Rules 2 transitions from Life

For discussion of other cellular automata.
Post Reply
User avatar
pzq_alex
Posts: 793
Joined: May 1st, 2021, 9:00 pm
Location: tell me if you know

Re: Rules 2 transitions from Life

Post by pzq_alex » June 5th, 2022, 1:33 am

These don’t seem to be mentioned anywhere in this thread:

Code: Select all

x = 11, y = 13, rule = B35cr/S23
2o2b2o3b2o$2obo2bo2b2o$4b2o8$2o2b2o$2obo2bo2b2o$4b2o3b2o!
\sum_{n=1}^\infty H_n/n^2 = \zeta(3)

How much of current CA technology can I redevelop "on a desert island"?
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » June 5th, 2022, 6:26 pm

pzq_alex wrote:
June 5th, 2022, 1:33 am
 These don’t seem to be mentioned anywhere in this thread:
...
They haven't been mentioned in this thread, but they have on Catagolue.
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
dl-rs
Posts: 141
Joined: April 11th, 2022, 12:14 am
Location: I was just a block until a glider crashes with me and I tumbled onto Earth surface in LWSS form.
Contact:
Contact dl-rs

Re: Rules 2 transitions from Life

Post by dl-rs » June 6th, 2022, 5:03 am

this is a puffer:

Code: Select all

x = 33, y = 28, rule = B3/S23-n4w
7$12bo$12bo$12b2o$24b3o$13bo4b3o2b2ob2o$6b2o5bo$7b2o5b2o$6b3o4b2obo3b
o9bo$7b2o7bobobo2b5o2b2o$7b2o3b2o17bo$7b2o7bobobo2b5o2b2o$6b3o4b2obo3b
o9bo$7b2o5b2o$6b2o5bo$13bo4b3o2b2ob2o$24b3o$12b2o$12bo$12bo!
uh nope two puffers.
—Hector Hu, who loves anything except the norm.
(full nickname: Versallies Poleon Terloo Nuclear London Dog)
Top
affamatodidio
Posts: 223
Joined: September 14th, 2021, 7:45 pm

Re: Rules 2 transitions from Life

Post by affamatodidio » June 6th, 2022, 7:29 am

An alien rule with absolutely miniscule c/2 and c/3.

Code: Select all

x = 3, y = 11, rule = B34j/S2-a3
2bo$b2o$2o$b2o$2bo2$bo$b2o$o$b2o$bo!
Top
User avatar
pzq_alex
Posts: 793
Joined: May 1st, 2021, 9:00 pm
Location: tell me if you know

Re: Rules 2 transitions from Life

Post by pzq_alex » June 6th, 2022, 8:13 am

Before I forget:

Code: Select all

x = 56, y = 45, rule = B3/S2-a34a
2bo9bo9b3o6b4o5b4o7b3o$2ob2o5b2ob2o6bo3bo4bo4bo4bo3bo5b5o$o3bo5bo3bo5b
o5bo3b2o2b2o4b2obo7bob3o$21bobobo5bo2bo$2ob2o5b2ob2o5b2o3b2o$bobo6bo3b
o15$2bo8b3o6b3o4bo$bobo6bobob2o4bobobobob2o$2ob2o6bo4bo3bo5bobo$16bo8b
2obo$15bo16$bo$obo$obo$3o$obo!
Rule with tons of minuscule c/2 and c/3, and a bonus 9c/32.

Edit: c/4 from rls

Code: Select all

x = 13, y = 18, rule = B3/S2-a34a
6bo$5bobo$5bobo$2bo2bobo2bo$2b2obobob2o$o11bo$bo3bobo3bo2$2b3o3b3o$3b
o5bo$2bo7bo$b2o7b2o$b2o2b3o2b2o$5bobo$4bo3bo$5bobo$4b2ob2o$5bobo!
Edit: P38

Code: Select all

x = 3, y = 5, rule = B34a/S2-a3
bo$obo$obo$obo$b2o!
Loafer

Code: Select all

x = 4, y = 7, rule = B34a/S2-a3
b3o$b3o$o2$2o$bo$bo!
\sum_{n=1}^\infty H_n/n^2 = \zeta(3)

How much of current CA technology can I redevelop "on a desert island"?
Top
User avatar
ihatecorderships
Posts: 309
Joined: April 11th, 2021, 12:54 pm
Location: Falls Church, VA

Re: Rules 2 transitions from Life

Post by ihatecorderships » June 6th, 2022, 9:54 am

Promising c/5 partial:

Code: Select all

x = 18, y = 50, rule = B3/S2-a34a
...ooo......ooo...$
....o........o....$
..o...o....o...o..$
..oo.oo....oo.oo..$
.o.....o..o.....o.$
......o....o......$
...oo........oo...$
...o..o....o..o...$
..oooo......oooo..$
..o..o......o..o..$
.o..............o.$
.ooooo......ooooo.$
.o..............o.$
oo.ooo......ooo.oo$
..................$
.......oooo.......$
..o..oooooooo..o..$
.o.ooo......ooo.o.$
..................$
....ooo.oo.ooo....$
...o.o.oooo.o.o...$
..................$
..................$
......o....o......$
...o..oooooo..o...$
..ooo.o....o.ooo..$
..oo..oooooo..oo..$
.oo..oo.oo.oo..oo.$
......oo..oo......$
..o.oo.o..o.oo.o..$
..o...o....o...o..$
.ooo.o......o.ooo.$
.oo............oo.$
.o..o........o..o.$
oo..o.o....o.o..oo$
o....oooooooo....o$
..o..o.oooo.o..o..$
.ooo..........ooo.$
.o.o.o.oooo.o.o.o.$
.o.o.o......o.o.o.$
...oo........oo...$
....o........o....$
....oooooooooo....$
..oooo.oooo.oooo..$
..oo.o......o.oo..$
.....o......o.....$
.oooo.oo..oo.oooo.$
-- Kalan Warusa
Don't drink and drive, think and derive.
Top
User avatar
May13
Posts: 789
Joined: March 11th, 2021, 8:33 am

Re: Rules 2 transitions from Life

Post by May13 » June 6th, 2022, 9:58 am

ihatecorderships wrote:
June 6th, 2022, 9:54 am
 Promising c/5 partial:

Code: Select all

x = 18, y = 50, rule = B3/S2-a34a
...ooo......ooo...$
....o........o....$
..o...o....o...o..$
..oo.oo....oo.oo..$
.o.....o..o.....o.$
......o....o......$
...oo........oo...$
...o..o....o..o...$
..oooo......oooo..$
..o..o......o..o..$
.o..............o.$
.ooooo......ooooo.$
.o..............o.$
oo.ooo......ooo.oo$
..................$
.......oooo.......$
..o..oooooooo..o..$
.o.ooo......ooo.o.$
..................$
....ooo.oo.ooo....$
...o.o.oooo.o.o...$
..................$
..................$
......o....o......$
...o..oooooo..o...$
..ooo.o....o.ooo..$
..oo..oooooo..oo..$
.oo..oo.oo.oo..oo.$
......oo..oo......$
..o.oo.o..o.oo.o..$
..o...o....o...o..$
.ooo.o......o.ooo.$
.oo............oo.$
.o..o........o..o.$
oo..o.o....o.o..oo$
o....oooooooo....o$
..o..o.oooo.o..o..$
.ooo..........ooo.$
.o.o.o.oooo.o.o.o.$
.o.o.o......o.o.o.$
...oo........oo...$
....o........o....$
....oooooooooo....$
..oooo.oooo.oooo..$
..oo.o......o.oo..$
.....o......o.....$
.oooo.oo..oo.oooo.$
qfind is faster:

Code: Select all

x = 17, y = 17, rule = B3/S2-a34a
6b2ob2o$6bo3bo$4bo7bo$4b3o3b3o$4bobo3bobo$3b2obo3bob2o$b2obo2bo
bo2bob2o$5bobobobo$3bobobobobobo$3bobo2bo2bobo$2bo2b2o3b2o2bo$2b
o2bo5bo2bo$2bo11bo$5bo5bo$bo3bo5bo3bo$o2b2o7b2o2bo$b3o9b3o!
Edit: +2 spaceships:

Code: Select all

x = 41, y = 26, rule = B3/S2-a34a
2b2o9b2o15b2ob2o$2b2o9b2o16bobo$4bobo3bobo15bobo3bobo$7bobo$5bo5bo15bo
2bo3bo2bo$6bo3bo17b2obobob2o$7bobo21bobo$6b2ob2o20bobo$6bo3bo19b2ob2o$
4bo7bo16bobobobo$4b3o3b3o17bo3bo$4bobo3bobo14b2obo3bob2o$3b2obo3bob2o
16b2ob2o$b2obo2bobo2bob2o10bobob2ob2obobo$5bobobobo14bobo2bobo2bobo$3b
obobobobobo12b2obobobobob2o$3bobo2bo2bobo15bobobobo$2bo2b2o3b2o2bo11b
2obob3obob2o$2bo2bo5bo2bo11b2ob2o3b2ob2o$2bo11bo10b3o2bo3bo2b3o$5bo5bo
$bo3bo5bo3bo$o2b2o7b2o2bo12bo5bo$b3o9b3o8bo2b2o7b2o2bo$25b4o7b4o$26bo
11bo!
Edit 2: new frontend:

Code: Select all

x = 17, y = 63, rule = B3/S2-a34a
4bobo3bobo$3b4o3b4o2$4bo7bo$3bobo5bobo$3bo9bo$4b2o5b2o$3b2o7b2o2$3bo9b
o$4bobo3bobo$3bob3ob3obo$5bobobobo$b3obobobobob3o$4bobo3bobo$2bo11bo$
3bo9bo$3bo2bo3bo2bo$2bo3b2ob2o3bo$2b3o2bobo2b3o$4b2obobob2o$4bo2bobo2b
o$4bo2bobo2bo$5bobobobo$b2o4bobo4b2o$4b2obobob2o$obobob2ob2obobobo$o3b
o2bobo2bo3bo$b3obo5bob3o$2bobobo3bobobo2$3bo9bo$3b2o7b2o$2b3o7b3o$2b3o
7b3o$6bobobo$6bobobo$2b3ob5ob3o2$6bo3bo$6b2ob2o$5b3ob3o$2bo2b2o3b2o2bo
$b2o2b2o3b2o2b2o$2o4bo3bo4b2o$2b4o5b4o$3bo9bo$4b2o5b2o$3b2o7b2o$3bob2o
3b2obo$2b2ob2o3b2ob2o$3bo9bo$2b5o3b5o$3bobo5bobo$2bo11bo$bobo9bobo2$o
2b3o5b3o2bo$b2ob2o5b2ob2o2$bo3bo5bo3bo$2bobo7bobo$3bo9bo!
Edit 3: final partial for even symmetry is 3 times longer:

Code: Select all

x = 18, y = 136, rule = B3/S2-a34a
bobob2o4b2obobo$4b3ob2ob3o$b2o12b2o2$obobo2bo2bo2bobobo$2bobobo4bobobo
$3o3b6o3b3o$bo5b4o5bo$7bo2bo$8b2o$bob2o8b2obo$obo2b2ob2ob2o2bobo$bo4bo
4bo4bo$bob2o8b2obo2$2b4o6b4o$2bo4bo2bo4bo$2bo12bo$3b2o8b2o$3b3o6b3o$3b
obob4obobo$4bo8bo$3bobo2b2o2bobo2$5bobo2bobo$6b2o2b2o$bo2b2o6b2o2bo$2b
4o6b4o$3b2o8b2o$6bo4bo$5bo6bo$6bo4bo$5b8o$6b6o$3bo10bo$4b2ob4ob2o$5b2o
b2ob2o2$4b10o$3b2o3b2o3b2o$b3o3bo2bo3b3o$b2o2bo6bo2b2o$2bo2bob4obo2bo$
2bobobo4bobobo$bo2bobo4bobo2bo$2bobob2o2b2obobo$4bo8bo$6bo4bo$4b3o4b3o
$5b2o4b2o$5bo2b2o2bo$6bob2obo$3bobobo2bobobo$bo3b2o4b2o3bo$o4b2o4b2o4b
o$b4o8b4o$6b6o$5bo2b2o2bo$4bo8bo$5b8o$7bo2bo$5bob4obo$5bo6bo$5bo6bo$6b
o4bo$4b2o6b2o$2bo2bo6bo2bo$2bob2obo2bob2obo$2o4bo4bo4b2o$b2o12b2o$2bo
3b2o2b2o3bo$5b2ob2ob2o$5b2o4b2o$bo4bo4bo4bo$2bobo2bo2bo2bobo$2b2o3bo2b
o3b2o$6b6o$6bo4bo2$3bob2o4b2obo$5bo6bo2$4b2o6b2o$6bo4bo$5bo6bo$3bo10bo
$3bo10bo$2bo12bo$2b2o2b2o2b2o2b2o$bo2bob2o2b2obo2bo$2bob3o4b3obo$4bo8b
o$4bo3b2o3bo$5bo6bo$6b2o2b2o$5bo2b2o2bo$5bobo2bobo$4b2o6b2o$5bo6bo$4bo
8bo$4b2o6b2o$3b3o6b3o$2b2o3b4o3b2o$3b2obo4bob2o$5bo6bo$5bobo2bobo2$5b
3o2b3o$6b2o2b2o$8b2o$6b2o2b2o$6bo4bo2$8b2o$5bobo2bobo$4b3ob2ob3o$3bo2b
o4bo2bo$2b4ob4ob4o$2b2obo6bob2o$7bo2bo$4bo3b2o3bo$b2obo8bob2o2$2ob2o8b
2ob2o$bo3bo6bo3bo$b2o12b2o$2bo2b2o4b2o2bo2$3bobo6bobo2$2bo2bobo2bobo2b
o$b2o3b2o2b2o3b2o$4bo8bo$4bo8bo$4bo8bo$4bo8bo!
Currently I can't use qfind for wider search.
Another c/5o:

Code: Select all

x = 17, y = 74, rule = B3/S2-a34a
8bo$6bo3bo$7bobo$b2o2bo5bo2b2o$obo4bobo4bobo$b5o5b5o$6bo3bo$3bo9bo$3b
2o7b2o$3b3obobob3o$6bo3bo2$b3o9b3o$6bo3bo$4bo2bobo2bo$4b2obobob2o$4bo
2bobo2bo$7bobo$5bo5bo$4b2o5b2o$4bo7bo$6bo3bo$6b2ob2o$7bobo$8bo$8bo2$7b
obo$bo5bobo5bo$o4bobobobo4bo$o2bob2o3b2obo2bo$b2o2b2o3b2o2b2o2$5b2o3b
2o$5b2o3b2o$4bobo3bobo$4b2obobob2o$3bo3bobo3bo$4b2obobob2o$5bobobobo$
4bo2bobo2bo$5b3ob3o$6bo3bo$6bo3bo$5bo5bo$5bobobobo$5b2o3b2o$5b2o3b2o$
4b9o$4bob5obo$3bobo5bobo2$7b3o$6bo3bo$6bo3bo$7bobo$6b2ob2o$5bobobobo$
6bo3bo$3b2obo3bob2o$6b2ob2o$2bobob2ob2obobo$2bobo2bobo2bobo$2b2obobobo
bob2o$5bobobobo$2b2obob3obob2o$2b2ob2o3b2ob2o$b3o2bo3bo2b3o3$5bo5bo$o
2b2o7b2o2bo$b4o7b4o$2bo11bo!
Edit 4: more spaceships & partials:

