Is $G=\{ e\}$ both torsion group and a torsion-free group?

Question

Is $G=\{ e\}$ a torsion group or a torsion-free group?

Because all elements in $G$ has finite order, it is a torsion group.

Because $e$ is the only element in $G$ with finite order, it is a torsion-free group.

Therefore, $G=\{ e\}$ is both torsion group and torsion-free group.