摘要
In this paper,the mathematical model describing the third-grade non-Newtonian blood flow suspended with nanoparticles through porous arteries is exactly solved.The present physical model was solved in the research literature via the optimal homotopy analysis method and the collocation method,where the obtained solution was compared with the numerical fourth-order Runge-Kutta solution.However,the present paper only introduces a new approach to obtain the exact solution of the concerned system and implements such exact solution as a reference to validate the published approximate solutions.Several remarks on the previously published results are observed and discussed in detail through tables and graphs.In view of the present calculations,the obtained results in the literature by Ghasemi et al.[Ghasemi,Hatami,Sarokolaie et al.(2015)]may need revisions.Furthermore,it is found that the obtained approximate results in the relevant literature agree with the current exact ones up to only two or three decimal places,at most.Hence,the present approach along with the obtained results reflexes the effectiveness and efficiency of our analysis when compared with the corresponding study in the literature.Moreover,the present results can be directly invested for similar future problems of the same constructions.