Code: Select all

x = 635, y = 332, rule = B3/S2-a34a
131b94o$121b10o94b8o$112b9o112b8o$104b8o129b9o$96b8o146b8o$89b7o162b9o
$83b6o178b8o$79b4o192b8o$75b4o204b9o$71b4o217b8o$69b2o229b10o$67b2o
241b11o$65b2o254b11o$63b2o267b11o$61b2o280b11o$59b2o293b9o$58bo304b6o$
57bo311b6o$56bo318b6o$55bo325b6o$54bo332b6o$53bo339b8o$52bo348b9o$51bo
358b9o$50bo368b9o$49bo378b7o$47b2o386b5o$46bo393b4o$45bo398b5o$43b2o
404b5o$42bo411b5o$41bo417b4o$39b2o422b4o$38bo428b4o$37bo433b5o$36bo
439b4o$35bo444b4o$35bo448b4o$34bo453b3o$33bo457b2o$32bo460b3o$31bo464b
3o$31bo467b2o$30bo470b3o$29bo474b2o$28bo477b2o$27bo480b2o$27bo482b2o$
26bo485b2o$25bo488b2o$24bo491b2o$24bo493b2o$23bo496b2o$23bo498b2o$22bo
501b3o$22bo251bo11bo240b4o$21bo250bobob3o3b3obobo242b3o$21bo251b2obo7b
ob2o246b2o$15bo4bo515b3o$15bo4bo254b2o7b2o253b2o$16bo2bo254b4o5b4o23bo
bo3bo3bo3bobo24bo10bo178b2o$16bobo218bo11bo23b2ob3o3b3ob2o26bo2bobo2bo
27bo2b8o2bo179bo$17b2o221b3ob3o26b2o2b2o3b2o2b2o22b2o2bo7bo2b2o23b5o4b
5o180bo$17bo218b2o2b2o3b2o2b2o27bo3bo28bob4o3b4obo24bo12bo181b2o$16b2o
220b3obobob3o24bo4bo3bo4bo21bo2bo3bo3bo3bo2bo27bo2bo188bo$16b2o221b3o
3b3o25b2o3b2ob2o3b2o21bo3b4o3b4o3bo24bo2bo2bo2bo186bo$15bobo221b3obob
3o26bo3bo3bo3bo26bo3bobo3bo28bo3b2o3bo187bo$14bo2bo221b9o27bob2o3b2obo
23bo4bo2bobo2bo4bo21b2obo2bo2bo2bob2o185bo$14bo3bo224bo33bo5bo26b3obo
2bobo2bob3o22b2obobob2obobob2o186b2o$13bo5b3o254bo7bo25b2o3bobobobo3b
2o23bobo2bo2bo2bobo189bo$13bo7bo215bob3o3b3obo26bobo3bobo26b2ob2obobob
2ob2o25b3o6b3o41bo3bo145bo$12bo8bo215bo2bobobobo2bo22bo4bo5bo4bo22b2o
4bobo4b2o28b6o42b9o144b2o$12bo9b2o219bo28bo4bo5bo4bo28bobo35b4o44bob3o
bo147bo$11bo12bo212bo2bo5bo2bo23bob2o3bo3b2obo23b2o2bobobobo2b2o30b2o
32b3o10bo5bo148bo$11bo12bo212bo3bo3bo3bo24bo4bobo4bo23b2ob2o2bobo2b2ob
2o23b3o8b3o27bo12b5o150b2o$10bo14bo212bo2bo3bo2bo29b2ob2o27bo4bobobobo
4bo24bo10bo27bobo12b3o153bo$10bo14bo212bo2bo3bo2bo30bobo27b2obo3bo3bo
3bob2o22bobo8bobo25b2ob2o168bo$9bo16b2o213b2ob2o34bo29b2obob2o3b2obob
2o22b2ob2o6b2ob2o25bobo170bo$9bo18b2o207b3o2bobo2b3o64bo7bo27bobo8bobo
27bo172b2o$8bo21b5o203bo9bo102bo10bo203bo$8bo25bo203b3o5b3o318bo$7bo
27bo174bobobobo22b2o5b2o320b2o$7bo27bo155b2ob2o13b2obobob2o21b2o5b2o
322bo$5b2o28bo156bobo15bobobobo23bobobobo324b2o$4bo31bo113b2o11b2o24bo
bo3bobo12b3ob3o24bo3bo327bo$3bo32bo113bo13bo45bo5bo24bo3bo328b2o$3bo
33bo111bo2b4o3b4o2bo22bo2bo3bo2bo43b3o331bo$2bo35bo112b5o3b5o25b2obobo
b2o11b2o5b2o359b2o$2o36bo111bo2bob2ob2obo2bo27bobo384bo$38bo112bobo7bo
bo28bobo16bo3bo364bo$39bo112b2obo3bob2o28b2ob2o15b2ob2o365bo$39bo113bo
2bobo2bo49bo3bo366b2o$40bo112bobo3bobo29b2ob2o14bo5bo367bo$41bo108b2ob
o2bobo2bob2o25b3ob3o12b2o5b2o367bo$41bo108b2ob2obobob2ob2o26b2ob2o13bo
7bo368bo$42bo107b2o3bo3bo3b2o27bobo16b5o371bo$43bo107bo2b2o3b2o2bo27b
2ob2o14b2obob2o371b2o$44bo106bo3bo3bo3bo23bo3bo3bo3bo10b3ob3o373bo$44b
o108b3o3b3o24bobo2b2ob2o2bobo34b2o11b2o341bo$45bo106bo2b2ob2o2bo24b2o
2b2ob2o2b2o8b2o2bobo2b2o19bo7bo345bo$46bo107b3ob3o29b2obob2o11b2o7b2o
17bo2bo5bo2bo173b6o3b6o156bo$47bo103bo2bobobobo2bo27bobobo11bo3bo3bo3b
o17bo2bo3bo2bo346bo$47bo108bobo34bo15b2obobob2o19bo4bo4bo347bo$48bo
102b4obobob4o25bob2ob2obo8bo5bobo5bo21bo179b3ob3ob3ob3o159bo$48bo102b
2o2b2ob2o2b2o25bob2ob2obo7bo2b2o2bobo2b2o2bo16bo7bo18bobobobo83b2ob2o
62bo13bo160bo$49bo100b2o3b2ob2o3b2o21b2o2bobobobo2b2o5b2obo2bobo2bob2o
17b2o5b2o17b2obobob2o83bobo64b3o7b3o162b2o$49bo104bo5bo24bo2bob3ob3obo
2bo6b3obobob3o21b5o20bobobobo81bobo3bobo60b2ob9ob2o163bo$50bo100b2o9b
2o22b2o11b2o11bobo50b3ob3o150bo3bo5bo3bo164bo$50bo100b2o9b2o47b2ob2o
23bo5bo19bo5bo80bo2bo3bo2bo62bo7bo168bo$50bo99b2o11b2o24b2o5b2o9bobo7b
obo17b2o7b2o105b2obobob2o61bobo7bobo167bo$51bo99b3o7b3o25b3o3b3o7b2o3b
o5bo3b2o17b2o3b2o18b2o5b2o83bobo65bob7obo169bo$51bo99bo2bo5bo2bo25b2o
5b2o38b3obo3bob3o107bobo65b4o3b4o170bo$52bo98bo2bo5bo2bo27b2ob2o10bo4b
o3bo4bo16bo3bobo3bo18bo3bo83bobobobo65bobobobo173bo$52bo134b3obobobob
3o5bo3bobo3bobo3bo14b2o2b2ob2o2b2o16b2o3b2o81bo2bobo2bo60b2obo3bo3bob
2o170bo$52bo98bo2bo5bo2bo23bobobobobobobo7b2ob2o3b2ob2o19bobobobo21bob
o80bo5bobo5bo58bobo7bobo172bo$53bo98b2o7b2o23b2obo2bobo2bob2o8bob2ob2o
bo20b2obobob2o17bo7bo77b2ob2obobob2ob2o59bob2o3b2obo173bo$53bo97bobo7b
obo21bobobo2bobo2bobobo6b2obo3bob2o18bo2bo3bo2bo16b2o5b2o77b4o2bobo2b
4o59bo2b5o2bo174bo$54bo96b2obo5bob2o23bob2obobob2obo9bobo3bobo45bobo5b
obo77b2ob3ob3ob2o60b2o3bo3b2o175bo$54bo97bob3ob3obo23bo4bo3bo4bo5bo2bo
2bobo2bo2bo18b3ob3o365bo$54bo96b3o2bobo2b3o24b2o7b2o6bobobo2bobo2bobob
o18bo3bo17b2obo5bob2o25bobo48bob2o5b2obo57b3o3bo3bo3b3o174bo$55bo96bo
3bobo3bo25b2o7b2o8bob2obobob2obo18b3obob3o16bo9bo23bob2ob2obo45bob2o5b
2obo58bo2bobo3bobo2bo176bo$55bo101bo32bo5bo9bo4bo3bo4bo16b2o3bo3b2o17b
o5bo23b3o7b3o41b2o3b2o3b2o3b2o57b2o9b2o177bo$55bo135bo3bo12b2o7b2o17bo
b2o5b2obo14b4o3b4o21b3obo3bob3o42bobo9bobo60bo7bo180bo$56bo94bobo7bobo
24b4o3b4o9b2o7b2o17bo11bo16b7o84bobo64bobo7bobo179bo$56bo95bo9bo25bo2b
o3bo2bo11bo5bo20bo9bo14b2o3b3o3b2o23b2obob2o46b2obobobobob2o61bo7bo
182bo$57bo91b2obob2o3b2obob2o21b2ob2o3b2ob2o11bo3bo21b2o7b2o49bob2ob2o
bo50bobo258bo$57bo93b2o2bo3bo2b2o23bo2b2o3b2o2bo8b4o3b4o44bo9bo22bobo
2bo2bobo43b4o7b4o61b2obob2o185bo$57bo96b2o3b2o25b4obo3bob4o7bo2bo3bo2b
o15b3o2bo5bo2b3o46b2o2bo2b2o47bob2ob2obo60b2o2bo2bo2bo2b2o182bo$57bo
96bo5bo26bo3bo3bo3bo7b2ob2o3b2ob2o15b2obo7bob2o14b2o5b2o25bo2bo2bo44bo
5bo3bo5bo57b3o7b3o184bo$57bo132bo5bo10bo2b2o3b2o2bo14bobo3bo3bo3bobo
13b2o5b2o25b2o3b2o45b2ob3o3b3ob2o59bob7obo186bo$57bo94bobo5bobo25b2o7b
2o7b4obo3bob4o14b2o2bo5bo2b2o11b3o9b3o21bo7bo48b2obob2o261bo$57bo95bo
7bo26b3o5b3o8bo3bo3bo3bo15bo2b3o3b3o2bo12b2o9b2o23bo2bo2bo122b5o191bo$
57bo97bo3bo27bo11bo10bo5bo20b3o5b3o49bo2bobo2bo121b5o192bo$57bo129b3o
7b3o8b2o7b2o18b2obo3bob2o15bo9bo23b3obob3o49bobobo66bo5bo191bo$57bo95b
2obobob2o46b3o5b3o17bo4bobo4bo11b4o9b4o19bo2b5o2bo50bo67bo7bo191bo$57b
o96bobobobo28bo7bo9bo11bo21bobo19b2o7b2o23b2o5b2o48bo2bo2bo64bo3bo3bo
191bo$57bo98bobo29b3o5b3o8b3o7b3o15bo2b3o3b3o2bo47bob5obo48b3ob3o62bob
o3bo3bobo132b3o9b3o43bo$57bo98bobo27b2o11b2o34bo3bo5bo3bo14bobo3bobo
22bobo3bo3bobo115bo3b5o3bo133bo11bo44bo$57bo98bobo28b2o2bo3bo2b2o9bo7b
o17bo13bo15bo5bo23b6ob6o43bo11bo58bobo2b2ob2o2bobo130bo3bo7bo3bo43bo$
57bo97b2ob2o28b2o7b2o9b3o5b3o17bobo7bobo12bo2bo2bobo2bo2bo18b2obob2ob
2obob2o42b2o9b2o62bobobobo134b2ob2o7b2ob2o43bo$57bo131bo7bo8b2o11b2o
15b2o9b2o12b2o3b2ob2o3b2o19bobo7bobo42bo13bo58bobob2ob2obobo130bo5bo5b
o5bo43bo$58bo94bobo3bobo45b2o2bo3bo2b2o17bo2bo3bo2bo13bobo3bobo3bobo
20b2ob5ob2o46b2o5b2o61b5obob5o131bo15bo44bo$59bo128b5ob5o9b2o7b2o18b2o
b2ob2ob2o19b3o27b9o46bo9bo62bo3bo3bo135b2o9b2o47bo$60bo93bo5bo26b3o2b
3o2b3o9bo7bo43bo5b3o5bo145b2o5bobo5b2o131bo11bo47bo$60bo89bo2bo2bobo2b
o2bo23bo9bo37bob2ob3ob2obo12b2o11b2o77b2ob3ob2o61b2o3bobo3b2o132bo13bo
47bo$61bo87bobobob2ob2obobobo22bo9bo9b5ob5o15b2obo2bo3bo2bob2o9b2o2bo
7bo2b2o76bo7bo63bo7bo134bob2o7b2obo47bo$61bo87bob2o2bo3bo2b2obo20bob2o
7b2obo6b3o2b3o2b3o15bo6bo6bo11bob2o7b2obo20bo9bo46bo7bo66bobo138b2o9b
2o49bo$61bo91b2obobob2o24bob2o7b2obo7bo9bo23bo17b2o13b2o20b3o3b3o49bo
3bo67bo3bo138b3o5b3o50bo$62bo88bobo2bobo2bobo21b2o5bobo5b2o6bo9bo20bo
2bo2bo15bo2bo7bo2bo24bobo52bobobo64b3o5b3o138bo3bo53bo$63bo88bo3bobo3b
o24bo2b3ob3o2bo6bob2o7b2obo18b3ob3o15b2ob2o5b2ob2o24bobo49bo9bo60b3o7b
3o135bobo3bobo51bo$63bo87bo3bo3bo3bo42bob2o7b2obo18bo5bo51b2obobob2o
47bobo3bobo209bob2ob2obo51bo$64bo87b2o7b2o25bobo5bobo6b2o5bobo5b2o16bo
7bo17bo7bo24bo2bobo2bo46b2o2bobo2b2o269bo$64bo87b2o7b2o26b2o5b2o9bo2b
3ob3o2bo18bo7bo16bobo5bobo24bobobobo49bobobobo211bo5bo53bo$65bo123bo7b
o40bo7bo15b3obo3bob3o22bobo3bobo46bobobobobobo205b3obo5bob3o49bo$65bo
87bobo3bobo27bo7bo10bobo5bobo17bobo2bobo2bobo12bobo9bobo76bobobobobobo
208bo7bo52bo$66bo87bo5bo30bo3bo13b2o5b2o18bob2obobob2obo12b2o3bo3bo3b
2o76bo3bobo3bo206b4o5b4o50bo$66bo86b4ob4o28b2o3b2o12bo7bo18b3o7b3o16bo
bobobo81bo2bobo2bo204b3o3bo5bo3b3o47bo$67bo122b2o3b2o12bo7bo18b3o7b3o
15b3o3b3o80bo2bobo2bo131bobo17b3o56bo5bo53bo$67bo124bobo16bo3bo19b2obo
7bob2o12b2ob2o3b2ob2o79b7o152bobo117bo$68bo84bobo3bobo29b2ob2o14b2o3b
2o19bobo7bobo12bo4b2ob2o4bo76bo3bobo3bo129bobobo14b2obob2o53bo7bo53bo$
68bo84bo7bo30bobo15b2o3b2o18bobo9bobo10bo2bo3bobo3bo2bo76bo3bo3bo130b
2ob2o14bobobobo52b3o5b3o52bo$69bo83b2ob3ob2o30bobo17bobo23bo7bo14b3o2b
2ob2o2b3o77bobo3bobo130b2ob2o13b2o5b2o114bo$70bo120b2ob2o15b2ob2o19b2o
11b2o16b2ob2o83bo5bo131b2ob2o12b2o7b2o49b2o9b2o51bo$70bo120bo3bo16bobo
20bo13bo100b2ob2o5b2ob2o124bo3bobo3bo8bob2o5b2obo48b2o9b2o51bo$71bo83b
2ob2o52bobo20bo2bo7bo2bo14b2o5b2o78bobo7bobo125bo3bobo3bo7bo3bo5bo3bo
112bo$72bo82b2ob2o27bob2o5b2obo11b2ob2o19b2o11b2o10b3obo7bob3o73bo13bo
125bobo3bobo9b3o7b3o49bo9bo53bo$73bo82bobo28bo2bo5bo2bo11bo3bo23bobobo
bo18b3o3b3o80bo7bo129bo5bo11bo9bo51b3o3b3o54bo$73bo82bobo31b2o3b2o39bo
b3o3b3obo14b2obo3bob2o76b3o9b3o208bo3bo56bo$74bo81bobo27b2obobo3bobob
2o6bob2o5b2obo16bo3bo3bo3bo16b3ob3o81bo7bo212bobo57bo$75bo78bo5bo25b2o
bobo3bobob2o6bo2bo5bo2bo19bo5bo16bo3bo3bo3bo75bobobo5bobobo208bo3bo56b
o$76bo76b2obobob2o24b3obo5bob3o9b2o3b2o21bobo3bobo16b4o3b4o76bob3o5b3o
bo207bo5bo55bo$76bo75bo9bo24b2ob3ob3ob2o6b2obobo3bobob2o18bobobobo20bo
3bo79bo2bo7bo2bo209bobo57bo$77bo72bo5bobo5bo21b2o3b2ob2o3b2o5b2obobo3b
obob2o44bob3obo79b2obo5bob2o207bob2ob2obo54bo$78bo72b2obobobobob2o23bo
2bo5bo2bo6b3obo5bob3o21bo22bob3obo79bob2obobob2obo209bo3bo56bo$79bo71b
o2bobobobo2bo23b3o7b3o7b2ob3ob3ob2o21b3o22bo3bo81b2o2bobo2b2o206b3o7b
3o52bo$79bo73b2obobob2o44b2o3b2ob2o3b2o18bo5bo21b3o83b2obobob2o210bo5b
o55bo$80bo71bobo2bo2bobo26b3o3b3o9bo2bo5bo2bo19bo5bo104bo5bobo5bo204bo
b2o5b2obo52bo$80bo70bo2bo5bo2bo26bo5bo10b3o7b3o19bo5bo21b3o81b2o2bo3bo
2b2o205bo2b2obob2o2bo52bo$81bo70b3o5b3o26b2o5b2o63bob2obobobob2obo78bo
5bo207bo6bo6bo51bo$82bo69b2o7b2o26bo2bobo2bo11b3o3b3o17b2ob2o5b2ob2o
11bobob2o3b2obobo74bo13bo203bobo3bobo3bobo51bo$82bo69b2o7b2o30bo16bo5b
o18b3o9b3o10b2o2b4ob4o2b2o73bobo9bobo203bob2o3bo3b2obo51bo$83bo66b2o2b
o5bo2b2o24bo7bo11b2o5b2o19bo9bo14b2o9b2o77bobo5bobo204b2ob2o3bo3b2ob2o
49bo$83bo66bob2o7b2obo23bo9bo10bo2bobo2bo17bobo4bo4bobo13bob2o3b2obo
79b3o3b3o206bo3bo5bo3bo50bo$84bo64bobo11bobo23b9o15bo21b2o5bo5b2o12bo
3bobobo3bo82bo209bo2b11o2bo48bo$84bo108bo15bo7bo16b2o2bobobobobo2b2o
16bobo80bo5b3o5bo203bo13bo49bo$85bo106b3o13bo9bo16b2ob3o3b3ob2o13bob2o
3b2obo75bo15bo202b5o5b5o48bo$86bo104bobobo13b9o18bobo7bobo14bo9bo76b5o
bobob5o204bo2bo5bo2bo49bo$86bo104b2ob2o17bo22b2o9b2o15bob2ob2obo83bobo
214bo3bo52bo$87bo104bobo17b3o23bo7bo17b3o3b3o82bo3bo209b3o7b3o48bo$87b
o104bobo16bobobo47bo9bo79b3obob3o206bobo2b2ob2o2bobo46bo$88bo101bobobo
bo14b2ob2o22b2o5b2o17bo7bo79bo4bo4bo206bo3b2ob2o3bo47bo$88bo100bob2ob
2obo14bobo22b2o7b2o15b3o5b3o81bo3bo209b2o2b2ob2o2b2o46bo$89bo101bo3bo
16bobo24bo5bo18bobo3bobo79bo2bo3bo2bo208bob2ob2obo48bo$89bo99bo2bobo2b
o12bobobobo20bo9bo17b2o3b2o83bo3bo267bo$90bo100bo3bo13bob2ob2obo19bo2b
2ob2o2bo17bobobobo80b2obo3bob2o210b2ob2o49bo$90bo95b2obo2bobo2bob2o10b
o3bo19b2ob2obobob2ob2o17bobo80bo3b2o3b2o3bo207bobobobo47bo$90bo96b2obo
bobobob2o9bo2bobo2bo18b2obobobobob2o17b2ob2o80bo2b2o3b2o2bo210bobo49bo
$91bo98bobobobo14bo3bo24bo3bo22bobo83bo7bo209b2obobob2o45bo$91bo95b2ob
obobobob2o6b2obo2bobo2bob2o15b2o9b2o18bobo83b2o5b2o211b2ob2o47bo$92bo
97bo2bo2bo10b2obobobobob2o15bo4bo3bo4bo17bobo81bo11bo205b2o3bobo3b2o
42bo$92bo95b3o5b3o11bobobobo20bo9bo18bo3bo80bobo7bobo204b3o9b3o41bo$
93bo93bo11bo7b2obobobobob2o16b5o3b5o101bob2o7b2obo203b3o9b3o40bo$93bo
116bo2bo2bo20b2ob2ob2ob2o17b2o3b2o78bo13bo201b3o13b3o38bo$93bo95bo7bo
10b3o5b3o22bobo21b2o3b2o77bobo11bobo205b3o3b3o42bo$94bo91bobobo5bobobo
6bo11bo19bobobobo18bo7bo76bobo11bobo205bobo3bobo42bo$94bo91bo2bo7bo2bo
37b2obobob2o17b3o3b3o79b2o7b2o209bo5bo42bo$95bo90b2o11b2o8bo7bo20b2obo
bob2o16bo2b2ob2o2bo76bob2o7b2obo207b2o3b2o42bo$95bo110bobobo5bobobo15b
2o3bobo3b2o14bo2b2ob2o2bo81bo3bo213b2ob2o42bo$96bo109bo2bo7bo2bo14b2ob
2obobob2ob2o16bo3bo81b2ob2ob2ob2o209bobobobo41bo$96bo109b2o11b2o13bobo
3b2ob2o3bobo14bobobobo80bo2b2ob2o2bo256bo$97bo136bobobo7bobobo15bo3bo
82bo2bobo2bo209bobo3bobo38bo$98bo136b3ob2o3b2ob3o10bo6bobo6bo77b3ob3o
210b3o3b3o38bo$98bo140bo5bo15b2o3b2ob2o3b2o79bobobo211bobo3bobo37bo$
99bo161b2obobo3bobob2o80bobo212bo7bo37bo$100bo137bo7bo16b2o7b2o293b2o
4bo3bo4b2o32bo$101bo134b2o9b2o14bo2bo3bo2bo293b4o2b2ob2o2b4o32bo$101bo
135bo9bo14b2o2b2ob2o2b2o79b3ob3o206bo2bob3ob3obo2bo31bo$102bo135bo7bo
15b2o2bo3bo2b2o80bo3bo207bobobo7bobobo30bo$102bo132bobo2bobobo2bobo13b
obo5bobo78b2o7b2o205bo2bo7bo2bo31bo$102bo133b13o13b2o9b2o75bobobo5bobo
bo201bo4bo7bo4bo28bo$103bo133b2o7b2o14b2o9b2o74b2o2bo7bo2b2o200bo5bo5b
o5bo28bo$103bo159bob2o3b2obo78bo9bo205bo3bo5bo3bo29bo$103bo137bobo21bo
bobobo80bo9bo204b5o7b5o28bo$104bo135b2ob2o19b2obobob2o298b3o3b3o31bo$
104bo135bo3bo20bobobobo78bobo3b3o3bobo202b2o3b2o3b2o3b2o26bo$105bo131b
obo5bobo18b2ob2o79bobobo5bobobo201bo4bo2bobo2bo4bo25bo$105bo129b2o3bo
3bo3b2o14bo7bo77bo2bo7bo2bo201bobo3bo5bo3bobo24bo$106bo128bo4bo3bo4bo
14bo7bo80bo7bo207bo2bo5bo2bo26bo$106bo128bo2b2o5b2o2bo14bobo3bobo79bob
o5bobo245bo$107bo129b2o7b2o359bo$107bo130bo7bo18b3ob3o81b2o5b2o244bo$
108bo129bo7bo19b2ob2o81b2o7b2o243bo$108bo128bo3bobo3bo18bo3bo334bo$
109bo127bob2o3b2obo20bo83b2ob2ob2ob2o242bo$109bo127b2o7b2o108bobo245bo
$110bo124b2o2b2o3b2o2b2o17b3o82bobobobobobo240bo$111bo128bo3bo15b2o5bo
bo5b2o74b2obobobobob2o239bo$112bo122b3o9b3o10bo3bo2bobo2bo3bo73bo2b3o
3b3o2bo237bo$113bo147b2o2b2o3b2o2b2o76bo9bo238bo$113bo121bobo9bobo12b
3o7b3o76b2o9b2o237bo$114bo125bo3bo19b3o3b3o78b2o3bobo3b2o236bo$115bo
118b3ob2o5b2ob3o14bobobobo79bob4ob4obo235bo$116bo119bobo7bobo17b2ob2o
80bobo2bobo2bobo235bo$117bo118b3o7b3o17b2ob2o83bobobobo237bo$118bo117b
3o7b3o14bo3bobo3bo78b2o2bobo2b2o234bo$118bo145b2obobob2o80b2obobob2o
235bo$119bo147bobo86bobo237bo$120bo144bobobobo81b2obobob2o234bo$121bo
142bobo3bobo78bob2obobob2obo231bo$122bo142b2o3b2o78bo2bo2bobo2bo2bo
229bo$122bo226bo3bo7bo3bo228bo$123bo140bobo3bobo77b2o2b2o3b2o2b2o228bo
$124bo140bo5bo78b2ob2o5b2ob2o227bo$124bo139b4ob4o79bo9bo228bo$125bo
227bo7bo228bo$126bo226bo7bo227bo$127bo136bobo3bobo78bo2bo5bo2bo224bo$
128bo135bo7bo78bob2o5b2obo224bo$128bo135b2ob3ob2o79bobo5bobo224bo$129b
o222bo2bo3bo2bo223bo$129bo222bob2obob2obo222bo$130bo135b2ob2o81bob2obo
b2obo221bo$130bo135b2ob2o85bobo224bo$131bo135bobo86bobo223bo$132b2o
133bobo84bobobobo220bo$134b2o131bobo80bo2bo7bo2bo215bo$136b2o127bo5bo
77bobo2bobobobo2bobo213bo$138b2o124b2obobob2o82bo3bo218bo$140b2o121bo
9bo76b5o5b5o213bo$142b2o117bo5bobo5bo75bo11bo213bo$144b2o116b2obobobob
ob2o301bo$146b2o114bo2bobobobo2bo77bo2bo3bo2bo212bo$148b2o114b2obobob
2o82bo3bo214bo$150b2o111bobo2bo2bobo77b2ob2o3b2ob2o209bo$152b2o108bo2b
o5bo2bo296b2o$154b3o106b3o5b3o77bo2bo5bo2bo206bo$157b2o104b2o7b2o80b2o
3b2o208bo$159b2o102b2o7b2o77b3o7b3o203b2o$161b2o98b2o2bo5bo2b2o75bo11b
o202bo$163b2o96bob2o7b2obo75b2o9b2o200b2o$165b5o90bobo11bobo73b3obo5bo
b3o198bo$170b6o174b2ob2o5b2ob2o196b2o$176b6o168b2ob2o5b2ob2o195bo$182b
4o373bo$186b2o163b3o7b3o193b2o$188b2o162bo9bo193bo$190b2o363bo$192b2o
360bo$194b2o356b2o$196b2o353bo$198b2o350bo$200b2o347bo$202b2o344bo$
204b2o340b2o$206b4o335bo$210b3o331bo$213b3o327bo$216b4o322bo$220b3o
317b2o$223b3o313bo$226b3o309bo$229b4o303b2o$233b3o298b2o$236b20o276b2o
$256b4o270b2o$260b4o264b2o$264b5o257b2o$269b4o251b2o$273b4o245b2o$277b
4o239b2o$281b5o232b2o$286b4o226b2o$290b5o219b2o$295b5o212b2o$300b4o
206b2o$304b5o199b2o$309b4o194bo$313b5o187b2o$318b5o180b2o$323b5o173b2o
$328b5o166b2o$333b6o158b2o$339b5o149b4o$344b5o141b3o$349b5o132b4o$354b
5o124b3o$359b9o111b4o$368b14o93b4o$382b13o76b4o$395b13o58b5o$408b14o
40b4o$422b40o!
Edit 5: all spaceships:

