Identity Permutation is Disjoint from All

Theorem
Let $S_n$ denote the symmetric group on $n$ letters.

Let $e \in S_n$ be the identity permutation on $S_n$.

Then $e$ is disjoint from every permutation $\pi$ on $S_n$ (including itself).

Proof
By definition of the identity permutation:
 * $\forall i \in \N_{>0}: e \left({i}\right) = i$

Thus $e$ fixes all elements of $S_n$.

Thus each element moved by a permutation $\pi$ is fixed by $e$.

The set of elements moved by $e$ is $\varnothing$, so the converse is true vacuously.