Solitary Wave Solutions of the (3+1)-dimensional Khokhlov–Zabolotskaya–Kuznetsov Equation by using the (G'/G,1/G)-Expansion Method

In this study, the (3+1)-dimensional Khokhlov-Zabolotskaya-Kuznetsov (KZK) equation, which is a mathematical model of non-absorption and dispersion in non-linear medium, sheds light on sound beam phenomenon, has physically important place, examined. order to find exact solution an effective reliable method, (G^'/G,1/G)-expansion used among analytical methods. The purpose method obtain more than one traveling wave classes depending conditions λ parameter. These are categorized into hyperbolic, trigonometric, complex trigonometric rational forms. graphics solitary waves represented by these successfully obtained presented as 2-dimensional, 3-dimensional contours. This article makes use ready-made package programs for arithmetic operations graphic drawings.