How do I find all the solutions for cos(x)tan(x)=tan(x) on one interval rotation of the unit circle?

1 Answer
Oct 19, 2017

In #[0, 2pi)#, we have #x in 0 and pi#

Explanation:

We can immediately rewrite as

#0 = tanx - cosxtanx#

#0 = tanx(1 - cosx)#

So we now have two equations.

#tanx = 0#

#x = 0 or pi#

AND

#1 - cosx= 0#

#x = 0#

So in the interval #[0, 2pi)#, the solutions will be #x in 0 uu pi#

Hopefully this helps!