Abstract Hybrid-order topological insulators combine the first- and higher-order topological properties and host the topological boundary states with codimension 1 and more than 1 in different bandgaps. A Weyl semimetal can possess two types of Weyl points: one class of Weyl points terminate the Fermi arc surface states; while another class of Weyl points not only launch Fermi arc surface states but hinge arc states, exhibiting the hybrid-order topology. Here, we propose a hybrid-order Weyl semimetal by stacking two-dimensional rhomboid lattices based on chiral nearest-neighbor and double-helix next-nearest interlayer couplings. The first type of Weyl point that only truncates the Fermi arc surface states exists at the crossing of any two-fold degeneracy of two adjacent bands, and the second type of Weyl point that connects the hinge arc states only appears at the crossing of the two middle bands. Our findings enrich the classification of topological semimetals in condensed matter physics.