Lesson 14 ~30 min Unit 1 · Ratios +90 XP

Ratios and Rates

Comparing quantities with ratios. 2:3 means 2 parts to 3 parts. Simplify, divide, and scale ratios to solve real problems.

Today’s hook: A recipe for 4 people needs 2 cups of flour and 3 cups of milk. How much for 10 people? Ratios let you scale any recipe, mixture, or sharing problem up or down.

0/5QUESTS

Printable Worksheets

Print or save as PDF — or build a custom worksheet from any module's questions.

Build Apply Master Build custom

Think First

warm-up

A bag has red and blue marbles in the ratio 3:5. If there are 24 marbles total, how many are red? Try to solve before reading on.

Record in your workbook.

The Big Idea

+5 XP

A ratio compares two or more quantities. 2:3 means 2 parts of the first thing for every 3 parts of the second. Ratios have no units — they show relative size. Simplify by dividing both sides by their HCF. To divide an amount in a ratio, add the parts, find the value of one part, then multiply.

A ratio 4:6 simplifies to 2:3 (HCF = 2). This means for every 2 units of A, there are 3 units of B. The total parts = 2 + 3 = 5 parts. If the total amount is 50, each part = 50 ÷ 5 = 10. So A = 2 × 10 = 20, B = 3 × 10 = 30. Check: 20 + 30 = 50, and 20:30 = 2:3. Correct!

$ ext{Share} = rac{ ext{ratio part}}{ ext{total parts}} imes ext{total amount}$

Simplify first

Divide both sides by HCF. 6:10 = 3:5.

Find total parts

Add all ratio numbers together.

One part = total ÷ parts

Then multiply by each ratio number.

What You’ll Master

objectives

Know

A ratio compares quantities with no units
How to simplify ratios using HCF
How to divide an amount in a given ratio

Understand

Why ratios stay the same when both sides scale
The connection between ratios and fractions
How rates differ from ratios

Can Do

Simplify any ratio to lowest terms
Divide amounts in a ratio
Find missing values in equivalent ratios

Words You Need

vocabulary

RatioA comparison of two or more quantities. Written with a colon, e.g. 2:3.

SimplifyDivide both sides by their HCF. 4:6 simplifies to 2:3.

PartOne number in a ratio. In 2:3:5, the parts are 2, 3, and 5.

Total partsThe sum of all ratio numbers. 2:3 has 2 + 3 = 5 total parts.

RateA ratio comparing different units. E.g. 60 km per hour = 60 km/h.

Unit rateA rate where the second quantity is 1. E.g. $5 per kg, 3 words per minute.

Spot the Trap

heads-up

Wrong: Ratio 2:3 with $50: A gets $20, B gets $30. “I just guessed.” No! Always find total parts first.

Right: Total parts = 2 + 3 = 5. Each part = $50 ÷ 5 = $10. A = 2 × $10 = $20. B = 3 × $10 = $30. Check: $20 + $30 = $50.

Wrong: Simplifying 12:18 by dividing only the first number. 12÷6=2, but 18 stays. 2:18. Wrong!

Fix: Divide BOTH by HCF(12, 18) = 6. 12÷6 = 2, 18÷6 = 3. So 2:3. Check: 12/18 = 2/3. Correct!

Simplifying Ratios

+5 XP

Divide both sides by their HCF. If the ratio has different units, convert to the same unit first. If it has decimals or fractions, multiply to make whole numbers first.

Simplify 24:36. HCF(24, 36) = 12. 24÷12 = 2, 36÷12 = 3. So 2:3. Simplify 0.5:1.5. Multiply by 2: 1:3. So 1:3. Simplify 45 min : 2 hours. Convert: 45 min : 120 min. HCF(45, 120) = 15. 45÷15 = 3, 120÷15 = 8. So 3:8.

$24:36 = rac{24}{12}:rac{36}{12} = 2:3$

HCF both sides

Always divide both numbers by the same factor.

Same units first

Convert cm to m, min to hours before simplifying.

Decimals?

Multiply to make whole numbers first. 0.5:2 ×2 = 1:4.

Dividing in a Ratio

+5 XP

Add the ratio parts to get total parts. Divide the amount by total parts to get one part. Multiply each ratio number by one part.

