Isometry between Metric Spaces is Continuous/Corollary

Corollary to Isometry between Metric Spaces is Continuous
Let $M_1 = \left({A_1, d_1}\right)$ and $M_2 = \left({A_2, d_2}\right)$ be metric spaces.

Let $\phi: M_1 \to M_2$ be an isometry.

Then its inverse $\phi^{-1}: M_2 \to M_1$ is a continuous mapping.

Proof
From Inverse of Isometry of Metric Spaces is Isometry, $\phi^{-1}$ is an isometry.

The result follows from Isometry between Metric Spaces is Continuous.