Question
If f(x)=(logcotxtan x)(logtanxcot x)−1+tan−1(x√(4−x2)) then f'(0) is equal to
Answer: Option C
:
C
f(x)=(logcotxtanx)(logtanxcotx)+tan−1(x√(4−x2))
f(x)=1+tan−1(x√(4−x2))
Now Put x=2sinθ, we get
f(x)=1+tan−1(2sinθ√4−4sin2θ)⇒f(x)=1+tan−1(2sinθ2cosθ)⇒f(x)=1+tan−1(tanθ)⇒f(x)=1+θ⇒f(x)=1+sin−1(x2)⇒f′(x)=0+1√1−(x2)2⋅12⇒f′(0)=12
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C
f(x)=(logcotxtanx)(logtanxcotx)+tan−1(x√(4−x2))
f(x)=1+tan−1(x√(4−x2))
Now Put x=2sinθ, we get
f(x)=1+tan−1(2sinθ√4−4sin2θ)⇒f(x)=1+tan−1(2sinθ2cosθ)⇒f(x)=1+tan−1(tanθ)⇒f(x)=1+θ⇒f(x)=1+sin−1(x2)⇒f′(x)=0+1√1−(x2)2⋅12⇒f′(0)=12
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