Version 1
: Received: 27 August 2020 / Approved: 11 September 2020 / Online: 11 September 2020 (08:05:17 CEST)
How to cite:
Salem, A.-A.; Fathy, R. Entropy Generation for MHD Heat and Mass Transfer over a Non-isothermal Stretching Sheet with Variable Viscosity. Preprints2020, 2020090245
Salem, A.-A.; Fathy, R. Entropy Generation for MHD Heat and Mass Transfer over a Non-isothermal Stretching Sheet with Variable Viscosity. Preprints 2020, 2020090245
Salem, A.-A.; Fathy, R. Entropy Generation for MHD Heat and Mass Transfer over a Non-isothermal Stretching Sheet with Variable Viscosity. Preprints2020, 2020090245
APA Style
Salem, A. A., & Fathy, R. (2020). Entropy Generation for MHD Heat and Mass Transfer over a Non-isothermal Stretching Sheet with Variable Viscosity. Preprints. https://doi.org/
Chicago/Turabian Style
Salem, A. and Rania Fathy. 2020 "Entropy Generation for MHD Heat and Mass Transfer over a Non-isothermal Stretching Sheet with Variable Viscosity" Preprints. https://doi.org/
Abstract
This work probes the combined effects of magnetic field and viscous dissipation on heat field and examine the second law analysis (entropy generation) in an electrically conducting fluid under the effect of wall mass transfer over continuous stretched non-isothermal surface with variable viscosity. The viscosity of the fluid is assumed to be an inverse linear function of temperature. The governing equation for the problem are changed to dimensionless ordinary differential equations by using similarity transformation and solved numerically by using Rung Kutta and Shooting technique. Velocity, concentration and temperature distribution are obtained and used to compute the entropy generation and the Bejan number in the flow field. The effect of variable viscosity, Schmidt number, Hartman and Reynolds number on the velocity, concentration, temperature, entropy generation and Bejan number are studied and discussed.
Keywords
entropy generation; heat and mass transfer; stretching sheet; variable viscosity
Subject
Computer Science and Mathematics, Applied Mathematics
Copyright:
This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.