Let Y = {`n^(2)n in N}sub` N. Consider f:N`rarr` Y as f(n) = `n^(2)`. Show that f is invertible. Also, find the inverse of f.

Show that f:R to R defined as f(x)= 4x+3 is invertible. Find the inverse of 'f' .

Let f : N rarr Y be a function defined as f(x) = 4x +3, where Y = {Y in N: y = 4x +3 for some x in N). Show that f is invertible. Find the inverse.

Consider f: R_(+) [4, oo] is given by f(x)= x^(2) + 4. Show that f is invertible with the inverses f^(-1) of f given by f^(-1)(y) = sqrt(y-4) , where R_(+) , is the set of all non-negative real numbers.

Let f : W rarr W be defined as f (x) = x -1 if x is odd and f(x) = x +1 if x is even then show that f is invertible. Find the inverse of f where W is the set of all whole numbers.

If f:RrarrR defined by f(x)=5x-8 for all x inR , then show that f is invertible. Find the corresponding inverse function.

Let f be defined by f (x)=2x + 1 for all xinR . Show that f is bijective and determine the inverse of f. Find f^(-1)(0),f^(-1)(2) and f^(-1)(-1) .

Let R be a relation defined on the set of natural numbers N as follows: R = {(x,y): x in N,y in N and 2x + y = 24). Then, find the domain and range of the relation R. Also, find whether R is an equivalence relation or not.