In this paper, we define equiform Darboux helices in a Galilean space (G_{3}) and obtain their explicit parameter equations. We show that equiform Darboux helices have only a non-isotropic axis and characterize equiform Darboux vectors of equiform Darboux helices in terms of equiform rectifying curves. We prove that an equiform Darboux vector
of an equiform Darboux helix α is an equiform Darboux helix if an admissible curve (alpha) is a rectifying curve. We also prove that there are no equiform curves of constant precession
and give some examples of equiform Darboux helices
