Question

How do you describe the end behavior for `f(x)=-x^4+x^2+2`?

Answer 1

`f in(-oo, 9/4]`. ]See explanation. and graph, for the overall behavior.

Explanation:

End behavior L

`f=-x^4(1-1/x^2-2/x^4) to -oo`, as x to +-oo#.

`f=(2-x^2)(1+x^2)=0`, at `x = +-sqrt2`.

`f'=2x(1-2x^2)=0`, at `x=0 and +-1/sqrt2`

`f''=2(1-6x^2)=0`, at `x=+-1/sqrt6`,

`and > 0`, at turning points `(+-1/sqrt2, 9/4)`,

giving global maximum `9/4`, at `x = +-1/sqrt2`-

At the turning point (0, 2), f''=2 giving local minimum 2.

`f''' ne 0`, at x = +-1/sqrt 6#, giving

POI , at `x=+-1/sqrt6`.

graph{-x^4+x^2+2 [-5, 5, -2.5, 2.5]}