(Group theory, group acting on set)
Theorem : if a group G acts on a set Ξ© then for each element Ο in Ξ© -
|Orb(Ο)| . |Stab(Ο)| = |G|
What this theorem is saying (in a loose sense) is that for each element in Ξ©, G can be "factored through" by the actions which fix the element, and what's left corresponds to the elements which G takes our element to.
Note that this applies to infinite groups as well as finite ones, via the laws of arithmetic for cardinal numbers.
Proof : An application of Lagrange's theorem. Although clearly there are |G| possibilities for Οg, they are not necessarily distinct. But
Οg1 = Οg2
<==> Οg1g2-1 = Ο
<==> g1g2-1 in Stab(Ο)
<==> Stab(Ο)g1 = Stab(Ο)g2
So the different Οg's correspond to the different cosets of Stab(Ο), and by Lagrange's theorem there are |G| / |Stab(Ο) of them.
Alternative proof using coset spaces - pick an Ο in Ξ©. Then Orb(Ο) is a transitive G-space, and hence is isomorphic to (G : Stab(Ο)) (as explained and proved in coset space). And by a direct application of Lagrange's theorem, |(G : Stab(Ο))| = |G|/|Stab(Ο)|.