Home
Additive Identity
Algebraic Expression
Arithmetic Expression
Associative Property
Averages
Brackets
Closure Property
Coefficient Of Variable
Commutative Property
Constants
Divisibility Principles
Factors
Fractions
H.C.F / G.C.D
Integers
L.C.M
Multipication Properties of Numbers
Multiples
Multiplicative Identity
Multiplicative Inverse
Numbers
Order of Numbers
Percentages
Profit and Loss
Ratio and Proportion
Sieve of Eratosthenes
Unitary Method
Variables
| Convert Fraction To Percentage Mixed Fraction To Improper Fraction | Improper Fraction To Mixed Fraction | Fraction To Percentage | Mixed Fraction To Percentage | Explanation
To convert a Fraction into Percentage, multiply the fraction by 100.
Some example regarding the Conversion of Fraction into Percentage are as follows:
Example 1 = Convert a given fractions 1/2 into percentage.
Answer = The proceed is as :-
Multiply the fraction(i.e. 1/2) by 100 and we get:
= 1/2 × 100
Multiply numerator of fraction(i.e. 1) by multiplier(i.e. 100) and denominator remains the same and we get:
= 1×100/2 = 100/2
Divide numerator by denominator, and we get the required percentage:
= 50 %
Example 2 = Convert a given fractions 2/10 into percentage.
Answer = The proceed is as :-
Multiply the fraction(i.e. 2/10) by 100 and we get:
= 2/10 × 100
Multiply numerator of fraction(i.e. 2) by multiplier(i.e. 100) and denominator remains the same and we get:
= 2×100/10 = 200/10
Divide numerator by denominator, and we get the required percentage:
= 20 %
Example 3 = Convert a given fractions 3/6 into percentage.
Answer = The proceed is as :-
Multiply the fraction(i.e. 3/6) by 100 and we get:
= 3/6 × 100
Multiply numerator of fraction(i.e. 3) by multiplier(i.e. 100) and denominator remains the same and we get:
= 3×100/6 = 200/10
Divide numerator by denominator, and we get the required percentage:
= 50 %
|