Question

How do you find the inverse of `f(x)=1/(2x)`?

Answer 1

`1/(2x)` - this function is an inverse of itself!

Explanation:

Our inverse will be a function y = g(x) such that f(g(x)) = x

If we can manipulate our initial function so that, instead of y = some function of x, we have x = some function of y, we'll have our inverse.

`y = 1/(2x)`
`2xy = 1`

`x = 1/(2y)`
...which is your inverse function. It's traditional to swap the variables, so, our inverse function is
`y = 1/(2x)`

...so this function is its own inverse!

We'll check our work. Subtitute our inverse function definition into our original equation, and calculate f(g(x)). We should get back x.

`f(g(x)) = 1/(2(1/(2x)))`
`= 1/(1/x)`

`= x`
GOOD LUCK

Answer 2

`f’x. = 1/(2x)`

Explanation:

`f(x) = 1/(2x)`

`y = 1/2x` change f(x) to y.

`x = 1/(2y)` switching x & y

`y = 1/(2x)`

`:.f’(x) = 1/(2x)` change y back to f’(x)