A function satisfying `int_0^1f(tx)dt=nf(x)`, where `x>0` is

Let f(x) be a function satisfying f'(x) = f(x) with f(0) = 1 and g(x) be a function that satisfies f(x) + g(x) = x^2 . Then the value of the integral int_0^1 f(x) g (x) dx is :

There exists a function f(x) satisfying f(0)=1, f'(0)=-1, f(x) gt 0 , for all x, then :

A real valued functio f(x) satisfies the functional equation f(x-y)=f(y)-f(a-x)f(a+y) where a is given constant and f(0) =1 f(2a-x) is equal to

Let f be function satisfying f(x+y)=f(x)+f(y) and f(x)=x^(2)g(x) , for all x and y, where g(x) is a continuous function. Then f'(x) is :

If f and g are continuous functions in [0,1] satisfying f(x) = f(a - x) and g(x) + g(a - x) = a , then int_0^a f(x). g(x) dx is equal to :

If f(x) is a ploynomial function satisfying f(x) . f(1/x) = f(x) + f(1/x) and f(3)=28, then f(2) is

A real valued function f(x) satisfies the functional equation : f(x-y)=f(x)f(y)-f(a-x)f(a+y) , where a is given constant and f(0)=1.f(2a-x) is equal to :