Question 1077821: Find all solutions of each of the equations in the interval [0,2pi).
a) sin(x+pi/3)+sin(x−pi/3)=1
b) tan(x+pi)+2sin(x+pi)=0
c) cos(x−pi/2)+sin2x=0
Answer by KMST(5328)   (Show Source):
You can put this solution on YOUR website! a) 
Using the trigonometric identities
for sine of sum an difference of two angles,
the equation can be re-written as
  
Taking out  and as common factors
the equation can be re-written as
 
We know that  , so we re-write the equation as
 and  .
In the interval [0,2pi), that happens only for
 .
b) 
Based on trigonometric identities, the equation can be re-written as
 and  .
Then, with some algebra, it can be re-written as
 and 
The numerator is zero when
 --->  or  .
The numerator is also zero when
 --->  --->  or  .
For none of those values of x, is the  zero,
so they are all valid solutions.
c) 
(Or did you mean  instead?)
Using trigonometric identities,
the equation can be re-written as
 <-->  and  .
If the second term was really  ,
using the trig identity for double angles,
the equation can be re-written as
 <---> 
The expression  is zero when
---> or .
The expression is also zero when
 <--->  .
In the interval [0,2pi), that happens for
 or  .
NOTE: For ,
 <-->  ,
in the interval [0,2pi) has solutions when
-->  or  ,
and when
 -->  -->  .
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