Composition of Relations is Associative

Theorem
The composition of relations is an associative binary operation:


 * $\left({\mathcal R_3 \circ \mathcal R_2}\right) \circ \mathcal R_1 = \mathcal R_3 \circ \left({\mathcal R_2 \circ \mathcal R_1}\right)$

Proof
First, note that from the definition of composition of relations, the following must be the case before the above expression is even to be defined:


 * $\operatorname{Dom} \left({\mathcal R_2}\right) = \operatorname{Cdm} \left({\mathcal R_1}\right)$
 * $\operatorname{Dom} \left({\mathcal R_3}\right) = \operatorname{Cdm} \left({\mathcal R_2}\right)$

The two composite relations can be seen to have the same domain, thus:

... and also the same codomain, thus:

So they are equal they have the same value at each point in their common domain, which this shows: