xs21_o8b9ak8zca321

#C [[ GRID THUMBLAUNCH THUMBSIZE 2 THEME Catagolue ]] 
x = 1, y = 1, rule = B3/S23
b!

	This pattern is a still-life.
	This pattern is periodic with period 1.
	This pattern runs in standard life (b3s23).
	The population is constantly 21.
	This evolutionary sequence works in multiple rules, from bs2-k3-ajk through to b2cin34acikwyz5-ejq678s012345678.

Pattern RLE

Code: Select all

Glider synthesis

Code: Select all

#C [[ GRID MAXGRIDSIZE 14 THEME Catagolue ]] 

#CSYNTH xs21_o8b9ak8zca321 costs 88 gliders (true).

#CLL state-numbering golly

x = 1183, y = 138, rule = B3/S23

483bo$484b2o$483b2o22$741bo5bo$739bobo3bobo$740b2o4b2o2$755bo$753b

2o50bo44bo$703bo50b2o49bobo43b2o$701bobo64bo30bobo3b2o43b2o8bo9bo$

702b2o62b2o32b2o7bobo47bo10bobo152bo141bo$706bo60b2o31bo8b2o48b3o

8b2o153bobo140bo$706bobo101bo214b2o139b3o13bo$706b2o48b2o210bo4bo

206b2o$355bo212bo47bobo80bo56b2o211bo2bo94bo113b2o$60bo295bo209bob

o47b2o82bo44bo71bobo48bo98b3o2b3o91bo$58bobo293b3o210b2o48bo40bo

39b3o42bobo5b2o64b2o47b2o49bobo146b3o39bo$59b2o11bo85bo201bo74bo4b

obo129bo85bobo83b2o5b2o50b2o5b2o6bo33b2o3b2o8b2o49b2o9b2o178b2o$

14bo51bo4bo85bo200b2o35bobo38b2o2b2o129bo86b2o44b2o49b2o46bobo3bob

o40bobo3bo59bo10bobo38b2o90bo45b2o$obo10bo52bobo2b3o78bobo2b3o199b

2o35b2o37b2o4bo129b3o43b2o43b2o31b3o6b2o49b2o7b2o39bo2bo45bo2bo15b

o57bo3b2o34bo3b2o48bo2b2o30bobo6b2o2bo2b2o37b2ob2o2bo2b2o32bo5b2ob

2o2bo2b2o4bo$b2o10b3o44b2o4b2o85b2o241bo170b2o47b2o44bobo32bo43b3o

19b2o39b2obo45b2obo9b2o3b2o57b2obo2bo32bobobo2bo45bobobo2bo31b2o6b

o2bobo2bo37b2obo2bobo2bo30bobo5b2obo2bobo2bo3b2o$bo59b2o90bo412bob

o49bo37b2o4bo33bo7b2o37bo11b2o8bo41b2o47b2o7b2o5b2o41b3o15b2o34b2o

2b2o33b2o12b2o2b2o42b2o2b2o33b2o8b2o2b2o33b2o9b2o2b2o5bobo$24bobo

33bo48bo40bo45b2o35b2o44b2o36b2o40b2o31b3o7bo34b2o91b2o36bo44b2o

41bo47bo37bo12bo51bo48bo10bo49bo15bo39bo35b2o15bo47bo35b2o11bo49bo

$24b2o82bobo38bobo43bobo34bobo43bobo35bobo39bobo33bo6bobo32bo2bo

90bo2bo42bo37bo5bo36bo47bo50bo51bo48bo58bo17bo39bo33bo18bo33b2o12b

o33bo14bo40b2o7bo$14b2o9bo32bo50bo40bo45bo36bo45bo37bo41bo33bo8bo

33b3o92b3o40b3o34b3o5b2o33b3o45b3o48b3o9b2o38b3o46b3o47b3o24b3o37b

3o50b3o35b2o8b3o46b3o36b3o2b2o4b3o$13b2o43b2o6bo506bo36bo8bobo31bo

47bo43b2o5bo11b2o38bo48bo52bo23bo39bo52bo37bo9bo40b3o5bo41bo7bo$

15bo41bobo4b5o38b5o36b5o41b5o32b5o41b5o33b5o37b5o38b5o31b5o90b5o

36bob5o30bob5o36bob5o41bob5o37bobo4bob5o8bo36bob5o42bob5o46bo23bob

5o33bob5o36b3o7bob5o41bob5o37bo4bob5o35bo7bob5o$63bo5bo36bo5bo34bo

5bo39bo5bo30bo5bo39bo4bo32bo4bo36bo4bo37bo4bo30bo4bo89bo4bo37bo4bo

31bo4bo37bo4bo42bo4bo39bo5bo4bo46bo4bo43bo4bo71bo4bo34bo4bo38bo8bo

4bo42bo4bo36bo6bo4bo44bo4bo$64bobo2bo37bobo2bo35bobo2bo40bobo2bo

31bobo2bo3bo36bobo35bobo39bobo40bobo33bobo92bobo40bobo34bobo40bobo

45bobo48bobo49bobo46bobo74bobo37bobo39bo3b2o5bobo45bobo46bobo47bob

o$5b2o58b4o39b4o37b4o42b4o33b4o3b2o37b3o35b3o39b3o40b3o33b3o92b3o

40b3o34b3o40b3o45b3o48b3o49b3o46b3o74b3o37b3o42bobo5b3o45b3o46b3o

32b3o12b3o$4bobo232bobo119bo42bo35bo94bo42bo36bo42bo47bo50bo51bo

48bo76bo39bo41bo10bo47bo48bo33bo15bo$6bo58b2o41b2o39b2o44b2o35b2o

44b3o35b3o41b2o41b2o34b2o93b2o41b2o35b2o41b2o46b2o49b2o50b2o47b2o

75b2o38b2o51b2o46b2o47b2o32bo15b2o$65b2o41b2o38bobo43bobo34bobo43b

o2bo34bo2bo$114bobo32bo45bo35b2o44b2o37b2o3b2o$114b2o75bo129bobo

683b2o$105bo9bo76b2o127bo686b2o$105b2o3b3o78b2o79b3o37b3o692bo$

104bobo3bo163bo39bo$111bo161bo3b2o34bo$277bobo$190b3o84bo$190bo$

191bo22$485b2o$486b2o$485bo$481b2o$480bobo$482bo4$474b2o$473bobo$

475bo29$523bobo$524b2o$524bo4$524b2o$523bobo$525bo$528b2o$528bobo$

528bo!

Sample occurrences

There are 8 sample soups in the Catagolue:

Unofficial symmetries

Symmetry	Soups	Sample soup links

1obj_glider_enum_clean_test_stdin	2	• •

22bit_glider_clean_test_stdin	2	• •

23bit2_glider_clean_test_stdin	2	• •

23bit_glider_clean_test_stdin	2	• •

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