Let `f` be an invertible real function. Write `(f^(-1)\ of)(1)+(f^(-1)\ of)(2)++(f^(-1)\ of)(100)dot`

Let f be an invertible function . Then prove that (f^(-1))^(-1) = f.

Let f be an invertible function.Show that the inverse of f^(-1) is f

Let f : X rarr Y be an invertible function . Show that the inverse of f^(-1) is f . i.e., (f^(-1))^(-1)= f .

Let f : X to Y be an invertible function. Show that the inverse of f ^(-1) is f, i.e., (f ^(-1)) ^(-1)=f.

Let f : X to Y be an invertible function. Show that the inverse of f ^(-1) is f, i.e., (f ^(-1)) ^(1)=f.

Let f : X to Y be an invertible function. Show that the inverse of f ^(-1) is f, i.e., (f ^(-1)) ^(-1)=f.

Let f: X -> Y be an invertible function. Show that the inverse of f^(-1) is f, i.e., (f^(-1))^(-1)= f .

Let f: X -> Y be an invertible function. Show that the inverse of f^(-1) is f, i.e., (f^(-1))^(-1)= f .

Let f: X -> Y be an invertible function. Show that the inverse of f^(-1) is f , i.e., (f^(-1))^(-1)= f .

Let f:X rarr Y be an invertible function.Show that the inverse of is f,i.e.,(f^(-1))^(-1)=f