TY  - JOUR
T1  - Modified Mathematical Model on the Study of Convective MHD Nanofluid Flow with Heat
Generation/Absorption along with Thermophoresis and Brownian Motion on Boundary Layer
Flow over a Linearly Stretching Sheet
AU - G. Madaki, Abdul. AU - Hussaini, A.A. 
JO  - Journal of Modern Mathematics and Statistics
VL  - 15
IS  - 3
SP  - 39
EP  - 46
PY  - 2021
DA  - 2001/08/19
SN  - 1994-5388
DO  - jmmstat.2021.39.46
UR  - https://makhillpublications.co/view-article.php?doi=jmmstat.2021.39.46
KW  - Heat generation/absorption
KW  -Boundary-layer
KW  -Brownian motion
KW  -Nanofluid
KW  -Stretching sheet
KW  -Thermophoresis
AB  - A numerical investigation is presented to show
the effects of convective nanofluid flow with heat
generation/absorption over a linearly stretching sheet by
considering thermophoresis and Brownian motion in the
presence of heat generation/absorption. A suitable set of
similarity transformations are used together with the
boundary conditions in order to convert the basic partial
differential equations into a set of corresponding
nonlinear ordinary differential equations. Runge-Kutta-
Fehlberg method along with shooting technique is
involved in order to solve the reduced governing basic
equations. The influences of several emerging physical
parameters of nanofluid on the profiles of velocity,
temperature and nanoparticle volume fraction, Nusselt
number and Sherwood number have been studied and
analyzed in detail through graphs and tables. It is noticed
that, the reduced Sherwood number is a decreasing
function with both heat generation/absorption parameters.
It is also noticed that the Brownian motion and
thermophoresis parameter have the reverse effects on
nanofluid Sherwood number. It is analyzed that the
Nusselt number decreases with an increase in the values
of thermophoresis parameter, Brownian motion
parameter. It is observed that the Sherwood number has
ascending behavior for thermophoresis and Brownian
motion parameters whereas nanofluid Sherwood number
gets amplified with a hike for all the values of Brownian
motion parameter.
ER  - 