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Percentages: Large & small

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visibility 164update 7 months agobookmarkshare

🎯 In this topic you will

Recognise and use percentages, including percentages less than 1 or greater than 100

🧠 Key Words

common factor
mixed number

Show Definitions

common factor: A number that divides exactly into two or more numbers.
mixed number: A number made up of a whole number and a fraction together.

$50\% = 0.5 \qquad 50\% = \tfrac{50}{100} = \tfrac{1}{2}$

$5\% = 0.05 \qquad 5\% = \tfrac{5}{100} = \tfrac{1}{20}$

$0.5\% = 0.005 \qquad 0.5\% = \tfrac{0.5}{100} = \tfrac{5}{1000} = \tfrac{1}{200}$

0.5% is too small to show on a diagram.

To write $\tfrac{0.5}{100}$ as a fraction in its simplest form:

First, multiply the numerator and denominator by 10 to get $\tfrac{5}{1000}$.
Then divide the numerator and denominator by 5 to get $\tfrac{1}{200}$.

Worked example

Write $17.5\%$ as a:

a. decimal b. fraction

Answer:

a. Divide $17.5$ by $100$ to get $17.5\% = 0.175$

b. $17.5\% = \tfrac{17.5}{100}$

$\tfrac{17.5}{100} = \tfrac{175}{1000}$

When you divide by 5, you get $\tfrac{35}{200}$

When you divide by 5 again, you get $\tfrac{7}{40}$

For a. Converting a percentage to a decimal means dividing by 100. So $17.5 \div 100 = 0.175$.

For b. Express $17.5\%$ as $\tfrac{17.5}{100}$. Multiply numerator and denominator by 10 to remove the decimal, giving $\tfrac{175}{1000}$. Simplify by dividing both numerator and denominator by $5$ twice: first to $\tfrac{35}{200}$, then to $\tfrac{7}{40}$, which is the simplest form.

Percentages can be more than 100%.

Suppose that over 20 years the price of a house increases by 75%. You can draw a diagram to show this.

old price 100%

new price 175%

$100\% + 75\% = 175\%$

The new price is 175% of the old price.

Worked example

The height of a young child is $140\%$ of its height 2 years ago.

The child’s height 2 years ago was $70 \text{ cm}$. Work out the height of the child now.

Answer:

You can use decimals or fractions to solve this problem.

Using decimals: $140\% = 1.4$

The height is $1.4 \times 70 \text{ cm} = 98 \text{ cm}$

Using fractions: $140\% = \tfrac{140}{100} = \tfrac{7}{5}$

The height is $\tfrac{7}{5} \times 70 = 70 \div 5 \times 7 = 14 \times 7 = 98 \text{ cm}$

You can calculate percentage increases using either decimals or fractions. Multiplying by $1.4$ is the same as multiplying by $\tfrac{7}{5}$. Both give the same result of $98 \text{ cm}$.

You can also visualize the increase with a bar diagram showing 100% (70 cm) growing to 140% (98 cm).

Bar diagram showing child's height increase from 70 cm (100%) to 98 cm (140%)

In Worked example 10.3, you could use algebra to write an expression linking the child’s height now and the child’s height 2 years ago; for example: $n = 1.4t$ or $n = \tfrac{7}{5}t$, where $n$ is the child’s height now and $t$ is the child’s height 2 years ago.

Worked example

Arun has $20.
He gives $5 to Marcus and $13 to Sofia.

a. What percentage does each person get?

b. What percentage is left?

Answer:

a. The fraction of the money that Marcus gets is $\tfrac{5}{20} = \tfrac{1}{4} = 25\%$.

The fraction that Sofia gets is $\tfrac{13}{20} = \tfrac{65}{100} = 65\%$.

The amount left is $20 - 5 - 13 = 2$.

The percentage is $\tfrac{2}{20} = \tfrac{1}{10} = 10\%$.

To find percentages, divide each share by the total amount and multiply by 100. Marcus receives $25\%$, Sofia receives $65\%$, and $10\%$ is left over.

