Abstract-Nonlinear equation which is difficult to solve by analysis, but it can be solved using approach of variety of  numerical methods, for instance Newton-Raphson and Halley Methods.  However, the methods are not guaranteed to be convergent. Predictor Corrector Halley's method is one of the method that appear from the advantages and disadvantages of Newton-Raphson and Method of Halley. This method uses the Newton-Raphson Method as predictor and Halley's Method as corrector. It has a higher order and more efficient from Newton-Raphson and Halley methods. The advantage of this method has a higher convergence that has sixth-order convergence so that the step of the iteration is fewer. Next,an algorithm of this method is used to determine the root approximations of nonlinear equations.

Conte, Samuel D. 1992. Dasar-Dasar Analisis Numerik. Jakarta: Erlangga.

Spanos, Aris. 1986. Statistical Foundations of Econometric Modelling. New York : Cambidge University Press

Inayat, Noor Khalida & Muhammad Aslam Noor. 2007. “Predictor-Corrector Halley Method for Nonlinear Equations.” Jurnal Applied Mathematics And Computation. 1587-1591

Amri, Khairil. “Menentukan Akar Persamaan Tak Linier dengan Menggunakan Metode Prediktor Korektor Halley”. Skripsi. Universitas Negeri Padang, Padang Indonesia, Juli, 2016.

Susila, I Nyoman. 1992. Dasar-Dasar Metode Numerik. Bandung: FMIP