Code: Select all


User@USER ~
$ cd ..

User@USER /home
$ ./qfind.exe -r B3/S2-a34a -p 5 -y 1 -w 9 -s o
qfind v2.1 by Matthias Merzenich, 3 May 2021
Input: D:\CGoL\cygwin64\home\qfind.exe -r B3/S2-a34a -p 5 -y 1 -w 9 -s o

Rule: B3/S2-a34a
Period: 5
Offset: 1
Width:  9
Symmetry: odd
Queue size: 2^20
Hash table size: 2^20
Minimum deepening increment: 5
Lookahead caching disabled
Number of threads: 1
Starting search
Queue full, depth 5, deepening 5, 131k/137k -> 6.5k/8.4k
Queue full, depth 8, deepening 7, 131k/206k -> 7.8k/19k
Queue full, depth 11, deepening 9, 131k/248k -> 8.1k/27k
Queue full, depth 14, deepening 11, 131k/277k

User@USER /home
$ ./qfind.exe -r B3/S2-a34a -p 5 -y 1 -w 9 -s o
qfind v2.1 by Matthias Merzenich, 3 May 2021
Input: D:\CGoL\cygwin64\home\qfind.exe -r B3/S2-a34a -p 5 -y 1 -w 9 -s o

Rule: B3/S2-a34a
Period: 5
Offset: 1
Width:  9
Symmetry: odd
Queue size: 2^20
Hash table size: 2^20
Minimum deepening increment: 5
Lookahead caching disabled
Number of threads: 1
Starting search
Queue full, depth 5, deepening 5, 131k/137k -> 6.5k/8.4k
Queue full, depth 8, deepening 7, 131k/206k -> 7.8k/19k
Queue full, depth 11, deepening 9, 131k/248k -> 8.1k/27k
Queue full, depth 14, deepening 11, 131k/277k -> 5.7k/27k
Queue full, depth 18, deepening 12, 131k/255k -> 4.3k/26k
Queue full, depth 23, deepening 12, 131k/333k -> 4.3k/28k
Queue full, depth 27, deepening 13, 131k/252k -> 4.3k/26k
Queue full, depth 30, deepening 15, 131k/270k -> 3.1k/21k
Queue full, depth 34, deepening 16, 131k/243k -> 3.0k/21k
Queue full, depth 38, deepening 17, 131k/223k -> 2.7k/20k
Queue full, depth 42, deepening 18, 131k/242k -> 2.3k/19k
Queue full, depth 45, deepening 20, 131k/218k -> 1.9k/16k
Queue full, depth 51, deepening 19, 131k/369k -> 1.8k/19k
Queue full, depth 57, deepening 18, 131k/362k -> 1.9k/20k
Queue full, depth 63, deepening 17, 131k/383k -> 1.9k/20k
Queue full, depth 68, deepening 17, 131k/313k -> 2.1k/20k
Queue full, depth 72, deepening 18, 131k/236k -> 1.8k/18k
Queue full, depth 77, deepening 18, 131k/314k -> 1.7k/18k
Queue full, depth 83, deepening 17, 131k/330k -> 1.7k/18k
Queue full, depth 89, deepening 16, 131k/391k -> 2.1k/20k
Queue full, depth 93, deepening 17, 131k/231k
x = 17, y = 17, rule = B3/S2-a34a
6b2ob2o$6bo3bo$4bo7bo$4b3o3b3o$4bobo3bobo$3b2obo3bob2o$b2obo2bo
bo2bob2o$5bobobobo$3bobobobobobo$3bobo2bo2bobo$2bo2b2o3b2o2bo$2b
o2bo5bo2bo$2bo11bo$5bo5bo$bo3bo5bo3bo$o2b2o7b2o2bo$b3o9b3o!

 -> 2.2k/18k
Queue full, depth 96, deepening 19, 131k/194k -> 2.6k/17k
Queue full, depth 99, deepening 21, 131k/190k -> 3.3k/18k
Queue full, depth 101, deepening 24, 131k/175k -> 3.4k/18k
Queue full, depth 104, deepening 26, 131k/224k -> 1.9k/14k
Queue full, depth 107, deepening 28, 131k/196k -> 1.4k/14k
Queue full, depth 110, deepening 30, 131k/196k -> 1.2k/12k
Queue full, depth 114, deepening 31, 131k/188k -> 1.0k/12k
Queue full, depth 118, deepening 32, 131k/201k -> 1.0k/12k
Queue full, depth 121, deepening 34, 131k/191k -> 918/12k
Queue full, depth 124, deepening 36, 131k/190k
x = 17, y = 24, rule = B3/S2-a34a
2b2o9b2o$2b2o9b2o$4bobo3bobo$7bobo$5bo5bo$6bo3bo$7bobo$6b2ob2o$
6bo3bo$4bo7bo$4b3o3b3o$4bobo3bobo$3b2obo3bob2o$b2obo2bobo2bob2o$
5bobobobo$3bobobobobobo$3bobo2bo2bobo$2bo2b2o3b2o2bo$2bo2bo5bo2b
o$2bo11bo$5bo5bo$bo3bo5bo3bo$o2b2o7b2o2bo$b3o9b3o!

 -> 839/11k
Queue full, depth 128, deepening 37, 131k/194k -> 943/11k
Queue full, depth 131, deepening 39, 131k/183k
x = 17, y = 26, rule = B3/S2-a34a
6b2ob2o$7bobo$4bobo3bobo2$3bo2bo3bo2bo$4b2obobob2o$7bobo$7bobo$
6b2ob2o$5bobobobo$6bo3bo$3b2obo3bob2o$6b2ob2o$2bobob2ob2obobo$2b
obo2bobo2bobo$2b2obobobobob2o$5bobobobo$2b2obob3obob2o$2b2ob2o3b
2ob2o$b3o2bo3bo2b3o3$5bo5bo$o2b2o7b2o2bo$b4o7b4o$2bo11bo!

 -> 955/11k
Queue full, depth 135, deepening 40, 131k/181k -> 1.2k/12k
Queue full, depth 138, deepening 42, 131k/165k -> 976/11k
Queue full, depth 141, deepening 44, 131k/179k -> 958/11k
Queue full, depth 143, deepening 47, 131k/153k -> 717/9.9k
Queue full, depth 146, deepening 49, 131k/182k -> 552/9.0k
Queue full, depth 150, deepening 50, 131k/178k -> 507/9.2k
Queue full, depth 154, deepening 51, 131k/177k -> 502/8.7k
Queue full, depth 157, deepening 53, 131k/167k -> 482/8.6k
Queue full, depth 161, deepening 54, 131k/177k -> 460/8.6k
Queue full, depth 165, deepening 55, 131k/181k -> 437/8.6k
Queue full, depth 168, deepening 57, 131k/171k -> 412/8.3k
Queue full, depth 172, deepening 58, 131k/168k -> 413/8.4k
Queue full, depth 175, deepening 60, 131k/171k -> 419/8.3k
Queue full, depth 179, deepening 61, 131k/169k -> 388/8.2k
Queue full, depth 183, deepening 62, 131k/219k -> 358/8.6k
Queue full, depth 188, deepening 62, 131k/242k -> 354/8.8k
Queue full, depth 192, deepening 63, 131k/193k -> 346/8.7k
Queue full, depth 196, deepening 64, 131k/180k -> 330/8.6k
Queue full, depth 200, deepening 65, 131k/165k -> 319/8.9k
Queue full, depth 204, deepening 66, 131k/169k -> 316/8.8k
Queue full, depth 207, deepening 68, 131k/163k -> 304/8.5k
Queue full, depth 211, deepening 69, 131k/175k -> 306/8.6k
Queue full, depth 216, deepening 69, 131k/202k -> 310/9.2k
Queue full, depth 220, deepening 70, 131k/221k -> 261/8.7k
Queue full, depth 225, deepening 70, 131k/275k -> 238/8.7k
Queue full, depth 232, deepening 68, 131k/334k -> 240/9.2k
Queue full, depth 236, deepening 69, 131k/184k -> 223/9.1k
Queue full, depth 240, deepening 70, 131k/200k -> 207/8.9k
Queue full, depth 245, deepening 70, 131k/183k -> 198/8.4k
Queue full, depth 248, deepening 72, 131k/167k -> 184/7.7k
Queue full, depth 253, deepening 72, 131k/194k -> 181/7.5k
Queue full, depth 257, deepening 73, 131k/165k -> 168/7.2k
Queue full, depth 262, deepening 73, 131k/206k -> 153/7.0k
Queue full, depth 267, deepening 73, 131k/220k -> 164/7.2k
Queue full, depth 273, deepening 72, 131k/373k -> 147/7.2k
Queue full, depth 280, deepening 70, 131k/316k -> 151/7.5k
Queue full, depth 287, deepening 68, 131k/314k -> 178/7.8k
Queue full, depth 291, deepening 69, 131k/206k -> 175/7.5k
Queue full, depth 296, deepening 69, 131k/242k -> 175/7.4k
Queue full, depth 302, deepening 68, 131k/264k
x = 17, y = 63, rule = B3/S2-a34a
4bobo3bobo$3b4o3b4o2$4bo7bo$3bobo5bobo$3bo9bo$4b2o5b2o$3b2o7b2o
2$3bo9bo$4bobo3bobo$3bob3ob3obo$5bobobobo$b3obobobobob3o$4bobo3b
obo$2bo11bo$3bo9bo$3bo2bo3bo2bo$2bo3b2ob2o3bo$2b3o2bobo2b3o$4b2o
bobob2o$4bo2bobo2bo$4bo2bobo2bo$5bobobobo$b2o4bobo4b2o$4b2obobob
2o$obobob2ob2obobobo$o3bo2bobo2bo3bo$b3obo5bob3o$2bobobo3bobobo2$
3bo9bo$3b2o7b2o$2b3o7b3o$2b3o7b3o$6bobobo$6bobobo$2b3ob5ob3o2$6b
o3bo$6b2ob2o$5b3ob3o$2bo2b2o3b2o2bo$b2o2b2o3b2o2b2o$2o4bo3bo4b2o
$2b4o5b4o$3bo9bo$4b2o5b2o$3b2o7b2o$3bob2o3b2obo$2b2ob2o3b2ob2o$3b
o9bo$2b5o3b5o$3bobo5bobo$2bo11bo$bobo9bobo2$o2b3o5b3o2bo$b2ob2o5b
2ob2o2$bo3bo5bo3bo$2bobo7bobo$3bo9bo!

 -> 187/7.8k
Queue full, depth 307, deepening 68, 131k/248k -> 200/7.9k
Queue full, depth 311, deepening 69, 131k/162k -> 189/7.5k
Queue full, depth 315, deepening 70, 131k/163k -> 182/7.4k
Queue full, depth 320, deepening 70, 131k/249k -> 184/7.7k
Queue full, depth 327, deepening 68, 131k/307k -> 208/8.1k
Queue full, depth 330, deepening 70, 131k/155k -> 219/7.7k
Queue full, depth 334, deepening 71, 131k/165k -> 197/7.6k
Queue full, depth 338, deepening 72, 131k/169k -> 206/7.9k
Queue full, depth 343, deepening 72, 131k/208k -> 192/7.8k
Queue full, depth 348, deepening 72, 131k/304k -> 168/7.4k
Queue full, depth 355, deepening 70, 131k/335k -> 172/7.9k
Queue full, depth 361, deepening 69, 131k/413k -> 194/8.3k
Queue full, depth 366, deepening 69, 131k/176k -> 244/8.6k
Queue full, depth 369, deepening 71, 131k/190k -> 258/8.2k
Queue full, depth 375, deepening 70, 131k/258k -> 300/8.8k
Queue full, depth 379, deepening 71, 131k/163k
x = 17, y = 74, rule = B3/S2-a34a
8bo$6bo3bo$7bobo$b2o2bo5bo2b2o$obo4bobo4bobo$b5o5b5o$6bo3bo$3bo
9bo$3b2o7b2o$3b3obobob3o$6bo3bo2$b3o9b3o$6bo3bo$4bo2bobo2bo$4b2o
bobob2o$4bo2bobo2bo$7bobo$5bo5bo$4b2o5b2o$4bo7bo$6bo3bo$6b2ob2o$
7bobo$8bo$8bo2$7bobo$bo5bobo5bo$o4bobobobo4bo$o2bob2o3b2obo2bo$b
2o2b2o3b2o2b2o2$5b2o3b2o$5b2o3b2o$4bobo3bobo$4b2obobob2o$3bo3bob
o3bo$4b2obobob2o$5bobobobo$4bo2bobo2bo$5b3ob3o$6bo3bo$6bo3bo$5bo
5bo$5bobobobo$5b2o3b2o$5b2o3b2o$4b9o$4bob5obo$3bobo5bobo2$7b3o$6b
o3bo$6bo3bo$7bobo$6b2ob2o$5bobobobo$6bo3bo$3b2obo3bob2o$6b2ob2o$
2bobob2ob2obobo$2bobo2bobo2bobo$2b2obobobobob2o$5bobobobo$2b2obo
b3obob2o$2b2ob2o3b2ob2o$b3o2bo3bo2b3o3$5bo5bo$o2b2o7b2o2bo$b4o7b
4o$2bo11bo!

