Whichis greater (1/2)^e or 1/e^2 if there is a given function sinx^(sinx), 0 < x < π?(a) 1/e^2(b) (1/2)^e(c) Data not sufficient(d) Varies as the value of x changesI have been asked this question in examination.Enquiry is from Second Order Derivative in portion Limits and Derivatives of Mathematics – Class 11

Whichis greater (1/2)^e or 1/e^2 if there is a given function sinx^(si

1.	Whichis greater (1/2)^e or 1/e^2 if there is a given function sinx^(sinx), 0 < x < π?(a) 1/e^2(b) (1/2)^e(c) Data not sufficient(d) Varies as the value of x changesI have been asked this question in examination.Enquiry is from Second Order Derivative in portion Limits and Derivatives of Mathematics – Class 11
Answer» Right option is (b) (1/2)^e To EXPLAIN I would say: Let, f(x) = sinx^(sinx) So, f(x) = e^sinx log sinx So, on differentiating it we get, f’(x) = sinx^(sinx) [cosx log sinx + cos x] So, f’(x) = 0 when, x = sin^-1(1/e) or x = π/2 Also, f”(x) = sinx^(sinx)[cos^2x(1 + log sinx)^2 – sinx log sinx + (cos^2x/sinx) – sinx] So that, f”(sin^-1(1/e)) = (e – 1/e)e^-1/e And, f”(π/2) = -1 Hence, f(x) has local as well as global MINIMUM at x = sin^-1(1/e) also have local and global maximum at x = π/2 Global minimum value of f(x) is (1/e)^1/e It therefore FOLLOWS that , sin π/6 ^(sinπ/6) > (1/e)^1/e =>(1/2)^1/2 > (1/e)^1/e =>(1/2)^e > 1/e^2

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