Question

What is the inverse of `y=6^x`?

Answer 1

`x=log_6y`

Explanation:

Since

`x=log_ba iff a=b^x`

you have:

`y=6^x iff x=log_6y`

Answer 2

`y= (ln x)/(ln 6)`

Explanation:

Replace x with y and y with x,

`x= 6^y` and solve for y now

ln x= yln 6

`y= (ln x)/(ln 6)`

Answer 3

See below.

Explanation:

If `g(x)` is the inverse for `f(x)` then

`g(f(x))=x` then

`g(6^x)=x rArrg(x) = log_ex/log_e 6 = f^-1(x)`.