Abstract
The transport of heat and mass has numerous uses in scientific engineering progression. The established laws of heat and mass transport i.e., Fourier and Fick laws do not foresee thermo-solute phenomena of relaxation time. The aim of current study is to analyze the concept of ferromagnetic flow of Eyring-Powell liquid with double magnetic dipole and homogeneous/heterogamous reactions over a flat plate. An external magnetic field by reason of two equivalent line dipole which are equidistant from the wall and normal to the flow plane has been applied. The heat flux model of Cattaneo-Christov is employed to modified method of Fourier's law to show the transport of heat structures. Convergent solutions to the non-linear formulation are derivative and scrutinized using homotopic technique. Characteristic of various parameter like magneto-thermomechanical [ferro-hydro-dynamic] interface parameter, homogeneous/heterogeneous reaction, dimensionless temperature relaxation for thermal profile are displayed through graphs. This study reports that the fluid factor and ferro-hydrodynamic interaction factor show conflicting behaviour on velocity field. Further analysis shows that the Prandtl num-ber decline the temperature field.