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VCE 11 General 2023

4.02 Percentages

Lesson

Converting percentages and decimals

To convert a decimal to a percentage, multiply by $100%$100%. For example, $0.15$0.15 as a percentage or 'per $100$100' is $0.15\times100%=15%$0.15×100%=15%.

To convert a percentage to a decimal, divide by $100%$100%. For example, $212%=\frac{212%}{100%}=2.12$212%=212%100%=2.12

Practice questions

QUESTION 1

Convert $0.51$0.51 to a percentage.

 

Converting percentages and fractions

Given a percentage is out of $100$100, a percentage can be written as a fraction with a denominator of $100$100. To convert a percentage to a fraction, first write the percentage as the numerator, place $100$100 in the denominator and then simplify if possible.

For example, $28%=\frac{28}{100}$28%=28100 which simplifies to $\frac{7}{25}$725.

To convert from a fraction to a percentage, convert to a fraction with $100$100 as the denominator. For example, to write $\frac{4}{5}$45 as a percentage, multiply the top and bottom by $20$20.

$\frac{4}{5}=\frac{80}{100}$45=80100

$\frac{4}{5}=80%$45=80%

For fractions that do not convert nicely, you can convert the fraction to a decimal, then as seen in the section above, multiply by $100$100 to convert to a percentage. For example, to write $\frac{1}{3}$13 as a percentage, first convert to a decimal by dividing the numerator by the denominator to get $\frac{1}{3}=0.333\ldots$13=0.333

Multiplying by $100$100 give $33.333\ldots$33.333 so $\frac{1}{3}=33.3\ldots%$13=33.3% which can be expressed exactly as $33\frac{1}{3}%$3313% or approximately by $33.3%$33.3%

Practice questions

QUESTION 2

Convert $\frac{5}{10}$510 into a percentage.

 

Finding percentages of quantities

To calculate the percentage of a quantity, convert the percentage into a fraction or a decimal and then multiply by the quantity.

For example, to find $71%$71% of $526$526 L, multiply them together.

$71%$71% of $526$526 $=$= $71%\times526$71%×526
  $=$= $\frac{71}{100}\times526$71100×526
  $=$= $\frac{71\times526}{100}$71×526100
  $=$= $\frac{37346}{100}$37346100
  $=$= $\frac{18673}{50}$1867350 or $373.46$373.46 L

 

One quantity as a percentage of another

We may need to express one amount as a percentage of another. For example we could express how full a water tank is by writing the current capacity as a percentage of the maximum capacity. For instance, a rainwater tank may currently contain $24$24 L of water in it but it can hold a maximum of $50$50 L.

To do this we write the two amounts as a fraction where the numerator represents the current amount and the denominator represents the maximum–which in this case, it's $\frac{24}{50}$2450. This question could also be asked as follows–what percentage is $24$24 of $50$50?

To convert it into a percentage we can use equivalent fractions to make the denominator $100$100:

$\frac{24}{50}=\frac{48}{100}$2450=48100

$\frac{24}{50}=48%$2450=48%

Careful!

When doing percentage calculations you will come across quantities in different units of measurements.

For example, we might want to find out what percentage $65$65 cm is of $3$3 m.

In these situations it is important to mathematically convert one of the units into the other.

 

Practice questions

Question 3

There are $2$2 boys and $7$7 girls in a class.

  1. Find the total number of students in the class.

  2. What percentage of the class is boys?

    Write your answer as a percentage correct to 2 decimal places.

  3. What percentage of the class is girls?

    Write your answer as a percentage correct to 2 decimal places.

 

Outcomes

U1.AoS2.6

concepts of ratio, proportion, percentage, percentage change and rate, and unitary method

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