Statement-1 : Let `f : [1, oo) rarr [1, oo)` be a function such that `f(x) = x^(x)` then the function is an invertible function.
Statement-2 : The bijective functions are always invertible .

Statement 1: Let f:R rarr R be a real-valued function AA x,y in R such that |f(x)-f(y)|<=|x-y|^(3) .Then f(x) is a constant function.Statement 2: If the derivative of the function w.r.t.x is zero,then function is constant.

Let f be an invertible function.Show that the inverse of f^(-1) is f

Let f:ArarrB is a function defined by f(x)=(2x)/(1+x^(2)) . If the function f(x) is a bijective function, than the correct statement can be

Let f(x)=e^(x^(3)-x^(2)+x) be an invertible function such that f^(-1)=g ,then-

Let a function f:(2,oo)rarr[0,oo)"defined as " f(x) = (|x-3|)/(|x-2|), then f is

Let f:(-1,oo) rarr R be defined by f(0)=1 and f(x)=1/x log_(e)(1+x), x !=0 . Then the function f:

Let a function f:(1, oo)rarr(0, oo) be defined by f(x)=|1-(1)/(x)| . Then f is

Let f : R rarr R : f(x) = (2x-3)/(4) be an invertible function. Find f^(-1) .