The Soret-Dufour effects on three-dimensional magnetohydrodynamics Newtonian fluid flow over an inclined plane
The three-dimensional (3D) model of the fluid flow model with length, breadth, and height or depth is the advanced and precise version from the two-dimensional (2D) model which just lies on a flat surface. The heat transfer in the boundary layer flow have numerous applications in the production of p...
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| Main Authors: | , , , , , , , |
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| Format: | Article |
| Language: | English English |
| Published: |
SEMARAK ILMU PUBLISHING
2024
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| Subjects: | |
| Online Access: | http://irep.iium.edu.my/113802/7/113802_The%20Soret-Dufour%20effects%20on%20three-dimensional.pdf http://irep.iium.edu.my/113802/8/113802_The%20Soret-Dufour%20effects%20on%20three-dimensional_Scopus.pdf http://irep.iium.edu.my/113802/ https://semarakilmu.com.my/journals/index.php/CFD_Letters/article/view/5402 https://doi.org/10.37934/cfdl.16.9.3951 |
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| Summary: | The three-dimensional (3D) model of the fluid flow model with length, breadth, and height or depth is the advanced and precise version from the two-dimensional (2D) model which just lies on a flat surface. The heat transfer in the boundary layer flow have numerous applications in the production of polymer, plastic films, and paper production. Therefore, this paper solves 3D magnetohydrodynamics Newtonian fluid
flow model with the effect of Soret-Dufour parameters. Compared with the previous report where the 3D model is without the inclination angle (all the axes are located at
their fixed position), this paper considers the boundary xy-plane being projected by a certain angle from the z-axis. The initial partial differential equations (PDEs) are subsequently reduced to ordinary differential equations (ODEs). The MATLAB bvp4c program is chosen to solve the ODEs and the results velocity profile, temperature profile, concentration profile, skin friction coefficient, local Nusselt number, and local Sherwood number. It can be inferred that the magnetic parameter is responsible to the decrement of the velocity profile and skin frictions coefficient. The enhancement
of the temperature and the local Sherwood number are caused by the Dufour number. Besides, concentration and the local Nusselt number are enhancing due to the increasing Soret number. |
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