ABSTRACT This study presents algorithms for addressing split equality variational inequality and fixed point problems in real Hilbert spaces that are inertial-like subgradient extragradient and inertial-like Tseng extragradient, respectively. We prove that the resulting sequences of the proposed algorithms converge strongly to solutions of the problem provided that the underlying mappings are quasi-monotone, uniformly continuous and quasi-nonexpansive mappings under some mild conditions. Furthermore, numerical experiments are shown to demonstrate the effectiveness of our techniques.