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Finding solutions in an interval for an equation with sine and cosine using double-angle identities
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29 votes
29 votes
Finding solutions in an interval for an equation with sine and cosine using double-angle identities

Finding solutions in an interval for an equation with sine and cosine using double-example-1
User Mike Strong
by
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1 Answer

19 votes
19 votes

Given:


\cos (2x)+\sin x=0
\text{Use }\cos (2x)=1-2\sin ^2x.


1-2\sin ^2x+\sin x=0

Multiplying by (-1) on both sides, we get


2\sin ^2x-\sin x-1=0


2\sin ^2x-2\sin x+\sin x-1=0


2\sin ^{}x(\sin x-1)+1(\sin x-1)=0

Taking out common terms.


(\sin x-1)(2\sin x+1)=0


(\sin x-1)=0,(2\sin x+1)=0


\sin x=1,\sin x=-(1)/(2)


Use\text{ }\sin ((\pi)/(2))=1,\sin (\pi+(\pi)/(6))=-(1)/(2).
\sin x=\sin ((\pi)/(2)),\sin x=\sin (\pi+(\pi)/(6))


\sin x=\sin ((\pi)/(2)),\sin x=\sin ((7\pi)/(6))


x=(\pi)/(2),(7\pi)/(6)

Hence the solution is


x=(\pi)/(2),(7\pi)/(6)

User Ian Emnace
by
2.9k points
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