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Question

Solve 2cos2x+3sinx=0.


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Solution

We have given:

2cos2x+3sinx=0

2(1-sin2x)+3sinx=0[cos2x=1-sin2x]2-2sin2x+3sinx=02sin2x-3sinx-2=02sin2x-4sinx+sinx-2=02sinx(sinx-2)+1(sinx-2)=0(sinx-2)(2sinx+1)=0Eithersinx-2=0or2sinx+1=0sinx=2orsinx=-12

Since, sinx=2 is not possible as the range of sinx is [-1,1].

So, for sinx=-12, we know that sin is negative in third and fourth quadrant so.

So, x=π+π6orx=2π-π6[sinπ6=12]x=6π+π6orx=12π-π6x=7π6orx=11π6

Hence, x=7π6orx=11π6 is the solution of given trigonometric function.


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