Happy Chinese New Year!
Recently
B35e/S2-i36c (three transitions from Life) has been investigated in which four 2c/5 orthogonal spaceships constitute a p64 oscillator, removing one of which shifts the OMOS by four cells orthogonally.
Coincidentally, in a rule three transitions from Harvest Moon, four c/4 diagonal gliders constitute a p66 oscillator, removing one of which shifts the OMOS by three cells diagonally.
Code: Select all
x = 19, y = 19, rule = B3-ckq5y/S2-ci3-aek4ci5c
11bo$11bobo$11b2o3$17bo$16bo$16b3o4$3o$2bo$bo3$6b2o$5bobo$7bo!
I adjusted the rule for my taste, and decided to use
the following one with 1,2-fold 14-cell p80 and 1,2,4-fold 9-cell p224 RROs. A period-108 glider gun can be made with the p66 and three ships, and a Heisenburp G-to-3G is easy to find.
Code: Select all
x = 128, y = 34, rule = B3-ckq4ck5y/S2-ci3-aek4i6k
40bo27b4o25b2o$38b2o27b2o2bo24bobo25b3o$37bo2bo25b2o2bo25bo27bo2bo$37b
o29bo2bo25b2obo23bo2b2o$6bo29bobo29b2o28bo25bo$7b2o$6bo2bo34bobo$9bo
35bo$8bobo31bo2bo$43b2o$obo39bo28b2o$bo68bo2bo$bo2bo13b2o50bo2b2o$2b2o
13bobo49bo2b2o$4bo12b2o50b4o6$52bo$53b2o$37b2o13b2o$36bobo21b2o$36b2o
22bobo$61b2o$46bobo$47bo$37b2o8bo2bo47bo25bo$37bobo8b2o45b2o2bo23bob2o
$38b2o10bo44bo2bo27bo$14b2o80b3o25bobo$13b2o109b2o$15bo!
Now back to topic. As the displacement of OMOS upon impact is six half-diagonals (6hd), put a candidate input glider 3hd away from a selected output glider like this:
Code: Select all
x = 33, y = 25, rule = B3-ckq4ck5y/S2-ci3-aek4i6kHistory
2.A$A.A$.2A$3.D$4.D$5.D$6.D14.A$7.D11.A.A$8.D11.2A$9.D$10.D$11.D3.A4.
D$12.D3.A4.D$13.D3A5.D$14.D2.D5.D$15.D2.D5.D$16.D2.D5.D$17.D2.D5.D3.
3A$18.D2.D5.D2.A$19.D2.D8.A$20.D2.D$21.D2.D$22.D2.2A$23.D.A.A$25.A!
Try running the pattern for multiples of 4 ticks and pasting the same arrangement mirrored diagonally, and collect working spaceships. The result is a group of 3c/(186+66n) diagonal SMOS with four subgroups determined by n mod 4:
Code: Select all
x = 409, y = 613, rule = B3-ckq4ck5y/S2-ci3-aek4i6k
7bo59bo$5bobo57bobo$6b2o58b2o3$bo59bo$2bo59bo$3o57b3o4$16b3o57b3o$16bo
59bo$17bo59bo3$11b2o58b2o$11bobo57bobo$11bo59bo4$32bo$30b2o$31b2o59bo$
90b2o$27bo61bo2bo$27b2o60bo$26bobo7bobo49bobo$36b2o$22b3o12bo44b3o11bo
bo$22bo59bo14bo$23bo8b2o49bo10bo2bo$33b2o60b2o$32bo61bo16$7bo59bo$5bob
o57bobo$6b2o58b2o3$bo59bo$2bo59bo$3o57b3o4$16b3o57b3o$16bo59bo$17bo59b
o3$11b2o58b2o$11bobo57bobo$11bo59bo8$37bo$35bobo$36b2o2$22b3o57b3o$22b
