Index Laws: Multiplying and Dividing Powers

1. 1 Write 2³ × 2⁴. Expand: (2×2×2) × (2×2×2×2) = 2⁷. 'How many 2s do we have? 3+4=7. So 2³ × 2⁴ = 2⁷.' Try 3² × 3⁵. Students expand and count. What's the pattern?
2. 2 Generalise: aᵐ × aⁿ = aᵐ⁺ⁿ. 'When multiplying powers with the same base, add the indices.' Students practise: 5³ × 5⁶, x² × x⁵, y⁴ × y.
3. 3 Write 2⁵ ÷ 2². Expand: (2×2×2×2×2)/(2×2). Cancel: 2×2×2 = 2³. 'We subtract: 5−2=3.' Generalise: aᵐ ÷ aⁿ = aᵐ⁻ⁿ. Practice: 3⁷ ÷ 3⁴, x⁶ ÷ x², p⁵ ÷ p³.
4. 4 Use division law: 3³ ÷ 3³ = 3⁰. But also: any number ÷ itself = 1. So 3⁰ = 1. 'Any non-zero number to the power zero equals 1.' Check with students: 100⁰ = ?, x⁰ = ?, 0.5⁰ = ?
5. 5 Simplify: 3x² × 4x³ = 12x⁵ (multiply coefficients, add indices). Simplify: 6y⁷ ÷ 2y⁴ = 3y³ (divide coefficients, subtract indices). Students practise 6 mixed examples.
6. 6 Display: a² × b² = ab⁴ (False — different bases). / x³ × x⁰ = x³ (True). / 2⁴ ÷ 2 = 2³ (True — 2=2¹). Students classify and correct the false ones.
7. 7 If x³ × xⁿ = x⁷, find n. If 2ⁿ ÷ 2³ = 2⁴, find n. If 5ⁿ = 1, find n. Algebra within indices.

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