![]() ![]() Step 3: Write 5 below 9 and subtract 9 - 5 = 4.Step 2: Now, 9 is not divisible by 5 but 5 × 1 = 5, so, write 1 as the first digit in the quotient.Step 1: We will consider the first digit of the dividend and divide it by 5.Solution: Let us see how to divide step by step. Thus, remainder = 6 and quotient = 81.Ĭase 3: This is a case of long division without a remainder. Step 5: Since 15 is not divisible by 9 but we know that 9 × 1 = 9, so, we take 9.Step 3: Write 8 in the quotient and subtract 73 - 72 = 1.Step 2: 73 is not divisible by 9 but we know that 9 × 8 = 72 so, we go for it.Now consider the first 2 digits to proceed with the division. Step 1: Since the first digit of the dividend is less than the divisor, put zero as the quotient and bring down the next digit of the dividend.Solution: Let us divide this using the following steps. Thus, 3 is the remainder and 108 is the quotient.Ĭase 2: When the first digit of the dividend is less than the divisor. We know that 4 × 8 = 32 which is less than 35 so, we go for it. Step 3: Now, 3 4 but 35 is not divisible by 4, so we look for the number just less than 35 in the table of 4.Bring the second digit of the dividend down and place it beside 0. So, 1 is written on top as the first digit of the quotient. Step 1: Here, the first digit of the dividend is 4 and it is equal to the divisor.Solution: The steps of this long division are given below: Division with RemaindersĬase 1: When the first digit of the dividend is equal to or greater than the divisor. So, first, let us learn division in which we get remainders. While performing long division, we may come across problems when there is no remainder, while some questions have remainders. Let us have a look at the examples given below for a better understanding of the concept. Step 4: Bring down the next digit of the dividend (if present).Step 3: Subtract the result from the digit and write the difference below.Step 2: Then divide it by the divisor and write the answer on top as the quotient.Check if this digit is greater than or equal to the divisor. Step 1: Take the first digit of the dividend from the left.Now, let us follow the long division steps given below to understand the process. The divisor is separated from the dividend by a right parenthesis 〈)〉 or vertical bar 〈|〉 and the dividend is separated from the quotient by a vinculum (an overbar). In order to perform division, we need to understand a few steps. Let us learn about the steps that are followed in long division. In arithmetic, long division is a standard division algorithm for dividing large numbers, breaking down a division problem into a series of easier steps. Division is one of the four basic mathematical operations, the other three being addition, subtraction, and multiplication. ![]()
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