Alexandroff Extension which is T2 Space is also T4 Space

Theorem
Let $T = \left({S, \tau}\right)$ be a non-empty topological space.

Let $p$ be a new element not in $S$.

Let $S^* := S \cup \left\{{p}\right\}$.

Let $T^* = \left({S^*, \tau^*}\right)$ be the Alexandroff extension on $S$.

Let $T^*$ be a $T_2$ (Hausdorff) space.

Then $T^*$ is a $T_4$ space.

Proof
We have:


 * Alexandroff Extension is Compact


 * Compact Hausdorff Space is T4.