In the present research article, we construct a new sequence of Generalized Bivariate Baskakov Durrmeyer Operators. We investigate rate of convergence and the order of approximation with the aid of modulus of continuity in terms of well known Peetre's K-functional, Voronovskaja type theorems and Lipschitz maximal functions. Further, graphical analysis is discussed. Moreover, we study the approximation properties of the operators in Bögel-spaces with the aid of mixed-modulus of continuity.