o8bo50bo$23bo8bo50bo19bo$30b3o68bobo$102b2o$44b3o57b3o$44bo59bo$45bo
51bo7bo$98bo$96b3o$39b2o58b2o$39bobo57bobo$39bo59bo18$7bo69bo69bo69bo$
5bobo67bobo67bobo67bobo$6b2o68b2o68b2o68b2o3$bo69bo69bo69bo$2bo69bo69b
o69bo$3o67b3o67b3o67b3o4$16b3o67b3o67b3o67b3o$16bo69bo69bo69bo$17bo69b
o69bo69bo3$11b2o68b2o68b2o68b2o$11bobo67bobo67bobo67bobo$11bo69bo69bo
69bo12$22b3o67b3o67b3o67b3o$22bo69bo69bo69bo$23bo69bo69bo69bo2$47bobo$
47b2o$48bo2$117bobo$54bo62b2o$52b2o64bo68bobo$53b2o132b2o68b3o$188bo
70bo$38b2o72b2o10bo59b2o69bo3bo$39b2o72b2o7b2o61b2o68bo$38bo73bo10b2o
59bo9bo60b3o$192b2o$193b2o68b3o$44bo73bo71bo74bo$44b2o72b2o70b2o69bo3b
o$43bobo71bobo69bobo69bo$261b3o19$7bo79bo$5bobo77bobo$6b2o78b2o3$bo79b
o$2bo79bo$3o77b3o4$16b3o77b3o$16bo79bo$17bo79bo3$11b2o78b2o$11bobo77bo
bo$11bo79bo12$22b3o77b3o$22bo79bo$23bo79bo11$54bo$55bo$53b3o2$138bo$
139bo$49bo87b3o$47bobo$48b2o11b2o78b2o$61bobo77bobo$61bo71bo7bo$131bob
o$132b2o2$55b3o77b3o$55bo79bo$56bo79bo11$7bo89bo$5bobo87bobo$6b2o88b2o
3$bo89bo$2bo89bo$3o87b3o4$16b3o87b3o$16bo89bo$17bo89bo3$11b2o88b2o$11b
obo87bobo$11bo89bo12$22b3o87b3o$22bo89bo$23bo89bo23$65bo$63b2o$64b2o
89bo$153b2o$60bo91bo2bo$60b2o90bo$59bobo7bobo79bobo$69b2o$70bo88bobo$
160bo$65b2o90bo2bo$66b2o90b2o$65bo91bo13$17bo89bo$15bobo87bobo$16b2o
88b2o3$11bo89bo$12bo89bo$10b3o87b3o4$26b3o87b3o$26bo89bo$27bo89bo3$21b
2o88b2o$21bobo87bobo$21bo89bo12$32b3o87b3o$32bo89bo$33bo89bo27$80bo$
78bobo$79b2o3$74bo$75bo100bo$73b3o98bobo$175b2o$87b3o87b3o$87bo89bo$
88bo81bo7bo$171bo$169b3o$82b2o88b2o$82bobo87bobo$82bo89bo15$17bo99bo
99bo109bo$15bobo97bobo97bobo107bobo$16b2o98b2o98b2o108b2o3$11bo99bo99b
o109bo$12bo99bo99bo109bo$10b3o97b3o97b3o107b3o4$26b3o97b3o97b3o107b3o$
26bo99bo99bo109bo$27bo99bo99bo109bo3$21b2o98b2o98b2o108b2o$21bobo97bob
o97bobo107bobo$21bo99bo99bo109bo12$32b3o97b3o97b3o107b3o$32bo99bo99bo
109bo$33bo99bo99bo109bo35$90bobo$90b2o$91bo2$190bobo$97bo92b2o$95b2o
94bo98bobo$96b2o192b2o108b3o$291bo110bo$81b2o102b2o10bo89b2o109bo3bo$
82b2o102b2o7b2o91b2o108bo$81bo103bo10b2o89bo9bo100b3o$295b2o$296b2o
108b3o$87bo103bo101bo114bo$87b2o102b2o100b2o109bo3bo$86bobo101bobo99bo
bo109bo$404b3o16$27bo109bo$25bobo107bobo$26b2o108b2o3$21bo109bo$22bo
109bo$20b3o107b3o4$36b3o107b3o$36bo109bo$37bo109bo3$31b2o108b2o$31bobo
107bobo$31bo109bo12$42b3o107b3o$42bo109bo$43bo109bo44$107bo$108bo$106b
3o2$221bo$222bo$102bo117b3o$100bobo$101b2o11b2o108b2o$114bobo107bobo$
114bo101bo7bo$214bobo$215b2o2$108b3o107b3o$108bo109bo$109bo109bo!
