find the least number which must be subtracted from 6203to obtain a perfect square .also ,find square root of number so obtained
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Answer:
Given:
A number = 6203, which is not a square root
To find:
1. The least number which must be subtracted from 6203 to obtain a perfect square.
2. Square root of the number so obtained.
Solution:
1. First we need to find the square root of the given number using the long division method.
2. We get the remainder as 119 so 119 must be subtracted from the number to get a perfect square.
New number= 6203-119= 6084
3. Again, we find the square root of the new number:
√6084 = 78
So, in this case remainder is zero.
* Least number that should be added is 119.
* Square root of the number is 78.
Step-by-step explanation:
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