How do you solve 5(cos^3)x=5cos x over the interval (0,2pi)?

1 Answer
Apr 25, 2018

Any multiple of #\pi/2# in the interval solves the equation.

Explanation:

First note that the factor #5# can be divided out leaving

#\cos^3(x)=\cos(x)#

#\cos(x)-\cos^3(x)=0#

Factoring and using the Pythagorean identity #\sin^2(x)+\cos^2(x)=1#:

#\cos(x)(1-\cos^2(x))=\cos(x)\sin^2(x)=0#

So either #\sin(x)# or #\cos(x)# could be #0# making #x# a multiple of #\pi/2#.