Let 'f' be an injective mapping with domain `{x,y,z}` and range `{1,2,3}` such that exactly one of the following statements is correct and the remaining are false `f(x)=1, f(y) != 1, f(z) != 2, ` then `f^(-1)(1)=`

Let f be an injective function with domain {x, y, z} and range {1, 2, 3} such that exactly one of the following statements is correct and the remaining are false. f(x)=1, f(y) ne1, f(z) ne 2 . The value of f^(-1)(1) is

Let f(x) be twice differentiable function for all real x and f(1) = 1, f(2) = 4 , f(3) = 9. Then which one of the following statements is definitelly true ?

Let f(x) =(x+1)^2-1,x ge -1 then {x: f(x) =f^(-1)(x) } =

If y=f(x)=(2x-1)/(x-2), then f(y)=

Find the domain and range of the function f(x) = (x)/(1+x^2) .

Find the domains of the following functions f(x) = ( 1)/( 2x-1)

If f(x) is a function such that f(xy)=f(x)+f(y) and f(2)=1 then f(x)=

If f(x) satisfies the relation f(x+ y) = f ( x) + f( y ) for all x, y in R and f(1) = 5 then

If f : R to R is continuous such that f(x + y) = f(x) + f(y) x in R , y in R and f(1) = 2 then f(100) =