Indices Basic 6 Mathematics Lesson Note
Download Lesson NoteTopic: Indices
What are Indices?
An index (or power) tells us how many times to multiply a number by itself.
Examples:
- 2³ = 2 × 2 × 2 = 8
- 5² = 5 × 5 = 25
- 10⁴ = 10 × 10 × 10 × 10 = 10,000
Parts of Index Notation:
- Base: The number being multiplied (2 in 2³)
- Index/Power: How many times to multiply (3 in 2³)
Reading Index Numbers
Examples:
- 3² = “3 to the power of 2” or “3 squared”
- 4³ = “4 to the power of 3” or “4 cubed”
- 5⁴ = “5 to the power of 4”
Numbers in Index Form
Writing Numbers in Index Form
Example 1: Express 8 as a power of 2 8 = 2 × 2 × 2 = 2³
Example 2: Express 125 as a power of 5 125 = 5 × 5 × 5 = 5³
Example 3: Express 1000 as a power of 10 1000 = 10 × 10 × 10 = 10³
Exercise A – Writing in Index Form
Write these numbers in index form:
- 16 as a power of 2 = ______
- 27 as a power of 3 = ______
- 81 as a power of 3 = ______
- 64 as a power of 4 = ______
- 32 as a power of 2 = ______
- 100 as a power of 10 = ______
- 49 as a power of 7 = ______
- 243 as a power of 3 = ______
Finding the Value of Index Numbers
Calculate these:
- 3⁴ = 3 × 3 × 3 × 3 = 81
- 2⁵ = 2 × 2 × 2 × 2 × 2 = 32
- 5³ = 5 × 5 × 5 = 125
Exercise B – Finding Values
Calculate the value of these index numbers:
- 2⁴ = ______
- 3³ = ______
- 5² = ______
- 4³ = ______
- 6² = ______
- 2⁶ = ______
- 10³ = ______
- 7² = ______
- 8² = ______
- 9² = ______
Rules of Indices
Rule 1: Multiplication (Same Base)
When multiplying powers with the same base, add the indices
Formula: aᵐ × aⁿ = aᵐ⁺ⁿ
Examples:
- 2³ × 2² = 2³⁺² = 2⁵ = 32
- 5² × 5⁴ = 5²⁺⁴ = 5⁶ = 15,625
Rule 2: Division (Same Base)
When dividing powers with the same base, subtract the indices
Formula: aᵐ ÷ aⁿ = aᵐ⁻ⁿ
Examples:
- 3⁵ ÷ 3² = 3⁵⁻² = 3³ = 27
- 10⁶ ÷ 10⁴ = 10⁶⁻⁴ = 10² = 100
Rule 3: Power of a Power
When raising a power to another power, multiply the indices
Formula: (aᵐ)ⁿ = aᵐˣⁿ
Examples:
- (2³)² = 2³ˣ² = 2⁶ = 64
- (5²)³ = 5²ˣ³ = 5⁶ = 15,625
Rule 4: Any Number to Power 0
Any number (except 0) raised to power 0 equals 1
Formula: a⁰ = 1 (where a ≠ 0)
Examples:
- 5⁰ = 1
- 100⁰ = 1
- 2,340⁰ = 1
Rule 5: Any Number to Power 1
Any number raised to power 1 equals itself
Formula: a¹ = a
Examples:
- 7¹ = 7
- 25¹ = 25
Exercise C – Using Index Rules
Simplify using index rules:
- 3² × 3³ = ______
- 5⁴ ÷ 5² = ______
- (2³)² = ______
- 4⁰ = ______
- 6¹ = ______
- 2⁵ × 2¹ = ______
- 10⁶ ÷ 10³ = ______
- (3²)³ = ______
- 7³ × 7² = ______
- 8⁴ ÷ 8⁴ = ______
Exercise D – Mixed Index Operations
Solve these problems:
- 2³ × 2² × 2¹ = ______
- 5⁵ ÷ 5³ ÷ 5¹ = ______
- (4²)² × 4¹ = ______
- 3⁴ × 3⁰ = ______
- (2³ × 2²) ÷ 2⁴ = ______
Real Life Problems
Population Growth
Example: A town’s population doubles every 10 years. If the current population is 5,000, what will it be in 30 years?
