The Number of conjugate classes of a non-abelian group of order $729$

Question

Howti identify Number of conjugate classes of a non-abelian group of order $729$.

A group of order $p^3$ where $p$ is prime have $p^2+p-1$ number of conjugacy class.But my question is what is the general rule of $p^n$ where $p$ is prime. if any such rule exists?