Similarly, put a candidate input glider on the same lane as an output glider, and then do the same to the shifted oscillator like this:
Code: Select all
x = 56, y = 68, rule = B3-ckq4ck5y/S2-ci3-aek4i6kHistory
7.A$5.A.A$6.2A$8.D$9.D$.A8.D$2.A8.D$3A9.D$13.D$14.D$15.D$D15.3A$.D14.
AD$2.D14.AD$3.D15.D$4.D15.D$5.D5.2A8.D$6.D4.A.A8.D$7.D3.A11.D$8.D15.D
$9.D15.D$10.D15.D$11.D15.D$12.D15.D$13.D15.D$14.D15.D$15.D16.2A$16.D
15.A.A$17.D14.A$18.D$19.D$20.D$21.D$22.D$23.D$24.D$25.D$26.D$27.D$28.
D$29.D$30.D$31.D$32.D$33.D$34.D$35.D$36.D$37.D$38.D$39.D$40.D$41.D$
42.D$43.D$44.D$45.D$46.D$47.D$48.D$49.D$50.D$51.D$52.D2$53.3A$53.A$
54.A!
Run to some generation when there is an input and an output glider, and then paste a rotationally symmetric copy. Try adjusting the distance between two halves, and collect working oscillators. The result is a group of period-(108+132n) OMOS with two subgroups.
Code: Select all
x = 551, y = 432, rule = B3-ckq4ck5y/S2-ci3-aek4i6k
7bo49bo69bo89bo99bo119bo$8bo49bo69bo89bo99bo119bo$6b3o47b3o67b3o87b3o
97b3o117b3o4$2bo49bo69bo89bo99bo119bo$obo47bobo67bobo87bobo97bobo117bo
bo$b2o48b2o68b2o88b2o98b2o118b2o6$8b3o47b3o67b3o87b3o97b3o117b3o$8bo
49bo69bo89bo99bo119bo$9bo49bo69bo89bo99bo119bo3$20bo$21bo$19b3o6$27b2o
$27bobo$27bo3$83bo$21b3o60bo$21bo60b3o$22bo5$90b2o$90bobo$90bo4$84b3o$
84bo$85bo83bo$170bo$168b3o6$176b2o$176bobo$176bo2$57bo$58bo$56b3o111b
3o$170bo$171bo$276bo$52bo224bo$50bobo222b3o$51b2o5$283b2o$58b3o222bobo
$58bo224bo$59bo3$277b3o$127bo149bo$128bo149bo113bo$126b3o264bo$391b3o
3$122bo$120bobo$121b2o$399b2o$399bobo$399bo2$84bo$85bo42b3o$83b3o42bo
264b3o$129bo263bo$394bo$529bo$530bo$217bo310b3o$91b2o125bo$91bobo122b
3o$91bo3$212bo323b2o$85b3o122bobo323bobo$85bo125b2o323bo$86bo$317bo$
318bo$316b3o211b3o$530bo$218b3o310bo$218bo$219bo92bo$310bobo$311b2o2$
57bo$58bo$56b3o2$318b3o$318bo$52bo266bo$50bobo$51b2o$170bo$171bo265bo$
169b3o266bo$436b3o2$58b3o$58bo$59bo372bo$177b2o251bobo$177bobo251b2o$
177bo4$171b3o$171bo266b3o$172bo265bo$439bo8$85bo$86bo$84b3o4$127bo$
128bo$92b2o32b3o$92bobo$92bo2$122bo154bo$120bobo155bo$86b3o32b2o153b3o
$86bo$87bo4$128b3o153b2o$128bo155bobo$129bo154bo4$278b3o$278bo$279bo
10$393bo$394bo$392b3o6$217bo182b2o$218bo181bobo$216b3o181bo4$212bo181b
3o$210bobo181bo$211b2o182bo2$171bo$172bo$170b3o2$218b3o$218bo$219bo2$
178b2o$178bobo$178bo138bo$318bo$316b3o2$172b3o$172bo$173bo138bo$310bob
o$311b2o$530bo$531bo$529b3o3$318b3o$318bo$319bo$537b2o$537bobo$537bo$
127bo$128bo$126b3o$531b3o$531bo$532bo$122bo$120bobo$121b2o6$128b3o$
128bo$129bo4$447bo$448bo$446b3o4$442bo$278bo161bobo$279bo161b2o$277b3o
5$448b3o$285b2o161bo$285bobo161bo$285bo4$279b3o$279bo$280bo9$173bo$
174bo$172b3o6$180b2o$180bobo$180bo$394bo$395bo$393b3o$174b3o$174bo$
175bo3$401b2o$401bobo$401bo4$395b3o$395bo$396bo11$327bo$328bo$326b3o4$
322bo$320bobo$321b2o6$328b3o$328bo$329bo14$541bo$542bo$540b3o6$548b2o$
548bobo$548bo4$542b3o$542bo$543bo39$406bo$407bo$405b3o6$413b2o$413bobo
$413bo4$407b3o$407bo$408bo!
