What are the values of #theta# that satisfies #2costhetatantheta + 2costheta -1 = tantheta#?

1 Answer
Nov 29, 2017

To summarize, solutions are:
#theta = pi/3 + 2pin#
#theta = (5pi)/3 + 2pin#
#theta = pin#

Explanation:

We start by putting all terms to one side:

#2costhetatantheta - tan theta + 2costheta - 1 = 0#

#tantheta(2costheta - 1) + 2costheta - 1 = 0#

#(2costheta - 1)tan theta = 0#

#costheta = 1/2 or tan theta = 0#

If we consider the first equation, we know that cosine will be positive in the first and forth quadrants. The reference angle will be #pi/3#, so the two solutions are going to be #pi/3# and #2pi - pi/3 = (5pi)/3#. The period of the cosine function is #2pi#, thus, the general form solution are :

#theta = pi/3 + 2pin and (5pi)/3 + 2pin#

For the second equation, we know that #tantheta = sintheta/costheta#, so the equation will be true only when #sintheta = 0#. This will occur when #theta = 0 or pi#. Since tangent has a period of #pi#, our general form solutions will be

#theta = pin#

Hopefully this helps!