Let f: X -> Ybe an invertible function....

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

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`because f : X to Y ` is an invertible function.
` therefore g : Y to X` will be a function such that
`" " gof = I_X and fog = I_Y`
`rArr " " f^(-1) = g `
Now `" " gof = I_X and fog = I_Y`
`rArr " " f^(-1) of = I_X and fof ^(-1) = I_Y`
`rArr f^(-1) : Y to X ` will be invertible and `(f^(-1))^(-1) = f `

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