Rational Numbers whose Denominators are not Divisible by 4 do not form Ring

Theorem
Let $S$ be the set defined as:


 * $S = \set {\dfrac m n : m, n \in \Z, m \perp n, 4 \nmid n}$

That is, $S$ is defined as the set of rational numbers such that, when expressed in canonical form, their denominators are not divisible by $4$.

Then the algebraic structure $\struct {S, +, \times}$ is not a ring.

Proof
For $\struct {S, +, \times}$ to be a ring, it is a necessary condition that $\struct {S, \times}$ is a semigroup.

For $\struct {S, \times}$ to be a semigroup, it is a necessary condition that $\struct {S, \times}$ is closed.

That is:
 * $\forall x, y \in S: x \times y \in S$

Let $x = \dfrac 1 2$ and $y = \dfrac 3 2$.

Both $x$ and $y$ are in $S$, as both are rational numbers expressed in canonical form whose denominators are not divisible by $4$.

But then:
 * $x \times y = \dfrac 1 2 \times \dfrac 3 2 = \dfrac 3 4$

which is a rational numbers expressed in canonical form whose denominator is divisible by $4$.

Hence $x \times y \notin S$ and so $\struct {S, \times}$ is not closed.

The result follows.