 -> 356/9.2k
Queue full, depth 383, deepening 72, 131k/166k -> 425/9.9k
Queue full, depth 385, deepening 75, 131k/149k -> 495/9.6k
Queue full, depth 388, deepening 77, 131k/164k -> 341/8.9k
Queue full, depth 393, deepening 77, 131k/297k -> 173/7.4k
Queue full, depth 399, deepening 76, 131k/294k -> 177/7.9k
Queue full, depth 404, deepening 76, 131k/184k -> 184/7.8k
Queue full, depth 407, deepening 78, 131k/153k -> 172/7.2k
Queue full, depth 411, deepening 79, 131k/174k -> 156/6.9k
Queue full, depth 419, deepening 76, 131k/365k -> 158/7.6k
Queue full, depth 424, deepening 76, 131k/291k -> 153/7.8k
Queue full, depth 428, deepening 77, 131k/158k -> 170/7.8k
Queue full, depth 432, deepening 78, 131k/163k -> 174/7.7k
Queue full, depth 436, deepening 79, 131k/165k -> 181/7.9k
Queue full, depth 439, deepening 81, 131k/166k -> 174/7.5k
Queue full, depth 445, deepening 80, 131k/263k -> 175/7.9k
Queue full, depth 450, deepening 80, 131k/231k -> 178/8.3k
Queue full, depth 456, deepening 79, 131k/343k -> 157/8.3k
Queue full, depth 462, deepening 78, 131k/305k -> 150/8.4k
Queue full, depth 467, deepening 78, 131k/224k -> 139/8.3k
Queue full, depth 474, deepening 76, 131k/336k -> 155/8.4k
Queue full, depth 481, deepening 74, 131k/329k -> 147/8.4k
Queue full, depth 489, deepening 71, 131k/337k -> 156/8.6k
Queue full, depth 497, deepening 68, 131k/468k -> 162/8.9k
Queue full, depth 504, deepening 66, 131k/346k
x = 17, y = 100, rule = B3/S2-a34a
b2o11b2o$bo13bo$o2b4o3b4o2bo$2b5o3b5o$bo2bob2ob2obo2bo$2bobo7bo
bo$3b2obo3bob2o$4bo2bobo2bo$4bobo3bobo$b2obo2bobo2bob2o$b2ob2obo
bob2ob2o$b2o3bo3bo3b2o$2bo2b2o3b2o2bo$2bo3bo3bo3bo$4b3o3b3o$3bo2b
2ob2o2bo$5b3ob3o$2bo2bobobobo2bo$7bobo$2b4obobob4o$2b2o2b2ob2o2b
2o$b2o3b2ob2o3b2o$5bo5bo$2b2o9b2o$2b2o9b2o$b2o11b2o$2b3o7b3o$2bo
2bo5bo2bo$2bo2bo5bo2bo2$2bo2bo5bo2bo$3b2o7b2o$2bobo7bobo$2b2obo5b
ob2o$3bob3ob3obo$2b3o2bobo2b3o$3bo3bobo3bo$8bo2$2bobo7bobo$3bo9b
o$2obob2o3b2obob2o$2b2o2bo3bo2b2o$5b2o3b2o$5bo5bo2$3bobo5bobo$4b
o7bo$6bo3bo2$4b2obobob2o$5bobobobo$7bobo$7bobo$7bobo$6b2ob2o2$4b
obo3bobo2$5bo5bo$bo2bo2bobo2bo2bo$obobob2ob2obobobo$ob2o2bo3bo2b
2obo$4b2obobob2o$2bobo2bobo2bobo$3bo3bobo3bo$2bo3bo3bo3bo$3b2o7b
2o$3b2o7b2o2$4bobo3bobo$5bo5bo$4b4ob4o3$4bobo3bobo$4bo7bo$4b2ob3o
b2o3$6b2ob2o$6b2ob2o$7bobo$7bobo$7bobo$5bo5bo$4b2obobob2o$3bo9bo
$bo5bobo5bo$2b2obobobobob2o$2bo2bobobobo2bo$4b2obobob2o$3bobo2bo
2bobo$2bo2bo5bo2bo$3b3o5b3o$3b2o7b2o$3b2o7b2o$b2o2bo5bo2b2o$bob2o
7b2obo$obo11bobo!

 -> 176/9.1k
Queue full, depth 510, deepening 65, 131k/305k -> 200/8.9k
Queue full, depth 516, deepening 64, 131k/246k -> 257/9.6k
Queue full, depth 519, deepening 66, 131k/168k -> 212/9.0k
Queue full, depth 523, deepening 67, 131k/171k -> 193/8.4k
Queue full, depth 528, deepening 67, 131k/279k -> 191/8.7k
Queue full, depth 533, deepening 67, 131k/219k -> 177/8.5k
Queue full, depth 539, deepening 66, 131k/275k -> 184/8.8k
Queue full, depth 543, deepening 67, 131k/213k -> 166/8.5k
Queue full, depth 553, deepening 62, 131k/530k -> 171/9.3k
Queue full, depth 563, deepening 57, 131k/466k -> 192/9.5k
Queue full, depth 567, deepening 58, 131k/179k -> 205/9.2k
Queue full, depth 574, deepening 56, 131k/317k -> 204/8.8k
Queue full, depth 580, deepening 55, 131k/261k -> 216/9.3k
Queue full, depth 585, deepening 55, 131k/287k -> 226/9.3k
Queue full, depth 589, deepening 56, 131k/161k -> 219/8.7k
Queue full, depth 593, deepening 57, 131k/171k -> 243/8.8k
Queue full, depth 598, deepening 57, 131k/222k -> 259/8.8k
Queue full, depth 602, deepening 58, 131k/170k -> 269/9.0k
Queue full, depth 606, deepening 59, 131k/168k -> 308/9.3k
Queue full, depth 610, deepening 60, 131k/187k -> 287/9.0k
Queue full, depth 615, deepening 60, 131k/309k -> 282/8.5k
Queue full, depth 620, deepening 60, 131k/243k -> 322/8.8k
Queue full, depth 624, deepening 61, 131k/163k -> 386/9.2k
Queue full, depth 627, deepening 63, 131k/199k -> 415/9.8k
Queue full, depth 630, deepening 65, 131k/178k
x = 17, y = 125, rule = B3/S2-a34a
6b2ob2o$7bobo$4bobo3bobo2$3bo2bo3bo2bo$4b2obobob2o$7bobo$7bobo$
6b2ob2o2$6b2ob2o$5b3ob3o$6b2ob2o$7bobo$6b2ob2o$2bo3bo3bo3bo$bobo
2b2ob2o2bobo$2b2o2b2ob2o2b2o$5b2obob2o$6bobobo$8bo$4bob2ob2obo$4b
ob2ob2obo$b2o2bobobobo2b2o$o2bob3ob3obo2bo$b2o11b2o2$4b2o5b2o$4b
3o3b3o$4b2o5b2o$6b2ob2o$2b3obobobob3o$2bobobobobobobo$b2obo2bobo
2bob2o$obobo2bobo2bobobo$2bob2obobob2obo$bo4bo3bo4bo$3b2o7b2o$3b
2o7b2o$5bo5bo$6bo3bo$3b4o3b4o$3bo2bo3bo2bo$2b2ob2o3b2ob2o$2bo2b2o
3b2o2bo$b4obo3bob4o$2bo3bo3bo3bo$5bo5bo$3b2o7b2o$3b3o5b3o$2bo11b
o$2b3o7b3o2$4bo7bo$3b3o5b3o$b2o11b2o$2b2o2bo3bo2b2o$3b2o7b2o$4bo
7bo2$3b5ob5o$2b3o2b3o2b3o$3bo9bo$3bo9bo$bob2o7b2obo$bob2o7b2obo$
2o5bobo5b2o$2bo2b3ob3o2bo2$3bobo5bobo$4b2o5b2o$4bo7bo$4bo7bo$6bo
3bo$5b2o3b2o$5b2o3b2o$7bobo$6b2ob2o$7bobo$7bobo$6b2ob2o$6bo3bo2$
2bob2o5b2obo$2bo2bo5bo2bo$5b2o3b2o$b2obobo3bobob2o$b2obobo3bobob
2o$b3obo5bob3o$2b2ob3ob3ob2o$b2o3b2ob2o3b2o$2bo2bo5bo2bo$2b3o7b3o
2$4b3o3b3o$5bo5bo$4b2o5b2o$4bo2bobo2bo$8bo$4bo7bo$3bo9bo$4b9o$8b
o$7b3o$6bobobo$6b2ob2o$7bobo$7bobo$5bobobobo$4bob2ob2obo$6bo3bo$
4bo2bobo2bo$6bo3bo$b2obo2bobo2bob2o$2b2obobobobob2o$5bobobobo$2b
2obobobobob2o$5bo2bo2bo$3b3o5b3o$2bo11bo2$4bo7bo$bobobo5bobobo$b
o2bo7bo2bo$b2o11b2o!

 -> 452/10k
Queue full, depth 634, deepening 66, 131k/176k -> 500/10k
Queue full, depth 637, deepening 68, 131k/175k -> 511/11k
Queue full, depth 640, deepening 70, 131k/166k
x = 17, y = 129, rule = B3/S2-a34a
5bobobobo$4b2obobob2o$5bobobobo$5b3ob3o$5bo5bo2$4b2o5b2o2$6bo3b
o$6b2ob2o$6bo3bo$5bo5bo$4b2o5b2o$4bo7bo$6b5o$5b2obob2o$5b3ob3o2$
3b2o2bobo2b2o$3b2o7b2o$2bo3bo3bo3bo$4b2obobob2o$bo5bobo5bo$o2b2o
2bobo2b2o2bo$b2obo2bobo2bob2o$3b3obobob3o$7bobo$6b2ob2o$2bobo7bo
bo$2o3bo5bo3b2o2$bo4bo3bo4bo$o3bobo3bobo3bo$2b2ob2o3b2ob2o$4bob2o
b2obo$3b2obo3bob2o$4bobo3bobo$bo2bo2bobo2bo2bo$obobo2bobo2bobobo
$2bob2obobob2obo$bo4bo3bo4bo$3b2o7b2o$3b2o7b2o$5bo5bo$6bo3bo$3b4o
3b4o$3bo2bo3bo2bo$2b2ob2o3b2ob2o$2bo2b2o3b2o2bo$b4obo3bob4o$2bo3b
o3bo3bo$5bo5bo$3b2o7b2o$3b3o5b3o$2bo11bo$2b3o7b3o2$4bo7bo$3b3o5b
3o$b2o11b2o$2b2o2bo3bo2b2o$3b2o7b2o$4bo7bo2$3b5ob5o$2b3o2b3o2b3o
$3bo9bo$3bo9bo$bob2o7b2obo$bob2o7b2obo$2o5bobo5b2o$2bo2b3ob3o2bo
2$3bobo5bobo$4b2o5b2o$4bo7bo$4bo7bo$6bo3bo$5b2o3b2o$5b2o3b2o$7bo
bo$6b2ob2o$7bobo$7bobo$6b2ob2o$6bo3bo2$2bob2o5b2obo$2bo2bo5bo2bo
$5b2o3b2o$b2obobo3bobob2o$b2obobo3bobob2o$b3obo5bob3o$2b2ob3ob3o
b2o$b2o3b2ob2o3b2o$2bo2bo5bo2bo$2b3o7b3o2$4b3o3b3o$5bo5bo$4b2o5b
2o$4bo2bobo2bo$8bo$4bo7bo$3bo9bo$4b9o$8bo$7b3o$6bobobo$6b2ob2o$7b
obo$7bobo$5bobobobo$4bob2ob2obo$6bo3bo$4bo2bobo2bo$6bo3bo$b2obo2b
obo2bob2o$2b2obobobobob2o$5bobobobo$2b2obobobobob2o$5bo2bo2bo$3b
3o5b3o$2bo11bo2$4bo7bo$bobobo5bobobo$bo2bo7bo2bo$b2o11b2o!

 -> 424/10k
Queue full, depth 643, deepening 72, 131k/178k -> 385/11k
Queue full, depth 647, deepening 73, 131k/170k -> 371/11k
Queue full, depth 651, deepening 74, 131k/172k -> 351/11k
Queue full, depth 655, deepening 75, 131k/176k -> 354/11k
Queue full, depth 658, deepening 77, 131k/158k -> 396/12k
Queue full, depth 661, deepening 79, 131k/168k -> 319/11k
Queue full, depth 665, deepening 80, 131k/176k -> 293/11k
Queue full, depth 670, deepening 80, 131k/224k -> 269/11k
Queue full, depth 675, deepening 80, 131k/241k -> 264/11k
Queue full, depth 679, deepening 81, 131k/167k -> 250/11k
Queue full, depth 684, deepening 81, 131k/274k -> 241/11k
Queue full, depth 688, deepening 82, 131k/199k -> 224/10k
Queue full, depth 692, deepening 83, 131k/162k -> 203/10k
Queue full, depth 696, deepening 84, 131k/178k -> 183/10k
Queue full, depth 701, deepening 84, 131k/276k -> 162/9.8k
Queue full, depth 705, deepening 85, 131k/159k -> 161/9.6k
Queue full, depth 709, deepening 86, 131k/171k -> 148/9.3k
Queue full, depth 714, deepening 86, 131k/198k -> 135/9.1k
Queue full, depth 719, deepening 86, 131k/267k -> 124/9.0k
Queue full, depth 725, deepening 85, 131k/261k
x = 17, y = 147, rule = B3/S2-a34a
b2o11b2o$4bo7bo$2bo2bo5bo2bo$3bo2bo3bo2bo$3bo4bo4bo$8bo$4bo7bo$
4b2o5b2o$6b5o2$5bo5bo$3b2o7b2o$5b2o3b2o$2b3obo3bob3o$3bo3bobo3bo
$2b2o2b2ob2o2b2o$5bobobobo$4b2obobob2o$3bo2bo3bo2bo2$5b3ob3o$6bo
3bo$4b3obob3o$3b2o3bo3b2o$2bob2o5b2obo$2bo11bo$3bo9bo$3b2o7b2o2$
3o2bo5bo2b3o$b2obo7bob2o$obo3bo3bo3bobo$b2o2bo5bo2b2o$bo2b3o3b3o
2bo$3b3o5b3o$3b2obo3bob2o$2bo4bobo4bo$7bobo$bo2b3o3b3o2bo$bo3bo5b
o3bo$bo13bo$2bobo7bobo$2b2o9b2o$3bo2bo3bo2bo$3b2ob2ob2ob2o2$2bob
2ob3ob2obo$2obo2bo3bo2bob2o$bo6bo6bo$8bo$5bo2bo2bo$5b3ob3o$5bo5b
o$4bo7bo$4bo7bo$4bo7bo$2bobo2bobo2bobo$2bob2obobob2obo$2b3o7b3o$
2b3o7b3o$b2obo7bob2o$2bobo7bobo$bobo9bobo$4bo7bo$b2o11b2o$bo13bo
$bo2bo7bo2bo$b2o11b2o$5bobobobo$2bob3o3b3obo$2bo3bo3bo3bo$5bo5bo
$4bobo3bobo$5bobobobo2$8bo$7b3o$5bo5bo$5bo5bo$5bo5bo2$b2ob2o5b2o
b2o$b3o9b3o$3bo9bo$bobo4bo4bobo$b2o5bo5b2o$2o2bobobobobo2b2o$b2o
b3o3b3ob2o$2bobo7bobo$2b2o9b2o$4bo7bo2$4b2o5b2o$3b2o7b2o$5bo5bo$
3bo9bo$3bo2b2ob2o2bo$b2ob2obobob2ob2o$2b2obobobobob2o$6bo3bo$2b2o
9b2o$bo4bo3bo4bo$3bo9bo$2b5o3b5o$3b2ob2ob2ob2o$7bobo$5bobobobo$4b
2obobob2o$4b2obobob2o$2b2o3bobo3b2o$b2ob2obobob2ob2o$obo3b2ob2o3b
obo$obobo7bobobo$b3ob2o3b2ob3o$5bo5bo2$4bo7bo$2b2o9b2o$3bo9bo$4b
o7bo$bobo2bobobo2bobo$2b13o$3b2o7b2o2$7bobo$6b2ob2o$6bo3bo$3bobo
5bobo$b2o3bo3bo3b2o$bo4bo3bo4bo$bo2b2o5b2o2bo$3b2o7b2o$4bo7bo$4b
o7bo$3bo3bobo3bo$3bob2o3b2obo$3b2o7b2o$b2o2b2o3b2o2b2o$6bo3bo$b3o
9b3o2$bobo9bobo$6bo3bo$3ob2o5b2ob3o$2bobo7bobo$2b3o7b3o$2b3o7b3o
!

 -> 119/8.6k
Queue full, depth 732, deepening 83, 131k/359k -> 125/8.8k
Queue full, depth 737, deepening 83, 131k/261k -> 137/8.6k
Queue full, depth 744, deepening 81, 131k/305k -> 155/8.7k
Queue full, depth 750, deepening 80, 131k/234k -> 221/9.4k
Queue full, depth 753, deepening 82, 131k/161k -> 279/9.5k
Queue full, depth 756, deepening 84, 131k/172k -> 123/8.8k
Queue full, depth 763, deepening 82, 131k/356k -> 110/8.2k
Queue full, depth 769, deepening 81, 131k/289k -> 99/8.1k
Queue full, depth 775, deepening 80, 131k/291k -> 102/8.3k
Queue full, depth 780, deepening 80, 131k/309k -> 124/8.8k
Queue full, depth 785, deepening 80, 131k/227k -> 120/8.5k
Queue full, depth 794, deepening 76, 131k/438k -> 131/9.1k
Queue full, depth 800, deepening 75, 131k/304k -> 144/9.1k
Queue full, depth 806, deepening 74, 131k/375k -> 145/9.4k
Queue full, depth 814, deepening 71, 131k/308k -> 132/9.7k
Queue full, depth 821, deepening 69, 131k/333k -> 146/9.3k
Queue full, depth 828, deepening 67, 131k/344k -> 162/9.6k
Queue full, depth 835, deepening 65, 131k/367k -> 164/9.9k
Queue full, depth 843, deepening 62, 131k/413k -> 174/9.8k
Queue full, depth 850, deepening 60, 131k/451k -> 175/9.7k
Queue full, depth 857, deepening 58, 131k/398k -> 213/10k
Queue full, depth 863, deepening 57, 131k/329k -> 229/10k
Queue full, depth 870, deepening 55, 131k/323k -> 278/10k
Queue full, depth 876, deepening 54, 131k/387k -> 254/11k
Queue full, depth 882, deepening 53, 131k/275k
x = 17, y = 177, rule = B3/S2-a34a
5bobobobo$4b2obobob2o$5bobobobo$5b3ob3o$5bo5bo2$4b2o5b2o2$6bo3b
o$5b2o3b2o$7bobo$4bo7bo$4b2o5b2o$3bobo5bobo2$2b2obo5bob2o$3bo9bo
$5bo5bo$3b4o3b4o$5b7o$2b2o3b3o3b2o2$3bo9bo2$4b2o5b2o$4b2o5b2o$b3o
9b3o$2b2o9b2o2$3bo9bo$4o9b4o$3b2o7b2o2$4bobo3bobo$5bo5bo$bo2bo2b
obo2bo2bo$b2o3b2ob2o3b2o$bobo3bobo3bobo$7b3o$bo5b3o5bo$b2o11b2o$
2o2bo7bo2b2o$bob2o7b2obo$2o13b2o$bo2bo7bo2bo$b2ob2o5b2ob2o2$4bo7b
o$3bobo5bobo$2b3obo3bob3o$bobo9bobo$b2o3bo3bo3b2o$5bobobobo$4b3o
3b3o$2b2ob2o3b2ob2o$bo4b2ob2o4bo$o2bo3bobo3bo2bo$b3o2b2ob2o2b3o$
6b2ob2o2$4b2o5b2o$3obo7bob3o$4b3o3b3o$3b2obo3bob2o$5b3ob3o$2bo3b
o3bo3bo$3b4o3b4o$6bo3bo$5bob3obo$5bob3obo$6bo3bo$7b3o2$7b3o$bob2o
bobobob2obo$bobob2o3b2obobo$2o2b4ob4o2b2o$2b2o9b2o$3bob2o3b2obo$
2bo3bobobo3bo$7bobo$3bob2o3b2obo$3bo9bo$4bob2ob2obo$4b3o3b3o$3bo
9bo$4bo7bo$3b3o5b3o$4bobo3bobo$5b2o3b2o$5bobobobo$7bobo$6b2ob2o$
7bobo$7bobo$7bobo$6bo3bo2$5b2o3b2o$5b2o3b2o$4bo7bo$4b3o3b3o$3bo2b
2ob2o2bo$3bo2b2ob2o2bo$6bo3bo$5bobobobo$6bo3bo$o6bobo6bo$b2o3b2o
b2o3b2o$b2obobo3bobob2o$3b2o7b2o$3bo2bo3bo2bo$2b2o2b2ob2o2b2o$2b
2o2bo3bo2b2o$3bobo5bobo$2b2o9b2o$2b2o9b2o$3bob2o3b2obo$5bobobobo
$4b2obobob2o$5bobobobo$6b2ob2o$4bo7bo$4bo7bo$4bobo3bobo2$5b3ob3o
$6b2ob2o$6bo3bo$8bo2$7b3o$2o5bobo5b2o$o3bo2bobo2bo3bo$b2o2b2o3b2o
2b2o$2b3o7b3o$4b3o3b3o$5bobobobo$6b2ob2o$6b2ob2o$3bo3bobo3bo$4b2o
bobob2o$7bobo$5bobobobo$4bobo3bobo$5b2o3b2o2$4bobo3bobo$5bo5bo$4b
4ob4o3$4bobo3bobo$4bo7bo$4b2ob3ob2o3$6b2ob2o$6b2ob2o$7bobo$7bobo
$7bobo$5bo5bo$4b2obobob2o$3bo9bo$bo5bobo5bo$2b2obobobobob2o$2bo2b
obobobo2bo$4b2obobob2o$3bobo2bo2bobo$2bo2bo5bo2bo$3b3o5b3o$3b2o7b
2o$3b2o7b2o$b2o2bo5bo2b2o$bob2o7b2obo$obo11bobo!

