Fractal type : complex marksjulia.
See CXMJ010 for more technical data concerning this fractal.
Parameters :
real(c) = 1, imag(c) = 0.3
real(p) = 74,705, imag(p) = 1.4
Bailout Test = mod
Bailout value = 4
Maximum number of iterations = 250
Outside color = iter
Potential Max Color = 0
Slope = 0
Bailout = 0
Distance Estimator = 0
Width factor = 0
Inversion radius = 0
Note : the only difference betweem this fractal and fractal CXMJ064 is real(p) = 74.705 instead of real(p) = 74.72.
With bailout test = real instead of mod for the above fractal CXMJ095 and with another palette of colors, the fractal below is displayed.
Name : CXMJ095A (2019/06/23)
With bailout test = imag instead of real for the above fractal CXMJ095A and with another palette of colors, the fractal below is displayed.
Name : CXMJ095B (2019/06/23)
With bailout test = or instead of imag for the above fractal CXMJ095B and with another palette of colors, the fractal below is displayed.
Name : CXMJ095C (2019/06/23)
Below, two kaleidoscopic transformations of the above fractal with a software program (just for fun).
Name of the first kaleidoscopic image : CXMJ095CK1(2019/06/23)
Name of the second kaleidoscopic image : CXMJ095CK2(2019/06/23)
With bailout test = and instead of or for the above fractal CXMJ095C and with another palette of colors, the fractal below is displayed.
Name : CXMJ095D (2019/06/23)
With bailout test = manh instead of and for the above fractal CXMJ095D and with another palette of colors, the fractal below is displayed.
Name : CXMJ095E (2019/06/23)
Below, two kaleidoscopic transformations of the above fractal with a software program (just for fun).
Name of the first kaleidoscopic image : CXMJ095EK1 (2019/06/23)
Name of the second kaleidoscopic image : CXMJ095EK2 (2019/06/23)
