 This paper explores the use of a new type of derivative, called the fractal fractional derivative with power law kernel, to analyse the dynamics of chaotic systems. This derivative was applied to a circuit design, and the results were compared to those obtained using traditional derivatives. The fractal fractional derivative with power law kernel allowed for faster convergence to the system's equilibrium than traditional derivatives, and it also provided more accurate predictions of the system's behaviour. This article was offered by Naived Khan, Tubaia Ahmed, Jamal Shah, and others.