Let `f` be an injective map 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` . The value of `f^(-1)(1)` is `x` (b) `y` (c) `z` (d) none of these

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

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

Consider that f : A rarr B (i) If f(x) is one-one f(x_(1)) = f(x_(2)) hArr x_(1) = x_(2) or f'(x) ge 0 or f'(x) le 0 . (ii) If f(x) is onto the range of f(x) = B. (iii) If f(x) and g(x) are inverse of each other then f(g(x)) = g(f(x)) = x. Now consider the answer of the following questions. Let f be one-oe function with domain {x, y, z} and range {1, 2, 3}. It is given that exactly one of the following statement is true and the remaining two are false. f(x) = 1, f(y) != 1, f(z) != 2 , then the value of f^(-1)(1) is

Let f be a one-one function with domain (21, 22, 23) and range {x,y,z). It is given that exactly one of the following statements is true and the remaining two are false. f(21) = x; f(22)!=x ; f(23) != y. Then f^(-1)(x) is

If f(x) = x/(x-1)=1/y then the value of f(y) is

If f(x)="cos"((log)_e x),t h e nf(x)f(y)-1/2[f(x/y)+f(x y)] has value (a) -1 (b) 1/2 (c) -2 (d) none of these

If f(x)="cos"((log)_e x),t h e nf(x)f(y)-1/2[f(x/y)+f(x y)] has value (a) -1 (b) 1/2 (c) -2 (d) none of these

Let f(x)=|x-1|dot Then (a) f(x^2)=(f(x))^2 (b) f(x+y)=f(x)+f(y) (c) f(|x|)=|f(x)| (d) none of these

Let f(x)=|x-1|dot Then (a) f(x^2)=(f(x))^2 (b) f(x+y)=f(x)+f(y) (c) f(|x|)=|f(x)| (d) none of these

Let A={x,y,z}=B={u,v,w) and f:A to B be defined by f (x)=u, f(y)=v, f(z)=w . Then, f is