 -> 257/10k
Queue full, depth 888, deepening 52, 131k/309k -> 267/11k
Queue full, depth 895, deepening 50, 131k/418k -> 303/11k
Queue full, depth 899, deepening 51, 131k/166k -> 426/11k
Queue full, depth 902, deepening 53, 131k/155k -> 287/10k
Queue full, depth 906, deepening 54, 131k/248k -> 254/11k
Queue full, depth 911, deepening 54, 131k/258k -> 302/11k
Queue full, depth 915, deepening 55, 131k/173k
x = 17, y = 182, rule = B3/S2-a34a
6b2ob2o$7bobo$4bobo3bobo2$3bo2bo3bo2bo$4b2obobob2o$7bobo$7bobo$
5bobobobo$4bo2bobo2bo$bo5bobo5bo$b2ob2obobob2ob2o$b4o2bobo2b4o$2b
2ob3ob3ob2o2$2bob2o5b2obo$2bob2o5b2obo$2o3b2o3b2o3b2o$bobo9bobo$
7bobo$2b2obobobobob2o$7bobo$b4o7b4o$4bob2ob2obo$o5bo3bo5bo$b2ob3o
3b3ob2o$5b2obob2o3$6bobobo$8bo$5bo2bo2bo$5b3ob3o2$2bo11bo$2b2o9b
2o$bo13bo$4b2o5b2o$3bo9bo2$4b2ob3ob2o$4bo7bo$4bo7bo$6bo3bo$6bobo
bo$3bo9bo$4bobo3bobo$3b2o2bobo2b2o$5bobobobo$3bobobobobobo$3bobo
bobobobo$3bo3bobo3bo$4bo2bobo2bo$4bo2bobo2bo$5b7o$3bo3bobo3bo$4b
o3bo3bo$4bobo3bobo$5bo5bo$b2ob2o5b2ob2o$2bobo7bobo$bo13bo$4bo7bo
$b3o9b3o$4bo7bo$bobobo5bobobo$bob3o5b3obo$bo2bo7bo2bo$2b2obo5bob
2o$2bob2obobob2obo$3b2o2bobo2b2o$4b2obobob2o$bo5bobo5bo$2b2o2bo3b
o2b2o$5bo5bo$bo13bo$bobo9bobo$3bobo5bobo$4b3o3b3o$8bo$bo5b3o5bo$
o15bo$b5obobob5o$7bobo$6bo3bo$4b3obob3o$3bo4bo4bo$6bo3bo$3bo2bo3b
o2bo$6bo3bo$3b2obo3bob2o$bo3b2o3b2o3bo$2bo2b2o3b2o2bo$4bo7bo$4b2o
5b2o$2bo11bo$2bobo7bobo$bob2o7b2obo$bo13bo$obo11bobo$obo11bobo$3b
2o7b2o$bob2o7b2obo$6bo3bo$3b2ob2ob2ob2o$3bo2b2ob2o2bo$4bo2bobo2b
o$5b3ob3o$6bobobo$7bobo3$5b3ob3o$6bo3bo$3b2o7b2o$bobobo5bobobo$2o
2bo7bo2b2o$3bo9bo$3bo9bo2$bobo3b3o3bobo$bobobo5bobobo$bo2bo7bo2b
o$4bo7bo$3bobo5bobo2$4b2o5b2o$3b2o7b2o2$3b2ob2ob2ob2o$7bobo$3bob
obobobobo$2b2obobobobob2o$bo2b3o3b3o2bo$3bo9bo$2b2o9b2o$2b2o3bob
o3b2o$2bob4ob4obo$2bobo2bobo2bobo$5bobobobo$3b2o2bobo2b2o$4b2obo
bob2o$7bobo$4b2obobob2o$2bob2obobob2obo$bo2bo2bobo2bo2bo$o3bo7bo
3bo$b2o2b2o3b2o2b2o$b2ob2o5b2ob2o$3bo9bo$4bo7bo$4bo7bo$2bo2bo5bo
2bo$2bob2o5b2obo$3bobo5bobo$3bo2bo3bo2bo$3bob2obob2obo$3bob2obob
2obo$7bobo$7bobo$5bobobobo$bo2bo7bo2bo$obo2bobobobo2bobo$6bo3bo$
b5o5b5o$2bo11bo2$3bo2bo3bo2bo$6bo3bo$2b2ob2o3b2ob2o2$2bo2bo5bo2b
o$5b2o3b2o$2b3o7b3o$2bo11bo$2b2o9b2o$b3obo5bob3o$b2ob2o5b2ob2o$b
2ob2o5b2ob2o2$2b3o7b3o$3bo9bo!

 -> 317/11k
Queue full, depth 919, deepening 56, 131k/175k -> 343/11k
Queue full, depth 922, deepening 58, 131k/173k -> 396/12k
Queue full, depth 925, deepening 60, 131k/160k -> 370/11k
Queue full, depth 929, deepening 61, 131k/181k -> 236/9.9k
Queue full, depth 934, deepening 61, 131k/239k -> 224/10k
Queue full, depth 940, deepening 60, 131k/312k -> 235/10k
Queue full, depth 945, deepening 60, 131k/275k -> 251/10k
Queue full, depth 951, deepening 59, 131k/349k -> 255/11k
Queue full, depth 956, deepening 59, 131k/280k -> 235/10k
Queue full, depth 960, deepening 60, 131k/192k -> 240/10k
Queue full, depth 968, deepening 57, 131k/453k -> 237/11k
Queue full, depth 974, deepening 56, 131k/289k -> 228/11k
Queue full, depth 980, deepening 55, 131k/330k -> 219/11k
Queue full, depth 987, deepening 53, 131k/357k -> 206/11k
Queue full, depth 994, deepening 51, 131k/343k -> 220/11k
Queue full, depth 1002, deepening 48, 131k/412k -> 241/11k
Queue full, depth 1009, deepening 46, 131k/294k -> 307/12k
Queue full, depth 1013, deepening 47, 131k/168k -> 312/12k
Queue full, depth 1017, deepening 48, 131k/172k -> 283/12k
Queue full, depth 1021, deepening 49, 131k/171k -> 255/11k
Queue full, depth 1026, deepening 49, 131k/293k -> 232/12k
Queue full, depth 1033, deepening 47, 131k/333k -> 250/11k
Queue full, depth 1038, deepening 47, 131k/274k -> 264/11k
Queue full, depth 1047, deepening 43, 131k/469k -> 276/11k
Queue full, depth 1054, deepening 41, 131k/347k -> 288/12k
Queue full, depth 1063, deepening 37, 131k/452k -> 286/13k
Queue full, depth 1073, deepening 32, 131k/556k -> 369/13k
Queue full, depth 1080, deepening 30, 131k/364k -> 503/13k
Queue full, depth 1087, deepening 28, 131k/405k -> 786/15k
Queue full, depth 1093, deepening 27, 131k/339k -> 956/16k
Queue full, depth 1098, deepening 27, 131k/324k -> 994/17k
Queue full, depth 1104, deepening 26, 131k/311k -> 1.1k/18k
Queue full, depth 1108, deepening 27, 131k/233k -> 1.1k/17k
Queue full, depth 1112, deepening 28, 131k/201k -> 1.1k/16k
Queue full, depth 1116, deepening 29, 131k/199k -> 1.0k/15k
Queue full, depth 1120, deepening 30, 131k/200k -> 997/14k
Queue full, depth 1124, deepening 31, 131k/208k -> 935/14k
Queue full, depth 1129, deepening 31, 131k/298k -> 999/15k
Queue full, depth 1134, deepening 31, 131k/251k -> 1.0k/15k
Queue full, depth 1137, deepening 33, 131k/195k -> 939/14k
Queue full, depth 1141, deepening 34, 131k/198k
x = 17, y = 227, rule = B3/S2-a34a
6b2ob2o$7bobo$4bobo3bobo2$3bo2bo3bo2bo$4b2obobob2o$7bobo$7bobo$
5bobobobo$4b2obobob2o$4bo2bobo2bo$4bo2bobo2bo$4bo2bobo2bo$5b2o3b
2o$5bobobobo$5b3ob3o$4b2o5b2o$4b9o$4bo7bo$4bo7bo$3bo9bo$3b2o7b2o
$3bo9bo$b2o11b2o$2b3o7b3o$6bo3bo$3b2ob2ob2ob2o$7bobo$bo3bobobobo
3bo$bo3b2o3b2o3bo$2ob2obo3bob2ob2o$2b2ob7ob2o$3bo3b3o3bo$2bo11bo
$2b3o7b3o$3bo9bo$6bo3bo$4bo2bobo2bo$7bobo$3b3o5b3o$bo3b7o3bo$b2o
2b2obob2o2b2o$7bobo$bobo4bo4bobo$bo2bo3bo3bo2bo$4bo3bo3bo$3b2o7b
2o$3b2o7b2o$5b3ob3o$3bobo5bobo$7bobo$3b4o3b4o$5bo5bo2$6b2ob2o$5b
obobobo$2b2obobobobob2o$4bobo3bobo2$2bo11bo$2b3o7b3o3$2o13b2o$bo
bo9bobo$2b4o5b4o$5bo5bo$3bo9bo$4b2o5b2o$2bo3b2ob2o3bo$8bo$2b2o9b
2o2$4bo7bo$5bo5bo$2bo2bo5bo2bo$4bo7bo$b2o11b2o$2bo11bo$o15bo$b3o
9b3o$bo2bo7bo2bo$5bo5bo2$4b3o3b3o$o15bo$b2o2b3ob3o2b2o$3bo3bobo3b
o$2bo5bo5bo$o7bo7bo$bo6bo6bo$2obo9bob2o$bob2o7b2obo$bo2bo7bo2bo$
b2o11b2o$2b3o7b3o$4bobo3bobo$4b3o3b3o$5b3ob3o$2b2o9b2o$bobo9bobo
$b2o3b2ob2o3b2o$5bo5bo$4bo2bobo2bo$3bo2bo3bo2bo$b2o3b2ob2o3b2o$o
b2o3bobo3b2obo$b2o4bobo4b2o$7bobo$4bobo3bobo$o2bo9bo2bo$bo3bo5bo
3bo$bo3bo5bo3bo$4bo2bobo2bo$2bobobo3bobobo$2bo4bobo4bo$3b3o5b3o$
6bo3bo$5bobobobo$5bo2bo2bo$6bo3bo$7b3o$8bo$7bobo$3b2obo3bob2o$4o
b2obob2ob4o$bo6bo6bo$5bo5bo$2b4o5b4o$5bo5bo$3bo3b3o3bo$2bo3b5o3b
o$4bobo3bobo$4bob2ob2obo$3b2o2bobo2b2o2$3bobo5bobo$4bo7bo$4bo7bo
$5b3ob3o2$6bo3bo$6b2ob2o$7bobo$7bobo$5bobobobo$4bo2bobo2bo2$4bo2b
obo2bo$5b2o3b2o2$4b3o3b3o$3bo2bo3bo2bo$3b2obo3bob2o$6bo3bo$6b2ob
2o$bo4b2ob2o4bo$o6bobo6bo$b3o2bo3bo2b3o$2bo3bo3bo3bo$4b2o5b2o$3b
ob2o3b2obo$3bo2bo3bo2bo$3b2obo3bob2o$3bobo5bobo$b2o11b2o$2bo11bo
$2bo3bo3bo3bo$4b2obobob2o$5bobobobo$6b2ob2o$6bo3bo$4b2o5b2o$4b3o
3b3o2$5bo5bo$6bo3bo$6b2ob2o$7bobo2$8bo2$2o4b2ob2o4b2o$obobo2bobo
2bobobo$b3ob2o3b2ob3o$4bo7bo$5b2o3b2o$4bo2bobo2bo$7bobo$3bo3bobo
3bo$3bo3bobo3bo$4b2obobob2o$5bobobobo$4b2obobob2o$6bo3bo$5bo5bo$
5bo5bo2$4b3o3b3o$5bo2bo2bo$8bo2$3bo2b5o2bo$4b9o$5bo5bo2$6bo3bo$6b
o3bo$7bobo$7bobo$5bobobobo$7bobo$6bo3bo$5b3ob3o$3bob3ob3obo$2bob
2obobob2obo$b3obobobobob3o$5bobobobo$5bobobobo$2bo2bo2bo2bo2bo$3b
3o5b3o$3b2o7b2o2$4bo7bo$2b2obo5bob2o$2ob2o7b2ob2o$bo13bo!