The two halves of a SMOS can be different. Combining one where input and output are on the same lane, and another where the input and output are 6hd apart, gives the following group of 3c/(186+66n) diagonal SMOS (and an outlier rake).
Code: Select all
x = 510, y = 614, rule = B3-ckq4ck5y/S2-ci3-aek4i6k
7bo49bo49bo$5bobo47bobo47bobo$6b2o48b2o48b2o3$bo49bo49bo$2bo49bo49bo$
3o47b3o47b3o4$16b3o47b3o47b3o$16bo49bo49bo$17bo49bo49bo3$11b2o48b2o48b
2o$11bobo47bobo47bobo$11bo49bo49bo4$83bo$32bo49b3o49bo$31b3o47b2ob2o
48b3o$30bo2b2o45bobo52bobo$29b2o2bobo43b3o$30b3ob3o41b2o8bo50bo$31bobo
2b2o41b2o7b2o39b2o9bo$32b2o2bo43bo8b2o39b2o7b2o$33b3o51b3o40bo9b2o$26b
2o6bo41b2o8bobo37b2o3bo$26bobo47bobo4b2ob2o38bobo$26bo49bo7b3o39bo6bob
o$85bo48b3o$136bo25$7bo59bo$5bobo57bobo$6b2o58b2o3$bo59bo$2bo59bo$3o
57b3o4$16b3o57b3o$16bo59bo$17bo59bo3$11b2o58b2o$11bobo57bobo$11bo59bo
7$37bobo$36bo2bo$36bo$36bo2bo$38bobob2o$32b3o4bo3bo59bo$26b2o3bo12b2o
40b2o16bo$26bobo6bo4b2o3bo40bobo13b3o$26bo4b2obobo5bo43bo$35bo2bo3bo2b
o$38bo5bobob2o$35bo3b2o4bo52bo9b2o$35b2o12bo46bobo9bobo$37bo3bo4b3o48b
2o9bo$37b2obobo$41bo2bo$44bo$41bo2bo57b3o$41bobo58bo$103bo16$7bo69bo$
5bobo67bobo$6b2o68b2o3$bo69bo$2bo69bo$3o67b3o4$16b3o67b3o$16bo69bo$17b
o69bo3$11b2o68b2o$11bobo67bobo$11bo69bo13$26b2o68b2o$26bobo67bobo$26bo
69bo3$52bo$50b2o$51b2o69bo$120b2o$121b2o2$56bobo$56b2o$43bo13bo57bo10b
obo$43b2o70b2o9b2o$42bobo69bobo10bo4$48b2o70b2o$49b2o70b2o$48bo71bo8$
7bo159bo219bo$5bobo157bobo217bobo$6b2o158b2o218b2o3$bo159bo219bo$2bo
159bo219bo$3o157b3o217b3o4$16b3o157b3o217b3o$16bo159bo219bo$17bo159bo
219bo3$11b2o158b2o218b2o$11bobo157bobo217bobo$11bo159bo219bo13$26b2o
158b2o218b2o$26bobo157bobo217bobo$26bo159bo219bo9$55bo$53bobo$54b2o
381bo$435bobo$219bo216b2o$49bo167bobo$50bo167b2o$48b3o380bo$432bo$213b
o216b3o$214bo$64b3o145b3o9b3o217b3o$64bo159bo219bo$65bo159bo219bo3$59b
2o158b2o218b2o$59bobo157bobo217bobo$59bo159bo219bo10$7bo89bo89bo$5bobo
87bobo87bobo$6b2o88b2o88b2o3$bo89bo89bo$2bo89bo89bo$3o87b3o87b3o4$16b
3o87b3o87b3o$16bo89bo89bo$17bo89bo89bo3$11b2o88b2o88b2o$11bobo87bobo
87bobo$11bo89bo89bo13$26b2o88b2o88b2o$26bobo87bobo87bobo$26bo89bo89bo
