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

Let f:{1,2,3} to {a,b,c} be one-one and onto function given by f (1) =a, f (2) =b and f (3) =c. Show that there exists a function g : {a,b,c} to {1,2,3} such that gof =I _(x) and fog =I _(y), where, X = {1,2,3} and Y={a,b,c}.

Consider f: {1,2,3} to {a,b,c} and g: {a,b,c} to {apple, ball, cat} defined as f (1) =a, f (2) =b, f (3)=c, g (a) = apple, g (b) = ball and g (c )= cat. Show that f, g and gof are invertible. Find out f ^(-1) , g ^(-1) and ("gof")^(-1) and show that ("gof") ^(-1) =f ^(-1) og ^(-1).

Given f(x+1) = 3x +5 , evaluate f(-2) and f(x)

If f(x) = 4x - x^2 , then f (a + 1) - f( a - 1) =

If f(x)=f'(x) and f(1) =2 , then f(3) equals :

If f(1)=1 and f(n+1)=2 f(n)+1 , then f(n) is

Show that the function f:N to N, given by f (1) =f (2) =1 and f (x) =x -1, for every x gt 2, is onto but not one-one.

If f : R to R is defined by f(x) = x/(x^(2)+1) find f(f(2)) .

If f(y)=f(x^(2)+2) and f'(3)=5 , then (dy)/(dx) at x=1 is :

If f(x)= 2x^(3)+3x^(2)-11x+6 find f(-1)