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
The rapid development of digital computer hardware and software has had a dramatic influence on math...
This is an overview of examples and problems posed in the late 1600s up to the mid 1700s for the pur...
The field of dynamics is itself a huge part of many branches of science, including the motion of the...
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, ...
AbstractThe microcomputer and its graphics capabilities are used to investigate chaos in Newton's me...
We study the chaotic behaviour of Newton's method with graphic calculators and computers. Through re...
We investigate the behavior of Newton\u27s Method for finding roots applied to complex-valued functi...
This note illustrates very simple graphics techniques for visualizing a large class of graphically i...
Main idea behind rational trigonometry. Traditional trigonome-try uses non-algebraic functions such ...
Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite tim...
This thesis presents new numerical algorithms for approximating functions by trigonometric polynomia...
Newton’s method is a topic that is accessible to calculus students. We use Newton’s method to approx...
We show how the use of rational parameterizations facilitates the study of the number of solutions o...
In this paper, a complex dynamical study of a parametric Chebyshev-Halley type family of iterative m...
The rapid development of digital computer hardware and software has had a dramatic influence on math...
This is an overview of examples and problems posed in the late 1600s up to the mid 1700s for the pur...
The field of dynamics is itself a huge part of many branches of science, including the motion of the...
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, ...
AbstractThe microcomputer and its graphics capabilities are used to investigate chaos in Newton's me...
We study the chaotic behaviour of Newton's method with graphic calculators and computers. Through re...
We investigate the behavior of Newton\u27s Method for finding roots applied to complex-valued functi...
This note illustrates very simple graphics techniques for visualizing a large class of graphically i...
Main idea behind rational trigonometry. Traditional trigonome-try uses non-algebraic functions such ...
Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite tim...
This thesis presents new numerical algorithms for approximating functions by trigonometric polynomia...
Newton’s method is a topic that is accessible to calculus students. We use Newton’s method to approx...
We show how the use of rational parameterizations facilitates the study of the number of solutions o...
In this paper, a complex dynamical study of a parametric Chebyshev-Halley type family of iterative m...
The rapid development of digital computer hardware and software has had a dramatic influence on math...
This is an overview of examples and problems posed in the late 1600s up to the mid 1700s for the pur...
The field of dynamics is itself a huge part of many branches of science, including the motion of the...