Let `h(x)=f(x)-(f(x))^2+(f(x))^3` for every real `x`. Then,

Let f(x) = x-[x] , for every real number x, where [x] is integral part of x. Then int_(-1) ^1 f(x) dx is

If f(x) = frac {x^2 -1}{x^2 +1} , for every real x, then the minimum value of f(x) is.

Suppose f is such that f(-x)=-f(x) for every real x and int_0^1 f(x) dx =5 , then int_-1^0 f(t)dt=

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 a given constant and f (0) =1, f(2a-x) is equal to :

If f(x) is continuous at x=0 , where f(x)=((e^(3x)-1)sin x)/(x^(2)) , for x!=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=((e^(3x)-1)sin x^(@))/(x^(2)) , for x!=0 , then f(0)=

Let F(x)=e^x,G(x)=e^(-x) " and " H(x)=G(F(x)) , where x is a real variable. Then (dH)/(dx) at x=0 is

Let f be a non constant continuous function for all xge0 . Let f satisfy the relation f(x)f(a-x)=1 for some a in R^(+) . Then I=int_(0)^(a)(dx)/(1+f(x)) is equal to

Let f(x)=x^3+3/2x^2+3x+3 , then f(x) is