Asked by Lauri
let f(x) = x^3 − 2 and g(x) = ^3√ x − 2
I can't figure out if these are inverses for each other, I don't know how to put in f(g(x)) or g(f(x)) and have an answer
I can't figure out if these are inverses for each other, I don't know how to put in f(g(x)) or g(f(x)) and have an answer
Answers
Answered by
Steve
If y = x^3-2
y+2 = x^3
x = ∛(y+2)
That means that
∛(x+2) is the inverse of x^3-2
To check, you know that f(f<sup>-1</sup>(x)) = x and f<sup>-1</sup>(f(x)) = x
So, if g(x) = f<sup>-1</sup>(x),
f(g) = g^3-2
= (∛(x+2))^3 - 2
= x+2-2
= x
and the same for g(f).
y+2 = x^3
x = ∛(y+2)
That means that
∛(x+2) is the inverse of x^3-2
To check, you know that f(f<sup>-1</sup>(x)) = x and f<sup>-1</sup>(f(x)) = x
So, if g(x) = f<sup>-1</sup>(x),
f(g) = g^3-2
= (∛(x+2))^3 - 2
= x+2-2
= x
and the same for g(f).
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