Let `f:RR rarr RR` be the function defined by `f(x)=x+1`. Find the function `g:RR rarr RR`, such that `(g o f)(x)=x^(2)+3x+3`

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 RR be the set of real numbers and f:RR rarr RR be defined by , f(x)=2x +1 . Find g: RR rarr RR , such that (g o f) (x) =10 x+10

Let f: RR rarr RR be a function defined by f(x)=ax+b , for all x in RR . If (f o f)=I_(RR) Find the value of a and b.

Let t the function f:RR to RR be defined by, f(x)=a^x(a gt0 ,a ne1). Find range of f

Prove that, the function f: RR rarr RR defined by f(x)=x^(3)+3x is bijective .

Let f: RR rarr RR be defined by f(x)={(|x|/(x) " when " x ne 0 ),(0" when "x =0 ):} and the function g: RR rarr RR be defined by g(x) =[x] where [x] is the greatest integer function. Prove that the functions (f o g) and (g o f) are same in [-1,0).

Let RR and QQ be the sets of real numbers and rational numbers respectively. If a in QQ and f: RR rarr RR is defined by , f(x)={(x " when" x in QQ ),(a-x" when " x notin QQ ):} then show that , (f o f ) (x) = x , for all x in RR

Let RR be the set of real numbers and f: RR rarr RR ,g: RR rarr RR be two functions such that, (g o f) (x) = 4x^(2)+4x+1 and (f o g ) (x) = 2x^(2)+1 . Find f(x) and g(x) .

Let f:RR rarr RR and g: RR rarr RR be two mapping defined by f(x)=2x+1 and g(x)=x^(2)-2 , find (g o f) and (f o g).

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