COMPREHENSION TYPE `f(x)` is a polynomial function `f:R rarrR` such that `f(2x)=f^(prime)(x)f^(primeprime)(x)`

COMPREHENSION TYPE f(x) is a polynomial function f:R rarr R such that f(2x)=f'(x)f''(x)

Find a polynomial function f(x) such that f(2x)=f'(x)f''(x)

f(x) is a polynomial function, f: R rarr R, such that f(2x)=f'(x)f''(x). The value of f(3) is

The function f:R rarr R, f(x)=x^(2) is

f(x) is a polynomial function, f: R rarr R, such that f(2x)=f'(x)f''(x). Equation f(x) = x has (A) three real and positive roots (B) three real and negative roots (C) one real root (D) three real roots such that sum of roots is zero

Function f:R rarr R,f(x)=x|x| is

If f(x) is a polynomial function such that f(x)f((1)/(x))=f(x)+f((1)/(x))and f(3) =-80 then f(x) - f((1)/(x)) =

Let f be a polynomial function such that f(3x)=f'(x);f''(x), for all x in R. Then : .Then :

The function f:R to R given by f(x)=x^(2)+x is

If f:R^(+)rarrR such that f(x)=log_(3)x and f^(-1)(x)=k^x then k+2=