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Manish writes the functions g(x)= 3 sqrt -x - 72 and h(x) = -(x + 72)^3

Which pair of expressions could Manish use to show that g(x) and h(x) are inverse functions?

Manish writes the functions g(x)= 3 sqrt -x - 72 and h(x) = -(x + 72)^3 Which pair-example-1
User Balraj Ashwath
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2 Answers

19 votes
19 votes

Its c

explanation:

on edge

User Scgough
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12 votes
12 votes

Answer:


√(-(x +72)^3) - 72 = -(3\sqrt x - 72 +72)^3

Explanation:

Given


g(x) = 3\sqrt x - 72


h(x) = -(x +72)^3

Required

Show that they are inverse functions

For g(x) and h(x) to be inverse, then:


g(h(x)) = h(g(x))

We have:


g(x) = 3\sqrt x - 72

Replace x with h(x)


g(h(x)) = 3√(h(x)) - 72

Substitute value for h(x)


g(h(x)) = 3√(-(x +72)^3) - 72

Similarly;


h(x) = -(x +72)^3

Replace x with g(x)


h(g(x)) = -(g(x) +72)^3

Substitute value for g(x)


h(g(x)) = -(3\sqrt x - 72 +72)^3

Recall that:


g(h(x)) = h(g(x))

So:


√(-(x +72)^3) - 72 = -(3\sqrt x - 72 +72)^3

User Dracodoc
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