Question

What are the critical values, if any, of `f(x)=(x^2-5x)/(x^2-2)`?

Answer 1

`f` has no critical values.

Explanation:

`f(x)=(x^2-5x)/(x^2-2)`

Note that the domain of `f` is all real numbers except `+-sqrt2`

`f'(x) = ((2x-5)(x^2-2)-(x^2-5x)(2x))/(x^2-2)^2`

`= (2x^3-5x^2-4x+10-2x^3+10x^2)/(x^2-2)^2`

`= (5x^2-4x+10)/(x^2-2)^2`

`f'(x)` is not defined for `x=+-sqrt2`, but those numbers are not in the domain of `f`, so they are not critical values for `f`.

`f'(x)=0` when `5x^2-4x+10 =0`. The discriminant of this quadratic is negative, so there are no real zeros.

`f` has no critical numbers.