Additional information
type of fractal | Rudy |
---|---|
formula | \[z_{n+1}=z_n^p+c\cdot{z}\] |
center x | 0.011474063844656358368556681170957745052874088287354 |
center y | 0.0023981885011515671757287293530680472031235694885254 |
Re(p) | 16 |
Im(p) | 0 |
Re(c) | 1.1622299366058188585526522729196585714817047119141 |
Im(c) | 0.0013451370452164461942456963328140773228369653224945 |
section size | 0.0001482140675139111563735072607528309163171797990799 |
color style | weighted-coloring |
smoothing function | spline |
core color | 0x0 |
puzzle piece? | true |
colormap | 215 |
post-processed | false |
siblings | 1 |
#22355E : 19.34%
#5F1415 : 17.92%
#1E1B1F : 15.81%
#B6E65B : 15.19%
#4B4185 : 10.22%
Rarity
type of fractal | Rudy | 7.43% |
Re(p) | 16 | 1.04% |
color style | weighted-coloring | 34.54% |
smoothing function | spline | 10.93% |
core color | 0x0 | 99.53% |
puzzlepiece | true | 1.83% |
colormap | 215 | |
post-processed | false | 70.26% |
siblings | 0446, 0615, 1364, 1368, 1696, 2383, 3960, 4456, 4563, 4853, 7052, 7580, 7957, 8436, 8600, 9764, 5068 | |
puzzle pieces | 0446, 0615, 1364, 1368, 1696, 2383, 3960, 4456, 4563, 4853, 7052, 7580, 7957, 8436, 8600, 9764 |