Consider `f:N to N, g : N to N and h: N to R` defined as `f (x) =2x,g (h) = 3y + 4 and h (z= sin z, AA x, y and z `in N. Show that h(gof) = (hog) of.

Consider f: N to N, g : N to N and h: N to R defined as f(x) = 2x, g(y) = 3y + 4 and h(z) = sin z, AA x, y and z in N. Show that ho(gof) = (hog)of .

If f : B to N , g : N to N and h : N to R defined as f(x) = 2x , g(y) = 3y+4 and h(x) = sin x , AA x, y, z in N . Show that h h o ( g of) = (h og) o f

If f: X to Y, g : Y to Z and h: Z to S are functions, then ho(gof) = (hog)of .

Let f: N rarr N be defined by f(x)=x^(2)+x+1 then f is

If f:R -> R, g:R -> R defined as f(x) = sin x and g(x) = x^2 , then find the value of (gof)(x) and (fog)(x) and also prove that gof != fog .

Let f : N to N : f(x) =2 x for all x in N Show that f is one -one and into.

If f(x) = x^n , n in N and gof(x) = ng(x) , then g(x) can be

Consider the identity function I_(N):N to N defined as I _(N) (x)=x AA x in N. Show that although I _(N) is onto but I _(N) + I _(N) : N to N defined as (I _(N) + I _(N)) (x) = I _(N) (x) + I _(N) (x) = x +x = 2x is not onto.

Prove that the function f: N to Y defined by f(x) = x^(2) , where y = {y : y = x^(2) , x in N} is invertible. Also write the inverse of f(x).

Show that the function f : N to N defined by f(x) = x^(3), AA x in N is injective but not surjective.