Share $72 in the ratio 3:5. Total parts = 3 + 5 = 8. One part = $72 ÷ 8 = $9. First share = 3 × $9 = $27. Second share = 5 × $9 = $45. Check: $27 + $45 = $72, and 27:45 = 3:5 (HCF = 9). Correct!

$ ext{Each share} = rac{ ext{total}}{ ext{sum of parts}} imes ext{ratio number}$

Add parts first

3:5 → 8 total parts. This is always step one.

Find one part

Divide total by total parts. $72 ÷ 8 = $9.

Always check

Shares must add to total. Ratio must be original simplified.

Rates and Unit Rates

+5 XP

A rate compares quantities with different units. A unit rate has 1 as the second quantity. Speed = km/h, price = $/kg, heart rate = beats/min.

A car travels 240 km in 3 hours. Speed = 240 km ÷ 3 h = 80 km/h (unit rate). 5 kg of apples cost $12.50. Price per kg = $12.50 ÷ 5 = $2.50/kg. Which is better value: 750 mL for $4.50 or 1 L for $5.80? Find unit price: $4.50/750 = $0.006/mL = $6/L. $5.80/1000 = $0.0058/mL = $5.80/L. The 1 L is better value.

$ ext{Unit rate} = rac{ ext{total quantity}}{ ext{number of units}}$

Divide for unit rate

Speed = distance ÷ time. Price per item = total ÷ number.

Per 1 unit

Unit rate always has 1 as the second quantity.

Compare unit rates

Lower $/kg or $/L means better value for money.

Watch Me Solve It · 3 examples

step-by-step

Example 1: Dividing in a ratio

Share $96 in the ratio 5:7.

Total parts = 5 + 7 = 12 parts.

One part = $96 ÷ 12 = $8. First share = 5 × $8 = $40. Second share = 7 × $8 = $56.

Check: $40 + $56 = $96. And 40:56 = 5:7 (HCF = 8). Correct!

Shares: $40 and $56

Example 2: Three-part ratio

Concrete is mixed in the ratio cement:sand:gravel = 1:2:3. How much of each is needed for 120 kg of concrete?

Total parts = 1 + 2 + 3 = 6 parts.

One part = 120 ÷ 6 = 20 kg. Cement = 1 × 20 = 20 kg. Sand = 2 × 20 = 40 kg. Gravel = 3 × 20 = 60 kg.

Check: 20 + 40 + 60 = 120 kg. And 20:40:60 = 1:2:3 (HCF = 20). Correct!

20 kg cement, 40 kg sand, 60 kg gravel

Example 3: Finding a missing ratio value

Find $x$ if $3:5 = x:20$.

Method: write as fractions. $\frac{3}{5} = \frac{x}{20}$.

Cross-multiply: $5x = 3 \times 20 = 60$. So $x = 60 \div 5 = 12$.

Check: 3:5 = 12:20. Simplify 12:20 = 3:5 (HCF = 4). Correct!

$x = 12$

Common Pitfalls

avoid these

Mistake: Ratio 2:3 with $50: first = $20, second = $30. But 20:30 = 2:3 by luck! This only works when total ÷ parts = 10.

Fix: Always use the method: total parts = 5, one part = $50 ÷ 5 = $10. 2×$10=$20, 3×$10=$30. Works for any total.

Mistake: 3:5 means 3/5 of the total. No! 3:5 means 3 parts out of 8 total parts, so 3/8 of the total.

Fix: First share = 3/(3+5) = 3/8. Second share = 5/(3+5) = 5/8. Total parts go in the denominator.

Mistake: Simplifying 15 min : 2 hours as 15:2. Different units! Must convert first.

Fix: 15 min : 120 min = 15:120 = 1:8 (HCF = 15). Always same units first!

Copy Into Your Books

essential notes

Simplify ratios: divide both sides by HCF. Same units first.

Divide amount in ratio: total parts = sum, one part = amount ÷ parts.

Equivalent ratios: $\frac{a}{b} = \frac{c}{d}$, cross-multiply: $ad = bc$.

Unit rate = total ÷ number of units. Lower unit price = better value.

How are you completing this lesson?

Brain Trainer · 4 problems

Brain Trainer · Ratios

4 problems

Four drill problems to build your ratio fluency. Work each, then reveal.

1 Simplify 18:27.

HCF(18,27) = 9. 18÷9 = 2, 27÷9 = 3.2:3
2 Share $84 in the ratio 2:5.

