Closure of Connected Set is Connected

Theorem
Let $T$ be a topological space.

Let $H$ be a connected subspace of $T$.

Let $H^-$ denote the closure of $H$ in $T$.

Then $H^-$ is connected.

Proof
As any set is a Subset of Itself, the result follows by setting $K = H^-$ in Subset of Closure of Connected Subspace.