If `f : A to B and g : B to A` are two functions such that `gof = I_(A) and fog = I _(B) ` then `g = f ^(-1).`

Statement -I: f: A to B is one -one and g: B to C is a one-one function, then gof : A to C is one-one Statement-II: If f: A to B, g : B to A are two functions such that gof =I_(A) and fog=I_(B) , then f=g^(-1) . Statement-III: f(x) =sec^(2)x- tan^(2)x, g(x) ="cosec"^(2)x-cot^(2)x , then f=g. Which of the above statements is/are true:

If f : A to B and g: B to C are two bijective functions then prove that gof : A to C is also a bijection.

If f : A to B and g : B to C are two injective functions the prove that gof : A to C is also an injection.

If f and g are two decreasing functions such that fog exists then fog is

Show that if f:A to B and g: B to C are onto, then gof :A to C is also onto.