Solution:
- After 10 years: 5,000 × 2¹ = 10,000
- After 20 years: 5,000 × 2² = 20,000
- After 30 years: 5,000 × 2³ = 40,000
Exercise E – Population and Growth
Solve these growth problems:
- Bacteria Growth: Bacteria triple every hour. If there are initially 100 bacteria, how many will there be after 4 hours? Answer: ______ bacteria
- School Enrollment: A school’s enrollment doubles every 5 years. If there are currently 200 students, how many will there be in 15 years? Answer: ______ students
- Savings Account: Money in a savings account increases by 50% each year. If Kemi starts with ₦1,000, how much will she have after 3 years? (Use 1.5 as the multiplier) Answer: ₦______
Exercise F – Area and Volume
Solve these measurement problems:
- Square Field: A square field has sides of 6 meters. What is its area? (Area = side²) Answer: ______ square meters
- Cube Storage: A cube-shaped container has sides of 4 meters. What is its volume? (Volume = side³) Answer: ______ cubic meters
- Computer Memory: Computer memory is often measured in powers of 2. If each unit stores 2⁸ bytes, how many bytes can 4 units store? Answer: ______ bytes
Exercise G – Technology and Science
Apply indices in technology:
- Digital Storage: A computer has 2¹⁰ GB of storage. How much storage is this in actual numbers? Answer: ______ GB
- Network Speed: Internet speed doubles every year. If current speed is 10 Mbps, what will it be in 4 years? Answer: ______ Mbps
- Solar Panel Output: A solar panel’s efficiency improves by a factor of 1.2 each year. If it currently produces 100 watts, what will it produce in 3 years? Answer: ______ watts (round to nearest whole number)
Quantitative Reasoning
Pattern Recognition
Example: Find the pattern: 2, 4, 8, 16, 32, … Pattern: Each term is 2 raised to increasing powers 2¹, 2², 2³, 2⁴, 2⁵, …
Exercise H – Number Patterns
Complete these patterns:
- Powers of 3: 3, 9, 27, _____, _____
- Powers of 5: 5, 25, 125, _____, _____
- Powers of 2: 2, 4, 8, 16, _____, _____
- Powers of 10: 10, 100, 1000, _____, _____
Exercise I – Comparing Powers
Compare these using >, <, or =:
- 2⁵ _____ 3³
- 4² _____ 2⁴
- 5² _____ 3³
- 10² _____ 2⁵
- 6² _____ 4³
Exercise J – Problem Solving
Use logical thinking:
- Missing Exponent: 2ˣ = 64. What is x? Answer: x = ______
- Missing Base: x³ = 216. What is x? Answer: x = ______
- Equation Solving: If 3ˣ × 3² = 3⁵, what is x? Answer: x = ______
- Growth Calculation: A plant’s height doubles each week. If it’s currently 8 cm tall, when was it 1 cm tall? Answer: ______ weeks ago
Answer Key
Exercise A:
- 2⁴, 2. 3³, 3. 3⁴, 4. 4³, 5. 2⁵, 6. 10², 7. 7², 8. 3⁵
Exercise B:
- 16, 2. 27, 3. 25, 4. 64, 5. 36, 6. 64, 7. 1000, 8. 49, 9. 64, 10. 81
Exercise C:
- 3⁵, 2. 5², 3. 2⁶, 4. 1, 5. 6, 6. 2⁶, 7. 10³, 8. 3⁶, 9. 7⁵, 10. 1
Exercise D:
- 2⁶, 2. 5¹, 3. 4⁵, 4. 3⁴, 5. 2¹
Exercise E:
- 8,100 bacteria
- 1,600 students
- ₦3,375
Exercise F:
- 36 square meters
- 64 cubic meters
- 1,024 bytes
Exercise G:
- 1,024 GB
- 160 Mbps
- 173 watts
Exercise H:
- 81, 243
- 625, 3,125
- 32, 64
- 10,000, 100,000
Exercise I:
- (32 > 27)
- = (16 = 16)
- < (25 < 27)
- (100 > 32)
- < (36 < 64)
Exercise J:
- x = 6
- x = 6
- x = 3
- 3 weeks ago