If `f: A-> B` and `g: B-> C` be the bijective function, then `(gof)^(-1)` is:

If f : A rarr B is a bijective function, then f^(-1) of is equal to

Statement I: f : A->B is one - one and g : B->C is a one - one function, then gof :A->C is one - one Statement II : If f:A->B, g:B->A are two functions such that gof=IA and fog=IB, then f=g-1. Statement III : f(x)=sec 2x-tan2x,g(x)=cosec2x-cot2x, then f=g

Let f:A to B and g:B to C be bijection, then (fog)^(-1) =

If f:A rarr B,g:B rarr C are bijective functions show that gof:A rarr C is also a bijective function.

If f:A rarrB is bijective function such that n(A)=10, then n(B)=?

Consider function f : A to B and g : B to C (A, B, sube R) such that (gof) ""^(-1) exists then

If f:A rarr B and g:B rarr C are one-one functions,show that gof is one-one function.

If f and g are two bijections; then gof is a bijection and (gof)^(-1)=f^(-1)og^(-1)