Question

How do you find the intervals of increasing and decreasing given `y=(2x-8)^(2/3)`?

Answer 1

Please see below.

Explanation:

`y=(2x-8)^(2/3)`

The domain is `(-oo,oo)`.

`y' = 2/3(2x-8)^(-1/3) * d/dx(2x-8)`

`= 4/3(2x-8)^(-1/3)`

`= 4/(3root(3)(2x-8)`

`y'` is never `0` and

`y'` is undefined (does not exist) at `x = 4`

So we look at the sign of `y'` on both sides of `4`

On `(-oo,4)`, `y' < 0` so the function is decreasing.

On `(4,oo)`, `y' > 0` so the function is increasing.

Bonus

From the above analysis we see that `f(4) = 0` is a local minimum. In fact it is a global minimum as well.