If `f:ArarrB,g:BrarrC` are two bijective functions then P.T `("gof")^(-1)=f^(-1)"og"^(-1)`

If A={1,2,3},B=(alpha,beta,gamma),c=(p,q,r) and (f:A to B,g:B to C are defined by f={(1,alpha),(2,gamma),(3,beta)},g={(alpha,q),(gamma,p)} then show that f and g are bijective functions and (gof)^(-1)=f^(-1)og^(-1).

If f:A to B is a bijective function then prove that (i) fof^(-1) = I_(B)

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

If f:A to B is a bijective function then prove that (ii) f^(-1) of =I_(A) .

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:RrarrR,g:RrarrR are defined by f(x)=3x-1 and g(x)=x^(2)+1 , then find ("gof")(2a-3)