@article{ajams2016454,
author={{Hossain, Muhammad Sajjad and Alim, M. A. and Kabir, Kazi H},
title={Numerical Analysis on MHD Natural Convection within Trapezoidal Cavity Having Circular Block},
journal={American Journal of Applied Mathematics and Statistics},
volume={4},
number={5},
pages={161--168},
year={2016},
url={http://pubs.sciepub.com/ajams/4/5/4},
issn={2328-7292},
abstract={In this paper, we have studied MHD natural convection within trapezoidal cavity having circular block with uniformly heated bottom wall with inclination angles (§æ). To investigate the effects of uniform heating with the circular block a Galerkin finite element method is studied and also used for solving the Navier-Stokes equations for different angles ¦µs. Here left and right walls are considered as cold and upper wall is considered as thermal insulated in a trapezoidal cavities. Rayleigh number (Ra) from 10<SUP>3</SUP> to 10<SUP>5</SUP>, Hartmann number (Ha = 20) and Prandtl number (Pr) from 0.026 to 0.7 with various tilt angles §¶ = 45<SUP>0</SUP>, 30<SUP>0</SUP> and 0<SUP>0</SUP> (square) are concerned with the fluid. By different sets of governing equations along with the corresponding boundary conditions are used to set the physical problems. Results are shown in terms of streamlines, isotherms, heat flux and heat transfer rates for different Ra and Pr. It is seen that for different angles ¦µs conduction dominant region changes for different Pr when Ra increases. Local and average nusselt numbers are also used for heat transfer analysis for different irrespective ¦µs.},
doi={10.12691/ajams-4-5-4}
publisher={Science and Education Publishing}
}