Difference between revisions of "User:Moosey/eatsplosion"

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{{Rule
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| name                = eatsplosion
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| char                = Chaotic
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| b                  = 2n3-ekqy4c5e
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| s                  = 2-cn3-eky4aij5e
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|
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}}
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Eatsplosion is a cellular automaton with the rulestring B2n3-ekqy4c5e/S2-cn3-eky4aij5e.
 
Eatsplosion is a cellular automaton with the rulestring B2n3-ekqy4c5e/S2-cn3-eky4aij5e.
 
It is named for the evolution of the short table, t-tetromino, and pi heptomino. (this sequence is referred to as pi.)
 
It is named for the evolution of the short table, t-tetromino, and pi heptomino. (this sequence is referred to as pi.)

Revision as of 17:21, 28 March 2019

eatsplosion
Rulestring 2-cn3-eky4aij5e/2n3-ekqy4c5e
B2n3-ekqy4c5e/S2-cn3-eky4aij5e
Character Chaotic


Eatsplosion is a cellular automaton with the rulestring B2n3-ekqy4c5e/S2-cn3-eky4aij5e. It is named for the evolution of the short table, t-tetromino, and pi heptomino. (this sequence is referred to as pi.)

x=31, y = 2, rule = B2n3-ekqy4c5e/S2-cn3-eky4aij5e bo26b3o$3o25bobo!

Its forum thread can be found here. Its catalogue page can be found here.

Interesting still lives

The block is very common and useful. It can eat gliders:

x=6, y = 6, rule = B2n3-ekqy4c5e/S2-cn3-eky4aij5e bo$2bo$3o2$4b2o$4b2o!

or turn a pi into a glider and a pi.

x=7, y = 7, rule = B2n3-ekqy4c5e/S2-cn3-eky4aij5e 2o$2o4$4b3o$4bobo! #C [[ STOP 21 ]]

There is also the "hat with tail with block" (HWTWB), which is a pi eater:

x=7, y = 11, rule = B2n3-ekqy4c5e/S2-cn3-eky4aij5e b2o$2bo$b2o4$o5bo$3ob3o$3bo$3o2b2o$o4b2o! #C [[ STOP 14 ]]

Oscillators

Known periods include:

Periods 2-6
Period 8
Period 10
Period 15
Period 18
Period 36 and a few multiples of 36 as well
All periods above 125.

Spaceships

TBA

Infinite growth

TBA

Other

Two reflectors

180°, repeat time 125

x=123, y = 68, rule = B2n3-ekqy4c5e/S2-cn3-eky4aij5e o$b2o$2o$120b2o$120b2o2$101b2o13bo$101b2o12bobo$118bo$115bobo$116bo3$ 94b2o25b2o$94b2o25b2o2$92b2o25b2o$92b2o25b2o2$90b2o$90b2o$97bo$96bobo$ 99bo$86b2o8bobo$86b2o4bo4bo$91bobo10b2o$84b2o4bo3bo9b2o$84b2o5bobo7b2o $101b2o$98b2o$32bo54bo10b2o$33bo52bobo$31b3o51bo3bo$86bobo7b2o$96b2o9$ 68b2o$56b2o10b2o$56b2o$66b2o20b2o$58b2o6b2o20b2o$58b2o$61b2ob2o6bo$61b 2ob2o5bobo$70bo3bo$71bobo$81b2o$81b2o$78b2o$78b2o$50b2o$50b2o3$53b2o9b 2ob2o$53b2o9b2ob2o4b2o$56b2o15b2o$56b2o$59b2ob2o$59b2ob2o!

90°, repeat time 131 (By abhpzta)

x=129, y = 63, rule = B2n3-ekqy4c5e/S2-cn3-eky4aij5e 90b2o$70b2o18b2o$70b2o12b3o6b2o$85b2o6b2o$84b3o2$98b2o$98b2o$63b2o36b 2o$63b2o36b2o2$61b2o$61b2o2$59b2o$59b2o2$65b3o35b2o$66b2o35b2o$55b2o8b 3o38b2o$55b2o49b2o$60b3o10b2o$53b2o5b3o10b2o$53b2o5bobo7b2o39b2o$70b2o 31b3o5b2o$67b2o35b2o8b2o$o66b2o34b3o8b2o$b2o52b3o59b2o$2o53b3o59b2o$ 55bobo7b2o29b2o9bobo$65b2o29b2o9b3o$100b2o5b3o$100b2o2$102b2o20b2o$ 102b2o20b2o2$104b2o$104b2o$37b2o$25b2o10b2o$25b2o$35b2o20b2o$27b2o6b2o 20b2o$27b2o$30b2ob2o$30b2ob2o5b3o$40b3o$40bobo79bobo$50b2o68b2ob2o$50b 2o68b5o$47b2o71b3o$47b2o65b2o$19b2o93b2o11b2o$19b2o96b2o8b2o$117b2o2$ 22b2o9b2ob2o$22b2o9b2ob2o4b2o$25b2o15b2o$25b2o$28b2ob2o$28b2ob2o!