Positive Rational Numbers under Division do not form Group

Theorem
Let $\struct {\Q_{>0}, /}$ denote the algebraic structure consisting of the set of (strictly) positive rational numbers $\Q_{>0}$ under the operation $/$ of division.

We have that $\struct {\Q_{>0}, /}$ is not a group.

Proof
In order to be a group, it is necessary that $\struct {\Q_{>0}, /}$ be an associative structure.

But consider the elements $2, 6, 12$ of $\Q_{>0}$.

We have:

whereas:

That is:


 * $\paren {12 / 6} / 2 \ne 12 / \paren {6 / 2}$

So it is not generally the case that for $a, b, c \in \Q_{>0}$:
 * $\paren {a / b} / c = a / \paren {b / c}$

and so $/$ is not associative on $\Q_{>0}$.

Hence $\struct {\Q_{>0}, /}$ is not a group.