Let R be the set of all real numbers. The function `f:Rrarr R` defined by `f(x)=x^(3)-3x^(2)+6x-5` is

The function f:R rarr R defined as f(x)=(3x^2+3x-4)/(3+3x-4x^2) is :

Consider a function f:R rarr R defined by f(x)=x^(3)+4x+5 , then

The function f:R→R defined by f(x)=(x−1)(x−2)(x−3) is

The function f : R -> R is defined by f (x) = (x-1) (x-2) (x-3) is

Let C denote the set of all complex numbers. A function f: C->C is defined by f(x)=x^3 . Write f^(-1)(1) .

If R is the set of real numbers then prove that a function f: R to R defined as f(x)=(1)/(x), x ne 0, x in R, is one-one onto.

Let R be the set of real numbers. Define the real function f : R ->Rb y f(x) = x + 10 and sketch the graph of this function.

A function f :Rto R is defined as f (x) =3x ^(2) +1. then f ^(-1)(x) is :

A function f :Rto R is defined as f (x) =3x ^(2) +1. then f ^(-1)(x) is :

Let f: R rarr Ris defined by/(x)= 3x + 5. Then