Symmetric Group is Group/Proof 1

Proof
Taking the group axioms in turn:

G0: Closure
By Composite of Permutations is Permutation, $S$ is itself a permutation on $S$.

Thus $\struct {\Gamma \paren S, \circ}$ is closed.

G1: Associativity
From Set of all Self-Maps is Monoid, we have that $\struct {\Gamma \paren S, \circ}$ is associative.

G2: Identity
From Set of all Self-Maps is Monoid, we have that $\struct {\Gamma \paren S, \circ}$ has an identity, that is, the identity mapping.

G3: Inverses
By Inverse of Permutation is Permutation, if $f$ is a permutation of $S$, then so is its inverse $f^{-1}$.

Thus all the group axioms have been fulfilled, and the result follows.