If a group of order 15 acts on a set of order 22 and there are no fixed points. How many orbits are there?
I know the group action corresponds to a homomorphism from G into $S_{22}$
If a group of order 15 acts on a set of order 22 and there are no fixed points. How many orbits are there?
I know the group action corresponds to a homomorphism from G into $S_{22}$