Question

How do you find the critical numbers for `x^4-2x^3-3x^2-5` to determine the maximum and minimum?

Answer 1

Please see the explanation section below,

Explanation:

`f(x) = x^4-2x^3-3x^2_5` is a polynomial, its domain is `(-oo,oo)`

`f'(x) = 4x^3-6x^2-6x` is never undefined and is `0` at the solutions to

`4x^3-6x^2-6x = 0`

Factor out the common factor of `2x` to get

`2x(2x^2-3x-3)=0`

This leads to two lower degree polynomial equations:

`2x=0` `" "` or `" "` `2x^2-3x-3=0`

The first has solution `0` and the solutions to the second may be found using the quadratic formula

`x= (-b+-sqrt(b^2-4ac))/(2a)`.

We get `x=(3+-sqrt33)/4`.

`f'(x)=0` at

`0`, `" "` `(3+sqrt33)/4`,`" "` and `" "` `(3-sqrt33)/4`

All of these solutions are in the domain of `f`, so they are all critical numbers for `f`.