Show that f: R `rarr (-1,1)` is defined by f(x) `= (10^(x)-10^(-x))/(10^(x)+10^(-x))` is invertible also find `f^(-1)` .

If f: R rarr R is defined by f(x) = 3x + 2 define f (f (x))

If the function f:[1, oo) rarr [ 1,oo) defined by f(x) = 2^(x(x -1)) is invertible, then find f^(-1) (x).

If f:R to R defined by f(x)=(3x+5)/(2) is an invertible function, then find f^(-1)(x) .

Let A = R-{2} and B = R - {1}. If f : A rarr B is a function defined by f(x)= (x-1)/(x-2) then show that f is one-one and onto. Hence, find f^(-1) .

Let A = { x:x in R ,(-pi)/(2) lt= xlt= (pi)/(2)} and B = (y:y in R , -1 lt= y lt=1} . Show that the function f : A rarr B given by f(x) = sin x is invertible andc hence find f^(-1) .

Show that the function f : R rarr { x in R : -1 lt x lt 1} defined by f (x) = (x)/(1+|x|), x in R is one - one and onto function.

Show the f:R-{-1)rightarrowR-{1} given by f(x)=frac[x][x-1] is invertible. Also find f^(-1) .

Let f:Rto(-1,1) be defined by f(x)=x/(1+x^2),x in R . Find f^(-1) if exists.