Implementations of Open and Closed Method Numerically: A Non-linear Equations Solution Convergence Test

Maulia Putri, Syaharuddin Syaharuddin

Abstract


Non-linear equations are one of the studies in mathematics. Root search in complex non-linear equations can be solved by numerical methods. Many methods to solve the equation. Therefore, the purpose of this research is to conduct simulation of closed and open methods such as Newton Raphson method, Secant method, Regula Falsi, Fixet Point, and Bisection. This is done as a form of comparative research to see the accuracy, number of iterations, and errors of each method in resolving the non-linear equations. As for the case being resolved is the roots of the exponential equation, trigonometry, logarithmic and polynomial degrees of three. The results of this study resulted in different levels of convergence in resolving each case

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References


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DOI: https://doi.org/10.31764/ijeca.v2i2.2041

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