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Question

The general solution of the equation2 cos2θ+3 sin θ=0 is
.

A
nπ+(1)nπ6, nZ
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B
nπ+(1)n+1π6, nZ
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C
nπ+(1)n5π6, nZ
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Solution

The correct option is B nπ+(1)n+1π6, nZ
To solve this equation, we try to write the equation in terms of sin θ.
Now, we can write the equation as:
2cos2θ+3sin θ=02(1sin2θ)+3sin θ=02sin2θ3sinθ2=0(sin θ2)(2sin θ+1)=0
This means either
sin θ=2 or sin θ=12.
But, sin θ=2 is not possible.
Thus,
sin θ=12=sin(π6)θ=nπ+(1)n(π6), nZθ=nπ+(1)n+1(π6), nZ

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