Lucky us: we already have our trig function isolated on one side.
The x-coordinate on the unit circle equals cosine.
Two angles between 0 and 2π have an x-coordinate of positive .
Trigonometric functions repeat themselves infinitely, so we need to list all of the possible correct angles. Just be careful about staring into the face of infinity; it has the teensy-weensy problem of driving people mad after a while.
Example 2
Solve tan t = -1 on the interval [-2π, 2π].
Tangent is sine over cosine.
Looking at the unit circle, they will be equal when at angles.
Tangent is negative in the second and fourth quadrants.
n = 0:
The angles fall smack dab in the middle of our interval.
n = 1:
These are greater than 2π, so they aren't acceptable answers.
n = -1:
These are within the interval.
n = -2:
These are less than -2π, so no good.
Our answers are .
Example 3
Solve on the interval .
Cosecant is the reciprocal of sine. That means we want the angles where
Sine and cosecant are the y-coordinate on the unit circle. They are negative in the third and fourth quadrants. is more than π, and is less than 2π.
The interval, , covers the left half of the unit circle, meaning the second and third quadrants. That means the only solution is:
.
.
angles.
.
on the interval 
.
is 
more than π, and 
is 
less than 2π.
, covers the left half of the unit circle, meaning the second and third quadrants. That means the only solution is: