In this paper, the impact of magnetic force, rotation, and nonlinear heat
radiation on the peristaltic flow of a hybrid bio -nanofluids through a symmetric
channel are investigated. Under the assumption of a low Reynolds number and a long
wavelength, the exact solution of the expression for stream function, velocity, heat
transfer coefficient, induced magnetic field, magnetic force, and temperature are
obtained by using the Adomian decomposition method. The findings show that the magnetic
force contours improve when the magnitude of the Hartmann number M is high and decreases
when rotation increases. Lastly, the effects of essential parameters that appear in the
problem are analyzed through a graph. Plotting all figures is done using the
MATHEMATICA software.
The purpose of this paper is studying the effect of magnetic hydrodynamic (MHD) of unsteady flow with fractional Burger's model between two oscillating parallel plates. The fractional order derivative in described in the Riemann-Liouville sense. The solutions which we obtained of the velocity field and the shear stress by using Laplace transform and Fourier transform in the expression of Mittage-Lefller function. Furthermore, the influence of the parameters on the velocity field spotlighted by means of the several graphs.
In this paper, we study the effects of a magnetic force on the flow of hybrid bio - nano fluid (Cu - Au. NPs) for a peristaltic channel through a porous medium in an asymmetric channel. Nanoparticles of gold and copper as well as the blood (the base fluid) is taken into account. By using the Adomian decomposition method to solve the governing equations, formulas for velocity, stream function, temperature, current density, and magnetic force have been obtained. The findings show that Gold nanoparticles have an elevation magnetic force compared with copper nanoparticles, based on fluid (blood) and hybrid nanofluid. Finally, the phenomenon of trapping is offered as an explanation for the physical behavior of many parameters. The effect of physical parameters is plotted and analyzed by using the Mathematica software.
The aim of this paper is to study the effect of magnetic hydrodynamic (MHD) on unsteady flow of Maxwell fluid with fractional derivative due to a constant acceleration plate. The fractional calculus process is introduced to establish the constitutive relationship of fluid model, by using Laplace transform and Fourier sine transform, we obtained closed solutions for velocity field and shear stress. Lastly, the solutions are present by integral and series form in terms of the generalized G and R functions. The influence of the parameters on the velocity field spotlighted by means of the several graphs.
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