Unit 3: Indices & Powers – GCSE Foundation Maths Rescue Pack

How to use this lesson

1. Complete the warm-up questions from memory
2. Study the worked examples carefully
3. Try the practice problems: Green → Amber → Red
4. Check your answers and complete the mastery checklist

GCSE Foundation Maths Revision Pathway

A structured 10-unit revision system to help Foundation students build from Grade 3 towards Grade 4/5.

1 Algebra & Sequences

2 Expanding & Factorising

📖 Unit 3 — Indices & Powers (current)

4 Linear Equations

5 Inequalities

6 Straight-Line Graphs

7 Non-Linear Graphs

8 Real-Life Graphs

9 Graph Applications

10 Coordinate Geometry

🔥

Warm-Up: Retrieval Practice

⏱ Before You Start

Answer from memory — no notes!

Q1 Write 2³ as repeated multiplication

Q2 Simplify: 3² × 3³

Q3 Simplify: 5⁴ ÷ 5²

Lesson Progress

✓ Warm-up — complete

→ Worked examples & key concepts

· Tiered practice (Green → Amber → Red)

· Mistake Detective & Examiner Lens

· Mastery checklist

💡

The Big Idea: Repeated Multiplication

An index (power) is a shortcut for repeated multiplication.

2 × 2 × 2 × 2

2⁴ = 16

The small number (index) tells you how many times to multiply the base by itself. It’s NOT multiplying by the power!

📖

Core Definitions

Base

The number being multiplied repeatedly

Index (Power)

How many times the base is multiplied by itself

Square

A number multiplied by itself (power of 2)

Cube

A number multiplied by itself three times (power of 3)

💡 Why Index Laws Work

When multiplying powers with the same base:
2³ × 2² = (2×2×2) × (2×2) = 2⁵
We are counting total identical factors.

✏️

Worked Examples

Worked Example 01Repeated Multiplication

Write 4³ as repeated multiplication

The power (3) tells us how many times to multiply 4 by itself.

✓ Answer

4³ = 4 × 4 × 4

Worked Example 02Evaluating a Power

Evaluate 3²

Write as repeated multiplication: 3² = 3 × 3

Calculate: 3 × 3 = 9

✓ Answer

Worked Example 03Negative Base PowersKEY SKILL

Evaluate: (a) (−2)² (b) (−2)³

(a) (−2)² = (−2) × (−2) = 4 (even power → positive)

(b) (−2)³ = (−2) × (−2) × (−2) = 4 × (−2) = −8 (odd power → negative)

✓ Answer

(a) 4 (b) −8

⚠️ Even powers → positive. Odd powers → keep the sign.

Worked Example 04Multiplying Powers (Same Base)

Simplify: 5² × 5³

Same base → add the indices: 2 + 3 = 5

✓ Answer

5⁵

💡 The base (5) stays the same; only the indices are added.

Worked Example 05Dividing Powers (Same Base)

Simplify: 7⁵ ÷ 7²

Same base → subtract the indices: 5 − 2 = 3

✓ Answer

7³

Worked Example 06Bases Must Match!IMPORTANT

Simplify: 2³ × 3²

Bases are different (2 and 3) — cannot use index laws!

Evaluate separately: 2³ = 8, 3² = 9

Multiply: 8 × 9 = 72

✓ Answer

⚠️ Index laws ONLY work when the bases match!

⭐

Special Index Rules

Worked Example 07The Zero Power Rule (a⁰ = 1)EXAM TIP

Evaluate: 7⁰

Rule: Any non-zero number to the power of 0 equals 1.

Why? Because 7³ ÷ 7³ = 7⁰ (subtract indices), but 7³ ÷ 7³ also = 1 (anything ÷ itself = 1).

✓ Answer

7⁰ = 1

⚠️ This catches many students: 7⁰ = 1, NOT 0 and NOT 7. The base doesn't matter — 100⁰ = 1, (−3)⁰ = 1, x⁰ = 1.

🔢 Power of 1

Any number to the power of 1 stays the same: 6¹ = 6

³ × a² = a⁵ 3 + 2 = 5 DIVIDE → SUBTRACT indices a⁵ ÷ a² = a³ 5 − 2 = 3

Same base? Multiply → add. Divide → subtract. Base never changes.

✅

Process Checklists

📋 Multiplying Powers

✓

Check bases match

✓

Add the indices

✓

Keep the base unchanged

📋 Dividing Powers

✓

Check bases match

✓

Subtract the indices

✓

Keep the base unchanged

🧮

Arithmetic Support

(−2)² = 4

(−2)³ = −8

Add indices when multiplying

Subtract indices when dividing

Rules only work when bases match

💪

Tiered Practice

🔓 How It Works

Tap any card to reveal the full working and answer.