19$67bobo$67b2o$68bo88bobo$157b2o$158bo88bobo$74bo172b2o$72b2o174bo$
73b2o89bo$162b2o$58b2o90b2o11b2o77b2o10bo$59b2o90b2o90b2o7b2o$58bo91bo
91bo10b2o3$64bo91bo91bo$64b2o90b2o90b2o$63bobo89bobo89bobo12$7bo89bo$
5bobo87bobo$6b2o88b2o3$bo89bo$2bo89bo$3o87b3o4$16b3o87b3o$16bo89bo$17b
o89bo3$11b2o88b2o$11bobo87bobo$11bo89bo13$26b2o88b2o$26bobo87bobo$26bo
89bo25$70bobo$69bo2bo$69bo$69bo2bo$71bobob2o$65b3o4bo3bo89bo$64bo12b2o
88bo$68bo4b2o3bo86b3o$64b2obobo5bo$68bo2bo3bo2bo$71bo5bobob2o$68bo3b2o
4bo82bo9b2o$68b2o12bo76bobo9bobo$70bo3bo4b3o78b2o9bo$70b2obobo$74bo2bo
$77bo$74bo2bo87b3o$74bobo88bo$166bo13$7bo109bo$5bobo107bobo$6b2o108b2o
3$bo109bo$2bo109bo$3o107b3o4$16b3o107b3o$16bo109bo$17bo109bo3$11b2o
108b2o$11bobo107bobo$11bo109bo13$26b2o108b2o$26bobo107bobo$26bo109bo
36$85bo$83b2o$84b2o109bo$193b2o$194b2o2$89bobo$89b2o$76bo13bo97bo10bob
o$76b2o110b2o9b2o$75bobo109bobo10bo4$81b2o110b2o$82b2o110b2o$81bo111bo
15$7bo219bo189bo$5bobo217bobo187bobo$6b2o218b2o188b2o3$bo219bo189bo$2b
o219bo189bo$3o217b3o187b3o4$16b3o217b3o187b3o$16bo219bo189bo$17bo219bo
189bo3$11b2o218b2o188b2o$11bobo217bobo187bobo$11bo219bo189bo13$26b2o
218b2o188b2o$26bobo217bobo187bobo$26bo219bo189bo42$88bo$86bobo$87b2o
411bo$498bobo$312bo186b2o$82bo227bobo$83bo227b2o$81b3o410bo$495bo$306b
o186b3o$307bo$97b3o205b3o9b3o187b3o$97bo219bo189bo$98bo219bo189bo3$92b
2o218b2o188b2o$92bobo217bobo187bobo$92bo219bo189bo!
How about non-diagonal spaceships? Take the first 3c/252 SMOS and prepare two halves as follows:
Code: Select all
x = 210, y = 133, rule = B3-ckq4ck5y/S2-ci3-aek4i6kHistory
7.A83.A79.A$5.A.A83.A.A77.A.A$6.2A83.2A78.2A3$.A84.3A8.A79.A$2.A85.A
7.A79.A$3A84.A8.3A77.3A3$92.2A$16.3A72.A.A66.2AD$16.A76.A68.A$17.A
143.A$88.A.A$89.2A$11.2A76.A76.2A$11.A.A47.3D.3D73.3D.3D17.A.A$11.A
46.D2.D.D.D.D70.D2.D5.D19.A$57.3D.3D.3D69.3D.3D.3D$58.D4.D3.D70.D2.D.
D3.D$61.3D.3D73.3D.3D4$37.A.A81.A.A$36.A2.A81.A2.A$36.A87.A$36.A2.A
81.A2.A$38.A.A.2A73.2A.A.A$32.3A4.A3.A73.A3.A4.3A50.A$26.2A3.A12.2A
69.2A12.A50.2A19.A.A$26.A.A6.A4.2A3.A69.A3.2A4.A53.2A20.A2.A$26.A4.2A
.A.A5.A75.A5.A.A.2A74.A$35.A2.A3.A2.A69.A2.A3.A2.A75.A2.A$38.A5.A.A.
