If `f : A rarr B` and `g : B rarr C` be two functions, then the compositions of functions f and g is given by

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

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

Let f:A rarr B and g:B rarr 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.

Let f:A rarr B;g:B rarr A be two functions such that fog=I_(B). Then; f is a surjection and g is an injection.

Let f:A rarr B;g:B rarr A be two functions such that gof=I_(A). Then; f is an injection and g is a surjection.

Let f:A rarr B and g:B rarr C be two functions and gof:A rarr C is define statement(s) is true?

Let f:R rarr R and g:R rarr R be two given functions such that f is injective and g is surjective.Then which of the following is injective.Then which of the following is these

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

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

Let f : R rarr R and g : R rarr R be two functions such that fog (x) = sin x^(2) and gof (x) = sin^(2)x . Then , find f(x) and g(x).