Partition Equation

Theorem
Let group $G$ act on a finite set $X$.

Let the distinct orbits of $X$ under the action of $G$ be:
 * $\operatorname{Orb} \left({x_1}\right), \operatorname{Orb} \left({x_2}\right), \ldots, \operatorname{Orb} \left({x_s}\right)$

Then:
 * $\left|{X}\right| = \left|{\operatorname{Orb} \left({x_1}\right)}\right| + \left|{\operatorname{Orb} \left({x_2}\right)}\right| + \cdots + \left|{\operatorname{Orb} \left({x_s}\right)}\right|$

Proof
Follows trivially from the fact that the Group Action Induces Equivalence Relation.