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Mathematics · Year 9 · Chapter 1

Powers with the same base

8 — 2×2×2
9
10⁴
10 000
2⁵
32
125
a³ × a²
a⁵ — add the indices
a⁶ ÷ a²
a⁴ — subtract
(a²)³
a⁶ — multiply
a⁰
1
5
8
9
10³
1000
25
4
a³ × a⁴
a⁷
2⁵ × 2²
2⁷ = 128
a⁸ ÷ a²
a⁶
(a³)²
a⁶
7⁰
1
2³ × 2³
2⁶ = 64
a⁵ × a ÷ a²
a⁴ — indices: 5 + 1 − 2
(2²)³ or 2⁵ — which is bigger?
(2²)³ = 2⁶ = 64, beats 32
3² × 3⁰
9 — the 3⁰ is just 1
xⁿ × xⁿ
x²ⁿ

An index counts the multiplies

2³ is not 2 × 3. The small number counts how many copies of the base are MULTIPLIED together: 2³ = 2 × 2 × 2 = 8. Get that meaning solid and the index laws stop being rules to memorise — they're just counting. Multiply a³ by a²? That's three a's times two a's — five a's: a⁵, so you ADD indices. Divide a⁶ by a²? Two a's cancel — a⁴: you SUBTRACT. Raise a power to a power, (a²)³? Three copies of two a's — six: you MULTIPLY. And a⁰ = 1 because a³ ÷ a³ has to be 1, and the law says it's a⁰. Whenever a law feels doubtful, write out the multiplies — the law is sitting right there.

  • 2³ = 2×2×2 = 8. (2×3 = 6 is a different animal.)
  • a³ × a² = (a·a·a)(a·a) = a⁵ — add.
  • a⁶ ÷ a² = a⁴ — subtract. And a³ ÷ a³ = a⁰ = 1.
  • (a²)³ = a²·a²·a² = a⁶ — multiply.

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