Ilarslan, KazimYildirim, Mehmet2020-06-252020-06-252019closedAccess0170-42141099-1476https://doi.org/10.1002/mma.5260https://hdl.handle.net/20.500.12587/7634The notion of Darboux helix in Euclidean 3-space was introduced and studied by Yayli et al. 2012. They show that the class of Darboux helices coincide with the class of slant helices. In a special case, if the curvature functions satisfy the equality kappa(2) + tau(2) = constant, then these curves are curve of the constant precession. In this paper, we study Darboux helices in Euclidean 4-space, and we give a characterization for a curve to be a Darboux helix. We also prove that Darboux helices coincide with the general helices. In a special case, if the first and third curvatures of the curve are equal, then Darboux helix, general helix, and V-4-slant helix are the same concepts.eninfo:eu-repo/semantics/closedAccessDarboux helixDarboux vectorgeneral helixV-4-slant helixArticle42165184518910.1002/mma.52602-s2.0-85053865181Q1WOS:000503431300007Q2