If functions `f:{1,2,…,n} rarr {1995,1996}` satisfying `f(1)+f(2)+…+f(1996) = `odd integer are formed, the number of such functions can be

Let A={1,2,3,4,5} and f:A rarr A be an into function such that f(i) nei, forall i in A , then number of such functions f are

A function f : R rarr R satisfies the equation f(x + y) = f(x) . f(y) for all, f(x) ne 0 . Suppose that the function is differentiable at x = 0 and f'(0) = 2. Then,

If the function f:[1, infty) rarr [1, infty) is defined by f(x)=2^(x(x-1)) , then find f^(-1)(x) .

A function f: R rarr R satisfies the equation f(x+ y)= f(x).f(y) "for all" x, y in R, f(x) ne 0 . Suppose that the function is differentiable at x=0 and f'(0)=2, then prove that f'(x)= 2f(x)

The function f(x) satisfying the equation f^2 (x) + 4 f'(x) f(x) + (f'(x))^2 = 0

Let f be real valued function from N to N satisfying. The relation f(m+n)=f(m)+f(n) for all m,n in N . The range of f contains all the even numbers, the value of f(1) is

Consider f : {1,2,3} rarr {a,b,c} given by f(1) = a, f(2) and f(3) = c . Find f^(-1) and show that (f^(-1))^(-1)=f .

Let S = {1, 2, 3}. Determine whether the functions f:S rarr S defined as below have inverses. Find f^(-1) , if it exists. Note : Here we accept that inverse at function is unique. f = {(1, 2), (2, 1), (3, 1)}

If functions f : A rarr B and g : B rarr A satisfy gof = I_A , then show that f is one one and g is onto.

f : R rarr R , f(x) = 2 x + |cosx| then f is ......... function .