Abstract

This article explores the properties of heat and mass transport for MHD Casson nanofluid flow between two horizontal plates by considering the Darcy-Forchheimer medium. The effects of a uniform inclined magnetic field are discussed numerically. A Darcy-Forchheimer medium is considered in the x-direction between two plates. The features of Brownian diffusive motion, porosity, friction, viscous dissipation, chemical reaction, and thermophoresis are also considered. The governing equations of the model are a system of partial differential equations. This system is converted into non-linear ordinary differential equations using suitable similarity functions. The numerical shooting technique is used to solve the attained boundary value problem. This numerical technique is endowed with the Runge-Kutta order four method and the Newton method. Graphs and tables depict different significant effects. It is observed that the effect of a magnetic field is inversely related to the fluid flow. Moreover, the porosity factor (λ) and the magnetic inclination (γ) are inversely related to the surface drag force (Cf) and the Nusselt number (Nu).

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