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Question

If f(sinθ)<0 and f′′(sinθ)>0 θ(0,π2) and g(θ)=f(sinθ)+f(cosθ), then

A
g(θ) is decreasing in x(π4,π2)
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B
g(θ) is decreasing in x(0,π4)
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C
g(θ) is increasing in x(π4,π2)
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D
g(θ) in increasing in x(0,π4)
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Solution

The correct option is C g(θ) is increasing in x(π4,π2)
To find; Monotonicity of g(θ) in (0,π4) and (π4,π2)

g(θ)=f(sinθ)+f(cosθ)g(θ)=f(sinθ)×cosθf(cosθ)×sinθ.

f(sinθ)<0 , f′′(sinθ)>0 θ(0,π2)

Let x=sinθ, f(x)<0 x(0,1)

θ(0,π2)cosθ (0,1)
f is decreasing in (0,1)

f′′(x)>0 x (0,1)
f is increasing in (0,1)

g(θ)=f(sinθ)cosθf(cosθ)sinθ
f(sinθ)<0 , f(cosθ)<0

In (0,π4)cosθ>sinθ
f(cosθ)>f(sinθ) and f<0
g(θ)<0
g(θ) is decreasing in x(0,π4)

In (π4,π2)sinθ>cosθ
f(sinθ)<f(cosθ) and f<0
g(θ)>0
g(θ) is increasing in x(π4,π2)

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