2A61.2A.A.A5.A74.2A.A.A$35.A3.2A4.A69.A4.2A3.A71.A3.A4.3A$35.2A12.A
61.A12.2A69.2A12.A$37.A3.A4.3A63.D2A4.A3.A71.A3.2A4.A$37.2A.A.A75.A.A
.2A74.A5.A.A.2A$41.A2.A71.A2.A75.A2.A3.A2.A$44.A71.A69.A4.2A.A.A5.A$
41.A2.A71.A2.A66.A.A6.A4.2A3.A$41.A.A73.A.A66.2A3.A12.2A$192.3A4.A3.A
$198.A.A.2A$196.A2.A$196.A$196.A2.A$197.A.A8$11.D.3D.3D$8.D2.D.D5.D$
7.3D.D.3D.3D$8.D2.D3.D3.D$11.D.3D.3D14$26.C$26.C.C$26.2C13$11.A$11.A.
A$11.2A3$17.A$16.A$16.3A4$3A$2.A$.A3$6.2A$5.A.A$7.A12$19.A$20.2A$19.
2A17.3A$38.A$38.A3.A$42.A$40.3A2$32.3A$32.A$32.A3.A$36.A$34.3A!
Again, try running the upper right pattern for multiples of 4 ticks and pasting the lower left pattern, and collect working spaceships. The result is a group of (6+3n,3n)c/(240+252n) SMOS.
Code: Select all
x = 413, y = 732, rule = B3-ckq4ck5y/S2-ci3-aek4i6k
374bobo$161bo213b2o$160b3o212bo$159b2ob2o$162bobo$163b3o203bo$156bo8b
2o203b2o$155b2o7bo2bo201b2o11b2o$154b2o8bo2b2o212b2o$155b3o7b2ob2o213b
o$156bobo9bobo$157b2ob2o7b3o$158b2o2bo8b2o204bo$159bo2bo7b2o204b2o$
160b2o8bo205bobo$161b3o$162bobo$163b2ob2o$164b3o$165bo8$402bo$401b3o$
401bobo$404b2o$405b2o$190bo206b2o5b2o$189bo206b2o10bo$189b3o205b2o8b3o
$399bobo5bobo$186b2o211b3o8b2o$185bobo212bo10b2o$180bo6bo7bo200bo6b2o
5b2o$181b2o12bobo199b2o3b2o$180b2o13b2o199b2o5b2o$405bobo$191b3o211b3o
$193bo212bo$192bo90$26bo209bo$26bobo207bobo$26b2o208b2o13$11bo209bo$
11bobo207bobo$11b2o208b2o3$17bo209bo$16bo209bo$16b3o207b3o4$3o207b3o$
2bo209bo$bo209bo3$6b2o208b2o$5bobo207bobo$7bo209bo8$41bo209bo$41bobo
207bobo$41b2o208b2o2$19bo209bo$20b2o208b2o$19b2o17b3o188b2o17b3o$38bo
209bo$38bo3bo205bo3bo$42bo209bo$40b3o207b3o2$32b3o207b3o$32bo209bo$32b
o3bo205bo3bo$36bo209bo$34b3o207b3o22$321bobo$128bo193b2o$127b3o192bo$
126b2ob2o$129bobo$130b3o183bo$123bo8b2o183b2o$122b2o7bo2bo181b2o11b2o$
121b2o8bo2b2o192b2o$122b3o7b2ob2o193bo$123bobo9bobo$124b2ob2o7b3o$125b
2o2bo8b2o$126bo2b2o6b2o$127b2obo6bo$128b2o$129b3o$130bobo$130b2o6$352b
o$353b2o$352b2o$159bo$158b3o$158bobo$161b2o183bobo$162b2o183b2o$154b2o
5b2o184bo13bo$153b2o10bo194b2o$154b2o8b3o193bobo$156bobo5bobo$156b3o8b
2o$157bo10b2o$160b2o5b2o186b2o$159b2o193b2o$160b2o194bo$162bobo$162b3o
$163bo58$26bo189bo$26bobo187bobo$26b2o188b2o13$11bo189bo$11bobo187bobo
$11b2o188b2o3$17bo189bo$16bo189bo$16b3o187b3o4$3o187b3o$2bo189bo$bo
