Question

How do I evaluate inverse functions?

Let f(x)=3^x and g(x)=f(f(x)). Evaluate g^-1(27).

Answer 1

`3^(-81)`

Explanation:

If `f(x) = 3^x`, and `g(x) = f(f(x))`, then first we must evaluate `g(x)`.

`g(x) = f(3^x)`
`g(x) = 3^(3x)`

An inverse function works like this: If `f(x) = x`, then `f^(-1)(x) = 1/x` or `x^(-1)`.
Here, `g(x) = 3^(3x)` so `g^(-1)(x) = 1/3^(3x)`

Now `g^(-1)(27)` must be evaluated. Input it into the above:
`g^(-1)(27) = 1/3^(3*27)`
`g^(-1)(27) = 1/3^81` or `3^(-81)`.

Answer 2

`g^(-1)(27) = 1`

Explanation:

Given:

`f(x) = 3^x`

`g(x) = f(f(x)) = 3^(3^x)`

If `g(x) = 27` then:

`3^color(blue)(3^x) = 27 = 3^color(blue)(3)`

As a real valued function `f(x) = 3^x` is one to one.

So we can deduce that the exponents are equal:

`3^x = 3 = 3^1`

and hence:

`x = 1`

So:

`g^(-1)(27) = 1`