If ∫1sinxt2.f(t)dt=1−sinx,∀xϵ(0,π2) then the value of f(1√3) is
A
1√3
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B
√3
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C
13
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D
3
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Solution
The correct option is D 3 ∫1sinxt2.f(t)dt=1−sinx Differentiating both sides with respect to ‘x’ 0−sin2x.f(sinx).cosx=−cosx⇒cosx[1−sin2x.f(sinx)]=0 But cosx≠0 So, f(sinx)=1sin2xf(1√3)=3