189bo3$6b2o188b2o$5bobo187bobo$7bo189bo8$41bo189bo$41bobo187bobo$41b2o
188b2o2$19bo189bo$20b2o188b2o$19b2o17b3o168b2o17b3o$38bo189bo$38bo3bo
185bo3bo$42bo189bo$40b3o187b3o2$32b3o187b3o$32bo189bo$32bo3bo185bo3bo$
36bo189bo$34b3o187b3o24$254b3o$98bobo153bo$99b2o153bo3bo$99bo158bo$
256b3o2$93bo154b3o$94b2o152bo$93b2o11b2o140bo3bo$105b2o145bo$107bo142b
3o3$101bo$100b2o$100bobo10$279bo$280b2o$279b2o$126bo$125b3o$125bobo$
128b2o144b3o$129b2o143b4o$121b2o5b2o144b3obo9bo$120b2o10bo142b4o8b2o$
121b2o8b3o143bo9bobo$123bobo5bobo$123b3o8b2o$124bo10b2o$120bo6b2o5b2o
146b2o$121b2o3b2o153b2o$120b2o5b2o154bo$129bobo$129b3o$130bo25$26bo
149bo$26bobo147bobo$26b2o148b2o13$11bo149bo$11bobo147bobo$11b2o148b2o
3$17bo149bo$16bo149bo$16b3o147b3o4$3o147b3o$2bo149bo$bo149bo3$6b2o148b
2o$5bobo147bobo$7bo149bo8$41bo149bo$41bobo147bobo$41b2o148b2o2$19bo
149bo$20b2o148b2o$19b2o17b3o128b2o17b3o$38bo149bo$38bo3bo145bo3bo$42bo
149bo$40b3o147b3o2$32b3o147b3o$32bo149bo$32bo3bo145bo3bo$36bo149bo$34b
3o147b3o27$201b3o$75bobo123bo$76b2o123bo3bo$76bo128bo$203b3o2$70bo125b
o$71b2o124b2o$70b2o11b2o111b2o$82b2o$84bo15$106bo125bo$107b2o124b2o$
106b2o124bo2bo$235bo$234bobo2$100bobo123bobo$101b2o124bo$101bo13bo111b
o2bo$114b2o112b2o$114bobo113bo$36bo119bo$36bobo117bobo$36b2o118b2o$
109b2o$108b2o$110bo10$21bo119bo$21bobo117bobo$21b2o118b2o3$27bo119bo$
26bo119bo$26b3o117b3o4$10b3o117b3o$12bo119bo$11bo119bo3$16b2o118b2o$
15bobo117bobo$17bo119bo8$51bo119bo$51bobo117bobo$51b2o118b2o2$29bo119b
o$30b2o118b2o$29b2o17b3o98b2o17b3o$48bo119bo$48bo3bo115bo3bo$52bo119bo
$50b3o117b3o2$42b3o117b3o$42bo119bo$42bo3bo115bo3bo$46bo119bo$44b3o
117b3o23$141bobo$141bo2bo$144bo$141bo2bo$137b2obobo$137bo3bo4b3o$135b
2o12bo$48b3o84bo3b2o4bo$48bo89bo5bobob2o$48bo3bo82bo2bo3bo2bo$36bo15bo
73bo4b2obobo5bo$36bobo11b3o73bobo6bo4b2o3bo$36b2o88b2o3bo12b2o$42b3o
87b3o4bo3bo$42bo95bobob2o$42bo3bo89bo2bo$46bo89bo$44b3o89bo2bo$137bobo
7$21bo89bo$21bobo87bobo$21b2o88b2o3$27bo89bo$26bo89bo$26b3o44bo42b3o
50bo$74b2o94b2o$73b2o94bo2bo$172bo$10b3o87b3o68bobo$12bo89bo$11bo89bo
2$82bo83b2o$16b2o63b2o23b2o57b2o$15bobo63bobo21bobo59bo$17bo89bo3$76b
2o$75b2o$77bo3$51bo89bo$51bobo87bobo$51b2o88b2o2$29bo89bo$30b2o88b2o$
29b2o17b3o68b2o17b3o$48bo89bo$48bo3bo85bo3bo$52bo89bo$50b3o87b3o2$42b
3o87b3o$42bo89bo$42bo3bo85bo3bo$46bo89bo$44b3o87b3o!
