Lesson 3 ~25 min Unit 1 · Financial Maths +85 XP

Percentage of a Quantity

Find $15\%$ of $\$60$, $8\%$ of $200$ km, or $45\%$ of anything — using the multiplier method or the unitary method.

Today's hook: $15\%$ of Year 8 students walk to school. If there are 120 Year 8 students, how many walk?

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Think First

warm-up

$15\%$ of Year 8 students walk to school. If there are 120 Year 8 students, how many walk? Jot down your first reaction — then we'll see who's right.

Record your answer in your workbook.

The Big Idea

+5 XP

To find a percentage of a quantity, change the percent to a decimal (or fraction) and multiply. The unitary method finds $1\%$ first, then scales up.

Finding $15\%$ of $\$60$ has two main routes. Multiplier method: $15\% = 0.15$, then $0.15 \times 60 = 9$. Unitary method: $1\%$ of $\$60$ is $\$0.60$, so $15\%$ is $15 \times 0.60 = \$9$. Both give $\$9$. The multiplier method is faster on a calculator; the unitary method is great for mental maths.

$P\% \text{ of } Q = \dfrac{P}{100} \times Q$

$10\%$ shortcut

Divide by 10. $10\%$ of $\$60 = \$6$.

$1\%$ is the unit

Find $1\%$ first (divide by 100), then multiply.

Build with $10\%, 5\%, 1\%$

$15\% = 10\% + 5\%$. $5\%$ is half of $10\%$.

What You'll Master

objectives

Know

Percentage $\to$ decimal: divide by 100
$P\%$ of $Q = \tfrac{P}{100} \times Q$
The unitary method: find $1\%$, then scale
$10\%$, $5\%$, $1\%$ are mental-maths building blocks

Understand

Why "of" in maths often means "multiply"
How $10\%$ and $1\%$ combine to find ANY percentage mentally
When to use calculator vs mental method

Can Do

Find any percentage of any quantity with or without a calculator
Use the unitary method to scale up from $1\%$
Apply percentages to real money problems

Words You Need

vocabulary

Multiplier methodConvert $\%$ to decimal, then multiply: $25\% \times \$80 = 0.25 \times 80$.

Unitary methodFind one unit ($1\%$) first, then multiply.

QuantityThe whole amount we are taking a percentage of.

OfIn percentage problems, "of" means "multiply by".

Building blocks$10\%$, $5\%$, $1\%$ — easy percentages used to build others.

EstimateA quick approximate answer to check the exact answer is reasonable.

Spot the Trap

heads-up

Wrong: "$15\%$ of $\$60$ = $15 \times 60 = 900$" — NO. You forgot to divide by 100. $15\% = 0.15$, not 15.

Right: Convert percentage to decimal FIRST: $15\% = 0.15$. Then $0.15 \times 60 = \$9$.

Wrong: "$25\%$ of $\$80 = 80 \div 25 = 3.2$" — NO. You DIVIDED instead of multiplying.

Right: Use the multiplier: $25\% = 0.25$. $0.25 \times 80 = \$20$.

The Multiplier Method

+5 XP

The fastest way on a calculator. Convert the percentage to a decimal, then multiply.

To find $P\%$ of $Q$, use $\tfrac{P}{100} \times Q$. So $32\%$ of $\$150$ becomes $0.32 \times 150 = \$48$. The decimal form is much easier to feed into a calculator than the fraction form.

$P\% \text{ of } Q = \dfrac{P}{100} \times Q$

Convert first

Always change $\%$ to decimal before multiplying.

Use brackets

On calculator: $(\text{rate} \div 100) \times \text{quantity}$.

Estimate to check

$32\%$ is roughly $\tfrac{1}{3}$. $\tfrac{1}{3}$ of $150 = 50$. Answer $\$48$ is reasonable.

The Unitary Method

+5 XP

Find $1\%$ first by dividing by 100. Then multiply by the percentage you actually want.

Take $23\%$ of $\$400$. Step 1: find $1\%$ — divide $400$ by $100$ to get $\$4$. Step 2: scale up — multiply $\$4$ by $23$ to get $\$92$. The same logic works for ANY percentage. It is brilliant for mental maths because $1\%$ is easy to find.

$1\%$ of $Q = \dfrac{Q}{100}$ $\Rightarrow$ $P\%$ of $Q = P \times \dfrac{Q}{100}$

$1\%$ in your head

$1\%$ of $\$400 = \$4$ (just move the decimal 2 places left).

Then multiply by $P$

$23 \times 4 = 92$.

Combine with $10\%$

$23\%$ = $2 \times 10\% + 3 \times 1\%$. Use whichever is faster.

Watch Me Solve It · 3 examples

Watch Me Solve It · 15% mental

+15 XP per step

PROBLEM

Find $15\%$ of $\$120$ using mental maths.

1

Find $10\%$ first

$10\%$ of $\$120 = \$12$

Move the decimal one place left.
2

Find $5\%$

$5\% = \tfrac{1}{2}$ of $10\% = \tfrac{1}{2} \times 12 = \$6$

Halve the $10\%$ value.
3

Add them

$15\% = 10\% + 5\% = 12 + 6 = \$18$

$15\%$ of $\$120 = \$18$.

Answer$\$18$

Watch Me Solve It · multiplier method

+15 XP per step

PROBLEM

Find $24\%$ of $250$ kg.

1

Convert $\%$ to decimal

$24\% = 0.24$

Divide by 100.
2

Multiply

$0.24 \times 250$

Use the calculator.
3

Compute

$0.24 \times 250 = 60$ kg

Estimate: $\tfrac{1}{4}$ of $250 = 62.5$. Sensible.