Notice that the sum of the three percentages is $25\% + 65\% + 10\% = 100\%$, which checks the calculation.

🧠 PROBLEM-SOLVING Strategy

Working with Percentages & Beyond 100%

Recognise and use percentages, including those less than 1% or greater than 100%.

Standard percentages.
$50\% = 0.5 = \tfrac{50}{100}=\tfrac{1}{2}$

$5\% = 0.05 = \tfrac{5}{100}=\tfrac{1}{20}$
Small percentages. Less than 1% can be written as tiny fractions:
$0.5\% = 0.005 = \tfrac{0.5}{100}=\tfrac{5}{1000}=\tfrac{1}{200}$
Converting decimals. To simplify $\tfrac{0.5}{100}$, multiply top and bottom by 10, then simplify step by step.
Percentages ending in .5. Multiply by 10 to remove decimals, then simplify by dividing through common factors.
Example: $17.5\%=\tfrac{17.5}{100}=\tfrac{175}{1000}=\tfrac{35}{200}=\tfrac{7}{40}$.
More than 100%. Percentages above 100% represent increases beyond the original.
Example: a 75% increase means new value = $175\%$ of original.
Use fractions or decimals. Choose whichever form makes multiplication easier:
$140\% = 1.4 = \tfrac{7}{5}$

Quick Tip: Multiplying by $1.4$ (decimal) is the same as multiplying by $\tfrac{7}{5}$ (fraction). Both give the same result.

Worked examples

a. Convert $17.5\%$ to decimal and fraction.

Decimal: $17.5\div100=0.175$.

Fraction: $\tfrac{17.5}{100}=\tfrac{175}{1000}=\tfrac{35}{200}=\tfrac{7}{40}$.

Answer:$0.175,\ \tfrac{7}{40}$
b. A child’s current height is 140% of its height 2 years ago (70 cm).

Decimal method: $1.4\times70=98\ \text{cm}$.

Fraction method: $\tfrac{7}{5}\times70=98\ \text{cm}$.

Answer:$98\ \text{cm}$
c. Arun shares $20: Marcus $5, Sofia $13, remainder $2.

Marcus: $\tfrac{5}{20}=\tfrac{1}{4}=25\%$.

Sofia: $\tfrac{13}{20}=\tfrac{65}{100}=65\%$.

Remaining: $\tfrac{2}{20}=\tfrac{1}{10}=10\%$.

Answer: Marcus 25%, Sofia 65%, Left 10% (check total = 100%).

Algebra connection: For growth problems, if $t$ = old value and $n$ = new value, then $n=kt$, where $k$ is the decimal or fraction form of the percentage.
Example: $n=1.4t$ or $n=\tfrac{7}{5}t$.

❓ EXERCISES

1. Worked example 10.2 shows how to write 17.5% as a fraction. Choose some more percentages that end in .5. Write these percentages as fractions in their simplest form. What different denominators do you get? What is the largest denominator? What is the smallest denominator?

👀 Show answer

Examples:
12.5% = $ \tfrac{125}{1000} = \tfrac{1}{8} $
22.5% = $ \tfrac{225}{1000} = \tfrac{9}{40} $
32.5% = $ \tfrac{325}{1000} = \tfrac{13}{40} $
47.5% = $ \tfrac{475}{1000} = \tfrac{19}{40} $
Largest denominator from these = 40, smallest = 8.

2. Write these percentages as decimals and as fractions. Write each fraction in its simplest form.

a. 7.5% b. 62.5% c. 1.5% d. 47.5% e. 32.5%

👀 Show answer

a. 7.5% = 0.075 = $ \tfrac{75}{1000} = \tfrac{3}{40} $
b. 62.5% = 0.625 = $ \tfrac{625}{1000} = \tfrac{5}{8} $
c. 1.5% = 0.015 = $ \tfrac{15}{1000} = \tfrac{3}{200} $
d. 47.5% = 0.475 = $ \tfrac{475}{1000} = \tfrac{19}{40} $
e. 32.5% = 0.325 = $ \tfrac{325}{1000} = \tfrac{13}{40} $

