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Square Root of Decimals

Square and Square Root - Concepts
Perfect Square
Square of Number 1-50
Square Root Using Prime Factorization
General Properties of Squares
Properties of Square - Based on Ending Digits
Properties of Square - Unit Digit of Square
Properties of Square - Difference of Consecutive Numbers
Pythagorean Triplet
Number Between Square Numbers
Properties of Square - Based on Pattern
Square Of Number Ending With 5
Square Root Using Long Division
Finding Nearest Perfect Square by Subtraction
Finding Nearest Perfect Square by Addition
Square Root of Decimals
Approximating Square Roots
Class - HCS Prelims Subjects
 
 
Concept Explanation
 

Square Root of Decimals

Step I: Obtain the number in the decimal form .

Step II: Place bar on the integral part as we do in the process of finding the square root of a perfect square of some natural number.

Step III: Make even number of decimal places by affixing a zero on the extreme right of decimal part, if necessary.

Step IV: Place bar on the decimal part on every pair of digits beginning with the first decimal place.

Step V: Start finding the square root by the long division method and put the decimal point in the square root as soon as the integral part is exhausted.

Illustration: Find the square root of 477.4225.

Solution: Here, the number of decimal places is already even.So, we place bars on the integral and decimal parts and proceed as given below:

Hence the square root of 477.4225. is 21.85 .

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Sample Questions
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Question : 1

Evaluate:  sqrt{frac{7.84}{1.96}} = ?

Right Option : B
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Explanation
Question : 2

Study the statements and choose the correct option.

Statement 1 :The square root of certain decimals are obtained by first changing the decimals into fractions with perfect squares as their numerators and denominators.

Statement 2: (26.1)^2  lies between 400 and 900.

Right Option : A
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Explanation
Question : 3

If sqrt {0.04 times 0.4 times a}=0.4 times 0.04 times sqrt {b},  then the value of  frac {a}{b}  is :

Right Option : A
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Explanation
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