Fractional Study of the Non-Linear Burgers’ Equations via a Semi-Analytical Technique

Most complex physical phenomena are described by non-linear Burgers’ equations, which help us understand them better. This article uses the transformation and fractional Taylor’s formula to find approximate solutions for fractional-order partial differential equations. Solving equations with right starting data shows that method utilized is correct can be utilized. Based on limit of idea, a rapid convergence McLaurin series used obtain close both models less work more accuracy. To see how time-Caputo derivatives affect results above behave, in three dimension figures drawn. The showed proposed an easy, flexible, helpful way solve wide range models.