Let R be the set of real numbers. If `f:R rarr R` is a function defined by `f(x)=x^(2)`, then f is

If f:R rarr(0, 1] is defined by f(x)=(1)/(x^(2)+1) , then f is

If f: R to R defined by f(x) =x^(2)-2x-3 , then f is:

Let f: R rarr R be a function defined by f(x)=(x^(2)+2x+5)/(x^(2)+x+1) is

If f: R to R is defined by f(x)=(x^(2)-4)/(x^(2)+1) , then f(x) is

Let X and Y be subsets of R, the set of all real numbers. The function f: X to Y defined by f(x) = x^(2) for x in X for xs X is one-one but not onto if

If f: R to R is defined by: f(x-1) =x^(2) + 3x+2 , then f(x-2) =

If R is the set of all real numbers and if f: R -[2] to R is defined by f(x)=(2+x)/(2-x) for x in R-{2} , then the range of is:

If f:R rarrR is defined by f(x)=2x+|x| then f(2x)+f(-x)-f(x)=