Abstract
A mathematical model with peristalsis for blood flow through a bifurcated artery is presented by taking blood as a nanofluid with magnetic field effects. The arteries pattern of bifurcation is treated to be symmetric about the axis of the parent artery and straight circular cylinders of limited length. The equations governing the flow are made non-dimensional, and coordinate transformation is employed to convert the irregular boundary to a regular boundary. The resulting system of equations is solved by Cauchy Euler’s method. The influence of model parameters on blood velocity, pressure difference, pressure gradient, and trapping is investigated, and results are represented graphically.
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