A unique five-dimensional (5D) hyperchaotic system with fourteen parameters is introduced in this work. Equilibrium Point, waveform analysis, Lyapunov exponent, and Sensitivity Dependent on Initial Condition (SDIC) analysis are used to demonstrate the proposed system's chaotic behavior. One of the many confusing definitions is that the suggested system is chaotic if it has a positive value of Lyapunov exponent or fulfills Sensitivity Dependent on Initial Condition on its domain, waveform analysis is an indication of the chaotic novel 5D system. When the duration of the period becomes large, the space between beginning conditions becomes large, and a small change in the beginning values causes a significant sensibility in the chaotic behavior. The Mathematica program was used to simulate the dynamics of a novel 5D hyperchaotic. Since it has two positive Lyapunov exponents, the waveform in the time domain is non-cyclical, it also has a higher sensitivity in terms of beginning conditions, and the suggested system is hyperchaotic.

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