Discuss the bijectivity of the following mapping :`f: RR rarr RR` defined by `f (x) = ax^(3) +b,x in RR and a ne 0' RR` being the set of real numbers

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.

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 mapping f: RR rarr RR defined by f(x)=mx +n , where m,n, x in RR and m ne 0 , is a bijection.

Find the image set of the domain of each of the following functions : g:RR to RR defined by, g(x) = x^2+2, for all x in RR, where RR is the set of real numbers.

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)=

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

Let RR be the set of real numbers and f: RR rarr RR be defined by , f(x) =x^(3) +1 , find f^(-1)(x)

f: RR to RR given by, f (x) =x^(2) +5, for all x in RR : then the image set is [RR is a set of real number]-

Prove that the mapping f: RR rarr RR defined by , f(x)=x^(2)+1 for all x in RR is neither one-one nor onto.

Find the image set of the domain of each of the following functions : h:RR^+ to RR defined by h(x) = log_ex, " for all " x in RR^+ where RR^+ is the set of positive real numbers.