Fractal geometry

Application of Fractal Geometry to Ecology Abstract New insights into the natural world are just a few of the results from the use of fractal geometry. Examples from population and landscape ecology are used to illustrate the usefulness of fractal geometry to the field of ecology. The advent of the computer age played an important role in the development and acceptance of fractal geometry as a valid new discipline. New insights gained from the application of fractal geometry to ecology include:

Role of Fractal Geometry in Indian Hindu Temple Architecture Dhrubajyoti Sardar M.Arch Scholar, Architecture & Planning Department Indian Institute of Technology, Roorkee Roorkee, Uttarakhand, India E-mail: ar.dhrubajyotisardar@gmail.com S. Y. Kulkarni Professor & Former Head Architecture & Planning Department, IIT Roorkee Roorkee, Uttarakhand, India E-mail: syk_iitr@yahoo.com Abstract— The self-similar recursive geometry is known as Fractal. Hindu Philosophy describes the cosmos as holonomic

stick to English. That is why teachers of the English in Kazakhstan need practical, easy-to-implement, effective methods to increase the use of the English in the classroom. One of the most effective methods for improving speaking skills is Fractal Geometry method. The teacher provides students with “How to” questions and students need to write instructions on how to perform everyday activities (How to cook perfect rice for 4 people?

Fractals are a remarkable family of shapes which are ubiquitous within the natural world yet were virtually overlooked by mathematicians until late 19th century, and only became properly acknowledged thanks to the remarkable insights of Mandelbrot in the 1970s. In this paper I introduce and define fractals as well as two methods to produce them: the photocopier method and chaos game. In order to aid in this I have produced a demonstration web application (hosted at turium.com/wflete) which uses the

1. Title:- Modeling of fractal antenna using Artificial Neural Network. 2.Introduction:- In high-performance spacecraft, aircraft, missile and satellite applications, where size, weight, cost, performance, ease of installation, and aerodynamic profile are constraints, low profile antennas may be required. Presently, there are many other government and commercial applications, such as mobile radio and wireless communications that have similar specifications. To meet these requirements, micro strip

logical if we go with the fundamentals .Okay? Let me tell you first about “Fractal”, A fractal is a natural phenomenon (make a note of that because it appears that by creating fractals in nature such as “Lightning bolts, “Heartbeats “,”DNA”, universe is doing its own mathematical calculations). or A fractal is a mathematical set that exhibits a repeating pattern that displays at every

“RESEARCHING CANCER “ Since I have been always interested in science and technology, I read many books about these topics. Futhermore, I often do some easy experiments with light, chemicals in my free time. However, until 10th grade, I never had the opportunity to contribute to medical research—something that I had always wanted to do. Then one day, I was announced that there would be a science competition for high school students in Ho Chi Minh City. I once decided to take part in. I spent a

There is a metaphor about math education which posits that doing math is like painting, and yet most students focus on whitewashing fences rather than examining pieces by the great masters of art. Up until taking calculus in high school, my thoughts about math rarely strayed beyond fence painting. However, I was lucky enough to get a passionate high-school calculus teacher who made it a goal to introduce us to Van Gogh, Salvador Dali, and the like. From such introductions I began to build my own

a closed loop, which is one construct made possible with recursion. The above image is an example of the Mandelbrot set. The Mandelbrot set, along with other sets, is an example of a fractal. Fractals are fundamentally based on the idea of infinite recursion. If you zoom in to a particular spot in the fractal, you’ll perhaps see a different arrangement of patterns, but you would still be able to

My infatuation in fractals began freshmen year at Greeley after taking a Seminar with one of the seniors. I’m not sure exactly when simple interest turned to a kind of obsession, but during that lesson something seemed to click. It seemed as if this was the universe’s answer to everything; the mystery was solved, however complex the answer was to understand. I’m still not sure if I was misunderstanding the lesson, or if I had somehow seen it for what it really was; a pattern to describe the way the