For any integer n, the product (α^n)(β^n)(γ^n) equals which expression?

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Boost your skills in A Level Further Mathematics Core Pure. Study with flashcards and multiple choice questions, each question is followed by hints and explanations. Get prepared for your exam with confidence!

Multiple Choice

For any integer n, the product (α^n)(β^n)(γ^n) equals which expression?

Explanation:
Raising a product to a power distributes the exponent across the factors. Here, the same exponent n is applied to α, β, and γ, so their product raised to n is the nth power of αβγ. In symbols, α^n β^n γ^n = (αβγ)^n. This follows from (xy)^n = x^n y^n for integers n (and the fact that multiplication is associative and commutative here), giving α^n β^n γ^n = (αβ)^n γ^n = [(αβ) γ]^n = (αβγ)^n. Therefore, the correct expression is (αβγ)^n.

Raising a product to a power distributes the exponent across the factors. Here, the same exponent n is applied to α, β, and γ, so their product raised to n is the nth power of αβγ. In symbols, α^n β^n γ^n = (αβγ)^n. This follows from (xy)^n = x^n y^n for integers n (and the fact that multiplication is associative and commutative here), giving α^n β^n γ^n = (αβ)^n γ^n = [(αβ) γ]^n = (αβγ)^n. Therefore, the correct expression is (αβγ)^n.

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