Baker's dozen is a period 12 oscillator consisting of a loaf hassled by two blocks and two caterers . The original form (using period 4 and period 6 oscillators to do the hassling) was found by Robert Wainwright in August 1989 .
By rephasing and moving the caterers, it is possible to get a 37-cell variant. Using mazings would also work.
x = 11, y = 21, rule = B3/S23
b3o$5bo$o4bo$4bo$b2o$bo$bo$bo2$4b2o3b2o$2o2bobo3bo$2o3bo$5bo$9bo$9bo$
9bo$8b2o$6bo$5bo4bo$5bo$7b3o!
#C [[ THUMBSIZE 2 THEME 6 GRID GRIDMAJOR 0 SUPPRESS THUMBLAUNCH ]]
#C [[ AUTOSTART GPS 12 LOOP 13 THUMBLAUNCH THUMBSIZE 2 THEME 6 ZOOM 12 HEIGHT 320 ]]
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It can be stabilised and welded in many ways. A caterer can be used in 2 ways, one way is also suitable for the jam . A mazing would work, and two can be stabilised next to each other. 2 opposite ones can be stabilised with 2 bookends (shown as bookend on snake ) in the lifeviewer.
x = 38, y = 28, rule = B3/S23
24b3o$28bo$23bo4bo$8bob2ob2obo10bo$8b2obobob2o7b2o$24bo$8b3o3b3o7bo$8b
o2bobo2bo7bo$10b2ob2o$27b2o3b2o$2o3b2o11b2o3b2o2bobo3bo$o3bobo2b2o3b2o
2bobo3bo3bo$5bo3b2o3b2o3bo8bo3bo$bo3bo13bo3bo8bo$31b2obo$bo3bo15bo3bo
5b2ob3o$5bo3b2o5b2o3bo15bo$o3bobo2b2o5b2o2bobo3bo4b2ob3o$2o3b2o13b2o3b
2o5bobo$32bobo$33bo$8b3o$8b3o7bo$6b2o2b3o2b2ob2o$6b2o7b4obo$6b3o10bob
o$8bo9bo2bo$8bo10b2o!
#C [[ THUMBSIZE 2 THEME 6 GRID GRIDMAJOR 0 SUPPRESS THUMBLAUNCH ]]
#C [[ AUTOSTART GPS 12 LOOP 13 THUMBLAUNCH THUMBSIZE 2 THEME 6 ZOOM 12 HEIGHT 360 ]]
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(click above to open LifeViewer ) RLE : here Plaintext : here
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