Open Extension Space is Connected

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

Let $T^*_{\bar p} = \left({S^*_p, \tau^*_{\bar p}}\right)$ be the open extension space of $T$.

Then $T^*_{\bar p}$ is a connected space.

Proof
The only open set of $T$ which contains $p$ is $S^*_p$.

Therefore it is impossible to set up a partition of $T$, as $S^*_p$ will always need to be an element of such a partition.