The mapping `f: A rarr B` is invertible if is ___

The mapping f:A rarr B is invertible if it is

1 (a) answer any one question :(i) suppose IR be the set of all real no. and the mapping f:IR rarr IR is defined by f(x) = 2x^2-5x+6 . find the value of f^-1(3)

Let the mapping f: A rarr B and g: B rarr C be defined by f(x)=5/x -1 and g(x)=2+x Find the product mapping ( g o f ).

Show that, the mapping f:NN rarr NN defined by f(x)=3x is one-one but not onto

Let A ={1,2,3,4} and the mapping f: A rarr A, g: A rarr A be defined by f(1)=3,f(2)=4,f(3)=2,f(4)=1 and g(1)=2, g(2)=4,g(3)=1,g(4)=3 Find (i) (g o f) (4), (ii) (f o g) (1), (iii) (g o f)(3), (iv) (f o g)(2)

Show that, the mapping f: RR rarr RR defined by f(x)=mx +n , where m,n, x in RR and m ne 0 , is a bijection.

Let Z be the set of integers and the mapping f:Z rarr Z be defined by, f(x):x^2 . State which of the following is equal to f^(-1)(-4) ?

The mapping f:ZZ rarr ZZ defined by , f(x)=3x-2 , for all x in ZZ , then f will be ___