Consider the function [math] on the interval [math]. Verify that this function satisfies the three hypotheses of Rolle's Theorem on the inverval:

[math] is on [math];
[math] is on [math];
[math] .

Then by Rolle's theorem, there exists a [math] such that [math].
Find all values [math] that satisfy the conclusion of Rolle's theorem and give then in a comma-separated list.

Values of [math]: