Question

Find the square root upto 3 decimal places :-
___
(a) √ 11
2 __
18

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Answer 1

Answer:

3.3166248

The square root of 11 is expressed as √11 in the radical form and as (11)½ or (11)0.5 in the exponent form. The square root of 11 rounded up to 7 decimal places is 3.3166248.

Answer 2

The square root upto 3 decimal places of √11 is 3.316

Given,

√11

To Find,

Find the square root upto 3 decimal places of √11

Solution,

• How to Calculate Square root of 11:- A square's inverse mathematical operation is called a square root. A number is multiplied by its square root to produce the product. Let's examine the example below: This number yields the value 11 when multiplied by itself. 11 is used to denote the √11. In exponent form, 11's square root is written as 11.
• Let's first express 11 as the product of its prime elements in order to further simplify the √11. The prime factors that make up the number 11 are as follows: Therefore, 1*11 is the prime factorization of 11. Any number's square root can be calculated by multiplying one number from each pair of the same numbers that make up the number's prime factorization. However, 11's prime factorization is 11 11, which does not contain any pairs of the same numbers. As a result, 11 is in the simplest form and cannot be further simplified.

So, the Value of √11 is : √11= (11)½ = 3.316624

According to the question we find the square root upto 3 decimal places of √11

so, the square root upto 3 decimal places of √11 is 3.316

Hence, the square root upto 3 decimal places of √11 is 3.316

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