Long Division Method Definition And Solved Example

Long Division Method Definition And Solved Example Dividing decimals using a long division. long division can also be used to divide decimal numbers into equal groups. it follows the same steps as that of long division, namely, – divide, multiply, subtract, bring down and repeat or find the remainder. here’s an example of long division with decimals. Verify using the long division method. ans: here, we divided 75 by 3. so, the dividend is 75 and the divisor is 3. division of 75 by 3. hence, we get the quotient as 25 & remainder as 0. to check division we will put the value. dividend = (divisor × quotient) remainder. therefore, 75 = 3 × 25 0 = 75. example 3.

Long Division Steps Calculator Examples Solution: the steps of this long division are given below: step 1: here, the first digit of the dividend is 4 and it is equal to the divisor. so, 4 ÷ 4 = 1. so, 1 is written on top as the first digit of the quotient. step 2: subtract 4 4 = 0. bring the second digit of the dividend down and place it beside 0. Solve 339 ÷ 3. 1. the 3 in the hundreds place of the dividend is divisible by 3, giving us a value of 1 to write first in the quotient. 2. now, we can write a 3 underneath the 3 in the hundreds place, and subtract. this should give us a value of 0. 3. we can then drag the three in the tens place down next to our 0. 4. Step i: write 27 inside the bracket and 9 on the left side of the bracket. step ii: start division from left to right, that is, divide 2 by 9. since, we cannot divide 2 by 9 so, we will divide 27 by 9. step iii: recall the table of 9. 9 × 3 = 27. now, write 3 in the quotient and subtract 27 from 27. the result is 0. thus, 27 ÷ 9 = 3. 2. Bring down the next digit of the dividend. 175 ÷ 25 = 7 remainder 0. divide this number by the divisor. the whole number result is placed at the top. any remainders are ignored at this point. 25 × 7 = 175. the answer from the above operation is multiplied by the divisor. the result is placed under the number divided into.

Long Division Examples And How To Solve Them Step i: write 27 inside the bracket and 9 on the left side of the bracket. step ii: start division from left to right, that is, divide 2 by 9. since, we cannot divide 2 by 9 so, we will divide 27 by 9. step iii: recall the table of 9. 9 × 3 = 27. now, write 3 in the quotient and subtract 27 from 27. the result is 0. thus, 27 ÷ 9 = 3. 2. Bring down the next digit of the dividend. 175 ÷ 25 = 7 remainder 0. divide this number by the divisor. the whole number result is placed at the top. any remainders are ignored at this point. 25 × 7 = 175. the answer from the above operation is multiplied by the divisor. the result is placed under the number divided into. Long division vs. short division. short and long division are both methods to divide numbers, but they differ in complexity. the short division method is a quick way to find the answer when dividing simple numbers. for example, say you want to divide 36 by 6. you write it as 36 ÷ 6, using a division sign, and quickly get the answer, which is 6. Perform long division as you would with whole numbers. place the decimal point in the quotient directly above the decimal point in the dividend. solved examples on long division. here are a few solved examples to help you understand long division better: example 1: divide 1275 ÷ 15. divide: 1 (leftmost digit) ÷ 15 = 0 (write 0 above the 1).