Rational Numbers with Denominators Coprime to Prime under Addition form Group

Theorem
Let $p$ be a prime number.

Let $\Q_p$ denote the set:


 * $\set {\dfrac r s : s \perp p}$

where $s \perp p$ denotes that $s$ is coprime to $p$.

Then $\struct {\Q_p, +}$ is a group.

Proof
Taking each of the group axioms in turn:

$\text G 1$: Associativity
As $\Q_p \subseteq \Q$ the result follows directly from Rational Addition is Associative and Restriction of Associative Operation is Associative.

$\text G 2$: Identity
By Integer is Coprime to 1:
 * $\dfrac 0 1 \in \Q_p$

regardless of our choice of $p$.

By the definition of addition on $\Q$:


 * $\dfrac a b + \dfrac 0 1 = \dfrac a b$

and


 * $\dfrac 0 1 + \dfrac a b = \dfrac a b$

for all $\dfrac a b \in \Q$.

Hence $\dfrac 0 1$ is the identity.

$\text G 3$: Inverses
For $\dfrac a b$ we have that $\dfrac {-a} b$ is the inverse of $\dfrac a b$.

As it has the same denominator as $\dfrac a b$ we have that $\dfrac {-a} b \in \Q_p$ as well.