Prove that the derivative of and odd function is an even function.

Prove that the derivative of an odd function an ever function .

The derivative of an odd function is always

True or False -The derivative of an even function is always an odd function.

Show that any function can be expressed as the sum of an odd function and even function

Define derivative of a function 'f' at x = c

Which of the following function is even function

f(x)=(cosx)/([(2x)/pi]+1/2), where x is not an integral multiple of pi and [dot] denotes the greatest integer function, is an odd function an even function neither odd nor even none of these

If the derivative of a function is sqrt(x) , then the function is -

STATEMENT 1: int_a^xf(t)dt is an even function if f(x) is an odd function. STATEMENT 2: int_a^xf(t)dt is an odd function if f(x) is an even function.

f(x)= cosx/([2x/pi]+1/2) where x is not an integral multiple of pi and [ . ] denotes the greatest integer function, is (a)an odd function (b)an even function (c)neither odd nor even (d)none of these