Answer$60$ kg

Watch Me Solve It · 120 students

+15 XP per step

PROBLEM

There are 120 Year 8 students. $15\%$ walk to school. How many walk?

1

$10\%$ of 120

$120 \div 10 = 12$

$12$ students.
2

$5\%$ of 120

$\tfrac{12}{2} = 6$

Halve the $10\%$.
3

Add for $15\%$

$12 + 6 = 18$

$18$ students walk.

Answer$18$ students

Common Pitfalls

heads-up

Forgetting to divide by 100

Multiplying by the raw percentage gives an answer 100$\times$ too big.

Fix: $25\% = 0.25$, NOT 25. Convert first.

Dividing instead of multiplying

"of" means multiply, not divide.

Fix: "$20\%$ of $\$50$" means $0.20 \times 50 = \$10$, not $50 \div 20$.

Wrong building blocks

Calculating $7\%$ as $10\% + 7$ instead of $5\% + 2\%$.

Fix: $7\% = 5\% + 2\%$ or $7\% = 10\% - 3\%$. Add/subtract percent pieces only.

Copy Into Your Books

Multiplier Method

$P\% \to$ decimal: $\div 100$
Multiply: $\tfrac{P}{100} \times Q$
$25\%$ of $80 = 0.25 \times 80 = 20$

Unitary Method

$1\%$ of $Q = Q \div 100$
Scale up by $P$
$23\%$ of $400$: $4 \times 23 = 92$

Mental Building Blocks

$10\%$: divide by 10
$5\%$: half of $10\%$
$1\%$: divide by 100

Quick Estimates

$25\% \approx \tfrac{1}{4}$
$33\% \approx \tfrac{1}{3}$
$50\% = \tfrac{1}{2}$

How are you completing this lesson?

Brain Trainer · 4 problems

Brain Trainer · Percentage of a Quantity

4 problems

Four drill problems to sharpen your skills. Work each, then reveal the answer.

1 Find $20\%$ of $\$45$.

$0.20 \times 45 = 9$.$\$9$
2 Find $35\%$ of $200$ kg.

$0.35 \times 200 = 70$.$70$ kg
3 Find $7\%$ of $\$300$ using $1\%$.

$1\% = \$3$, so $7\% = 7 \times 3 = \$21$.$\$21$
4 Find $45\%$ of $\$80$ using mental building blocks.

$50\% = \$40$; $5\% = \$4$; $45\% = 40 - 4 = \$36$.$\$36$

Complete in your workbook.

Quick Check · 5 questions

What is $30\%$ of $\$150$?

+10 XP

$25\%$ of $80$ km is equal to:

+10 XP

A 200-mL drink is $8\%$ sugar. How much sugar is that?

+10 XP

Use the unitary method: $1\%$ of $\$600$ is:

+10 XP

$15\%$ of an 80 kg box of mangoes is bruised. How many kg are bruised?

+10 XP

Show Your Working · 3 questions

Show Your Working

9 marks total

Apply Medium 3 MARKS

Q6. Calculate each, showing your method: (a) $40\%$ of $\$250$ (b) $7.5\%$ of $\$80$ (c) $12\%$ of $\$45$

Answer in your workbook.

Understand Easy 2 MARKS

Q7. A school has 850 students. $32\%$ catch the bus. How many catch the bus?

Answer in your workbook.

Reason Hard 4 MARKS

Q8. Lucia uses mental maths to find $17\%$ of $\$240$. (a) Show how she could use building blocks ($10\%$, $5\%$, $1\%$) to do it in her head. (b) Verify with the multiplier method. (c) Which method was faster for this problem, and why?

Answer in your workbook.

Comprehensive Answers

Quick Check

1. B — $0.30 \times 150 = \$45$.

2. C — $\tfrac{1}{4} \times 80 = 20$ km.

3. C — $0.08 \times 200 = 16$ mL.

4. C — $600 \div 100 = \$6$.

5. B — $0.15 \times 80 = 12$ kg.

Show Your Working Model Answers

Q6 (3 marks): (a) $0.40 \times 250 = \$100$ [1]. (b) $0.075 \times 80 = \$6$ [1]. (c) $0.12 \times 45 = \$5.40$ [1].

Q7 (2 marks): $0.32 \times 850 = 272$ students [1, working]. Answer: $272$ catch the bus [1].

Q8 (4 marks): (a) $10\%$ of $240 = \$24$; $5\% = \$12$; $1\% = \$2.40$; so $17\% = 10 + 5 + 1 + 1 = \$24 + \$12 + \$2.40 + \$2.40 = \$40.80$ [2]. (b) Multiplier: $0.17 \times 240 = \$40.80$ ✓ [1]. (c) Multiplier was faster — one calculation instead of four [1].

Stretch Challenge · +25 XP, +10 coins

Sales Tax Surprise

In one country, two taxes apply to a purchase: a $10\%$ goods tax, then a further $5\%$ luxury tax on the new total. A handbag's sticker price is $\$400$ before any tax. (a) What is the final price after both taxes? (b) What single percentage of $\$400$ would give the same final price?

Reveal solution

(a) After $10\%$ tax: $400 \times 1.10 = \$440$. After $5\%$ luxury tax: $440 \times 1.05 = \$462$. (b) Total increase: $\$62$ on $\$400$ = $15.5\%$. (Note: NOT a simple $15\%$ — the taxes compound!)

Quick Review

Multiplier

$P\%$ of $Q = \tfrac{P}{100} \times Q$

Unitary

Find $1\%$, then scale

$10\%$ trick

Divide by 10

$5\%$ trick

Half of $10\%$

Estimate

$\tfrac{1}{4}, \tfrac{1}{3}, \tfrac{1}{2}$ for sanity

"Of" = $\times$

Always multiply, never divide

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