 -> 977/14k
Queue full, depth 1145, deepening 35, 131k/184k -> 1.0k/14k
Queue full, depth 1148, deepening 37, 131k/187k -> 1.1k/15k
Queue full, depth 1150, deepening 40, 131k/157k -> 1.0k/14k
Queue full, depth 1153, deepening 42, 131k/196k -> 703/12k
Queue full, depth 1157, deepening 43, 131k/184k -> 628/12k
Queue full, depth 1162, deepening 43, 131k/298k -> 558/13k
Queue full, depth 1167, deepening 43, 131k/279k -> 536/12k
Queue full, depth 1172, deepening 43, 131k/244k -> 546/13k
Queue full, depth 1177, deepening 43, 131k/268k -> 552/13k
Queue full, depth 1181, deepening 44, 131k/277k -> 482/13k
Queue full, depth 1187, deepening 43, 131k/363k -> 480/13k
Queue full, depth 1194, deepening 41, 131k/338k -> 487/14k
Queue full, depth 1201, deepening 39, 131k/466k -> 431/14k
Queue full, depth 1209, deepening 36, 131k/402k -> 505/15k
Queue full, depth 1214, deepening 36, 131k/243k -> 496/14k
Queue full, depth 1220, deepening 35, 131k/347k -> 473/14k
Queue full, depth 1228, deepening 32, 131k/400k -> 483/14k
Queue full, depth 1236, deepening 29, 131k/482k -> 549/14k
Queue full, depth 1243, deepening 27, 131k/382k -> 598/15k
Queue full, depth 1254, deepening 21, 131k/693k -> 821/17k
Queue full, depth 1261, deepening 19, 131k/352k -> 1.1k/17k
Queue full, depth 1265, deepening 20, 131k/232k -> 942/15k
Queue full, depth 1273, deepening 17, 131k/429k -> 1.2k/18k
Queue full, depth 1282, deepening 13, 131k/536k -> 2.1k/22k
Queue full, depth 1287, deepening 13, 131k/319k -> 2.3k/21k
Queue full, depth 1292, deepening 13, 131k/329k -> 2.8k/22k
Queue full, depth 1295, deepening 15, 131k/275k -> 2.5k/20k
Queue full, depth 1301, deepening 14, 131k/344k -> 3.0k/24k
Queue full, depth 1305, deepening 15, 131k/260k -> 2.6k/22k
Queue full, depth 1310, deepening 15, 131k/328k -> 2.2k/22k
Queue full, depth 1317, deepening 13, 131k/448k -> 2.4k/24k
Queue full, depth 1324, deepening 11, 131k/506k -> 3.0k/28k
Queue full, depth 1330, deepening 10, 131k/415k -> 4.1k/32k
Queue full, depth 1336, deepening 9, 131k/371k -> 4.7k/35k
Queue full, depth 1340, deepening 10, 131k/276k -> 4.9k/32k
Queue full, depth 1342, deepening 13, 131k/235k -> 3.7k/24k
Queue full, depth 1345, deepening 15, 131k/201k -> 3.2k/21k
Queue full, depth 1348, deepening 17, 131k/217k -> 2.4k/18k
Queue full, depth 1352, deepening 18, 131k/219k -> 2.1k/18k
Queue full, depth 1356, deepening 19, 131k/213k -> 1.9k/18k
Queue full, depth 1359, deepening 21, 131k/206k -> 1.3k/15k
Queue full, depth 1365, deepening 20, 131k/318k -> 1.5k/18k
Queue full, depth 1370, deepening 20, 131k/303k -> 1.5k/17k
Queue full, depth 1376, deepening 19, 131k/330k -> 1.6k/18k
Queue full, depth 1383, deepening 17, 131k/442k -> 1.8k/21k
Queue full, depth 1390, deepening 15, 131k/425k -> 2.0k/23k
Queue full, depth 1396, deepening 14, 131k/384k -> 2.2k/24k
Queue full, depth 1403, deepening 12, 131k/446k -> 2.9k/26k
Queue full, depth 1409, deepening 11, 131k/420k -> 4.5k/32k
Queue full, depth 1413, deepening 12, 131k/254k -> 4.3k/30k
Queue full, depth 1417, deepening 13, 131k/242k -> 3.8k/28k
Queue full, depth 1420, deepening 15, 131k/238k -> 2.7k/23k
Queue full, depth 1424, deepening 16, 131k/227k -> 2.1k/21k
Queue full, depth 1429, deepening 16, 131k/299k -> 2.1k/21k
Queue full, depth 1433, deepening 17, 131k/278k -> 2.4k/20k
Queue full, depth 1437, deepening 18, 131k/229k -> 2.3k/20k
Queue full, depth 1441, deepening 19, 131k/269k -> 2.1k/20k
Queue full, depth 1446, deepening 19, 131k/263k -> 2.0k/21k
Queue full, depth 1452, deepening 18, 131k/390k
x = 17, y = 290, rule = B3/S2-a34a
4bobo3bobo$3b4o3b4o2$4bo7bo$3bobo5bobo$3bo9bo$4b2o5b2o$3b2o7b2o
2$3bo9bo$4bobo3bobo$3bob3ob3obo$5bobobobo$b3obobobobob3o$4bobo3b
obo$2bo11bo$3bo9bo$3bo2bo3bo2bo$2bo3b2ob2o3bo$2b3o2bobo2b3o$4b2o
bobob2o$4bo2bobo2bo$4bo2bobo2bo$5bobobobo$b2o4bobo4b2o$4b2obobob
2o$obobob2ob2obobobo$o3bo2bobo2bo3bo$b3obo5bob3o$2bobobo3bobobo2$
3bo9bo$3b2o7b2o$2b3o7b3o$2b3o7b3o$6bobobo$6bobobo$2b3ob5ob3o2$6b
o3bo$6b2ob2o$5b3ob3o$2bo2b2o3b2o2bo$b2o2b2o3b2o2b2o$2o4bo3bo4b2o
$2b4o5b4o$3bo9bo$4b2o5b2o$3b2o7b2o$3bob2o3b2obo$2b2ob2o3b2ob2o$3b
o9bo$2b5o3b5o$3bobo5bobo$2bo11bo$bobo9bobo2$o2b3o5b3o2bo$b2ob2o5b
2ob2o2$bo3bo5bo3bo$2bobo7bobo$3bo9bo$6bo3bo$6bo3bo$6bo3bo$4b3o3b
3o$4bo7bo$4b2obobob2o$7bobo$6b2ob2o$5bobobobo$5bobobobo$3bo3bobo
3bo$3bo3bobo3bo$7bobo$3b3obobob3o$5bobobobo2$6bo3bo$3bo2bo3bo2bo
$2bobobo3bobobo$2bob2ob3ob2obo2$2bobo7bobo$2bo2bo5bo2bo$4bo7bo$2b
2o9b2o$b3o9b3o$4b2obobob2o$5bobobobo$7bobo$2bo4bobo4bo$2o6bo6b2o
$3bo4bo4bo$2b4o2bo2b4o$2bo5bo5bo$b2obo7bob2o$2b2o9b2o$3bo9bo$5b2o
3b2o$7bobo$3bob2o3b2obo$5bo5bo$2bo3b5o3bo$b2o3b2ob2o3b2o$b2o11b2o
$2bob4ob4obo$2bo2b2obob2o2bo$3bob2o3b2obo$2b2o2bo3bo2b2o$3bob3ob
3obo$3b4o3b4o$3bo2bo3bo2bo$4bobo3bobo$4bo2bobo2bo2$7bobo$4b2obob
ob2o$3bo3bobo3bo$3bob2o3b2obo$4b2o5b2o2$3bo9bo$2bo11bo$2bo11bo$3o
11b3o$3b2o7b2o$3b2o7b2o$3b2o7b2o$3bob2o3b2obo$8bo$2bo2bo5bo2bo$7b
obo$2b2o4bo4b2o2$4bo7bo$4b2o5b2o$2bo2bo5bo2bo2$b3o9b3o$2b2o9b2o$
bo13bo$bo13bo$bobo9bobo$3b3o5b3o$5bo5bo$4b3o3b3o$2bo2bo5bo2bo$2o
bo2b2ob2o2bob2o2$2bo3bo3bo3bo$2bo4bobo4bo$2bo5bo5bo$o15bo$4bo7bo
$2ob2o7b2ob2o$3bobo5bobo$bob2o7b2obo$3b3o5b3o$4bo7bo$2bo2bo5bo2b
o$5bo5bo$bo2b2o5b2o2bo$b2o3bo3bo3b2o$4bo2bobo2bo$3bo3bobo3bo$2b2o
9b2o$bob3obobob3obo$o15bo$b3o2bo3bo2b3o$2bo3b2ob2o3bo$5b2o3b2o$b
ob2o7b2obo$bo4bo3bo4bo$b2o3bo3bo3b2o2$3b2o2bobo2b2o$3bo9bo$3b2ob
2ob2ob2o$8bo$5bo5bo$5bo5bo$6bo3bo$7b3o2$7b3o$3b2obobobob2o$bobo4b
o4bobo$bo13bo$b3o3bobo3b3o$3b2ob2ob2ob2o$5b2obob2o$5bob3obo$4bob
o3bobo$3bo3bobo3bo$3b2obo3bob2o$3b2ob2ob2ob2o$3bo9bo$5bo5bo$3bo9b
o$3bo2bo3bo2bo$4bo2bobo2bo$7bobo$7bobo$6b2ob2o$7bobo$6b2ob2o$6b2o
b2o2$5b2o3b2o$5b2o3b2o$4bobo3bobo$4bo7bo$3b2ob2ob2ob2o$3bo3bobo3b
o$5bobobobo$5bo5bo$5bobobobo$6b2ob2o$bo5bobo5bo$ob2ob3ob3ob2obo$
bo5bobo5bo$4bo7bo$5bobobobo$2bob4ob4obo$2bo2b3ob3o2bo2$2bo11bo$2b
o11bo$2bo2b2o3b2o2bo$7bobo$4b2obobob2o$4b2obobob2o$5b3ob3o$5bo5b
o$3b2o7b2o$5bo5bo$7bobo$7bobo$7bobo$8bo2$7bobo$7bobo$o5b2ob2o5bo
$obo2bobobobo2bobo$b2o2b2o3b2o2b2o$b2o11b2o$6bo3bo$4bo2bobo2bo$5b
o5bo$6bo3bo$4b2obobob2o$4bo2bobo2bo$4b2obobob2o$5bobobobo$4bo2bo
bo2bo$5b2o3b2o$6bo3bo$5bo5bo$7bobo$5b2o3b2o$5b2o3b2o2$5bo5bo$3b2o
b5ob2o$4bo3bo3bo$8bo2$6b2ob2o$6bo3bo$7bobo$6b2ob2o$6bo3bo$4bo7bo
$4b3o3b3o$4bobo3bobo$3b2obo3bob2o$b2obo2bobo2bob2o$5bobobobo$3bo
bobobobobo$3bobo2bo2bobo$2bo2b2o3b2o2bo$2bo2bo5bo2bo$2bo11bo$5bo
5bo$bo3bo5bo3bo$o2b2o7b2o2bo$b3o9b3o!

 -> 1.8k/22k
Queue full, depth 1458, deepening 17, 131k/361k -> 2.0k/23k
Queue full, depth 1463, deepening 17, 131k/326k -> 1.9k/21k
Queue full, depth 1466, deepening 19, 131k/200k -> 2.4k/19k
Queue full, depth 1468, deepening 22, 131k/170k -> 1.8k/15k
Queue full, depth 1472, deepening 23, 131k/214k -> 1.7k/17k
Queue full, depth 1477, deepening 23, 131k/264k -> 1.6k/18k
Queue full, depth 1482, deepening 23, 131k/322k -> 1.4k/18k
Queue full, depth 1488, deepening 22, 131k/340k -> 1.4k/19k
Queue full, depth 1491, deepening 24, 131k/225k -> 1.3k/16k
Queue full, depth 1495, deepening 25, 131k/200k -> 1.2k/15k
Queue full, depth 1500, deepening 25, 131k/297k -> 1.2k/16k
Queue full, depth 1505, deepening 25, 131k/267k -> 1.3k/17k
Queue full, depth 1509, deepening 26, 131k/207k -> 1.1k/16k
Queue full, depth 1514, deepening 26, 131k/264k -> 1.1k/15k
Queue full, depth 1519, deepening 26, 131k/354k -> 943/15k
Queue full, depth 1526, deepening 24, 131k/383k -> 1.0k/17k
Queue full, depth 1532, deepening 23, 131k/355k -> 994/16k
Queue full, depth 1540, deepening 20, 131k/524k -> 1.1k/18k
Queue full, depth 1547, deepening 18, 131k/436k -> 1.3k/18k
Queue full, depth 1553, deepening 17, 131k/363k -> 1.4k/18k
Queue full, depth 1561, deepening 14, 131k/533k -> 1.8k/22k
Queue full, depth 1569, deepening 11, 131k/518k -> 3.1k/28k
Queue full, depth 1573, deepening 12, 131k/220k -> 3.5k/25k
Queue full, depth 1577, deepening 13, 131k/237k -> 3.8k/25k
Queue full, depth 1581, deepening 14, 131k/271k -> 3.7k/27k
Queue full, depth 1585, deepening 15, 131k/281k -> 3.0k/26k
Queue full, depth 1590, deepening 15, 131k/296k -> 2.6k/26k
Queue full, depth 1596, deepening 14, 131k/411k -> 2.9k/28k
Queue full, depth 1602, deepening 13, 131k/453k -> 2.7k/29k
Queue full, depth 1608, deepening 12, 131k/327k -> 2.9k/29k
Queue full, depth 1613, deepening 12, 131k/355k -> 3.4k/28k
Queue full, depth 1618, deepening 12, 131k/406k -> 3.3k/28k
Queue full, depth 1623, deepening 12, 131k/339k -> 3.2k/28k
Queue full, depth 1629, deepening 11, 131k/399k -> 3.8k/32k
Queue full, depth 1635, deepening 10, 131k/401k -> 4.1k/35k
Queue full, depth 1640, deepening 10, 131k/314k -> 4.0k/33k
Queue full, depth 1645, deepening 10, 131k/374k -> 3.8k/31k
Queue full, depth 1651, deepening 9, 131k/467k -> 3.8k/33k
Queue full, depth 1658, deepening 7, 131k/439k -> 5.3k/38k
Queue full, depth 1662, deepening 8, 131k/290k -> 4.2k/30k
Queue full, depth 1670, deepening 5, 131k/686k -> 7.5k/46k
Queue full, depth 1681, deepening 5, 101k/983k -> 7.5k/44k
Queue full, depth 1687, deepening 5, 131k/493k -> 9.3k/47k
Queue full, depth 1692, deepening 5, 131k/451k -> 9.3k/51k
Queue full, depth 1697, deepening 5, 131k/466k -> 9.8k/56k
Queue full, depth 1701, deepening 6, 131k/396k -> 7.7k/46k
Queue full, depth 1706, deepening 6, 131k/404k -> 7.1k/45k
Queue full, depth 1710, deepening 7, 131k/283k -> 5.6k/36k
Queue full, depth 1717, deepening 5, 131k/606k -> 8.5k/50k
Queue full, depth 1722, deepening 5, 131k/350k -> 9.3k/51k
Queue full, depth 1728, deepening 5, 131k/575k -> 8.1k/48k
Queue full, depth 1735, deepening 5, 131k/541k -> 7.9k/45k
Queue full, depth 1739, deepening 6, 131k/401k -> 7.1k/40k
Queue full, depth 1744, deepening 6, 131k/381k -> 7.9k/45k
Queue full, depth 1749, deepening 6, 131k/395k -> 9.0k/50k
Queue full, depth 1753, deepening 7, 131k/327k -> 7.3k/44k
Queue full, depth 1757, deepening 8, 131k/308k -> 5.1k/36k
Queue full, depth 1763, deepening 7, 131k/465k -> 6.0k/40k
Queue full, depth 1770, deepening 5, 131k/618k -> 8.2k/51k
Queue full, depth 1783, deepening 5, 84k/983k -> 5.4k/35k
Queue full, depth 1789, deepening 5, 131k/471k -> 7.3k/37k
Queue full, depth 1793, deepening 6, 131k/305k -> 8.3k/37k
Queue full, depth 1796, deepening 8, 131k/286k -> 7.2k/35k
Queue full, depth 1799, deepening 10, 131k/273k -> 5.3k/29k
Queue full, depth 1803, deepening 11, 131k/252k -> 4.2k/28k
Queue full, depth 1807, deepening 12, 131k/263k -> 3.2k/25k
Queue full, depth 1814, deepening 10, 131k/463k -> 4.0k/32k
Queue full, depth 1820, deepening 9, 131k/470k -> 4.3k/33k
Queue full, depth 1826, deepening 8, 131k/463k -> 5.9k/39k
Queue full, depth 1831, deepening 8, 131k/361k -> 6.1k/40k
Queue full, depth 1836, deepening 8, 131k/362k -> 5.2k/39k
Queue full, depth 1842, deepening 7, 131k/392k -> 5.2k/39k
Queue full, depth 1848, deepening 6, 131k/452k -> 7.8k/46k
Queue full, depth 1851, deepening 8, 131k/302k -> 5.2k/33k
Queue full, depth 1856, deepening 8, 131k/339k -> 5.4k/35k
Queue full, depth 1861, deepening 8, 131k/356k -> 5.2k/35k
Queue full, depth 1866, deepening 8, 131k/431k -> 5.0k/34k
Queue full, depth 1872, deepening 7, 131k/393k -> 6.4k/40k
Queue full, depth 1877, deepening 7, 131k/383k -> 6.8k/41k
Queue full, depth 1881, deepening 8, 131k/346k
x = 17, y = 375, rule = B3/S2-a34a
b2o11b2o$4bo7bo$2bo2bo5bo2bo$3bo2bo3bo2bo$3bo4bo4bo$8bo$4bo7bo$
4b2o5b2o$6b5o2$5bo5bo$3b2o7b2o$5b2o3b2o$2b3obo3bob3o$3bo3bobo3bo
$2b2o2b2ob2o2b2o$5bobobobo$4b2obobob2o$3bo2bo3bo2bo2$5b3ob3o$6bo
3bo$4b3obob3o$3b2o3bo3b2o$2bob2o5b2obo$2bo11bo$3bo9bo$3b2o7b2o2$
3o2bo5bo2b3o$b2obo7bob2o$obo3bo3bo3bobo$b2o2bo5bo2b2o$bo2b3o3b3o
2bo$3b3o5b3o$3b2obo3bob2o$2bo4bobo4bo$7bobo$bo2b3o3b3o2bo$bo3bo5b
o3bo$bo13bo$2bobo7bobo$2b2o9b2o$3bo2bo3bo2bo$3b2ob2ob2ob2o2$2bob
2ob3ob2obo$2obo2bo3bo2bob2o$bo6bo6bo$8bo$5bo2bo2bo$5b3ob3o$5bo5b
o$4bo7bo$4bo7bo$4bo7bo$2bobo2bobo2bobo$2bob2obobob2obo$2b3o7b3o$
2b3o7b3o$b2obo7bob2o$2bobo7bobo$bobo9bobo$4bo7bo$b2o11b2o$bo13bo
$bo2bo7bo2bo$b2o11b2o$5bobobobo$2bob3o3b3obo$2bo3bo3bo3bo$5bo5bo
$4bobo3bobo$5bobobobo2$8bo$7b3o$5bo5bo$5bo5bo$5bo5bo2$b2ob2o5b2o
b2o$b3o9b3o$3bo9bo$bobo4bo4bobo$b2o5bo5b2o$2o2bobobobobo2b2o$b2o
b3o3b3ob2o$2bobo7bobo$2b2o9b2o$4bo7bo2$4b2o5b2o$3b2o7b2o$5bo5bo$
3bo9bo$3bo2b2ob2o2bo$b2ob2obobob2ob2o$2b2obobobobob2o$6bo3bo$2b2o
9b2o$bo4bo3bo4bo$3bo9bo$2b5o3b5o$3b2ob2ob2ob2o$7bobo$5bobobobo$4b
2obobob2o$4b2obobob2o$2b2o3bobo3b2o$b2ob2obobob2ob2o$obo3b2ob2o3b
obo$obobo7bobobo$b3ob2o3b2ob3o$5bo5bo2$4bo7bo$2b2o9b2o$3bo9bo$4b
o7bo$bobo2bobobo2bobo$2b13o$3b2o7b2o2$7bobo$6b2ob2o$6bo3bo$3bobo
5bobo$b2o3bo3bo3b2o$bo4bo3bo4bo$bo2b2o5b2o2bo$3b2o7b2o$4bo7bo$4b
o7bo$3bo3bobo3bo$3bob2o3b2obo$3b2o7b2o$b2o2b2o3b2o2b2o$6bo3bo$b3o
9b3o2$bobo9bobo$6bo3bo$3ob2o5b2ob3o$2bobo7bobo$2b3o7b3o$2b3o7b3o
2$7bobo$5bobobobo2$5bo5bo$4b3o3b3o$4b2obobob2o$7bobo$7bobo$4bo2b
obo2bo$4b2obobob2o$3b2o2bobo2b2o$3b5ob5o$4bo2bobo2bo$4b2obobob2o
$4bo2bobo2bo$7bobo$4bo7bo$3bo2b5o2bo$3b2ob5ob2o$3b2o7b2o$3bo9bo$
2b3o7b3o$3b2o7b2o$4bo7bo$b3o9b3o$2bo4bobo4bo$5b3ob3o$4b2obobob2o
$7bobo$bo5bobo5bo$bobo4bo4bobo$bo3bo5bo3bo$3b2o2bobo2b2o$2bobo3b
o3bobo$2bo11bo$2b3o7b3o2$6b2ob2o$3bob2o3b2obo$4b2o5b2o$3bo4bo4bo
$bo3bo5bo3bo$bo4b2ob2o4bo$2bo4b3o4bo$2b3o2b3o2b3o$4b2o5b2o$3bobo
5bobo$3bo2bo3bo2bo$3bob2o3b2obo$4bo2bobo2bo$3bo9bo$4b3o3b3o$5b2o
3b2o$6bo3bo$6b2ob2o$4b2obobob2o$3bobobobobobo$3b4o3b4o3$2b2o9b2o
$3bo9bo2$b2o11b2o$2obo9bob2o$2b2obo5bob2o$2bo11bo$5bo5bo$3b4o3b4o
$5b7o$2b2o3b3o3b2o2$3bo9bo2$4b2o5b2o$4b2o5b2o$b3o9b3o$2b2o9b2o2$
3bo9bo$4o9b4o$3b2o7b2o2$4bobo3bobo$5bo5bo$bo2bo2bobo2bo2bo$b2o3b
2ob2o3b2o$bobo3bobo3bobo$7b3o$bo5b3o5bo$b2o11b2o$2o2bo7bo2b2o$bo
b2o7b2obo$2o13b2o$bo2bo7bo2bo$b2ob2o5b2ob2o2$4bo7bo$3bobo5bobo$2b
3obo3bob3o$bobo9bobo$b2o3bo3bo3b2o$5bobobobo$4b3o3b3o$2b2ob2o3b2o
b2o$bo4b2ob2o4bo$o2bo3bobo3bo2bo$b3o2b2ob2o2b3o$6b2ob2o2$4b2o5b2o
$3obo7bob3o$4b3o3b3o$3b2obo3bob2o$5b3ob3o$2bo3bo3bo3bo$3b4o3b4o$
6bo3bo$5bob3obo$5bob3obo$6bo3bo$7b3o2$7b3o$bob2obobobob2obo$bobo
b2o3b2obobo$2o2b4ob4o2b2o$2b2o9b2o$3bob2o3b2obo$2bo3bobobo3bo$7b
obo$3bob2o3b2obo$3bo9bo$4bob2ob2obo$4b3o3b3o$3bo9bo$4bo7bo$3b3o5b
3o$4bobo3bobo$5b2o3b2o$5bobobobo$7bobo$6b2ob2o$7bobo$7bobo$7bobo
$6bo3bo2$5b2o3b2o$5b2o3b2o$4bo7bo$4b3o3b3o$3bo2b2ob2o2bo$3bo2b2o
b2o2bo$6bo3bo$5bobobobo$6bo3bo$o6bobo6bo$b2o3b2ob2o3b2o$b2obobo3b
obob2o$3b2o7b2o$3bo2bo3bo2bo$2b2o2b2ob2o2b2o$2b2o2bo3bo2b2o$3bob
o5bobo$2b2o9b2o$2b2o9b2o$3bob2o3b2obo$5bobobobo$4b2obobob2o$5bob
obobo$6b2ob2o$4bo7bo$4bo7bo$4bobo3bobo2$5b3ob3o$6b2ob2o$6bo3bo$8b
o2$7b3o$2o5bobo5b2o$o3bo2bobo2bo3bo$b2o2b2o3b2o2b2o$2b3o7b3o$4b3o
3b3o$5bobobobo$6b2ob2o$6b2ob2o$3bo3bobo3bo$4b2obobob2o$7bobo$5bo
bobobo$4bobo3bobo$5b2o3b2o2$4bobo3bobo$5bo5bo$4b4ob4o3$4bobo3bob
o$4bo7bo$4b2ob3ob2o3$6b2ob2o$6b2ob2o$7bobo$7bobo$7bobo$5bo5bo$4b
2obobob2o$3bo9bo$bo5bobo5bo$2b2obobobobob2o$2bo2bobobobo2bo$4b2o
bobob2o$3bobo2bo2bobo$2bo2bo5bo2bo$3b3o5b3o$3b2o7b2o$3b2o7b2o$b2o
2bo5bo2b2o$bob2o7b2obo$obo11bobo!

