We propose two friendly analytical techniques called Adomian decomposition and Picard methods to analyze an unsteady\naxisymmetric flow of nonconducting, Newtonian fluid. This fluid is assumed to be squeezed between two circular plates passing\nthrough porous medium channel with slip and no-slip boundary conditions. A single fractional order nonlinear ordinary\ndifferential equation is obtained by means of similarity transformation with the help of the fractional calculus definitions. The\nresulting fractional boundary value problems are solved by the proposed methods. Convergence of the two methods� solutions is\nconfirmed by obtaining various approximate solutions and various absolute residuals for different values of the fractional order.\nComparison of the results of the two methods for different values of the fractional order confirms that the proposed methods are\nin a well agreement and therefore they can be used in a simple manner for solving this kind of problems. Finally, graphical study\nfor the longitudinal and normal velocity profiles is obtained for various values of some dimensionless parameters and fractional\norders.
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