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Fractal
s
are
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Beautiful
Mathematic
The formula behind fractals.
The simple formula, first used by Benoit B.Mandelbrot was this
:
Z = Z2 + C
Seemingly very simple, but it contains possibilities for an
extremely complictedoutput when given interation possibility, and
it has also an imaginary part. Thisimaginar part involve use of
complex numbers in C, in the terms of i, whichequals the square
root of -1.Complex numbers follow their own rules that sometimes
differ from those of real
numbers. Because of their unique properties, they are often used
in fractals thatare graphed in thecomplex planes.
The so called Mandelbrotset is one example of afractal that is
graphed inthe complex plan.
Looking close with a magnifying glassalong the periferical
border (sharppicture), one will see just the samestructure as in
the main picture, a unik
kind of a repetition.
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Julia sets exist in the complex plane, where the horizontal axis
represent the real
numbers, and the vertical axis represents imginary numbers. An
assortment ofJulia sets here sourrounds the Mandelbrot set.
In the equation (x=x2+ C ), the C for Julia setsare more
sophisticated, having a complex numberinvolved. This imply infinite
possibilities for the
developing of fractals.
The two fractal examples shown here wasachieved by different
values for the C in theequation, and shows what influence this had
forthe image of the fractal pictures.
More thrilling pictures can be achieved bylaying in colours ,
and the colour distributionwill depend on how many iterations
used.
Where to learn more.
When Benoit B.Mandelbrot in 1975 published hisfrst book about
fractals, the interest increased
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rapidly. Few years later (1978) came his book The Fractal
Geometri ofNature .
This book is far from easily read, and you should be wellskilled
in mathematics and its formulations to get a profound
advantage from reading the book. With its 468 pages anextensive
job waits for you !
For those who prefer a more spontanus meeting with
beautyfulfractals and less heavy mathematics, the book The Beauty
of
Fractals is recommended. It was publishetin 1986, with 199 pages
and 185 figures, manyin colour.
Where can you just play with fractals ?
You have a fine opportunity for doing this by downloading a
freeware programcalled Fractal Forge.
You find it in Google, just try this :
Fractovia - Fractal Forge Fractal Forge v.2.8.2 is freeware. You
can use it to draw your
own fractal images, and explore Mandelbrot Set's branches. Now
it's easier and
faster than ... http://www.fractovia.org/uberto/
When you has got in on your screen, just click in upper left
corner and then onFile and Open file. Then you get 30 different
fractals you can play with.Chose one of them, and Open it. Wait for
some seconds, and then click inupper right corner. This should
bring you a menu, and click on Data. Nowyou can enter into the
formula, and change iterations etc. etc., and thenclick on Start to
see the result. Good Luck !
http://go.startsiden.no/go/e/content_results;siteId=230;afu=verden.abcsok.noa47index.html%3Fq%3Dfractal%2520forge%252C%2520freeware%26cs%3Dlatin1/http:/www.fractovia.org/uberto/http://www.fractovia.org/uberto/http://go.startsiden.no/go/e/content_results;siteId=230;afu=verden.abcsok.noa47index.html%3Fq%3Dfractal%2520forge%252C%2520freeware%26cs%3Dlatin1/http:/www.fractovia.org/uberto/http://www.fractovia.org/uberto/
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Do you just want to look at beautiful fractals ?
An excellent collection can be found in Sekinos Fractal Gallery,
try it onthe address .
http://www.willamette.edu/~sekino/fractal/annex.htm
Take a look at four of them :
Skien, 7. febr. 2010
Kjell W. Tveten
http://www.willamette.edu/~sekino/fractal/annex.htmhttp://www.willamette.edu/~sekino/fractal/annex.htm