3. Copy and complete this table.

	$80	$300	$90
100%	$80	$300
50%			$45
5%
0.5%

👀 Show answer

	$80	$300	$90
100%	$80	$300	$90
50%	$40	$150	$45
5%	$4	$15	$4.50
0.5%	$0.40	$1.50	$0.45

4. Write these percentages as fractions in their simplest form.

a. 2% b. 0.2% c. 8% d. 0.8% e. 7% f. 0.7%

👀 Show answer

a. 2% = $ \tfrac{2}{100} = \tfrac{1}{50} $
b. 0.2% = $ \tfrac{0.2}{100} = \tfrac{2}{1000} = \tfrac{1}{500} $
c. 8% = $ \tfrac{8}{100} = \tfrac{2}{25} $
d. 0.8% = $ \tfrac{0.8}{100} = \tfrac{8}{1000} = \tfrac{2}{250} = \tfrac{1}{125} $
e. 7% = $ \tfrac{7}{100} $
f. 0.7% = $ \tfrac{0.7}{100} = \tfrac{7}{1000} $

a. Work out:

i. 1% of 600 kilograms

ii. 1.5% of 600 kilograms

iii. 3.5% of 600 kilograms

iv. 2.2% of 600 kilograms

b. In part a, why was it useful to work out 1% first?

👀 Show answer

a.
i. $1\% = \tfrac{1}{100} \times 600 = 6$ kg
ii. $1.5\% = 1.5 \times 6 = 9$ kg
iii. $3.5\% = 3.5 \times 6 = 21$ kg
iv. $2.2\% = 2.2 \times 6 = 13.2$ kg

b. Once you know 1% = 6 kg, you can scale it to find other percentages quickly.

a. Work out 1% of 7000 metres.

b. Use your answer to part a to work out:

i. 2% of 7000 metres

ii. 0.5% of 7000 metres

iii. 0.1% of 7000 metres

iv. 0.3% of 7000 metres

👀 Show answer

a. $1\% = \tfrac{1}{100} \times 7000 = 70$ m

b.
i. $2\% = 2 \times 70 = 140$ m
ii. $0.5\% = \tfrac{1}{2} \times 70 = 35$ m
iii. $0.1\% = \tfrac{70}{10} = 7$ m
iv. $0.3\% = 3 \times 7 = 21$ m

7. How would you work out 1.3% of $7500? Can you think of any different methods?

👀 Show answer

$1\% = \tfrac{1}{100} \times 7500 = 75$
$0.3\% = \tfrac{0.3}{100} \times 7500 = 22.5$
So $1.3\% = 75 + 22.5 = 97.5$

✅ Different methods: Multiply directly → $0.013 \times 7500 = 97.5$.

a. Work out $ \tfrac{1}{3} $ of 100.

b. Write $ \tfrac{1}{3} $ as a percentage.

Zara says: $ \tfrac{1}{3} $ is 33%.
Arun says: $ \tfrac{1}{3} $ is 33.3%.

c. How could Zara be correct?

d. How could Arun be correct?

e. Write $ \tfrac{2}{3} $ as a percentage.

👀 Show answer

a. $ \tfrac{1}{3} \times 100 = 33.\overline{3} $
b. $ \tfrac{1}{3} = 0.333\ldots = 33.3\% $ (recurring).
c. Zara rounded $33.\overline{3}\%$ down to 33%.
d. Arun gave the value to 1 decimal place: 33.3%.
e. $ \tfrac{2}{3} = 0.666\ldots = 66.7\% $ (to 1 decimal place).

