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Question

If π2<x<π2 and the sum to infinite number of terms of the series cosx+23cos x sin2 x+49cos x sin4 x+..... is finite, then x lies in the set


A

π2< x < π2

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B

π6< x < π6

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C

π6< x < π2

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D

0 < x < π2

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Solution

The correct option is A

π2< x < π2


Solution : cosx+23cos x sin2 x+49cos x sin4 x+..... is finite

cos x123sin2x

3Cosx32sin2x

3cosx1+2(1sin2x)

3cosx1+cos2x

1<23sin2x<1

3< 2sin2x< 3

32<sin2x<32

0<sin2x<32

We know that for every value of x we have 0<sin2x<1

Since, π2<x<π2

Then x can take all the values in the interval -

π2<x<π2

π2< x < π2


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