7.3 Fractions of amounts
Fractions of amounts can be found by using your division and multiplication skills. To work out a fraction of any amount you first divide your amount by the number on the bottom of the fraction – the denominator. This gives you 1 part.
You then multiply that answer by the number on the top of the fraction – the numerator.
It is worth noting here that if the number on the top of the fraction is 1, multiplying the answer will not change it so there is no need for this step. Take a look at the examples below.
Example: Divide by the denominator
Method
To find of 90 we do 90 ÷ 5 = 18.
Since the number on the top of our fraction is 1, we do not need to multiply 18 by 1 as it will not change the answer.
So of 90 = 18.
Example: Multiply by the numerator
Method
To find of 42 we do 42 ÷ 7 = 6.
This means that of 42 = 6.
Since you want of 42, we then do 6 × 4 = 24.
So of 42 = 24.
Let’s go back to the jacket that used to cost £80 but is now in the sale with off. How do you find out how much it costs? Firstly, you need to find of 80. To calculate this you do:
£80 ÷ 5 = £16 and then £16 × 2 = £32
This means that you save £32 on the price of the jacket. To find out how much you pay you then need to do £80 − £32 = £48.
You will have practised finding fractions of amounts in Everyday maths 1, but have a go at the following activity to recap this important skill.
Activity 17: Finding fractions of amounts
Work out the following without using a calculator. You may double-check on a calculator if you need to and remember to check your answers against ours.
You are looking to buy house insurance and want to get the best deal. Put the following offers in order, from cheapest to most expensive, after the discount has been applied.
| Company A | Company B | Company C |
|---|---|---|
£120 per year | £147 per year | £104 per year |
Special offer: off!
| Special offer: off!
| Special offer: off!
|
Answer
Company C is cheapest:
of £104 = £104 ÷ 4 = £26 discount
£104 − £26 = £78
Company A is second cheapest:
of £120 = £120 ÷ 3 = £40 discount
£120 − £40 = £80
Company B is most expensive:
of £147 = £147 ÷ 7 × 2 = £42 discount
£147 − £42 = £105
A cinema sells 2400 tickets over a weekend. They review their ticket sales and find that of the weekend ticket sales were to adults. How many adult tickets were sold?
Answer
1600 tickets sold to adults:
2400 ÷ 3 = 800 to give
2 × 800 = 1600 to give
A college has raised of its £40 000 charity fundraising target. How much money does the college need to raise to meet its target?
Answer
£16 000 needed to meet target.
40 000 ÷ 5 = 8000 to give
8000 × 3 = 24 000 to give (the amount raised)
But the question asks how much is needed to meet its target so we need to subtract the amount raised from the target:
40 000 − 24 000 = £16 000
Discounts and special offers are not always advertised using fractions. Sometimes, you will see adverts with 10% off or 15% off. Another common area where we see percentages in everyday life would be when companies apply VAT at 20% to items or when a restaurant adds a 12.5% service charge. The next section looks at what percentages are, and how to calculate them.
Combining fractions of an amount
Sometimes, it’s useful to break down a fraction into smaller, more manageable parts.
Example
To findof an amount, you can addandof that amount:
1. Findof the amount.
2. Findof the amount. This can easily be done by halving theamount.
3. Add these two results.
If the amount is 20:
1. of 20 is 10.
2. of 20 is 5, or of 10 is 5.
3. Add them together: 10 + 5 = 15
Activity 18: fractions of amounts
Using the above method:
Find of 40
Find of 18.
Answer
Finding of 40:
of 40 is 20
of 40 is 10
Add them: 20 + 10 = 30
Finding of 18:
of 18 is 6
is 2 x 6 = 12
Summary
In this section you have:
learned how to express a quantity of an amount in the form of a fraction
learned how to, and practised, simplifying fractions
revised your knowledge on finding fractions of amounts.