Let the function `g: QQ-{3} rarr QQ` be defined by `g(x)=(2x+3)/(x-3) (QQ` being the set of rational numbers ), then f is ___

Let the function f:RR rarr RR be defined by , f(x)=3x-2 and g(x)=3x-2 (RR being the set of real numbers), then (f o g)(x)=

Let the function f:RR rarr RR be defined by f(x)=x^(2) (RR being the set of real numbers), then f is __

Show that , the function f: RR rarr RR defined by f(x) =x^(3)+x is bijective, here RR is the set of real numbers.

If the function f:RR rarr RR and g: RR rarr RR are given by f(x)=3x+2 and g(x)=2x-3 (RR being the set of real numbers), state which of the following is the value of (g o f) (x) ?

Let the functions f: QQ rarr QQ and g: QQ rarr QQ be defined by, f(x)=3x and g(x)=x+3 . Assuming that f and g are both invertible , verify that , ( g o f) ^(-1) =(f^(-1) o g ^(-1)) .

Let the function f:RR rarr RR be defined by , f(x)=4x-3 .Find the function g:RR rarr RR , such that (g o f) (x)=8x-1

Let the function f: QQ be defined by f(x)=4x-5 for all x in QQ . Show that f is invertible and hence find f^(-1)

Let f(x)=2^100x+1,g(x)=3^100x+1 Then the set of real numbers x such that f(g(x))=x is

If the function f: RR rarr RR be defined by, f(x)={(x " when "x in QQ ),(1-x " when " x in QQ ):} then prove that , (f o f)=I_(RR) .

Let the function f:RR rarr RR and g:RR be defined by f(x) = sin x and g(x)=x^(2) . Show that, (g o f) ne (f o g) .