0 / 12

Problems revealed

Tap problems to reveal working and answers

🟢 Green — Core Skills

🟢 Green · TYPE YOUR ANSWER

Evaluate: 5²

✍️ Type Your Answer

Simplify: 5² × 5³

Same base → add indices: 2 + 3 = 5

✓ 5⁵

Green · Q1

Write 6³ as repeated multiplication

Power of 3 means multiply 3 times

✓ 6 × 6 × 6

Tap to reveal answer

Green · Q2

Evaluate: 4²

4² = 4 × 4 = 16

✓ 16

Tap to reveal answer

Green · Q3

Simplify: 2³ × 2²

Same base, add indices 3 + 2 = 5

✓ 2⁵

Tap to reveal answer

Green · Q4

Simplify: 9⁴ ÷ 9²

Same base, subtract indices 4 − 2 = 2

✓ 9²

Tap to reveal answer

🟡 Amber — Multi-Step

🟡 Amber · TYPE YOUR ANSWER

Simplify: 4³ × 4²

Amber · Q5

Simplify: 3² × 3⁴ ÷ 3³

Multiply: 3² × 3⁴ = 3⁶ Divide: 3⁶ ÷ 3³ = 3³

✓ 3³

Tap to reveal answer

Amber · Q6

Evaluate: (−3)²

(−3) × (−3) neg × neg = positive

✓ 9

Tap to reveal answer

Amber · Q7

Evaluate: (−4)³

(−4)×(−4)×(−4) = 16 × (−4) = −64

✓ −64

Tap to reveal answer

Amber · Q8

Simplify: 8³ ÷ 8

8 = 8¹ 8³ ÷ 8¹ 3 − 1 = 2

✓ 8²

Tap to reveal answer

🔴 Red — Exam Style

🔴 Red · TYPE YOUR ANSWER

Evaluate: (−2)³

Red · 2 marks · Q9

Simplify fully: 4³ × 4⁵ ÷ 4²

(3+5) − 2 = 8 − 2 = 6

✓ 4⁶

Tap to reveal answer

Red · 2 marks · Q10

Evaluate: (−5)² × 5³

(−5)² = 25 5³ = 125 25 × 125 = 3,125

✓ 3,125

Tap to reveal answer

Red · 2 marks · Q11

Simplify: 6⁴ ÷ 6⁴

4 − 4 = 0 Any number to power 0 = 1

✓ 1 (or 6⁰)

Tap to reveal answer

🔍

Mistake Detective

⚠️ These mistakes cost marks

Study each one carefully.

❌ Wrong

2³ × 3² = 6⁵

Bases are different — cannot combine

✅ Correct

2³ = 8, 3² = 9 8 × 9 = 72

❌ Wrong

(−3)² = −9

Even power of a negative is positive

✅ Correct

(−3)² = (−3) × (−3) = 9

❌ Wrong

5² × 5³ = 5⁶

Multiplied indices instead of adding

✅ Correct

5² × 5³ = 5⁵ (Add: 2 + 3 = 5)

🎓

Examiner Lens

🎓 To Gain Full Marks

Write the index rule before simplifying (e.g., “add indices”)
Keep base unchanged when applying rules
Show index addition or subtraction clearly
Use brackets for negative bases
Check bases match before combining

🏆

Mastery Checklist

🏆 Unit 3 Mastery

✓

I understand repeated multiplication

✓

I can evaluate positive and negative base powers

✓

I can multiply powers with the same base (add indices)

✓

I can divide powers with the same base (subtract indices)

✓

I know index rules only apply when bases match

Nice work — you’ve completed Unit 3!

7 units remaining. Consistent practice is what turns Grade 3 into Grade 4/5. Keep going.

Ready for Unit 4?

If you can do these 3 things confidently, you're ready to move on:

I can use the laws of indices I can evaluate negative and zero indices I can work with powers of powers

👨‍👩‍👧 For Parents

Your child has completed Unit 3 of a structured GCSE Foundation Maths revision programme covering Algebra and Graphs — key topics on every Foundation paper.

✔ AQA, Edexcel & OCR aligned

✔ 190+ questions & 70 worked examples

✔ Step-by-step explanations

Up Next

Unit 4: Solving Linear Equations →

Continue →

🏠 Back to Diagnostic Quiz

Your Guru Academy

🏠 Home 📋 Full System

Your Guru Academy is an independent resource and is not affiliated with, endorsed by, or connected to AQA, Edexcel (Pearson), OCR, or any exam board. All exam board names are the property of their respective owners. Content is designed to support Foundation GCSE revision but does not guarantee any specific grade outcome.