AbstractAmong the methods available for the characterization of complicated mathematical and physical phenomena, computers with graphics are emerging as an important tool. In this article, I present computational and graphical results on Halley's method for one-parameter functions of the form ζ(ζα − 1) = 0 and sin(ζ) = 0 in order to gain insight as to where the method can be relied upon and where it behaves strangely. The resulting plots reveal a visually striking and intricate class of patterns indicating behavior ranging from stable attractive and repulsive points to chaos. Iterative approximation methods such a Halley's method occur frequently in science and engineering
Newton’s method is a topic that is accessible to calculus students. We use Newton’s method to approx...
Abstract. The present paper is devoted to studying Hubbard’s pendulum equation ẍ+ 10−1ẋ+ sin(x) =...
Abstract. We give a short introduction to the methods of representing polynomial and trigono-metric ...
AbstractAmong the methods available for the characterization of complicated mathematical and physica...
An important piece of information when dealing with a polynomial in the complex plane is its roots, ...
Main idea behind rational trigonometry. Traditional trigonome-try uses non-algebraic functions such ...
This thesis presents new numerical algorithms for approximating functions by trigonometric polynomia...
International audienceWe determine the two-dimensional symplectic map describing 1P/Halley chaotic d...
We study the chaotic behaviour of Newton's method with graphic calculators and computers. Through re...
This note illustrates very simple graphics techniques for visualizing a large class of graphically i...
AbstractThe microcomputer and its graphics capabilities are used to investigate chaos in Newton's me...
We show how the use of rational parameterizations facilitates the study of the number of solutions o...
A complete MAPLE procedure is designed to effectively implement an algorithm for approximating trigo...
In this paper we investigate arithmetic nature of the values of generalized hypergeometric functions...
It is surprising to students to learn that a natural combination of simple functions, the function s...
Newton’s method is a topic that is accessible to calculus students. We use Newton’s method to approx...
Abstract. The present paper is devoted to studying Hubbard’s pendulum equation ẍ+ 10−1ẋ+ sin(x) =...
Abstract. We give a short introduction to the methods of representing polynomial and trigono-metric ...
AbstractAmong the methods available for the characterization of complicated mathematical and physica...
An important piece of information when dealing with a polynomial in the complex plane is its roots, ...
Main idea behind rational trigonometry. Traditional trigonome-try uses non-algebraic functions such ...
This thesis presents new numerical algorithms for approximating functions by trigonometric polynomia...
International audienceWe determine the two-dimensional symplectic map describing 1P/Halley chaotic d...
We study the chaotic behaviour of Newton's method with graphic calculators and computers. Through re...
This note illustrates very simple graphics techniques for visualizing a large class of graphically i...
AbstractThe microcomputer and its graphics capabilities are used to investigate chaos in Newton's me...
We show how the use of rational parameterizations facilitates the study of the number of solutions o...
A complete MAPLE procedure is designed to effectively implement an algorithm for approximating trigo...
In this paper we investigate arithmetic nature of the values of generalized hypergeometric functions...
It is surprising to students to learn that a natural combination of simple functions, the function s...
Newton’s method is a topic that is accessible to calculus students. We use Newton’s method to approx...
Abstract. The present paper is devoted to studying Hubbard’s pendulum equation ẍ+ 10−1ẋ+ sin(x) =...
Abstract. We give a short introduction to the methods of representing polynomial and trigono-metric ...