Find the square root of the following numbers by long division method
(i)5329 (ii) 16384
Answers
Step-by-step explanation:
- So therefore, square root of 5329 is 73.
- Therefore, √16384 = 128. 4.
Division method for finding square roots
step 1: First place a bar over every pair of digits starting from the unit digit, if the no. of digits is odd then the left most single-digit will also have a bar.
Step 2: Think of the largest number whose square is equal to or just less than the first bar digit, take this number as a divisor and also as the quotient.
Step 3: Next subtract the product of the divisor and the quotient from the first bar digit and bring down the next pair of digits which have a bar to the right side of the reminder, this becomes the new dividend.
Step 4: The new divisor is obtained by (adding the first divisor and the quotient and a digit to the right side of it that we have to choose according to the new dividend, which is chosen in such a way that product of new divisor and this digit is less than or equal to the new dividend )
Step 5: Repeat steps 2,3,4, till all the bar digits have been taken up, new quotient is the required square root of the given no.
square root of the 5329
Step 1: 5329
Step 2: 49<53<64
72 <53 <82
Step 3: the new dividend is 429
Step 4: 142=×2=284
143×3=429
This square root of 5329 is 73.