xp39_0ggy3o8geh6k4ozw346w88w2521011wc871z66x238cjey2456zgs26zxc453yas48x562zzyq8ckx247yaok46zyzydc871zyz0ck4y2ep62o8xcczywgs26wgg0g8k8w22wc4ozyzw345che123y311

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

	This pattern is an oscillator.
	This pattern is periodic with period 39.
	This pattern runs in standard life (b3s23).
	The population fluctuates between 162 and 232.
	This evolutionary sequence works in multiple rules, from b3s23 through to b34c6e8s234c5e6n8.

Pattern RLE

Code: Select all

Glider synthesis

Code: Select all

#C [[ GRID MAXGRIDSIZE 14 THEME Catagolue ]] 

#CSYNTH xp39_0ggy3o8geh6k4ozw346w88w2521011wc871z66x238cjey2456zgs26zxc453yas48x562zzyq8ckx247yaok46zyzydc871zyz0ck4y2ep62o8xcczywgs26wgg0g8k8w22wc4ozyzw345che123y311 costs 91 gliders (true).

#CLL state-numbering golly

x = 1220, y = 125, rule = B3/S23

181bo1035bo$182bo1034bobo$180b3o1034b2o5$1213bo$1211b2o$1212b2o$

313bobo$313b2o$84bo229bo$85bo1111bo$83b3o195bo916bo$279b2o915b3o$

280b2o$1200bobo$88b2o102bo491bo515b2o$88bobo102b2o488bo517bo$88bo

56bo46b2o89bo97bo69bo90bo114bo25b3o69bo91bo113bo110bo113bo$144bobo

135bobo95bobo67bobo88bobo112bobo95bobo89bobo111bobo108bobo111bobo$

142b3obo133b3obo93b3obo65b3obo86b3obo110b3obo93b3obo87b3obo109b3ob

o106b3obo109b3obo10bo$80bo60bo4bob2o129bo4bob2o89bo4bob2o61bo4bob

2o82bo4bob2o106bo4bob2o89bo4bob2o83bo4bob2o105bo4bob2o102bo4bob2o

105bo4bob2o7bobo$39bo39bobo59bobobobobo129bobobobobo89bobobobobo

61bobobobobo82bobobobobo19bo86bobobobobo89bobobobobo83bobobobobo

105bobobobobo102bobobobobo105bobobobobo7b2o$37bobo38bo2bo60b2obobo

132b2obobo92b2obobo58b2o4b2obobo79b2o4b2obobo20bo82b2o4b2obobo86b

2o4b2obobo80b2o4b2obobo102b2o4b2obobo99b2o4b2obobo97bo4b2o4b2obobo

$38b2o2b3o34b2o25bobo37bobo135bobo95bobo58bo8bobo79bo8bobo19b3o81b

o8bobo86bo8bobo80bo8bobo102bo8bobo99bo8bobo97bo4bo8bobo$44bo40bo

20b2o31b2o6bo137bo86bo10bo59bobo7bo80bobo7bo104bobo7bo87bobo7bo5bo

75bobo7bo103bobo7bo18bo81bobo7bo15bo80b3o4bobo7bo$43bo41bo21bo31b

2o231b2o70b2o89b2o113b2o96b2o11b2o77b2o112b2o24b2o83b2o22bo89b2o$o

84bo285bobo388b2o217b2o106b3o$b2o139b2o232b3o301bo$2o140bobo231bo

302bo80bo88b2ob2o109b2ob2o106b2ob2o109b2ob2o6b2o$4b3o39b2o38b2o6b

3o45bo55bobo176bo301b3o76b2o89b2ob2o109b2ob2o17bo88b2ob2o7b3o99b2o

b2o6b2o$6bo39b2o38b2o6bo104b2o549b2o7b2o81bo113b2o26bo82b2o17bo94b

o$5bo89bo103bo234bo314bo92b2o111bo28b3o79bo20bo93b2o$432bobo317bo

89b2o114bo110bo111b2o$91b3o339b2o127bo117b2o68b2o7bo83bo112b2o109b

2o14b2o97bo14b2o$93bo467bo117b2o77b2o98bo224bobo111bobo$92bo434bo

33b3o78bo38bo76bobo71bo24bo4bobo119b2o99bo85bo27bo$431b2o93bo2bo

