The purpose of this book is to introduce some new definitions of separation axioms in supra fuzzy topological spaces using the ideas of Ali [8]. Some of their equivalent formulations along with various new characterizations and results concerning the existing ones are presented here. Our criterion for definitions has been preserving as much as possible the relation between the corresponding separation properties for supra fuzzy topological spaces. Moreover, it will be seen that the definitions of these axioms are good extensions in the sense of Lowen [60]. We aim to develop theories of supra fuzzy T0, supra fuzzy T1, supra fuzzy T2(Hausdorff), supra fuzzy SFR(supra fuzzy regular), supra fuzzy SFN(supra fuzzy normal), supra fuzzy R0- and supra fuzzy R1- separation axioms analogous to its counter part in ordinary topology. We also prove that all the concepts are hereditary, productive and projective.