THE EFFECT OF THERMAL RADIATION, VELOCITY SLIP AND VISCOUS DISSIPATION ON MHD STAGNATION-POINT FLOW AND HEAT TRANSFER OVER A SHRINKING SHEET IN NANOFLUIDS WITH STABILITY ANALYSIS
Research on heat transfer problems is important in view of applications in industries and engineering. As a result, the present study examines numerically the steady MHD stagnation point flow and heat transfer over a shrinking sheet in the presence of suction, thermal radiation, viscous dissipati...
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| Main Authors: | , , , , |
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| Format: | Article |
| Language: | English |
| Published: |
EBSCO
2021
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| Subjects: | |
| Online Access: | http://ir.unimas.my/id/eprint/38597/1/THE%20EFFECT%20OF%20THERMAL%20RADIATION.pdf http://ir.unimas.my/id/eprint/38597/ https://web.p.ebscohost.com/abstract?site=ehost&scope=site&jrnl=0024998X&AN=153571768&h=lLQbmAfVmm%2bSWM5HOpXiJAGzt3MvR5%2bms6Dq88ae%2bEDY3h92MzJC1ZRjC5H%2feeBzC%2bQRq%2fF6gShkRIZP3qKa6A%3d%3d&crl=c&resultLocal=ErrCrlNoResults&resultNs=Ehost&crlhashurl=login.aspx%3fdirect%3dtrue%26profile%3dehost%26scope%3dsite%26authtype%3dcrawler%26jrnl%3d0024998X%26AN%3d153571768 |
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| Institution: | Universiti Malaysia Sarawak |
| Language: | English |
| Summary: | Research on heat transfer problems is important in view of applications in industries and
engineering. As a result, the present study examines numerically the steady MHD stagnation
point flow and heat transfer over a shrinking sheet in the presence of suction, thermal radiation,
viscous dissipation and velocity slip. The flow for this problem is considered in nanofluids and a
Buongiorno’s model is used. The boundary layer equation is derived by reducing the governing
equations to an ordinary differential equation. An appropriate similarity transformation is used
to convert from PDEs to ODEs. The numerical results were then processed using the bvp4c
package in Matlab. The impacts of the characteristics studied were graphically represented and
extensively described in this study. Dual solutions occur within a particular range of α, according
to the numerical results. Finally, a stability analysis proves that there are two solutions to the
problem and only one of them is stable |
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