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Question

Giventhatsin2β=sinα.cosα;showthatcos2β=2cos2(π4+α)

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Solution

Solution:

given

sin2β=sinαcosα

multiplying 2 on both sides

2sin2β=2sinαcosα

1cos2β=sin2α

cos2β=1sin2αLHS

Now for cos2β=2cos2(π4+α)

We know

cosπ2=0

sinπ2=1

Taking RHS

2cos2(π4+α)

1+cos(2π4+2α)

1+cos(π2+2α)

1+[cosπ2cos2αsinπ2sinα]

1sin2α

LHD=RHS Proved


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