For technical explanations (equations and parameters), see : MANDEL01 fractal.
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Parameters used here (on a particular area of MANDEL01 fractal) :
real perturbation : 0, imaginary perturbation : 0
bailout test : mod, bailout value : 4
Below, three images of the same fractal with three different palettes of colors.
Name of the image : MANDEL04A
Name of the image : MANDEL04B
Name of the image : MANDEL04C
Zoom on the center of fractal MANDEL004a.
Name of the image : MANDEL04D
Zoom on the left of the center of the above image.
Name of the image : MANDEL04E
Other zoom in an area of the above image.
Name of the image : MANDEL04F
Same image with a different palette of colors.
Name of the image : MANDEL04G
Zoom on an area of fractal MANDEL04F.
Name of the image : MANDEL04H
Other zoom on an area of fractal MANDEL4F.
Name of the image : MANDEL04I
Zoom of a small area of the above image with another palette of colors.
Name of the image : MANDEL04J
Other zoom of an area of fractal MANDEL04E.
Name of the image : MANDEL04K
Zoom on the centerof the above image.
Name of the image : MANDEL04L
Zoom of an area of the above fractal.
If we compare this image with the first image of this gallery (image MANDEL01),
the magnification factor is about 1,826,000,000,000 (or 1.826 x 10^12) !
Name of the image : MANDEL04M
If we use a much larger area for all the above fractals of this series,
the first fractal MANDEL01 of this gallery is displayed (assumming that the palette of colors is the same).
With the parameter outside color = atan instead of iter used for all the above images,
and with a much larger area, a drastic change of the aspect of fractal MANDEL01 can be observed.
Name of the image : MANDEL04N
