In this paper, we obtain existence and uniqueness results of fixed points of nonlinear operators satisfying the condition of the form (Φ1,Φ2) given as a perturbation of Φ2 contraction by a convenable function Φ1 in metric and Banach spaces, which enable us to extend the Banach’s mapping principle and other results in the literature. Also, the Φ-quasi nonexpansive character of our context is shown in order to obtain results of convergence and stability of iterative processes of Mann and Ishikawa.