Find the inverse of the function: `f(x)={(x^3-1, ,x<2), (x^2+3,xgeq2)}`

Show that f: [-1, 1] ->R , given by f(x)=x/((x+2) is one- one . Find the inverse of the function f: [-1, 1]

Find the inverse of the function f(x) = (ax+b)/(cx-a) , which is a bijection.

Find the inverse of the function: f:(2,3) to (0,1) defined by f(x)=x-[x], where[.] represents the greatest integer function

Find the inverse of the function: f:[-1,1]rarr[-1,1] defined by f(x)=x|x|

Find the inverse of the function f: [-1,1] to [-1,1],f(x) =x^(2) xx sgn (x).

f(x) = (8^(2x) - 8^(-2x))/(8^(2x) + 8^(-2x) find the inverse of the function

If x in[-1,(-1)/(sqrt(2))] , then the inverse of the function f(x)=sin^(-1)(2x sqrt(1-x^(2))) is given by

Find the inverse of the function: f : [ − 1 , 1 ] → [ − 1 , 1 ] is defined by f ( x ) = x | x |

Show that f: [-1, 1] ->R , given by f(x)=x/((x+2) is one- one . Find the inverse of the function f: [-1, 1]→ S where S is the Range of f.

Find the inverse of the function: f: R rarr (-oo,1)gi v e nb y\ f(x)=1-2^(-x)