Sameh E. Askar
King Saud University
37 Papers
60 Citations
Sameh E. Askar is an academic researcher from King Saud University. The author has contributed to research in topics: Medicine & Computer science. The author has an hindex of 5, co-authored 11 publications. Previous affiliations of Sameh E. Askar include College of Business Administration.
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Papers
Axisymmetric Flow and Heat Transfer in TiO2/H2O Nanofluid over a Porous Stretching-Sheet with Slip Boundary Conditions via a Reliable Computational Strategy
TL;DR: In this article , the motion of TiO2/H2O nano-structures towards heated and porous sheets by considering the MHD effect and partial slip at the boundary is inspected.
MHD Free convection flows of Jeffrey fluid with Prabhakar-like fractional model subject to generalized thermal transport
TL;DR: In this paper , the effects of magnetohydrodynamics and heat absorption on an incompressible Jeffrey fluid' time-dependent free convection flow over an infinite, vertically heated plate with homogeneous heat flux were examined.
6
Numerical study of hybridized Williamson nanofluid flow with TC4 and Nichrome over an extending surface
Asmat Ullah Yahya,Imran Siddique,Nadeem Salamat,Hijaz Ahmad,M. Y. Rafiq,Sameh E. Askar,Sohaib Abdal +6 more
TL;DR: In this article , an elongating surface holds the flow and thermal transition phenomenon in the existence of uniform sources of magnetic field and heat radiation, and the boundary of wall obeys a suction and slip condition.
3
The hydrodyanamics of gravity-driven vessel drainage of third order fluid using perturbation method
Azam Ali Amur,K. Memon,Syed Feroz Shah,Mohsin Amur,Hijaz Ahmad,A.M. Siddiqui,Dilber Uzun Ozsahin,Sameh E. Askar +7 more
TL;DR: This study uses the perturbation method to analyze gravity-driven vessel drainage of a third-order fluid, obtaining analytical solutions for velocity profile, flow rate, and time efflux, and examining the effects of various parameters on these variables.
3
Adomian decomposition method for solution of fourteenth order boundary value problems
TL;DR: In this article , highly advanced numerical techniques are established for the approximation of the fourteenth (14th)-order boundary value problems using Adomian decomposition method, the mathematical outcomes of the equations are attained in the form of convergent series that have effortlessly assessable components having step size h = 10.