We define and study a new depth, related to the Stanley depth, for the partially ordered set (poset) of nonempty submultisets of a multiset. We find the new depth explicitly for any multiset with at most five distinct elements and provide an upper bound for the general case. On the other hand, the elements of a product of chains corresponds to the submultisets of a multiset. We prove that the new depth of the product of chains \(\bm{n}^k\backslash \bm{0}\) is \((n-1)\lceil{k\over 2}\rceil\). We also show that the new depth for any case of a multiset with \(n\) distinct elements can be determined if we know all interval partitions of the poset of nonempty subsets of \{1,2,...,\(n\)\}.