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 2f(x)- 3f(1/x) = x then int_1^(e) f(x) dx =

Let f(x) = x - 1/x , then f' (-1) is

If f is odd function, then int_(-1)^1 (|x| + f(x) cos x)dx is :

If f (x) = x - [x], x (ne 0 ) in R, where [x] is the greatest integer less than or equal to x, then the number of solutions of f(x) + f ((1)/(x)) = 1 is :

If f(x) is integrable on [0,a], then int_0^(a) (f(x))/(f(x)+ f(a-x)) dx =

If f(x) = f(a - x) , then int_0^(a) xf(x) dx is equal to :

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

The function f and g are given by : f(x)=(x) , the fractional part of x and g(x)=(1)/(2)sin[x]pi , where [x] denotes the integral part of x, then range of gof is :