111bo2bo4bo89b3o5b2o82bo2bo4bo17b3o2b2o81b3o5b2o28b2o71b3o5b2o19b

2o83bo2bo4bo20b2o$432b2o92bo2bo111bo2bo4b2o89b3o3bo84bo2bo4b2o22bo

82b3o3bo16b2o14bo71b3o3bo16b2o88bo2bo4b2o14b2o$271bo159bo96bo114bo

5b2o98bo83bo5b2o114bo13bo96bo13bo91bo5b2o14bo$270b2o290b2o86bo96b

2o91bo112b2o15b3o16b3o72b2o15b3o95bo15b3o$270bobo215bo72b2o119b3o

176b2o109bo16bo93bo113bo$489bo73bo118bo177b2o5b2o121bo$428bo58b3o

193bo178bo4bobo284bo$268b3o157b2o437bo284bobo8bo13b2o$270bo156bobo

12bobo708b2o9b2o10b2o9b2o$230bo38bo172b2o352bo366b2o13bo8bobo$107b

o123b2o210bo120b3o33bo193bobo4bo385bo$106b2o122b2o258bo73bo36bo

193b2o5b2o97bo$106bobo382b2o72bo33b3o199b2o99bo16bo110bo113bo$490b

2o141bo97b2o90bo76b3o16b3o15b2o91b3o15b2o94b3o15bo$440bo84bo107b2o

5bo89bo92b2o5bo91bo13bo96bo13bo99bo14b2o5bo$438b2o84bo2bo105b2o4bo

2bo90bo3b3o60bo22b2o4bo2bo73bo14b2o16bo3b3o86b2o16bo3b3o89b2o14b2o

4bo2bo$439b2o83bo2bo106bo4bo2bo88b2o5b3o59b2o2b3o17bo4bo2bo74b2o

28b2o5b3o80b2o19b2o5b3o83b2o20bo4bo2bo$490b3o33bo75bo38bo77bobo77b

obo4bo24bo74b2o120bo113bo27bo$492bo110b2o115b2o83bo222bobo111bobo$

437b2o52bo110b2o116bo7b2o90bo113b2o93b2o14b2o96b2o14bo$437bobo287b

o92b2o111bo110bo114b2o$437bo292bo89b2o83b3o28bo89bo20bo111b2o$719b

2o7b2o91bo85bo26b2o91bo17b2o113bo$354bo247b3o115b2o88b2ob2o91bo17b

2ob2o96b3o7b2ob2o101b2o6b2ob2o$355bo248bo114bo90b2ob2o109b2ob2o

106b2ob2o101b2o6b2ob2o$353b3o247bo$358bobo355b2o191b2o111b3o$358b

2o66b2o89b2o113b2o83b2o11b2o90b2o86b2o24b2o86bo22b2o112b2o$348bo

10bo58bo7bobo80bo7bobo104bo7bobo81bo5bo7bobo81bo7bobo84bo18bo7bobo

84bo15bo7bobo103bo7bobo4b3o$347bobo67bobo8bo57b3o19bobo8bo103bobo

8bo86bobo8bo80bobo8bo102bobo8bo99bobo8bo102bobo8bo4bo$348bobob2o

64bobob2o4b2o58bo20bobob2o4b2o103bobob2o4b2o86bobob2o4b2o80bobob2o

4b2o102bobob2o4b2o99bobob2o4b2o102bobob2o4b2o4bo$346bobobobobo61bo

bobobobo62bo19bobobobobo106bobobobobo89bobobobobo83bobobobobo105bo

bobobobo102bobobobobo96b2o7bobobobobo$346b2obo4bo61b2obo4bo82b2obo

4bo106b2obo4bo89b2obo4bo83b2obo4bo105b2obo4bo102b2obo4bo95bobo7b2o

bo4bo$349bob3o65bob3o86bob3o110bob3o93bob3o87bob3o109bob3o106bob3o

98bo10bob3o$349bobo67bobo88bobo112bobo95bobo89bobo111bobo108bobo

111bobo$350bo69bo90bo86b3o25bo97bo91bo113bo110bo113bo$227b2o371bo

539bo$228b2o369bo540b2o$227bo911bobo2$1143b3o$1143bo$1144bo4$1128b

2o$1129b2o$1128bo5$1123b2o$276b2o844bobo$276bobo845bo$276bo14$180b

3o$182bo$181bo11$288b2o$287b2o$289bo!

Sample occurrences

There are 1 sample soups in the Catagolue:

Unofficial symmetries

Symmetry	Soups	Sample soup links

oscthread_stdin	1	•

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