Answer:
A ) The graph of the function start high and ends low .
Step-by-step explanation:
Given : f(x) = [tex]-x^{5} +x^{2} -x[/tex].
To find : Describe the end behavior of the following function.
Solution : We have given function
f(x) = [tex]-x^{5} +x^{2} -x[/tex].
We can see the Degree = 5 ( Odd) , Leading coefficient = negative .
By the End Behavior Rule : If the degree odd and leading coefficient is negative then the left side of graph would be up and right would be down.
Therefore, A ) The graph of the function start high and ends low .
