How do you solve cos2theta=costheta?

1 Answer
Alan P.
Jun 25, 2015

theta epsilon {0^o, 120^o, 240^o} (if the range is restricted to [0,2pi))

Explanation:

Limiting the range of theta epsilon [0,2pi)

Since cos(2theta)= 2cos^2(theta)-1
After re-arranging cos(2theta)=cos(theta) into the form:
color(white)("XXXX")cos(2theta)-cos(theta)=0
we can write
color(white)("XXXX")2cos^2(theta)-cos(theta)-1 = 0
which factors as
color(white)("XXXX")(2cos(theta)+1)*(cos(theta)-1) = 0

So the equation holds if
color(white)("XXXX")cos(theta)= (-1/2)
color(white)("XXXX")color(white)("XXXX")rarr theta = 120^o or 240^o
or if
color(white)("XXXX")cos(theta)=1
color(white)("XXXX")color(white)("XXXX")rarr theta = 0^o

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