The concept of zero-divisor graphs of rings is widely used for establishing relationships between the properties of graphs and the properties of the underlying ring. The zero-divisor graph of a ring is generalized to the k-zero-divisor hypergraph of a ring R for k ∈ N , which is denoted by H k (R) . This paper is an endeavor to discuss some properties of zero-divisor hypergraphs. We determine the diameter and girth of H k (R) whenever R is reduced. Also, we characterize all commutative rings R for which H k (R) is in some known class of graphs. Further, we obtain certain necessary conditions for H k (R) to be a Hamilton Berge cycle and a flag-traversing tour. Moreover, we answer a case of the question raised by Eslahchi et al. [15]. [ABSTRACT FROM AUTHOR]