Parts = 7. Each = $84 ÷ 7 = $12. 2×$12 = $24, 5×$12 = $60.$24, $60
3 Find $x$: 4:7 = $x$:35.

4/7 = x/35. 7x = 140. x = 20.20
4 A car travels 315 km in 3.5 hours. Speed?

315 ÷ 3.5 = 3150 ÷ 35 = 90 km/h.90 km/h

Complete in your workbook.

Quick Check · 5 questions

Simplify 16:24

+10 XP

$60 in ratio 2:3. Larger share?

+10 XP

3:8 = $x$:24. Find $x$.

+10 XP

Simplify 45 min : 2 hours

+10 XP

3 kg for $8.40 or 4 kg for $11.20?

+10 XP

Show Your Working · 3 questions

Show Your Working

11 marks total

ApplyMedium4 MARKS

Q6. (a) Share $150 in the ratio 3:7. Show all working. (b) Three friends invest in a business in the ratio 2:3:5. The total investment is $24,000. How much did each friend invest?

Answer in your workbook.

ApplyMedium4 MARKS

Q7. (a) A train travels 420 km in 3 hours 30 minutes. Find its average speed in km/h. (b) Which is better value: 600 g for $7.20 or 800 g for $9.60? Show working.

Answer in your workbook.

ReasonHard3 MARKS

Q8. A rectangle has sides in the ratio 3:4. Its perimeter is 84 cm. Find the length and width, and explain why the ratio of sides must be simplified before you can use it.

Answer in your workbook.

Comprehensive Answers

Quick Check

1. B — 16:24 = 2:3 (HCF = 8).

2. C — $60÷5 = $12. 3×$12 = $36.

3. A — 3/8 = x/24, 8x = 72, x = 9.

4. D — 45:120 = 3:8 (HCF = 15).

5. B — $8.40/3 = $2.80, $11.20/4 = $2.80. Same.

Show Your Working Model Answers

Q6 (4 marks): (a) Parts = 10, each = $150÷10 = $15 [1]. 3×$15 = $45, 7×$15 = $105 [1]. (b) Parts = 10, each = $24,000÷10 = $2,400 [1]. 2×$2,400 = $4,800, 3×$2,400 = $7,200, 5×$2,400 = $12,000 [1].

Q7 (4 marks): (a) 3.5 hours [0.5]. 420÷3.5 = 120 km/h [1.5]. (b) $7.20/600 = $0.012/g = $12/kg [1]. $9.60/800 = $0.012/g = $12/kg [1]. Same value.

Q8 (3 marks): Perimeter = 2(L+W) = 84, so L+W = 42 [0.5]. Ratio 3:4 means 3+4 = 7 parts [0.5]. Each part = 42÷7 = 6 [0.5]. Width = 3×6 = 18 cm, Length = 4×6 = 24 cm [1]. Simplified ratio gives the actual relationship between sides [0.5].

Stretch Challenge · +25 XP, +10 coins

The Golden Ratio

The Golden Ratio is approximately 1.618:1, written as $\phi$ (phi). It appears in nature, art, and architecture. A rectangle with sides in the golden ratio is considered the most pleasing to the eye. If a golden rectangle has a short side of 10 cm, what is the long side? If the long side is 34 cm, what is the short side? Research one place the golden ratio appears in nature or art.

Reveal solution

Long side = 10 × 1.618 = 16.18 cm. Short side = 34 ÷ 1.618 = 21.01 cm (or more precisely: 34/$\phi$ = 21.01 cm). The Golden Ratio appears in: sunflower seed spirals (Fibonacci sequence ratio approaches $\phi$), the Parthenon in Athens, nautilus shell spirals, Leonardo da Vinci’s Vitruvian Man, and even human body proportions.

Quick Review

Ratio

Compares quantities, no units

Simplify

÷ both by HCF

Same units

Convert before simplifying

Divide

Total ÷ parts = one part

Rate

Different units, per 1

Equivalent

Cross-multiply: ad = bc

Your Badges

0 of 6

First Steps

3-Day Streak

3 in a Row

Lesson Ace

Stretch Seeker

Daily Warrior

Mark lesson as complete

Tick when you’ve finished Learn, Practice and the Stretch. Earns +90 XP and +25 coins.

Unit overview · Maths subject page · Unit quiz