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Question

The general solution of the equation sin100xcos100x=1 is
(where nZ )

A
2nπ+π2
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B
nπ+π2
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C
2nππ2
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D
nπ
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Solution

The correct option is B nπ+π2
sin100xcos100x=1
sin100x=1+cos100x
We know that,
sin100x1 and 1+cos100x1
The equation has solution only when
sin100x=1 and 1+cos100x=1sin2x=1 and cos2x=0
x=nπ±π2 and x=nπ±π2
x=nπ±π2,nZx=(2n±1)π2
As (2n+1) and (2n1) both represent set of odd integers, so
x=(2n+1)π2=nπ+π2, nZ

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