Cancellable Semiring with Unity is Additive Semiring

Theorem
Let $\left({S, *, \circ}\right)$ be a cancellable semiring with unity $1_S$.

Then the distributand $*$ is commutative.

That is to say, $\left({S, *, \circ}\right)$ is also a additive semiring.

Proof
Let $\left({S, *, \circ}\right)$ be a semiring, all of whose elements of $S$ are cancellable for $*$.

We expand the expression $\left({a * b}\right) \circ \left({c * d}\right)$ using the distributive law in two ways:

So, by the fact that all elements of $\left({S, *}\right)$ are cancellable (and thus, a fortiori, are $a \circ c$ and $b \circ d$), we have:

As this is true for all $a, b, c, d \in S$, it is true in particular if $c = d = 1_S$.

Thus it is clear that $b * a = a * b$, which is exactly to say that $*$ is commutative.

Hence the result, by definition of additive semiring.