 -> 6.1k/38k
Queue full, depth 1885, deepening 9, 131k/299k -> 6.1k/36k
Queue full, depth 1888, deepening 11, 131k/225k -> 6.9k/33k
Queue full, depth 1890, deepening 14, 131k/192k -> 8.5k/33k
Queue full, depth 1891, deepening 18, 131k/198k -> 4.2k/24k
Queue full, depth 1894, deepening 20, 131k/223k -> 2.7k/21k
Queue full, depth 1898, deepening 21, 131k/231k -> 2.3k/21k
Queue full, depth 1902, deepening 22, 131k/221k -> 1.8k/20k
Queue full, depth 1906, deepening 23, 131k/217k -> 1.5k/18k
Queue full, depth 1910, deepening 24, 131k/226k -> 1.4k/17k
Queue full, depth 1913, deepening 26, 131k/218k -> 1.2k/15k
Queue full, depth 1917, deepening 27, 131k/195k -> 1.0k/14k
Queue full, depth 1921, deepening 28, 131k/208k -> 917/13k
Queue full, depth 1928, deepening 26, 131k/367k -> 1.0k/16k
Queue full, depth 1933, deepening 26, 131k/329k -> 998/15k
Queue full, depth 1938, deepening 26, 131k/290k -> 1.0k/16k
Queue full, depth 1942, deepening 27, 131k/289k -> 955/16k
Queue full, depth 1946, deepening 28, 131k/199k -> 765/14k
Queue full, depth 1951, deepening 28, 131k/269k -> 764/13k
Queue full, depth 1955, deepening 29, 131k/200k -> 696/13k
Queue full, depth 1961, deepening 28, 131k/332k -> 755/13k
Queue full, depth 1967, deepening 27, 131k/318k -> 912/14k
Queue full, depth 1972, deepening 27, 131k/356k -> 862/14k
Queue full, depth 1979, deepening 25, 131k/381k -> 947/15k
Queue full, depth 1986, deepening 23, 131k/414k -> 1.0k/17k
Queue full, depth 1994, deepening 20, 131k/473k -> 1.2k/19k
Queue full, depth 2002, deepening 17, 131k/540k -> 1.5k/22k
Queue full, depth 2010, deepening 14, 131k/513k -> 2.2k/26k
Queue full, depth 2013, deepening 16, 131k/215k -> 1.9k/21k
Queue full, depth 2018, deepening 16, 131k/238k -> 2.2k/22k
Queue full, depth 2023, deepening 16, 131k/299k -> 1.9k/21k
Queue full, depth 2028, deepening 16, 131k/349k -> 1.8k/21k
Queue full, depth 2035, deepening 14, 131k/448k -> 2.3k/24k
Queue full, depth 2041, deepening 13, 131k/408k -> 2.7k/26k
Queue full, depth 2048, deepening 11, 131k/477k -> 3.1k/30k
Queue full, depth 2055, deepening 9, 131k/419k -> 4.1k/35k
Queue full, depth 2062, deepening 7, 131k/575k -> 5.3k/40k
Queue full, depth 2068, deepening 6, 131k/417k -> 7.1k/44k
Queue full, depth 2073, deepening 6, 131k/365k -> 7.7k/46k
Queue full, depth 2077, deepening 7, 131k/312k -> 5.7k/38k
Queue full, depth 2080, deepening 9, 131k/252k -> 4.9k/30k
Queue full, depth 2083, deepening 11, 131k/229k -> 4.4k/26k
Queue full, depth 2087, deepening 12, 131k/243k -> 4.0k/26k
Queue full, depth 2090, deepening 14, 131k/275k -> 2.7k/22k
Queue full, depth 2095, deepening 14, 131k/277k -> 2.7k/24k
Queue full, depth 2099, deepening 15, 131k/273k -> 2.2k/22k
Queue full, depth 2106, deepening 13, 131k/448k -> 2.8k/27k
Queue full, depth 2110, deepening 14, 131k/283k -> 2.7k/25k
Queue full, depth 2115, deepening 14, 131k/317k -> 2.6k/24k
Queue full, depth 2121, deepening 13, 131k/341k -> 2.9k/26k
Queue full, depth 2128, deepening 11, 131k/473k -> 3.5k/32k
Queue full, depth 2135, deepening 9, 131k/475k -> 4.8k/38k
Queue full, depth 2143, deepening 6, 131k/600k -> 6.6k/50k
Queue full, depth 2148, deepening 6, 131k/404k -> 6.9k/44k
Queue full, depth 2150, deepening 9, 131k/204k -> 5.3k/31k
Queue full, depth 2154, deepening 10, 131k/273k -> 5.8k/33k
Queue full, depth 2157, deepening 12, 131k/239k -> 4.2k/28k
Queue full, depth 2161, deepening 13, 131k/240k -> 3.7k/27k
Queue full, depth 2165, deepening 14, 131k/242k -> 3.0k/24k
Queue full, depth 2169, deepening 15, 131k/252k -> 2.5k/22k
Queue full, depth 2173, deepening 16, 131k/288k -> 2.8k/22k
Queue full, depth 2177, deepening 17, 131k/240k -> 2.8k/23k
Queue full, depth 2181, deepening 18, 131k/252k -> 2.5k/23k
Queue full, depth 2185, deepening 19, 131k/288k -> 2.2k/23k
Queue full, depth 2190, deepening 19, 131k/294k -> 2.0k/23k
Queue full, depth 2194, deepening 20, 131k/254k -> 1.6k/20k
Queue full, depth 2199, deepening 20, 131k/300k -> 1.6k/19k
Queue full, depth 2204, deepening 20, 131k/245k -> 1.6k/20k
Queue full, depth 2210, deepening 19, 131k/424k -> 1.8k/21k
Queue full, depth 2216, deepening 18, 131k/388k -> 1.9k/23k
Queue full, depth 2223, deepening 16, 131k/402k -> 2.4k/26k
Queue full, depth 2228, deepening 16, 131k/338k -> 2.2k/25k
Queue full, depth 2232, deepening 17, 131k/253k -> 1.8k/22k
Queue full, depth 2238, deepening 16, 131k/336k -> 2.1k/23k
Queue full, depth 2242, deepening 17, 131k/248k -> 2.4k/22k
Queue full, depth 2246, deepening 18, 131k/244k -> 2.1k/21k
Queue full, depth 2251, deepening 18, 131k/335k -> 2.2k/23k
Queue full, depth 2255, deepening 19, 131k/254k -> 2.3k/22k
Queue full, depth 2258, deepening 21, 131k/188k -> 1.9k/19k
Queue full, depth 2261, deepening 23, 131k/195k -> 1.6k/17k
Queue full, depth 2264, deepening 25, 131k/198k -> 1.3k/16k
Queue full, depth 2268, deepening 26, 131k/190k -> 1.1k/15k
Queue full, depth 2272, deepening 27, 131k/197k -> 1.0k/15k
Queue full, depth 2276, deepening 28, 131k/202k -> 898/13k
Queue full, depth 2280, deepening 29, 131k/190k -> 787/13k
Queue full, depth 2285, deepening 29, 131k/340k -> 739/12k
Queue full, depth 2291, deepening 28, 131k/328k -> 768/13k
Queue full, depth 2297, deepening 27, 131k/365k -> 922/14k
Queue full, depth 2302, deepening 27, 131k/291k -> 938/14k
Queue full, depth 2308, deepening 26, 131k/299k -> 931/15k
Queue full, depth 2313, deepening 26, 131k/246k -> 987/15k
Queue full, depth 2318, deepening 26, 131k/273k -> 1.0k/15k
Queue full, depth 2322, deepening 27, 131k/237k -> 937/14k
Queue full, depth 2328, deepening 26, 131k/352k -> 951/15k
Queue full, depth 2332, deepening 27, 131k/204k -> 860/14k
Queue full, depth 2338, deepening 26, 131k/334k -> 859/15k
Queue full, depth 2345, deepening 24, 131k/396k -> 965/17k
Queue full, depth 2351, deepening 23, 131k/375k -> 1.0k/18k
Queue full, depth 2357, deepening 22, 131k/396k -> 1.0k/17k
Queue full, depth 2362, deepening 22, 131k/290k -> 997/16k
Queue full, depth 2368, deepening 21, 131k/365k -> 1.1k/17k
Queue full, depth 2374, deepening 20, 131k/359k -> 1.3k/18k
Queue full, depth 2380, deepening 19, 131k/382k -> 1.5k/20k
Queue full, depth 2385, deepening 19, 131k/313k -> 1.4k/19k
Queue full, depth 2392, deepening 17, 131k/398k -> 1.7k/21k
Queue full, depth 2397, deepening 17, 131k/349k -> 1.5k/20k
Queue full, depth 2402, deepening 17, 131k/321k -> 1.5k/19k
Queue full, depth 2410, deepening 14, 131k/454k -> 2.3k/24k
Queue full, depth 2415, deepening 14, 131k/395k -> 2.3k/24k
Queue full, depth 2423, deepening 11, 131k/462k -> 3.7k/32k
Queue full, depth 2427, deepening 12, 131k/287k -> 3.4k/28k
Queue full, depth 2433, deepening 11, 131k/442k -> 3.5k/32k
Queue full, depth 2439, deepening 10, 131k/413k -> 4.3k/35k
Queue full, depth 2445, deepening 9, 131k/389k -> 6.0k/40k
Queue full, depth 2450, deepening 9, 131k/323k -> 6.9k/44k
Queue full, depth 2453, deepening 11, 131k/288k -> 5.5k/37k
Queue full, depth 2457, deepening 12, 131k/271k -> 5.5k/37k
Queue full, depth 2461, deepening 13, 131k/280k -> 4.6k/36k
Queue full, depth 2465, deepening 14, 131k/270k -> 3.7k/32k
Queue full, depth 2469, deepening 15, 131k/310k -> 3.0k/29k
Queue full, depth 2474, deepening 15, 131k/260k -> 3.0k/29k
Queue full, depth 2478, deepening 16, 131k/327k -> 2.3k/26k
Queue full, depth 2484, deepening 15, 131k/383k -> 2.7k/28k
Queue full, depth 2489, deepening 15, 131k/296k -> 2.8k/28k
Queue full, depth 2493, deepening 16, 131k/236k -> 2.3k/26k
Queue full, depth 2499, deepening 15, 131k/407k -> 2.4k/28k
Queue full, depth 2506, deepening 13, 131k/502k -> 2.7k/31k
Queue full, depth 2512, deepening 12, 131k/429k -> 3.3k/31k
Queue full, depth 2517, deepening 12, 131k/359k -> 3.4k/32k
Queue full, depth 2523, deepening 11, 131k/469k -> 4.0k/35k
Queue full, depth 2528, deepening 11, 131k/383k -> 3.7k/33k
Queue full, depth 2534, deepening 10, 131k/392k -> 4.3k/36k
Queue full, depth 2541, deepening 8, 131k/518k -> 5.6k/44k
Queue full, depth 2545, deepening 9, 131k/299k -> 4.4k/36k
Queue full, depth 2551, deepening 8, 131k/516k -> 5.5k/39k
Queue full, depth 2556, deepening 8, 131k/337k -> 7.1k/43k
Queue full, depth 2561, deepening 8, 131k/396k -> 7.1k/48k
Queue full, depth 2565, deepening 9, 131k/287k -> 6.3k/42k
Queue full, depth 2570, deepening 9, 131k/359k -> 5.1k/41k
Queue full, depth 2577, deepening 7, 131k/544k -> 6.4k/48k
Queue full, depth 2583, deepening 6, 131k/477k -> 9.4k/56k
Queue full, depth 2587, deepening 7, 131k/349k -> 7.9k/50k
Queue full, depth 2590, deepening 9, 131k/302k -> 6.7k/42k
Queue full, depth 2594, deepening 10, 131k/289k -> 5.8k/40k
Queue full, depth 2599, deepening 10, 131k/308k -> 5.4k/41k
Queue full, depth 2604, deepening 10, 131k/385k -> 4.7k/39k
Queue full, depth 2610, deepening 9, 131k/428k -> 5.0k/41k
Queue full, depth 2616, deepening 8, 131k/495k -> 5.1k/41k
Queue full, depth 2623, deepening 6, 131k/567k -> 6.9k/49k
Queue full, depth 2628, deepening 6, 131k/414k -> 7.0k/45k
Queue full, depth 2633, deepening 6, 131k/399k -> 7.8k/47k
Queue full, depth 2638, deepening 6, 131k/423k -> 8.3k/48k
Queue full, depth 2643, deepening 6, 131k/430k -> 9.2k/53k
Queue full, depth 2647, deepening 7, 131k/333k -> 7.2k/46k
Queue full, depth 2652, deepening 7, 131k/437k -> 6.7k/45k
Queue full, depth 2659, deepening 5, 131k/502k -> 9.7k/60k
Queue full, depth 2669, deepening 5, 117k/983k -> 7.1k/46k
Queue full, depth 2679, deepening 5, 131k/868k -> 7.6k/42k
Queue full, depth 2684, deepening 5, 131k/386k -> 9.5k/46k
Queue full, depth 2686, deepening 8, 131k/227k -> 6.5k/32k
Queue full, depth 2690, deepening 9, 131k/260k -> 5.9k/32k
Queue full, depth 2693, deepening 11, 131k/283k -> 3.8k/27k
Queue full, depth 2698, deepening 11, 131k/305k -> 3.6k/28k
Queue full, depth 2704, deepening 10, 131k/490k -> 3.9k/31k
Queue full, depth 2710, deepening 9, 131k/434k -> 4.7k/35k
Queue full, depth 2715, deepening 9, 131k/367k -> 5.7k/37k
Queue full, depth 2720, deepening 9, 131k/340k -> 5.5k/38k
Queue full, depth 2725, deepening 9, 131k/395k -> 5.1k/39k
Queue full, depth 2731, deepening 8, 131k/506k -> 5.0k/41k
Queue full, depth 2738, deepening 6, 131k/426k -> 6.0k/46k
Queue full, depth 2749, deepening 5, 103k/983k -> 6.5k/42k
Queue full, depth 2755, deepening 5, 131k/418k -> 5.9k/37k
Queue full, depth 2760, deepening 5, 131k/299k -> 5.9k/36k
Queue full, depth 2773, deepening 5, 65k/983k -> 4.0k/29k
Queue full, depth 2790, deepening 5, 66k/983k -> 3.6k/23k
Queue full, depth 2824, deepening 5, 26k/983k -> 1.9k/12k
Queue full, depth 2842, deepening 5, 54k/983k -> 3.8k/23k
Queue full, depth 2862, deepening 5, 79k/983k -> 6.0k/27k
Queue full, depth 2879, deepening 5, 50k/983k -> 3.0k/20k
Queue full, depth 2898, deepening 5, 64k/983k -> 3.8k/23k
Queue full, depth 2919, deepening 5, 34k/983k -> 1.7k/15k
Search complete.

