Open Subgroup is Closed

Theorem
Let $G$ be a topological group.

Let $H\leq G$ be an subgroup.

Then $H$ is closed.

Proof
By Right and Left Regular Representations in Topological Group are Homeomorphisms, the left cosets of $H$ are open.

By Left Coset Space forms Partition, the complement of $H$ is a union of left cosets of $H$.

Because the complement of $H$ is open, $H$ is closed.