If `f:AtoB` and `g:BtoC` are both bijective functions then `(gof)^(-1)` is

Let f : A to B and g : B to C be the bijective functions. Then (g of )^(-1) is

If f: A->B and g: B->C are onto functions show that gof is an onto function.

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

Let f: A to B and g: B to C be two functions. Then; if gof is onto then g is onto; if gof is one one then f is one-one and if gof is onto and g is one one then f is onto and if gof is one one and f is onto then g is one one.

If f: A->B and g: B->C are onto functions, show that gof is an onto function.

Let f:A to A and g:A to A be two functions such that fog(x)=gof (x)=x for all x in A Statement-1: {x in A: f(x)=g(x)}={x in A: f(x)=x}={x in A: g(x)=x} Statement-2: f:A to A is bijection.

Statement-1: If f:R to R and g:R to R be two functions such that f(x)=x^(2) and g(x)=x^(3) , then fog (x)=gof (x). Statement-2: The composition of functions is commulative.

If function f:AtoB is a bijective , then f^(-1) of is

Let f:N rarr R be the function defined by f(x)=(2x-1)/2 and g:Q rarr Q be another function defined by g(x)=x+2 then (gof)(3/2) is

If f: Q->Q ,\ \ g: Q->Q are two functions defined by f(x)=2x and g(x)=x+2 , show that f and g are bijective maps. Verify that (gof)^(-1)=f^(-1)\ og^(-1) .