Exact solutions for a two-dimensional thermoelectric MHD flow with steady-state heat transfer on a vertical plate with two instantaneous infinite hot suction lines

Abstract

In the present work, the mathematical description of a two-dimensional unsteady magneto-hydrodynamics slow flow with thermoelectric properties (TEMHD) on an infinite vertical partially hot porous plate is presented. The Laplace-Fourier transform technique is employed to simplify the field equations. For the steady-state heat transfer assumption, exact expressions for the temperature and stream function are analytically obtained for TEMHD flow on a wall with two infinite instantaneous hot suction lines. The results obtained are displayed graphically.

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