### About

#
**Mandelbrot - set **

The members of the common Mandelbrot set follow the rule

*z _{n+1}= z_{n}^{2}+ c *; initial value

*z*

_{0}= 0
*c* is a complex number, as is *z *

We look for points *c* in the complex plane, for which the series
does not diverge. They form the Mandelbrot set. In the simulation they
are colored red, lying within a range with the fractal boundary, the
famous "apple man". Diverging points are colored green to blue, with the
color shading indicating the speed of divergence.

Drawing a rectangle with the mouse defines a smaller range of
calculation with correspondingly increasing resolution. **Reset**
leads back to the initial condition.

#
**Fractal for variable power law**

The fractal character of the boundary of the Mandelbrot structure is a result of the nonlinearity of the series´ construction rule. It is not dependent on its specific square law rule.

To demonstrate this, a modified series is calculated with variable power law in the nonlinear term

*z _{n+1}= z_{n}^{k}+ c*;

*z*a rational number

_{0}= 0; k≧ 1,

*c* is the complex number in the plane, for which convergence or
divergence of the series is determined.

The calculation is more transparent when the complex number is written in polar coordinates.

*z = x + i y = r (cosφ + i sinφ) = r e ^{iφ} *

*r = √(x ^{2} + y^{2});^{ }φ = arctg (y /
x) *

*z ^{k} = r ^{k} e^{iφ} = r ^{k}
(cos (kφ) + i sin (kφ)) *

In the simulation a **slider **is used to vary the rational number*
k* between *1* and *10*. In the number field an arbitrary
rational number can be input, for example an exact integer or a very
high number such as 1000. *k = 2 *delivers the common "apple man"
of the Mandelbrot set.

The default position when opening the simulation and after **Reset**
is *n = 10*.

Be patient! This is a number crunching calculation, and it may take
several seconds or even minutes to see the result after a change of *k *or*
*after Reset, depending on the quality of your computer. When you
assume that the computer has been hooked up, close the simulation and
start it anew.

**E1:**Choose the power *k = 2* and store the contour of the
"apple man" in your memory.

**E2: **Choose a slightly different value of *k* and reflect how
the change originates.

**E3: **Type integers* *1 to 10 into the text
field. Watch for symmetries, study how they relate to

*k*, and how the structure originates.

**E4:** Type a very high integer for *k*, e.g. 1000. The fractal
looks close to a circle. Why? Take a look at the boundary several times
magnified.

**E5:** Choose integer or rational* k*. Use the selection
rectangle of the mouse to deeply intrude into the fractal, and look for
especially attractive structures. Where are they? Why? (not an easy
question).

mandelbrot xlm was originally developed by

Francisco Esquembre and Wolfgang Christian The variations were developed by Dieter Röß in October 2008This simulation is part of

“Learning and Teaching Mathematics using Simulations

– Plus 2000 Examples from Physics”

ISBN 978-3-11-025005-3, Walter de Gruyter GmbH & Co. KG

### Translations

Code | Language | Translator | Run | |
---|---|---|---|---|

### Credits

Dieter Roess - WEH- Foundation; Tan Wei Chiong; Loo Kang Wee; Francisco Esquembre ; Wolfgang Christian

### Sample Learning Goals

[text]

### For Teachers

This is yet another variation of the Mandelbrot Set, the latest of the Mandelbrot series, you could say.

This time, what varies is the power to which the complex number ** z** is raised to in each iteration.

The standard Mandelbrot Set is iterated as follows: z(n+1) = z(n)^2 + c

However, in this simulation, we define the algorithm as follows:** z(n+1) = z(n)^k + c**, where

**is a real number.**

*k*The value of

**can be adjusted with either the slider, which allows the values to be set between 1 and 10, or with the field provided, which allows for any real value of**

*k***to be entered. This set is also called the Multibrot Set, as a portmanteau of "Multiple" and "Mandelbrot".**

*k*

**Disclaimer**: Due to the colouring algorithm used, selecting negative powers will end up merely returning a monotone page of colour. We are currently working on implementing a better colouring algorithm for all our Mandelbrot Set simulations.The default value of

**is set to**

*k*

*k = 10*Research

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### Video

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### Version:

- http://weelookang.blogspot.sg/2016/02/vector-addition-b-c-model-with.html improved version with joseph chua's inputs
- http://weelookang.blogspot.sg/2014/10/vector-addition-model.html original simulation by lookang

### Other Resources

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### end faq

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- Details
- Written by Wei Chiong
- Parent Category: Pure Mathematics
- Category: 2 Sequences and series
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