Can anyone corderize this 2782c/95732o puffer into a new speed? I have a version where 2 copies interact, but die off eventually shown here
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x = 3100, y = 8, rule = B2e3aijk4artw5-cry678/S1c2ace3knr4ajw5-ak6-ci78
2bo3094bo$2bo3094bo$obo3094bobo$3o3094b3o$b4o3090b4o$bobobo3088bobobo$
4b2o3088b2o$3b2o3090b2o!
Here is a stable interaction between 2 copies
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x = 3095, y = 8, rule = B2e3aijk4artw5-cry678/S1c2ace3knr4ajw5-ak6-ci78
2bo3089bo$2bo3089bo$obo3089bobo$3o3089b3o$b4o3085b4o$bobobo3083bobobo$
4b2o3083b2o$3b2o3085b2o!
Also can someone corderize this 346c/4824o? 2 copy interaction shown below
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x = 637, y = 7, rule = B2e3aijk4acrtw5-cery6-n78/S1c2ace3knr4ackw5-aeky6-ci78
2obobo625bobob2o$o2b2o627b2o2bo$b2obo627bob2o$2o633b2o$2o633b2o$2o633b
2o$bo633bo!
This one seems harder, but maybe still possible
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x = 123, y = 7, rule = B2e3aijk4acrtw5-cery6-in78/S1c2ace3knr4ackw5-aeky6-ci78
obob2o111b2obobo$b2o2bo111bo2b2o$bob2o113b2obo$4b2o111b2o$4b2o111b2o$
4b2o111b2o$4bo113bo!
This diagonal puffer also seems hard, but maybe possible
Code: Select all
x = 2951, y = 2951, rule = B2e3aij4ar5-cery6ac78/S1c2ace3knr4acek5-ak6-ci78
b2o$o$2o$3o2945$2947bo2bo$2947b2obo$2947b3o!