Suppose f:[−1,1]->R is continuous, f(−1)>−1, and f(1)<1. Show that f has a fixed point. So for every y between f(−1) and f(1) we can find an x s.t. −1<x<1 and f(x)=y, but I'm not sure how to show one of these creates a fixed point.

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The solution of a differential equation y′′+3y′+2y=0 is of the form
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D) $c_1{e}^{-<!--\; -\; -->2x}+c_2{2}^{-<!--\; -\; -->x}$

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