Bonus two-barrelled rakes derived from the outlier rake above:
Code: Select all
x = 199, y = 734, rule = B3-ckq4ck5y/S2-ci3-aek4i6k
160bobo$161b2o$161bo3$155bo$156b2o$155b2o11b2o$167b2o$169bo3$163bo$
162b2o$162bobo13$188bo$187b3o$187bobo$190b2o$191b2o$183b2o5b2o$182b2o
10bo$183b2o8b3o$185bobo5bobo$185b3o8b2o$186bo10b2o$182bo6b2o5b2o$183b
2o3b2o$182b2o5b2o$191bobo$191b3o$192bo91$22bo$22bobo$22b2o15$11bo$11bo
bo$11b2o3$17bo$16bo$16b3o4$3o$2bo$bo3$6b2o$5bobo$7bo6$37bo$37bobo$37b
2o4$19bo$20b2o$19b2o17b3o$38bo$38bo3bo$42bo$40b3o2$32b3o$32bo$32bo3bo$
36bo$34b3o20$137bobo$138b2o$138bo3$132bo$133b2o$132b2o11b2o$144b2o$
146bo15$168bo$169b2o$168b2o4$162bobo$163b2o$163bo13bo$176b2o$176bobo4$
171b2o$170b2o$172bo61$32bo$32bobo$32b2o15$21bo$21bobo$21b2o3$27bo$26bo
$26b3o4$10b3o$12bo$11bo3$16b2o$15bobo$17bo6$47bo$47bobo$47b2o4$29bo$
30b2o$29b2o17b3o$48bo$48bo3bo$52bo$50b3o2$42b3o$42bo$42bo3bo$46bo$44b
3o22$100b3o$100bo$100bo3bo$104bo$102b3o2$94b3o$94bo$94bo3bo$98bo$96b3o
15$125bo$126b2o$125b2o4$120b3o$120b4o$120b3obo9bo$121b4o8b2o$123bo9bob
o4$128b2o$127b2o$129bo28$22bo$22bobo$22b2o15$11bo$11bobo$11b2o3$17bo$
16bo$16b3o4$3o$2bo$bo3$6b2o$5bobo$7bo6$37bo$37bobo$37b2o4$19bo$20b2o$
19b2o17b3o$38bo$38bo3bo$42bo$40b3o2$32b3o$32bo$32bo3bo$36bo$34b3o25$
67b3o$67bo$67bo3bo$71bo$69b3o2$62bo$63b2o$62b2o17$98bo$99b2o$98bo2bo$
101bo$100bobo2$92bobo$93bo$93bo2bo$94b2o$96bo$22bo$22bobo$22b2o15$11bo
$11bobo$11b2o3$17bo$16bo$16b3o4$3o$2bo$bo3$6b2o$5bobo$7bo6$37bo$37bobo
$37b2o4$19bo$20b2o$19b2o17b3o$38bo$38bo3bo$42bo$40b3o2$32b3o$32bo$32bo
3bo$36bo$34b3o21$37bobo$37bo2bo$40bo$37bo2bo$33b2obobo$33bo3bo4b3o$31b
2o12bo$31bo3b2o4bo$34bo5bobob2o$31bo2bo3bo2bo$22bo4b2obobo5bo$22bobo6b
o4b2o3bo$22b2o3bo12b2o$28b3o4bo3bo$34bobob2o$32bo2bo$32bo$32bo2bo$33bo
bo9$11bo$11bobo$11b2o3$17bo47bo$16bo49b2o$16b3o46bo2bo$68bo$67bobo2$3o
$2bo$bo60b2o$61b2o$63bo$6b2o$5bobo$7bo6$37bo$37bobo$37b2o4$19bo$20b2o$
19b2o17b3o$38bo$38bo3bo$42bo$40b3o2$32b3o$32bo$32bo3bo$36bo$34b3o!
I am going to visit family members later, so that's all for now.