" The inverse of function "f:R rarr{x in R:x<1}" given by "f(x)=(e^(x)-e^(-x))/(e^(x)+e^(-x))" is "

The inverse of the function f:R rarr{x in R:x<1} given by f(x)=(e^(x)-e^(-x))/(e^(x)+e^(-x)), is (1)/(2)log(1+x)/(1-x) (b) (1)/(2)log(2+x)/(2-x)(1)/(2)log(1-x)/(1+x) (d) None of these

The inverse of the function f:R to {x in R: x lt 1}"given by "f(x)=(e^(x)-e^(-x))/(e^(x)+e^(-x)), is

Find the inverse of the function f : R rarr R defined by f(x) = 4x - 7 .

Find the inverse of the function f : R rarr R defined by f(x) = 4x - 7 .

The inverse of the function f: R rarr R given by f(x) = log_{a}(x+sqrt(x^2+1)(a gt 0, a ne 1) is

Find the inverse of the function f: R rarr (-oo,1) given by f(x) = 1-2^(-x)

Find the inverse of the function: f:R rarr(-oo,1) givenby f(x)=1-2^(-x)

If f:A rarr B is a bijection then only f has inverse function II: The inverse function f:R^(+)rarr R^(+) defined by f(x)=x^(2) is f^(-1)(x)=sqrt(x)

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

Function f:R rarr R,f(x)=x|x| is