$(k,n)$-nets, $n\in N\backslash\{1\}$, $k\in N\backslash\{1,\dots,n\}$, represent a generalization of $k$-nets, $k\in N\backslash\{1,2\}$; namely $(k,2)$-nets are $k$-nets [8-9]. Finite $(k,n)$-nets of order $q\in N\backslash\{1\}$ are also called $(k,n,q)$-nets [7]. In this article a connection between $k,n$ and $q$ is established.