Question

Suppose that `f ( x )` and `g ( x )` are functions which satisfy `f ( g ( x ) ) = x^2` and `g ( f ( x ) ) = x^3` for all `x ≥ 1` . If `g ( 16 ) = 16` , then compute `log_2 g ( 4 )`. (You may assume that `f ( x ) ≥ 1` and `g ( x ) ≥ 1` for all `x ≥ 1` .)?

Answer 1

`4/3`

Explanation:

Consider `g(f(g(4)))`

Since `f(g(4))=4^2=16`, this is equal to `g(16)=16`.

On the other hand, since `g(f(x))=x^3`, we see that this is `(g(4))^3`.

So

`(g(4))^3=16 implies 3 log_2(g(4)) = log_2 16 = 4`