THE MANDELBRÖT & JULIA GALLERY

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The description lists the type of set, (Mandelbröt or Julia), the function used to generate the set and the scan area parameters, (the coordinates of the lower-left corner, followed by the length of the side). The constant is added for Julia sets.

Most values are shown in exponential notation.

Mandelbröt
z = z² + c
(-1.40E-1, 8.90E-1),
4.95E-5 Mandelbröt
z = z² + c
(-7.22E-1, 3.03E-1),
6.51E-3 Julia
z = z(z² - 1) + c
(-1.52, -1.45),
3.23
(-0.6171, 0.4553i) Julia
z = z(z² - 1) + c
(-2.94E-1, 2.52E-1),
1.53E-3
(-0.6171, 0.4553i)

Mandelbröt
z = z² - z - 1 + c
(9.19E-1, 1.69E-2),
1.69E-1 Mandelbröt
z = z² - z - 1 + c
(9.49E-1, 1.33E-1),
3.42E-2 Julia
z = z²(z - 1) + c
(-1.20, -1.50),
3.00
(0.9541, 0.5385i) Julia
z = z²(z - 1) + c
(-5.29E-1, -6.70E-2),
2.17E-1
(0.9541, 0.5385i)

Mandelbröt
z = z^4 + c
(--1.40, -1.30),
2.60
Mandelbröt
z = z^4 + c
(-6.85E-1, 3.53E-1),
1.23E-3 Julia
z = z^4 + c
(-1.50, -1.50),
3.00
(-0.6841, 0.3534i) Julia
z = z^4 + c
(-8.76E-1, 1.32E-1),
1.20E-1
(-0.6841, 0.3534i)

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Mandelbröt z = z² + c (-1.40E-1, 8.90E-1), 4.95E-5	Mandelbröt z = z² + c (-7.22E-1, 3.03E-1), 6.51E-3	Julia z = z(z² - 1) + c (-1.52, -1.45), 3.23 (-0.6171, 0.4553i)	Julia z = z(z² - 1) + c (-2.94E-1, 2.52E-1), 1.53E-3 (-0.6171, 0.4553i)
Mandelbröt z = z² - z - 1 + c (9.19E-1, 1.69E-2), 1.69E-1	Mandelbröt z = z² - z - 1 + c (9.49E-1, 1.33E-1), 3.42E-2	Julia z = z²(z - 1) + c (-1.20, -1.50), 3.00 (0.9541, 0.5385i)	Julia z = z²(z - 1) + c (-5.29E-1, -6.70E-2), 2.17E-1 (0.9541, 0.5385i)
Mandelbröt z = z^4 + c (--1.40, -1.30), 2.60	Mandelbröt z = z^4 + c (-6.85E-1, 3.53E-1), 1.23E-3	Julia z = z^4 + c (-1.50, -1.50), 3.00 (-0.6841, 0.3534i)	Julia z = z^4 + c (-8.76E-1, 1.32E-1), 1.20E-1 (-0.6841, 0.3534i)

THE MANDELBRÖT & JULIA GALLERY

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[Last update: 3/12/2005]