Abstract
In this paper, we investigated the stagnation point flow of Maxwell micropolar fluid flow over a Riga plate. Micropolar fluid flows over the Riga plate were used to create the mathematical model. The system of partial differential equations is created using the momentum equation and the micro inertia theory to accomplish the boundary layer approximation. Through appropriate similarity transformations, nonlinear partial differential equations are transformed into dimensionless nonlinear ordinary differential equations. This system solved the numerical scheme via the BVP4C method. The effects of involving physical parameters like dimensionless parameter, modified Hartman number, material parameter, slip condition sigma(s), viscoelastic parameter delta(m) and Soret coefficient S-T are shown through graphs and numerical results. The physical quantities such as Skin friction, local Nusselt number, and local Sherwood number are shown in tables. R increases when the dimensionless parameter, Material parameter K and Slip condition a, increase, while R decreases with the Modified Hartman number Z and viscoelastic parameter delta(m) increase. (C) 2021 Sharif University of Technology. All rights reserved.