An Extension of the Bisection Theorem to Symmetrical Circuits with Cross-Coupling

Zghoul, Fadi Nessir

doi:10.14569/ijacsa.2016.070658

Cited by 1 publication

(1 citation statement)

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“…The interval divides into two parts, then chooses from these two parts which part contains roots and which part does not contain roots is discarded. This is done repeatedly until the roots of the equation are obtained or close to the roots of the equation [27] This method is applicable when you want to solve the equation f(x)=0 where f(x) is a continuous function. Bisection Method can be seen in Fig.…”

Section: Bisection Methodsmentioning

confidence: 99%

Implementing Bisection Method on Forex Trading Database for Early Diagnosis of Inflection Point

Noertjahyana¹,

Abas²,

Yusoh³

et al. 2023

IJACSA

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Many people are trading in the forex market during the COVID-19 pandemic with the hope of earning money, but they are experiencing shortages due to the lack of information and technology-based tools for existing daily data. Sometimes traders only use moving averages in trading data, even though this information needs to be processed again to get the right inflection point. The objective of this research is to find inflection points based on Forex trading database. Another algorithm can also be used to determine the inflection point between two points on a moving average. This can be supported by the Bisection method used because it can guarantee that convergence will occur. The results show that the points resulting from the bisection calculation on the moving average provide a fairly accurate decision support for the location where the inflection point is located. From 10,000 data there is a standard deviation of 0.71 points which is very small compared to an average of 20 pips (points used as the difference in price values in forex). The use of the bisection method provides an accuracy of the results in seeing the inflection point of 87%.

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Section: Bisection Methodsmentioning

confidence: 99%