@Article{hmt.11.13,
AUTHOR = {R. Biswas
, M. Afikuzzaman, M. Mondal
, S.F. Ahmmed},
TITLE = {MHD FREE CONVECTION AND HEAT TRANSFER FLOW THROUGH A  VERTICAL POROUS PLATE IN THE PRESENCE OF CHEMICAL  REACTION},
JOURNAL = {Frontiers in Heat and Mass Transfer},
VOLUME = {11},
YEAR = {2018},
NUMBER = {1},
PAGES = {1--10},
URL = {http://www.techscience.com/fhmt/v11n1/53406},
ISSN = {2151-8629},
ABSTRACT = {Present study concerns with the numerical investigation of the MHD free convection and heat transfer fluid flow through a semi-infinite vertical porous 
plate with the effects of chemical reaction. A boundary layer approximation is premeditated to develop a flow model representing time dependent 
momentum, energy and concentration equations. The governing model equations are governed as a form of coupled nonlinear dimensionless system 
of partial differential equations (PDEs) by the as usual mathematical procedure of mathematical transformation and which model equations are solved 
by using explicit finite difference method (EFDM). Then the numerical results have been calculated by Compaq Visual FORTRAN (CVF) 6.6a and 
the obtained results have been capitalized for the variations of various dimensionless parameters on velocity, temperature and concentration profiles 
along with the skin friction coefficient, Nusselt number, Sherwood number, Isotherms and Streamlines. At the end, the obtained results are plotted and 
discussed after stability convergence test (SCT) by the using graphics software tecplot-9. An increases in the Grashof number is to increase the velocity 
distributions but by increasing the magnetic parameter which reduces the velocity profiles whereas increasing the heat generation parameter which 
increase the temperature profile.},
DOI = {10.5098/hmt.11.13}
}