Long Division Calculator
The calculator will divide any two numbers (positive or negative, integer or decimal), with steps shown. Enter the dividend and the divisor and get the quotient to the given precision without remainder or quotient with remainder.
Enter two numbers: dividend and divisor:
x
divide by
x
Long division calculator is a division method that helps solve division problems visually and step by step. It is used to divide numbers, especially when the dividend and divisor are large. This method helps avoid mistakes and better understand the division process.
Long division calculator is useful in schools to teach children the basics of arithmetic. It can also be used by adults to perform quick calculations without using electronic devices. This method helps develop number skills and improves understanding of mathematical operations.
The main elements of the calculator:
Long division calculator is useful in schools to teach children the basics of arithmetic. It can also be used by adults to perform quick calculations without using electronic devices. This method helps develop number skills and improves understanding of mathematical operations.
The main elements of the calculator:
- Dividend: The number we are dividing.
- Divisor: The number we are dividing by.
- Result (quotient): The answer to the division.
- Remainder: The part of the dividend that is not divisible by the divisor.
Long Division is one of the traditional methods of performing arithmetic operations that allows you to divide numbers by writing them in columns. This method helps to better understand the division process and avoid mistakes, especially when working with large numbers. Let’s look at how to correctly perform long division.
Steps for Performing Long Division:
1. Writing the Numbers: Start by writing the dividend (the number being divided) and the divisor (the number by which we are dividing). The dividend is written on the right, and the divisor is on the left, with a vertical line between them.
2. Determining the First Digit: Look at the first digit of the dividend and determine how many times the divisor fits into this digit. If the divisor is larger, take the next digit as well.
3. Subtraction: Multiply the divisor by the found number and write the result under the dividend. Then subtract this number from the dividend.
4. Bringing Down the Next Digit: Bring down the next digit from the dividend next to the remainder.
5. Repeating the Process: Repeat steps 2-4 until all digits of the dividend have been used. If the remainder becomes smaller than the divisor, write down 0 and continue.
6. Writing the Result: Once all digits of the dividend have been used, write the result under the divisor, and if there is a remainder, it remains below.
Example:
Let’s consider an example of dividing 432 by 3. Here, 432 is the dividend, 3 is the divisor, 144 is the quotient, and 0 is the remainder.
1. Write: 432 and 3, placing a vertical line between them.
2. The first digit of the dividend is 4. Since 4 is greater than 3, it means that 4 can be divided by 3 once. Write 1 below the divisor.
3. Multiply 1 by the divisor. The result is 3, which we write under the first digit of the dividend. Then subtract: 4 minus 3 equals 1, which we write below the digit 3.
4. Bring down the next digit of the dividend, which is 3. As a result, we get the number 13.
5. Since 13 is greater than the divisor, it means that 13 can be divided by 3 four times. Write 4 in the next cell below the divisor.
6. Multiply 4 by the divisor and write the result, which is 12, below the number 13. Subtract from 13: 13 minus 12 equals 1. Write this below the number 12 but under the digit 2.
7. Bring down the next digit of the dividend, which is 2. As a result, we get the number 12.
8. Since 12 is greater than the divisor, it means that 12 can be divided by 3 four times. Write 4 in the next cell below the divisor.
9. Multiply 4 by the divisor and write the result, which is 12, below the number 12. Subtract from 12: 12 minus 12 equals 0.
10. All digits of the dividend have been used, and since the remainder from the last subtraction equals 0, it means that the calculation is complete.
Long division is a useful skill that will help you perform arithmetic operations more efficiently and accurately. Practice makes perfect, so don’t hesitate to practice with various examples using our calculator!
Steps for Performing Long Division:
1. Writing the Numbers: Start by writing the dividend (the number being divided) and the divisor (the number by which we are dividing). The dividend is written on the right, and the divisor is on the left, with a vertical line between them.
2. Determining the First Digit: Look at the first digit of the dividend and determine how many times the divisor fits into this digit. If the divisor is larger, take the next digit as well.
3. Subtraction: Multiply the divisor by the found number and write the result under the dividend. Then subtract this number from the dividend.
4. Bringing Down the Next Digit: Bring down the next digit from the dividend next to the remainder.
5. Repeating the Process: Repeat steps 2-4 until all digits of the dividend have been used. If the remainder becomes smaller than the divisor, write down 0 and continue.
6. Writing the Result: Once all digits of the dividend have been used, write the result under the divisor, and if there is a remainder, it remains below.
Example:
Let’s consider an example of dividing 432 by 3. Here, 432 is the dividend, 3 is the divisor, 144 is the quotient, and 0 is the remainder.
1. Write: 432 and 3, placing a vertical line between them.
2. The first digit of the dividend is 4. Since 4 is greater than 3, it means that 4 can be divided by 3 once. Write 1 below the divisor.
3. Multiply 1 by the divisor. The result is 3, which we write under the first digit of the dividend. Then subtract: 4 minus 3 equals 1, which we write below the digit 3.
4. Bring down the next digit of the dividend, which is 3. As a result, we get the number 13.
5. Since 13 is greater than the divisor, it means that 13 can be divided by 3 four times. Write 4 in the next cell below the divisor.
6. Multiply 4 by the divisor and write the result, which is 12, below the number 13. Subtract from 13: 13 minus 12 equals 1. Write this below the number 12 but under the digit 2.
7. Bring down the next digit of the dividend, which is 2. As a result, we get the number 12.
8. Since 12 is greater than the divisor, it means that 12 can be divided by 3 four times. Write 4 in the next cell below the divisor.
9. Multiply 4 by the divisor and write the result, which is 12, below the number 12. Subtract from 12: 12 minus 12 equals 0.
10. All digits of the dividend have been used, and since the remainder from the last subtraction equals 0, it means that the calculation is complete.
Long division is a useful skill that will help you perform arithmetic operations more efficiently and accurately. Practice makes perfect, so don’t hesitate to practice with various examples using our calculator!