9. Write each of these mixed numbers as a percentage. The first one has been done for you.

a. $ 1 \tfrac{1}{2} = 150\% $

b. $ 1 \tfrac{1}{4} $

c. $ 1 \tfrac{3}{4} $

d. $ 1 \tfrac{3}{10} $

e. $ 1 \tfrac{7}{10} $

f. $ 2 \tfrac{1}{4} $

👀 Show answer

a. $ 1 \tfrac{1}{2} = 150\% $ (given)
b. $ 1 \tfrac{1}{4} = \tfrac{5}{4} = 1.25 = 125\% $
c. $ 1 \tfrac{3}{4} = \tfrac{7}{4} = 1.75 = 175\% $
d. $ 1 \tfrac{3}{10} = \tfrac{13}{10} = 1.3 = 130\% $
e. $ 1 \tfrac{7}{10} = \tfrac{17}{10} = 1.7 = 170\% $
f. $ 2 \tfrac{1}{4} = \tfrac{9}{4} = 2.25 = 225\% $

10.

a. Write $ \tfrac{1}{5} $ as a percentage.

b. Write these mixed fractions as percentages:

i. $ 1 \tfrac{1}{5} $

ii. $ 1 \tfrac{3}{5} $

iii. $ 1 \tfrac{4}{5} $

iv. $ 2 \tfrac{3}{5} $

👀 Show answer

a. $ \tfrac{1}{5} = 0.2 = 20\% $

b.
i. $ 1 \tfrac{1}{5} = \tfrac{6}{5} = 1.2 = 120\% $
ii. $ 1 \tfrac{3}{5} = \tfrac{8}{5} = 1.6 = 160\% $
iii. $ 1 \tfrac{4}{5} = \tfrac{9}{5} = 1.8 = 180\% $
iv. $ 2 \tfrac{3}{5} = \tfrac{13}{5} = 2.6 = 260\% $

🧠 Think like a Mathematician

Task: Explore percentages of a given amount, including percentages greater than 100%.

Questions:

a) Work out 30% of $60.

b) Use your answer to part a to work out some percentages of $60 that are greater than 100%.

c) Reflect: check your percentages from part b. Are they correct?

d) What percentage of $60 is $102?

👀 show answer

a) 30% of $60 = $0.3 \times 60 = 18$. So 30% of $60 is $18.
b) Since 30% = $18, - 150% = $90 (because $18 \times 5$), - 200% = $120 (because $18 \times \tfrac{200}{30}$), - 300% = $180, and so on.
c) The values are correct as long as they are exact multiples of $18, since each $18 represents 30%.
d)$102 \div 60 = 1.7$, so $102 is 170% of $60.

❓ EXERCISES

12. Look at the diagram

a. What percentage of $50 is $40?

b. What percentage of $40 is $50?

👀 Show answer

a. $ \tfrac{40}{50} \times 100 = 80\% $
b. $ \tfrac{50}{40} \times 100 = 125\% $

13. Marcus has 500 g of flour. He uses 200 g to bake bread and 120 g to make biscuits. Work out the percentage of the flour:

a. he uses for bread

b. he uses for biscuits

c. he does not use

👀 Show answer

a. $ \tfrac{200}{500} \times 100 = 40\% $
b. $ \tfrac{120}{500} \times 100 = 24\% $
c. $ 100\% - (40\% + 24\%) = 36\% $

14. Sofia works for 40 hours in a week. She spends 25 hours in her office, 8 hours in the factory and the rest in a workshop. Work out the percentage of the time that she spends:

a. in her office

b. in the factory

c. in a workshop

👀 Show answer

a. $ \tfrac{25}{40} \times 100 = 62.5\% $
b. $ \tfrac{8}{40} \times 100 = 20\% $
c. Remaining $ = 40 - (25+8) = 7$ hours → $ \tfrac{7}{40} \times 100 = 17.5\% $

15. Zara earns $250. She pays $95 in tax and pays a bill of $65. Work out the percentage of her money:

a. she pays in tax

b. she has left after both payments

👀 Show answer

a. $ \tfrac{95}{250} \times 100 = 38\% $
b. Left = $250 - (95+65) = 90$
$ \tfrac{90}{250} \times 100 = 36\% $

16. An airline ticket costs $40. The price is increased by 200%.

a. Work out:

i. the increase

ii. the price after the increase

b. Find the number to complete this sentence: The new price is … times the original price

👀 Show answer

a. i. Increase = $200\%$ of 40 = $ \tfrac{200}{100} \times 40 = 80 $
ii. Price after increase = $40 + 80 = 120$

b. New price = 3 times the original price

17. The mass of a puppy is 5 kg. As it grows, the mass increases by 300%.

a. Work out: i. the increase in mass ii. the new mass

b. Find the number to complete this sentence: The new mass is … times the original mass.

