Simultaneous effects of melting heat transfer and inclined magnetic field flow of tangent hyperbolic fluid over a nonlinear stretching surface with homogeneous–heterogeneous reactions

Abstract

The purpose of present article is to investigate homogeneous–hetrogeneous reactions and melting heat transfer in the flow of magnetohydrodynamic (MHD) mixed convective flow of hyperbolic tangent fluid. Flow by nonlinear stretching sheet is addressed in presence of non-uniform heat source/sink. Governing equations through conservations laws are obtained. Series solutions of dimensionless problems are developed within the frame of homotopic theory. Convergence solution is achieved and suitable values are found. The velocity, temperature and concentration are analyzed graphically within the frame of various pertinent variables. Skin friction coefficient, local Nusselt number and wall concentration have been scrutinized through plots. An increase in space and temperature dependent non-uniform heat source/sink variables show rise to temperature.