- Converting Between Fractions, Decimals, and Percents
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- Converting a Fraction with a Denominator of 100 to a Percentage
- Converting a Percentage to a Fraction with a Denominator of 100
- Finding the Percentage of a Grid that is Shaded
- Representing Benchmark Percentages on a Grid
- Introduction to Converting a Percentage to a Decimal
- Introduction to Converting a Decimal to a Percentage
- Converting Between Percentages and Decimals
- Converting Between Percentages and Decimals in a Real-World Situation
- Converting a Percentage to a Fraction in Simplest Form
- Converting a Fraction to a Percentage: Denominator of 4, 5, or 10
- Finding Benchmark Fractions and Percentages for a Figure
- Converting a Fraction to a Percentage: Denominator of 20, 25, or 50
- Converting a Fraction to a Percentage in a Real-World Situation
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Converting a Fraction to a Percentage Denominator of 4, 5, or 10 Online Quiz
Following quiz provides Multiple Choice Questions (MCQs) related to Converting a Fraction to a Percentage Denominator of 4, 5, or 10. You will have to read all the given answers and click over the correct answer. If you are not sure about the answer then you can check the answer using Show Answer button. You can use Next Quiz button to check new set of questions in the quiz.
Answer : A
Explanation
Step 1:
$\frac{1}{4}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 25
$\frac{1}{4} = (1 \times 25) \div (4 \times 25) = \frac{25}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{1}{4} = \frac{25}{100}$ = 25%
Answer : C
Explanation
Step 1:
$\frac{4}{5}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 20
$\frac{4}{5} = (4 \times 20) \div (5 \times 20) = \frac{80}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{4}{5} = \frac{80}{100}$ = 80%
Answer : B
Explanation
Step 1:
$\frac{1}{10}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 10
$\frac{1}{10} = (1 \times 10) \div (10 \times 10) = \frac{10}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{1}{10} = \frac{10}{100}$ = 10%
Answer : D
Explanation
Step 1:
$\frac{3}{4}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 25
$\frac{3}{4} = (3 \times 25) \div (4 \times 25) = \frac{75}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{3}{4} = \frac{75}{100}$ = 75%
Answer : A
Explanation
Step 1:
$\frac{2}{5}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 20
$\frac{2}{5} = (2 \times 20) \div (5 \times 20) = \frac{40}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{2}{5} = \frac{40}{100}$ = 40%
Answer : B
Explanation
Step 1:
$\frac{3}{10}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 10
$\frac{3}{10} = (3 \times 10) \div (10 \times 10) = \frac{30}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{3}{10} = \frac{30}{100}$ = 30%
Answer : D
Explanation
Step 1:
$\frac{5}{4}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 25
$\frac{5}{4} = (5 \times 25) \div (4 \times 25) = \frac{125}{100}$
Step 3:
Writing this fraction as a percentage
By definition $\frac{5}{4} = \frac{125}{100}$ = 125%
Answer : C
Explanation
Step 1:
$\frac{3}{5}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 20
$\frac{3}{5} = (3 \times 20) \div (5 \times 20) = \frac{60}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{3}{5} = \frac{60}{100}$ = 60%
Answer : B
Explanation
Step 1:
$\frac{7}{10}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 10
$\frac{7}{10} = (7 \times 10) \div (10 \times 10) = \frac{70}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{7}{10} = \frac{70}{100}$ = 70%
Answer : A
Explanation
Step 1:
$\frac{11}{10}$ is made into a fraction with 100 as denominator.
Step 2:
We multiply and divide the fraction by 10
$\frac{11}{10} = (11 \times 10) \div (10 \times 10) = \frac{110}{100}$
Step 3:
Writing this fraction as a percentage
By definition, $\frac{11}{10} = \frac{110}{100}$ = 110%