Question

How do you determine where the function is increasing or decreasing, and determine where relative maxima and minima occur for `y=x^4-2x^3`?

Answer 1

intercept / stationary point at x= 0 is an inflexion point

stationary point at `x = 3/2` is a relative minimum

Explanation:

`y=x^4-2x^3 = x^3(x-2)` so `y = 0` at `x = 0, 2`

`y' = 4x^3 - 6x^2 = x^2(4x-6)` so `y' = 0` at `x = 0, 3/2`

`y'' = 12x^2 - 12x = 12x(x-1)`

`y''(0) = 0` and `y''(3/2) = 9 [> 0]`

so the intercept and stationary point at x= 0 is an inflexion point

and the stationary point at `x = 3/2` is a relative minimum

globally, the dominant term in the expression is `x^4` so `lim_{x to pm oo} y = + oo`

you can see all of this in the plot
graph{x^4 - 2x^3 [-10, 10, -5, 5]}