Unfortunately, no. It is known that the maximum number of mutually disjoint $S(4,5,11)$s on the same point set is $2$. Any such pair are always isomorphic. So, you can't find $7$ disjoint copies of an $S(4,5,11)$ in the complete $5$-uniform hypergraph on $11$ vertices (or partition it into copies); you can find only two of them at most.

* E. S. Kramer, D. M. Mesner, _Intersections among Steiner systems_, *J. Combin. Theory, Ser. A*, **16** (1974), 273–285, https://doi.org/10.1016/0097-3165(74)90054-5