Introduction to group theory/Uniqueness of identity proof

Proof:

Let ${\displaystyle G}$ be a group, and let ${\displaystyle e,e^{\prime }\in G}$ both be identity elements. Then

${\displaystyle \mathrm{\forall }a\in G,(a*e=a=e*a)}$ and ${\displaystyle (a*e^{\prime }=a=e^{\prime }*a)}$.

Then since ${\displaystyle e,e^{\prime }\in G}$

${\displaystyle e=e*e^{\prime }=e^{\prime }}$ and thus ${\displaystyle e=e^{\prime }}$.

Q.E.D.