Application of Analytical Techniques for Solving Fractional Physical Models Arising in Applied Sciences

In this paper, we examined the approximations to time-fractional Kawahara equation and modified equation, which model creation of nonlinear water waves in long wavelength area transmission signals. We implemented two novel techniques, namely homotopy perturbation transform method Elzaki decomposition method. The derivative having fractional-order is taken Caputo sense. Adomian He’s polynomials make it simple handle terms. To illustrate adaptability effectiveness derivatives with fractional order represent regions, numerical data have been given graphically. A key component symmetry pattern, symmetrical nature solution may be observed graphs. importance our suggested methods illustrated by convergence analytical solutions precise solutions. techniques currently use are straightforward effective for solving issues. offered reduced computational time their main advantage. It will possible solve partial differential equations using study’s findings as a tool.