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Question
If f(x)=(sin2x−1)n, then x=π2 is a point of
If f(x)=(sin2x−1)n, then x=π2 is a point of
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Solution
The correct options are
B Local Minimum, if n is odd
D Local Minimum, if n is even
Given : f(x)=(sin2x−1)n
Differentiate w.r.t x.f′(x)=n(sin2x−1)n−1(2sinxcosx)Atx=π2f′(π2)=n(sin2(π2)−1)n−12sin(π2)f′(π2)=0f′(π2)=(0−)nf′(π2)=(0−)nf′(π2)=0Which implies that ⇒ If n is odd, then the function is of local maximum.⇒ If n is even, then the function is of local minimum.Hence, the correct answer is options B and D.
B Local Minimum, if n is odd
D Local Minimum, if n is even
Given : f(x)=(sin2x−1)n
Differentiate w.r.t x.
f′(x)=n(sin2x−1)n−1(2sinxcosx)
Atx=π2
f′(π2)=n(sin2(π2)−1)n−12sin(π2)
f′(π2)=0
f′(π2)=(0−)n
f′(π2)=(0−)n
f′(π2)=0
Which implies that ⇒ If n is odd, then the function is of local maximum.
⇒ If n is even, then the function is of local minimum.
Hence, the correct answer is options B and D.
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