#C two even-symmetry perpendicular greyships chained together, with
#C small tagalongs at back end:  Hartmut Holzwart, 5 December 2005
x = 66, y = 163, rule = B3/S23
35bo11bo$34b3o9b3o$34boboo7boobo$35b3o7b3o$35boo4bo4boo$40b3o$39b5o$
33bo4bo5bo$32b3o$31bobboobbobobobo$31boobbo$32bobb3o$29bo5boo$29bobbo$
29bo4bo$29b5o$35boo$35boo$$29bo$28b3o$27boo$28booboo3b3o$28b4o3bobbo$
29bo8bo$29bobbobo3bo$33bo3bo$30boobo$35bo$30b4obo$34bo$30b6o$29bo6bo$
29b8o$27bo10bo$27b12o$25bo14bo$25b16o$23bo18bo$23b20o$21bo22bo$21b24o$
19bo26bo$19b28o$17bo30bo$17b32o$15bo34bo$15b36o$13bo38bo$13b40o$3bo7bo
42bo7bo$bb3o6b44o6b3o$bboboo3bo46bo3boobo$3b3o3b48o3b3o$3b3obo50bob3o$
3boobb52obboo$8bo48bo$10b46o$8boo46boo$8b50o$7bobbo44bobbo$12b42o$6boo
3bo42bo3boo$12b42o$12boo38boo$13bob36obo$13bo38bo$12bobboob30oboobbo$
16boo30boo$17b32o$18bo28bo$21b24o$21boo20boo$25bob5obb5obo$25boboo8boo
bo$29bob4obo$26booboo4booboo$26boo10boo$25bob4o4b4obo$24b3o12b3o$23boo
bo3b6o3boboo$22bobboboo8boobobbo$22boo4b3o4b3o4boo$25bobbobbobbobbobbo
$20bo4bobob3obb3obobo4bo$21booboo3b3obb3o3booboo$24boo5bobbo5boo$25bob
o3bobbo3bobo$25b3obobobbobob3o$31bobbo$26boo3b4o3boo$28boob4oboo$28bo
3boo3bo$32boo$$31b4o$30bo4bo$29b8o$28bo8bo$27b12o$26bo12bo$25b16o$24bo
16bo$23b20o$22bo20bo$21b24o$20bo24bo$19b28o$18bo28bo$17b32o$16bo32bo$
15b36o$14bo36bo$13b40o$12bo40bo$bbo8b44o8bo$b3o6bo44bo6b3o$oobo5b48o5b
oboo$3o5bo48bo5b3o$boo4b52o4boo$6bo52bo$5boob50oboo$$4bo6b44o6bo$7bo
50bo$4boo6b42o6boo$11bo42bo$9boob42oboo$9boobo40boboo$10boobb38obboo$
9b3o42b3o$9b3o3b36o3b3o$9b3obbo36bobb3o$10bobbob36obobbo$11bo4boo30boo
4bo$20b26o$19bo26bo$18bob26obo$18boo26boo$18bob26obo$19boo24boo$19boo
bb20obboo$19boobo20boboo$19boob22oboo$19boobo20boboo$22boo3b12o3boo$
22boo18boo$28b10o$27bo10bo$25boob10oboo$25boo12boo$24bo3b10o3bo$24bobo
12bobo$24bobobb8obbobo$25bo14bo$23boobbobb6obbobboo$27b4o4b4o$32boo$
26bo5boo5bo$25bobo10bobo$24bo16bo$24bobbo10bobbo$25bo14bo!
CB 1,1,1,1