👀 Show answer

a.i. Increase = $300\% \times 5 = 15$ kg
a.ii. New mass = $5 + 15 = 20$ kg

b. New mass is 4 times the original mass.

18.

a. The cost of a car increases by 5%. What percentage of the original price is the new price?

b. The cost of petrol increases by 80%. What percentage of the original price is the new price?

👀 Show answer

a. New price = $100\% + 5\% = 105\%$ of original
b. New price = $100\% + 80\% = 180\%$ of original

19. Ruqiyah is trying to answer this question: What percentage of $125 is $200?

She thinks the answer is a whole number. She cannot find the answer. Can you help her?

👀 Show answer

$ \tfrac{200}{125} \times 100 = 160\% $ ✅ $200$ is $160\%$ of $125$, a whole number answer.

20. Vikram wants to work out 135% of $40 but he does not know how. Describe some different methods to do this calculation. Which method do you prefer? Why?

👀 Show answer

Method 1: Multiply directly → $1.35 \times 40 = 54$
Method 2: Find 100% ($40$) and 35% ($14$), then add → $40+14=54$
Method 3: Break into 120% + 15% → $48+6=54$

✅ Preferred: Method 1 (direct multiplication), quickest and simplest.

⚠️ Be careful! Percentages Below 1% and Above 100%

Percentages less than 1% are very small. For example, $0.5\%=0.005=\tfrac{1}{200}$, not $\tfrac{1}{20}$.
Divide by 100, not 10. $5\%=\tfrac{5}{100}=0.05$, not $0.5$.
More than 100% means “more than the whole.” $175\%$ of a number is the whole (100%) plus three quarters more (75%).
Use decimals or fractions for clarity. $140\%=1.4=\tfrac{7}{5}$. Multiply either form by the original value to find the new total.
Check results with a “times” statement. If a mass increases by $300\%$, the new mass is $4$ times the original (not $3$ times).
Estimate to sense-check. $200\%$ of $40$ must be double: $80$. So $135\%$ of $40$ should be a bit more than $50$.

📘 What we've learned — Percentages < 1 and > 100

Percentages can be converted to decimals and fractions:
$50\%=0.5=\tfrac{1}{2},\quad 5\%=0.05=\tfrac{1}{20},\quad 0.5\%=0.005=\tfrac{1}{200}$.
To simplify small percentages (like $0.5\%$), multiply numerator and denominator to remove decimals, then reduce to simplest form.
Decimals and fractions are interchangeable: e.g. $17.5\%=0.175=\tfrac{7}{40}$.
Percentages can be greater than 100%. For example, an increase of $75\%$ makes the new value $175\%$ of the original.
Use decimals or fractions for calculations: $140\%=1.4=\tfrac{7}{5}$ → $1.4\times70=98$ cm.
Percentages describe parts of a whole: e.g. Marcus gets $25\%$, Sofia $65\%$, and $10\%$ is left. The total $=100\%$ checks the calculation.
Algebra connection: new value $n$ can be written as $n=1.4t$ or $n=\tfrac{7}{5}t$, where $t$ is the original value.

Percentages: Large & small

🎯 In this topic you will

🧠 Key Words

🧠 PROBLEM-SOLVING Strategy

Working with Percentages & Beyond 100%

Worked examples

❓ EXERCISES

🧠 Think like a Mathematician

❓ EXERCISES

⚠️ Be careful! Percentages Below 1% and Above 100%

📘 What we've learned — Percentages < 1 and > 100

Related Past Papers

Related Tutorials

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