Let `f:R rarr R` defined by `f(x)=(x^(2))/(1+x^(2))`. Proved that f is neither injective nor surjective.

Let f:R rarr R be a function defined as f(x)=(x^(2)-6)/(x^(2)+2) , then f is

Let f:R to R be a function defined by f(x)=(x^(2)-8)/(x^(2)+2) . Then f is

Show f:R rarr R defined by f(x)=x^(2)+4x+5 is into

The function f:R rarr R defined as f(x)=(x^(2)-x+1)/(x^(2)+x+1) is

If f:R rarr R be a function defined as f(x)=(x^(2)-8)/(x^(2)+2) , then f is

If f: R to R is defined by f(x) = x^(2)+1 , then show that f is not an injection.

Let f:R->R be a function defined by f(x)=x^2-(x^2)/(1+x^2) . Then:

Let f:R to R be defined by f(x) =e^(x)-e^(-x). Prove that f(x) is invertible. Also find the inverse function.

Let the function f:R→R be defined by f(x)=cosx,∀x∈R. Show that f is neither one-one nor onto

Let f:[-1,1] to R_(f) be a function defined by f(x)=(x)/(x+2) . Show that f is invertible.