Difference between revisions of "Manuals/calci/MANDELBROT"
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| − | <div style="font-size:30px">'''MANDELBROT'''</div><br/> | + | <div style="font-size:30px">'''MANDELBROT (SettingsArray,Width,Height,MandeliterFunction,Shades,CanvasId)'''</div><br/> |
==Description== | ==Description== | ||
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==Examples== | ==Examples== | ||
| + | #MANDELBROT() | ||
| + | [[File:Mandelbrot.png]] | ||
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| + | ==Related Videos== | ||
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| + | {{#ev:youtube|v=8ma6cV6fw24|280|center|Mandel brot}} | ||
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==See Also== | ==See Also== | ||
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*[[Manuals/calci/LISSAJOUSCURVE| LISSAJOUSCURVE ]] | *[[Manuals/calci/LISSAJOUSCURVE| LISSAJOUSCURVE ]] | ||
*[[Manuals/calci/LISSAJOUS| LISSAJOUS ]] | *[[Manuals/calci/LISSAJOUS| LISSAJOUS ]] | ||
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==References== | ==References== | ||
Latest revision as of 15:47, 4 March 2019
MANDELBROT (SettingsArray,Width,Height,MandeliterFunction,Shades,CanvasId)
Description
- This function shows the figure of the Mandelbrot.
- Fractals are infinitely complex patterns that are self-similar across different scales.
- This property is called self-similarity.
- Fractals form a never ending pattern, created by repeating a simple process over and over, in an ongoing feedback loop.Mandelbrot Set is the set of points in the complex plane with the sequence where the result does not approach infinity.
- The Julia Set is closely related to Mandelbrot Set.
- The Mandelbrot Set is obtained from the quadratic recurrence equation , (with=0), where points c in the complex plane for which the computed value of does not tend to infinity.
where the result does not approach infinity.
, (with
=0), where points c in the complex plane for which the computed value of 
does not tend to infinity.Examples
- MANDELBROT()
Related Videos
See Also
References