = 666), you enter 2 in the 9th quotient position and 666 in the subtraction row. Since 900 minus 666 leaves a remainder of 234 you enter 234 on the next line. Then move the next dividend digit (0 in column #10) down to that line to form the new subtrahend of 2340.								9	0	0
-							6	6	6
Since the greatest multiple of 333 that divides into 2340 without going over is 7 (7 x 333 = 2331), you enter 7 in the 10th quotient position and 2331 in the subtraction row. Since 2340 minus 2331 leaves a remainder of 9 you enter 9 on the next line. Then move the next dividend digit (0 in column #11) down to that line to form the new subtrahend of 90.								2	3	4	0
-							2	3	3	1
Since 333 is greater than 90 you enter a zero in the 11th quotient position and then combine the digits 90 with the digit from the next position in the dividend (0 in column #12) in an attempt to form a number that is greater than or equal to the 333. That new number is 900. Since the greatest multiple of 333 that divides into 900 without going over is 2 (2 x 333 = 666), you enter 2 in the 12th quotient position and 666 in the subtraction row. Since 900 minus 666 leaves a remainder of 234 you enter 234 on the next line. Then move the next dividend digit (0 in column #13) down to that line to form the new subtrahend of 2340.											9	0	0
-										6	6	6
Since the greatest multiple of 333 that divides into 2340 without going over is 7 (7 x 333 = 2331), you enter 7 in the 13th quotient position and 2331 in the subtraction row. Since 2340 minus 2331 leaves a remainder of 9 you enter 9 on the next line.											2	3	4	0
-										2	3	3	1
It appears the calculator ran out of room before it could complete the long division.														9
-

Since 3.33 x 30.027027027 does not equal 99.99, either the calculator ran out of room before the long division was completed, the quotient contains a recurring decimal, or there is a rounding issue between the calculated result and the long division result. In this case it appears to be a repeating decimal.

I hope I"ve managed to help you to understand how to perform long division. If not, please use the feedback form beneath the calculator to let me know what I have left out.