Statement - I : If f(x) `= sinx, then f'(0) = f'(2pi)`
Statement - II : If f(x) = sin x , then f(0) `=f(2pi)`.

Statement -I : f(x) = sin x then f' (pi) = f' (3pi) Statement - (ii) : f(x) = sin x then f (pi) = f (3pi)

Statement - I : for f(x)=sin x, f'(pi)=f'(3pi) Statement - II : for f(x) =sin x, f(pi)=f(3pi)

Statement - I : If f(x) is an odd function, then f'(x) is an even function. Statement - II : If f'(x) is an even function, then f(x) is an odd function.

If f(x)=xinx then f'((pi)/2) is equal to

Statement 1: For f(x)=sinx ,f^(prime)(pi)=f^(prime)(3pi) Statement 2: For f(x)=sinx ,f(pi)=f(3pi)dot a. Statement 1 and Statement 2, both are correct and Statement 2 is the correct explanation for Statement 1 b. Statement 1 and Statement 2, both are correct and Statement 2 is not the correct explanation for Statement 1 c. Statement 1 is correct but Statement 2 is wrong. d. Statement 2 is correct but Statement 1 is wrong.

Let F(x) be an indefinite integral of sin^(2) x Statement - I : The function F(x) satisfies F(x+pi) = F(x) for all real x Statement - II : sin^(2) (pi+x) = sin^(2) x for all real x

If f(x)= sin""x/2 ,then the value of f''( pi ) is-

If f(x)=|x|^(|sinx|), then find f^(prime)(-pi/4)

If f(x)={x^2 sin((pi x)/2), |x| =1 then f(x) is