Mathematical modeling for the convection boundary layer flow in a viscous fluid with newtonian heating and convective boundary conditions
Problems of convection boundary layer flow are important in engineering and industrial activities. Such flows are applied to manage the thermal effects in many industrial outputs for example in electronic devices, computer power supply and also in engine cooling system such as cooling fins in a c...
Saved in:
Main Author: | |
---|---|
Format: | Thesis |
Language: | English |
Published: |
2013
|
Subjects: | |
Online Access: | http://umpir.ump.edu.my/id/eprint/9468/1/CD8284.pdf http://umpir.ump.edu.my/id/eprint/9468/ |
Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
Institution: | Universiti Malaysia Pahang |
Language: | English |
Summary: | Problems of convection boundary layer flow are important in engineering and industrial
activities. Such flows are applied to manage the thermal effects in many industrial
outputs for example in electronic devices, computer power supply and also in engine
cooling system such as cooling fins in a car radiator. In modeling the convective
boundary layer flow problems, there are four common boundary conditions considered
namely as the constant or prescribe wall temperature, constant or prescribe surface heat
flux, Newtonian heating and conjugate or convective boundary conditions. Generally,
the boundary conditions that are usually applied are the constant/prescribe wall
temperature or constant/prescribe surface heat flux. In this study, the boundary
condition considered are the Newtonian heating and convective boundary conditions.
The Newtonian heating is the heat transfer from the surface is taken to be proportional
to the local surface temperature and which is usually termed conjugate convective flow
and convective boundary conditions is where heat is supplied through a bounding
surface of finite thickness and finite heat capacity. The interface temperature is not
known a priori but depends on the intrinsic properties of the system, namely the thermal
conductivity of the fluid or solid. The mathematical modeling for the convection
boundary layer flow in a viscous fluid is investigated. Three problem have been studied,
there are forced convection on a stagnation point flow over a stretching sheet, the
extended from the first problem by considering the effects of magnetohydrodynamic in
a presence of thermal radiation and the mixed convection on a stagnation point flow
past a stretching vertical surface. All of the governing equations which is in the form of
non linear partial differential equation from each problem are reduced to ordinary
differential equations by using similarity transformation before being solved
numerically by using the implicit finite difference scheme known as the Keller-box
method. The numerical codes in the form of computer programmes are developed by
using the MATLAB software. Six parameter which is the Prandtl number, stretching
parameter, conjugate parameter, magnetic parameter, thermal radiation parameter and
buoyancy parameter are considered. The features of the flow and heat transfer
characteristics for various values of these parameter are analyzed and discussed. It is
found that, the increase of Prandtl number, stretching parameter, thermal radiation
parameter and buoyancy parameter in an assisting buoyant flow results a decrease in
surface temperature. Meanwhile, the trend goes opposite with magnetic parameter,
conjugate parameter and buoyancy parameter in an opposite buoyant flow. Futhermore,
it is found that the trends for skin friction coefficient, temperature and velocity profiles
for convective boundary conditions is quite similar to the Newtonian heating case. On
the other hand for heat transfer profiles, it is found that the trends is contrary for all
parameters considered except the conjugate parameter. |
---|