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KrzysztofMarczak — Raytraced reflections 7
Published: 2011-06-18 19:00:05 +0000 UTC; Views: 4208; Favourites: 42; Downloads: 0
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Description
Image rendered using Mandelbulber 1.03Mandelbulber 1.04;
image_width 384;
image_height 216;
z_min 0;
view_point_x 4.0079937484315149;
view_point_y -7.7093225479846517;
view_point_z 3.626159059841306;
angle_alfa -9.3724158616691202;
angle_beta 19.68349807941367;
angle_gamma 90;
zoom 1.5999999999999999e-10;
perspective 1.2;
formula 12;
julia_mode 1;
julia_a 8;
analityc_DE_mode 0;
DE_factor 0.69999999999999996;
reflect 0.80000000000000004;
ambient_occlusion_quality 1;
glow_intensity 0.40000000000000002;
glow_color_1_R 65535;
glow_color_1_G 11743;
glow_color_1_B 0;
glow_color_2_R 65535;
glow_color_2_G 59012;
glow_color_2_B 0;
background_color_1_G 0;
background_color_1_B 0;
background_color_2_R 0;
background_color_2_G 0;
background_color_2_B 0;
coloring_random_seed 355952;
coloring_speed 0.5;
limits_enabled 1;
post_fog_visibility 180.90000000000001;
post_fog_visibility_front 29.699999999999999;
post_fog_color_R 65535;
post_fog_color_G 65535;
post_SSAO_enabled 0;
main_light_alfa 0.43633231299858238;
main_light_beta 0.43633231299858238;
aux_light_intensity 0.20000000000000001;
aux_light_number 2;
aux_light_predefined_1_x 4.0342665287933368;
aux_light_predefined_1_y -5.8705671242684554;
aux_light_predefined_1_z 5.012172583204177;
aux_light_predefined_1_intensity 0.031152476920484021;
aux_light_predefined_2_x 4.1587320131299386;
aux_light_predefined_2_y -4.4961013835370078;
aux_light_predefined_2_z 2.638011113607555;
aux_light_predefined_2_intensity 0.0599465612461208;
aux_light_predefined_1_enabled 1;
aux_light_predefined_2_enabled 1;
aux_light_predefined_1_colour_R 64584;
aux_light_predefined_1_colour_G 65535;
aux_light_predefined_1_colour_B 48931;
aux_light_visibility 0.10000000000000001;
hybrid_formula_1 8;
hybrid_formula_2 7;
hybrid_formula_5 0;
hybrid_iterations_1 10;
hybrid_power_1 1.05;
hybrid_power_2 3;
hybrid_cyclic 1;
mandelbox_scale 1.2;
mandelbox_folding_min_radius 0;
mandelbox_color_R 0.10000000000000001;
mandelbox_color_X 0;
mandelbox_color_Y 0;
mandelbox_color_Z 0;
view_distance_max 115.9347471695358;
view_distance_min 9.9999999999999998e-13;
linear_DE_mode 1;
raytraced_reflections 1;
reflections_max 2;
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Comments: 16
I am not capable of writing code and not much of a mathematician but I have managed to create some nice images with your software (see johnfwalte.com if you want). The question I have is how do you determine the data entry numbers that are long strings of integers after the decimal point such as glow intensity of 0.40000000000000002(15 zeros ???) or in the case of Zoom Factor above of 1.5999999999999999e- 10? I'm sorry, this is just beyond me to fathom. Help.
👍: 0 ⏩: 0
whoa cool! This is like a weird palace with pillars everywhere!
👍: 0 ⏩: 0
Wow, thats a stunning image. What type of fractal is this Krzysztof ? Ive not seen this type of fractal from Mandelbulber.
👍: 0 ⏩: 1
I was also surprise for me, that it is possible to get this shape in Mandelbulber. It's hybrid fractal: about 20 iterations of Mandelbox and 2 for Menger Sponge. Mandelbox has scale=1.0, minRadius = 0. There is enabled Julia mode, and Julia constant is (from 4 to 8,0,0). It is required to use Limits (cross-sections) to find places with interesting detail inside the box.
👍: 0 ⏩: 1
Nice find, the amount of possibilities just blow my mind with Mandelbulber.
Regards. Shaun.
👍: 0 ⏩: 0
