Exponential Power Law Fluid Over A Semi-Infinite Vertical Plate With Variable Thermal Conductivity In The Presence Of The Induced Magnetic Field

Abstract

In this problem, the exponential power-law steady of electrically conducting fluid over a semi-infinite vertical plate with the impact of induced magnetic field and consideration of variable thermal conductivity. The governing PDEs are converted into nonlinear ordinary differential equations with the similarity transformations and the solutions are obtained through MATLAB inbuilt software package bvp4c. Different values of the governing parameters are graphically provided for velocity, temperature distributions and skin-frictions and the rare of heat transfer coefficients are presented tabular from.