14 spaceships found.
Maximum depth reached: 3016
Longest partial result:

x = 17, y = 603, rule = B3/S2-a34a
b2obob5obob2o$b2o2bo2bo2bo2b2o$3ob2ob3ob2ob3o$2o3b2o3b2o3b2o$bo
b3o2bo2b3obo$b2obobo3bobob2o$b2o3b2ob2o3b2o$5b7o$4bo7bo$5b2o3b2o
$6b2ob2o$bob3o5b3obo$obo11bobo$7b3o$bobo9bobo2$3bobo5bobo$5bo5bo
$5bo5bo$5bo5bo$5b2o3b2o$b2obo7bob2o$2o2bob2ob2obo2b2o$4bob5obo$4b
o2b3o2bo$8bo$3bo2bobobo2bo$3bobobobobobo$5bo5bo$4bo7bo$5b2o3b2o$
3bo9bo$5b2o3b2o$bo4bo3bo4bo$b2ob2o5b2ob2o$2obobo5bobob2o$bo4b2ob
2o4bo$4bob2ob2obo$3b2o7b2o2$2bob2o5b2obo$2bobo2bobo2bobo$b2obo7b
ob2o$3bo9bo$4b4ob4o$7b3o$4bo7bo$4b2o5b2o$6bo3bo$3b2o2bobo2b2o$3b
ob2o3b2obo$2bo2b2o3b2o2bo$3b2o3bo3b2o$7b3o$6bo3bo$6bo3bo$5b2o3b2o
$2b2o9b2o$bob4o3b4obo$bobo2bo3bo2bobo$2bobo7bobo$4b2o5b2o$4bobo3b
obo$bo2bo7bo2bo$b2ob9ob2o$bo2bobobobobo2bo$2b2o9b2o$3bo2bo3bo2bo
$2b2o9b2o$3b2o7b2o2$4bo3bo3bo$2ob2o2bobo2b2ob2o$o4bobobobo4bo$bo
5bobo5bo$2b4obobob4o$7bobo$4bo2bobo2bo$4bobo3bobo$4bo7bo$5b2o3b2o
$5bo5bo2$4b2o5b2o$5bo5bo$3bo2bo3bo2bo$3bo9bo$3bo4bo4bo$4bobobobo
bo2$6bobobo$3b2obo3bob2o$5b3ob3o$4bo2bobo2bo$4b3o3b3o$3bo9bo$b2o
b2o5b2ob2o$o3bo7bo3bo$bo2bo7bo2bo$bo3bo5bo3bo$3bob2o3b2obo$2b2o9b
2o$bob2o7b2obo$b2obo7bob2o$obobo7bobobo$bo2bobo3bobo2bo$3b2ob2ob
2ob2o$7bobo$3bobo5bobo$5b2o3b2o$6bo3bo$2b2obobobobob2o$2bobo7bob
o$4bo2bobo2bo$b3o3bobo3b3o$b5obobob5o$2b3o2bobo2b3o$3bob2o3b2obo
$2bobo7bobo$2bo11bo$obo11bobo2$2b2o9b2o2$3bo9bo$4bo7bo$2bo3b2ob2o
3bo2$bob3o5b3obo$bobo3b3o3bobo$b3o9b3o$5bo2bo2bo$b2obob2ob2obob2o
$3bo3bobo3bo$bo2b3obob3o2bo$3bo9bo$5b3ob3o$2b3obo3bob3o$2b2ob2ob
ob2ob2o$5bo5bo$5b2o3b2o$5b2obob2o$2b2obobobobob2o$3o2b3ob3o2b3o$
6b2ob2o$2bo11bo$4b2obobob2o$bo2bo7bo2bo$bobob3ob3obobo$2b2ob2o3b
2ob2o$4bo7bo$3bobo5bobo$3b2o7b2o$3bo9bo$3b2o7b2o$2b5o3b5o$3bob2o
3b2obo$5bobobobo$5bo5bo$5b2o3b2o$4bob2ob2obo$5b2obob2o$2b3o3bo3b
3o$7bobo$4bo7bo$5b2o3b2o$6bo3bo$4bobo3bobo$4b2o5b2o$4b2o5b2o$2bo
2bo5bo2bo$2bo11bo$4b2o5b2o$5bo5bo$2bo11bo$b3o9b3o$3bo2b2ob2o2bo$
3b3o5b3o$bo2bo7bo2bo$2o2b4ob4o2b2o$3bo2b2ob2o2bo$2bo11bo$6b2ob2o
$o6bobo6bo$b4o3bo3b4o$2b4o5b4o$4b3o3b3o$2bo2bobobobo2bo$bobobobo
bobobobo$bo3bobobobo3bo$2b2o3bobo3b2o$2b3o2bobo2b3o$2bo3b2ob2o3b
o$3bo2b2ob2o2bo$3b2o2bobo2b2o$7bobo$3bo3bobo3bo$3b2ob2ob2ob2o$3b
2o7b2o$6bo3bo$4bobo3bobo$3bobobobobobo$5bobobobo$6bo3bo$4bo7bo$4b
2obobob2o$2bo4bobo4bo$2bo2b3ob3o2bo$2bob2obobob2obo$5bobobobo$2b
2obobobobob2o$3b3obobob3o$5bobobobo$6b2ob2o2$5bobobobo$4bo2bobo2b
o$7bobo$5bobobobo$4b2obobob2o$7bobo$5b3ob3o2$4bo7bo$4bo7bo$4b4ob
4o$7bobo$2bo5bo5bo$2b2o9b2o$bo13bo$4b2o5b2o$3bo9bo2$4b2ob3ob2o$4b
o7bo$4bo7bo$6bo3bo$6bobobo$3bo9bo$4bobo3bobo$3b2o2bobo2b2o$5bobo
bobo$3bobobobobobo$3bobobobobobo$3bo3bobo3bo$4bo2bobo2bo$4bo2bob
o2bo$5b7o$3bo3bobo3bo$4bo3bo3bo$4bobo3bobo$5bo5bo$b2ob2o5b2ob2o$
2bobo7bobo$bo13bo$4bo7bo$b3o9b3o$4bo7bo$bobobo5bobobo$bob3o5b3ob
o$bo2bo7bo2bo$2b2obo5bob2o$2bob2obobob2obo$3b2o2bobo2b2o$4b2obob
ob2o$bo5bobo5bo$2b2o2bo3bo2b2o$5bo5bo$bo13bo$bobo9bobo$3bobo5bob
o$4b3o3b3o$8bo$bo5b3o5bo$o15bo$b5obobob5o$7bobo$6bo3bo$4b3obob3o
$3bo4bo4bo$6bo3bo$3bo2bo3bo2bo$6bo3bo$3b2obo3bob2o$bo3b2o3b2o3bo
$2bo2b2o3b2o2bo$4bo7bo$4b2o5b2o$2bo11bo$2bobo7bobo$bob2o7b2obo$b
o13bo$obo11bobo$obo11bobo$3b2o7b2o$bob2o7b2obo$6bo3bo$3b2ob2ob2o
b2o$3bo2b2ob2o2bo$4bo2bobo2bo$5b3ob3o$6bobobo$7bobo3$5b3ob3o$6bo
3bo$3b2o7b2o$bobobo5bobobo$2o2bo7bo2b2o$3bo9bo$3bo9bo2$bobo3b3o3b
obo$bobobo5bobobo$bo2bo7bo2bo$4bo7bo$3bobo5bobo2$4b2o5b2o$3b2o7b
2o2$3b2ob2ob2ob2o$7bobo$3bobobobobobo$2b2obobobobob2o$bo2b3o3b3o
2bo$3bo9bo$2b2o9b2o$2b2o3bobo3b2o$2bob4ob4obo$2bobo2bobo2bobo$5b
obobobo$3b2o2bobo2b2o$4b2obobob2o$7bobo$4b2obobob2o$2bob2obobob2o
bo$bo2bo2bobo2bo2bo$o3bo7bo3bo$b2o2b2o3b2o2b2o$b2ob2o5b2ob2o$3bo
9bo$4bo7bo$4bo7bo$2bo2bo5bo2bo$2bob2o5b2obo$3bobo5bobo$3bo2bo3bo
2bo$3bob2obob2obo$3bob2obob2obo$7bobo$7bobo$5bobobobo$bo2bo7bo2b
o$obo2bobobobo2bobo$6bo3bo$b5o5b5o$2bo11bo2$3bo2bo3bo2bo$6bo3bo$
2b2ob2o3b2ob2o2$2bo2bo5bo2bo$5b2o3b2o$2b3o7b3o$2bo11bo$2b2o9b2o$
b3obo5bob3o$b2ob2o5b2ob2o$b2ob2o5b2ob2o2$2b3o7b3o$3bo9bo2$5b3ob3o
$6b2ob2o$4bobo3bobo$3bo9bo$4bobo3bobo$5bobobobo$7bobo$5bobobobo$
4bo2bobo2bo$4bo2bobo2bo$6b2ob2o$3bo3bobo3bo$4b2obobob2o2$6bo3bo2$
3bo2b2ob2o2bo$2bobobobobobobo$4b9o$4b2o2bo2b2o$3bo9bo$4b2o5b2o$2b
obo7bobo$b2obo7bob2o2$2b4o5b4o$4bo2bobo2bo$7bobo$bo5bobo5bo$b2o4b
3o4b2o$bobo3b3o3bobo$2bobo2b3o2bobo$5bo5bo$bo13bo$bo2bo7bo2bo$2b
obo7bobo$6bo3bo$4bo2bobo2bo$4b3o3b3o$4b2o2bo2b2o$bo3bo5bo3bo$bob
o2b2ob2o2bobo$bo13bo$2bo4b3o4bo$2bo5bo5bo$3bobo5bobo$2b2o9b2o$7b
obo$2b2o9b2o$3bo2b2ob2o2bo$3b2ob2ob2ob2o$5bo5bo2$6bo3bo$4bo2bobo
2bo$3bo3bobo3bo$3bob2o3b2obo$4b3o3b3o$4bo7bo2$2b2o9b2o$2b2o9b2o$
b2o11b2o$bo2bo7bo2bo$2bo2bo5bo2bo$2bo11bo$5bo5bo$4b3o3b3o$8bo$2b
2o4bo4b2o$8bo$3bo9bo$5bo5bo$3b3o5b3o$4bo7bo$bobo9bobo$3bo9bo$3bo
9bo$bo13bo$2o13b2o2$2b2obo5bob2o$3bo9bo$4bobo3bobo$b3o3bobo3b3o$
b2o3bo3bo3b2o$b2o3b2ob2o3b2o2$b3o3b3o3b3o$bo6bo6bo2$2obo9bob2o$2b
2obo5bob2o$2o3bo5bo3b2o2$2b2obo5bob2o2$4b2o5b2o$5b2o3b2o$2bo2b2o
3b2o2bo$bob2obo3bob2obo$2b2o2b2ob2o2b2o$2b3o7b3o$6bo3bo$bob2o7b2o
bo$o4b2o3b2o4bo$b2o4bobo4b2o$b3o3bobo3b3o$2b6ob6o$2bobobo3bobobo
$2obobo5bobob2o$bo13bo$2b2o9b2o$3bo9bo$2bo2b3ob3o2bo$3bo3b3o3bo$
4b9o2$5b2o3b2o$6b5o$7b3o2$7b3o$2b2o9b2o$4bo2bobo2bo$2obo4bo4bob2o
$bob2obo3bob2obo$3b2o7b2o2$4bo3bo3bo$4b3o3b3o$3bo2b2ob2o2bo$2bob
obo3bobobo$2bobobo3bobobo$5b2o3b2o$4bo7bo$4bo7bo$3b2o7b2o$6b2ob2o
$6b2ob2o$7bobo$6b2ob2o2$6bo3bo$6b2ob2o$5bobobobo$5b2o3b2o$4bo2bo
bo2bo$4bo7bo$4bob2ob2obo$3b3obobob3o$5bobobobo$4bo7bo$4b2o5b2o$5b
o5bo$7bobo$b2o2bo5bo2b2o$obo4bobo4bobo$b5o5b5o$6bo3bo$3bo9bo$3b2o
7b2o$3b3obobob3o$6bo3bo2$b3o9b3o$6bo3bo$4bo2bobo2bo$4b2obobob2o$
4bo2bobo2bo$7bobo$5bo5bo$4b2o5b2o$4bo7bo$6bo3bo$6b2ob2o$7bobo$8b
o$8bo2$7bobo$bo5bobo5bo$o4bobobobo4bo$o2bob2o3b2obo2bo$b2o2b2o3b
2o2b2o2$5b2o3b2o$5b2o3b2o$4bobo3bobo$4b2obobob2o$3bo3bobo3bo$4b2o
bobob2o$5bobobobo$4bo2bobo2bo$5b3ob3o$6bo3bo$6bo3bo$5bo5bo$5bobo
bobo$5b2o3b2o$5b2o3b2o$4b9o$4bob5obo$3bobo5bobo2$7b3o$6bo3bo$6bo
3bo$7bobo$6b2ob2o$5bobobobo$6bo3bo$3b2obo3bob2o$6b2ob2o$2bobob2o
b2obobo$2bobo2bobo2bobo$2b2obobobobob2o$5bobobobo$2b2obob3obob2o
$2b2ob2o3b2ob2o$b3o2bo3bo2b3o3$5bo5bo$o2b2o7b2o2bo$b4o7b4o$2bo11b
o!


User@USER /home
$
The latest version of hex-gliders.db have 668 gliders from OT hexagonal rules. Let's find more!
My CA (13 rules)
My scripts: new-glider.py v0.2 (new version), nbsearch2a.py, collector.py v0.3
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » June 6th, 2022, 5:54 pm

B3/S2-a34a was briefly mentioned earlier in this thread, but I don't think it has been studied in depth until now. Those are some nice ships.
Also, nice job on the mini-loafer, pzq_alex! (I also made some edits to the 1-transition rules wiki page without asking; sorry!)

EDIT: Blinker can eat a 9c/32:

Code: Select all

x = 4, y = 18, rule = B3/S2-a34a
o$o$o11$2bo$bobo$bobo$bobo$bobo!
I found the reaction from a soup.

EDIT2: 9c/15o reburnable fuse:

Code: Select all

x = 4, y = 36, rule = B3/S2-a34a
b2o$o2bo$b2o7$b2o$o2bo$b2o7$b2o$o2bo$b2o7$b2o$o2bo$b2o4$4o$o2bo$4o!
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » June 10th, 2022, 8:06 pm

9c/30o pi ship and 180c/360o B puffer:

Code: Select all

x = 16, y = 43, rule = B34z5n/S23
7b2o$6b2ob2o$6bob3o$2b3o2$bo4bo$6bo2b3o$3bo2bob2o$4bo2bobo3bo$6bo2bo4b
o$11b2ob2o$6bo2bo4bo$4bo2bobo3bo$3bo2bob2o$6bo2b3o$bo4bo2$2b3o$6bob3o$
6b2ob2o$7b2o18$o$bo$b2o$2o$o!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » June 13th, 2022, 5:51 pm

Small p18 OMOS:

Code: Select all

x = 14, y = 6, rule = B3/S23-j4n
2o$2bo$2bo8b3o$3o8bo$11bo$12b2o!
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
EvinZL
Posts: 852
Joined: November 8th, 2018, 4:15 pm
Location: A tungsten pool travelling towards the sun
Contact:
Contact EvinZL

Re: Rules 2 transitions from Life

Post by EvinZL » June 13th, 2022, 7:23 pm

Interestingly, there's only one mention of B37e/S236e on the forums, despite it being so close to life and turning drylife's r-pentomino into a ship:

Code: Select all

x = 5, y = 6, rule = B37e/S236e
o$o$3o$2b2o$3b2o$2b2o!
it's also just barely nonexplosive (I think)

for a sample of its behavior, b-hep stabilizes at gen 6,613

Code: Select all

x = 3, y = 4, rule = B37e/S236e
2o$b2o$2o$o!
5 R period-tripled rake, consisting of a 18c/84 block puffer plus a block-to-g

Code: Select all

x = 153, y = 27, rule = B37e/S236e
o$o$3o$2b2o$3b2o43b3o$2b2o142b3o$51b2o93b3obo$47bo4bo98bo$52bo98b2o$
48bo2bo98b2o$49bo90b4o6bo$15b2o2b2o12b2o2b2o100b5o$15b2o2b2o4b2o6b2o2b
2o20bo78bo$24bo2bo30bo11b2o67b4o$23bo4bo30b2o7b2o2bo67b4o$24b4o40b2ob
2o$27b3o12bo26b3o70bo$42bo100b2o4b2o$42bo13b3o89b2ob2o$56b3o88bo2bobo$
54b2ob2o87b3o3bo$145bo4b2o$50bo3bobo17b2o16b2o16b2o16b2o15bobo$50bo2bo
5bo14b2o16b2o16b2o16b2o16b2o$52b3o4bo$55bo$52b3o!
and an unrelated 18c/84 ship

Code: Select all

x = 80, y = 61, rule = B37e/S236e
21b2o$20bo2bo$8bo17bo$6bo2bo10b2ob3obo$6b4o11bo3bobo$7bo12b2o$20b3o$
20bo2bo$21b3o$22bo$34b3o$33bo2bo$33bo3bo$20b2o10b2o2bo$o19b2o14bo$o34b
o2bo$3o31b2ob2o$2b2o31bo$3b2o32b2o$2b2o6$15b2o16b2o$15b2o4bo11b2o5bo
17b2o$20bobo15bobo11bo4bo2bo16b2o$20b2o16b2o12b2o4b2o18b2o$54bo9bo12b
2o$49b2o2b2o8bobo9b3o$48bo2b2o10bob2o8bo$48b2o7bob2o2b2o2bo7bo$19bo17b
o10b2obo9bo2bo2bo$19bo17bo11b2o5bo4bo$19bo6b2o9bo12bo8b2o$25bobo3bo26b
o7bo3bo$24bo7bo33b2o4bo$22b2o4bo3bo34bo5bo$22bobo2b3obo36bo4bo$22bob5o
43b2o$23b2o16b2o$24b3o13bo28b3o$25bo$44bobo$35bo8bo2bo$35bo4bo3bo2bo$
34bo10b2o$34bo5bo$35b2o4$18b2ob3o$16bobo2b2o$17b2o5bo$16bo3bo3bo$16bo
3b2obo$15bob2o3bo$15bo$16bo!
a version of the rake outputting 3G per cycle

Code: Select all

x = 132, y = 36, rule = B37e/S236e
6bo$6bo$6b3o$8b2o$9b2o$8b2o16bo$23b2obo2b2o$26b6o$23b2obo4b2o$25b3ob2o
b2o$9b3o13bo4bob3o85b3obo$13bo12bob2o90bo4b2o3b2o$9b2ob2o13bob3o89b2ob
o6bo$122b3o4b3o$123b2o$8b2o107b2o4b3o$8bobo33b3o69bob2o4bo2bo$7bo3bo
32bobo4bo63b2ob2o5bobo$7bo3bo34b3o3bo64bob2o3bo$7bo2bo37b3o2bo64b2o5bo
$9bo19b3o17bobobo68bo3bo$29bobo13b3obob2o68bo3bo$29bo2bo12b2ob3o70bobo
$30bobo15b2o70b2o6bobo$30b3o89bo5bo2bo$128bo2bo$27b2o100b2o$5bo20bo2bo
18b2o16b2o16b2o16b2o16b2o$3b2o22b2o19b2o16b2o16b2o16b2o16b2o$4b2o4$bo
22bo$o22bo$3o20b3o!
b-hep based puffrake (c/2)

Code: Select all

x = 12, y = 21, rule = B37e/S236e
6o$o5bo$o$bo4bo$3b2o$7b3o$10b2o$b2o4b2ob2o$o2bo$o2bo$2ob2o$2b2o5$6o$o
5bo$o$bo4bo$3b2o!
EDIT: 2G R synth

Code: Select all

x = 3, y = 8, rule = B37e/S236e
2bo$2o$b2o3$3o$o$bo!
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » June 14th, 2022, 12:48 am

EvinZL wrote:
June 13th, 2022, 7:23 pm
 5 R period-tripled rake, consisting of a 18c/84 block puffer plus a block-to-g

Code: Select all

x = 153, y = 27, rule = B37e/S236e
o$o$3o$2b2o$3b2o43b3o$2b2o142b3o$51b2o93b3obo$47bo4bo98bo$52bo98b2o$
48bo2bo98b2o$49bo90b4o6bo$15b2o2b2o12b2o2b2o100b5o$15b2o2b2o4b2o6b2o2b
2o20bo78bo$24bo2bo30bo11b2o67b4o$23bo4bo30b2o7b2o2bo67b4o$24b4o40b2ob
2o$27b3o12bo26b3o70bo$42bo100b2o4b2o$42bo13b3o89b2ob2o$56b3o88bo2bobo$
54b2ob2o87b3o3bo$145bo4b2o$50bo3bobo17b2o16b2o16b2o16b2o15bobo$50bo2bo
5bo14b2o16b2o16b2o16b2o16b2o$52b3o4bo$55bo$52b3o!
and an unrelated 18c/84 ship

Code: Select all

x = 80, y = 61, rule = B37e/S236e
21b2o$20bo2bo$8bo17bo$6bo2bo10b2ob3obo$6b4o11bo3bobo$7bo12b2o$20b3o$
20bo2bo$21b3o$22bo$34b3o$33bo2bo$33bo3bo$20b2o10b2o2bo$o19b2o14bo$o34b
o2bo$3o31b2ob2o$2b2o31bo$3b2o32b2o$2b2o6$15b2o16b2o$15b2o4bo11b2o5bo
17b2o$20bobo15bobo11bo4bo2bo16b2o$20b2o16b2o12b2o4b2o18b2o$54bo9bo12b
2o$49b2o2b2o8bobo9b3o$48bo2b2o10bob2o8bo$48b2o7bob2o2b2o2bo7bo$19bo17b
o10b2obo9bo2bo2bo$19bo17bo11b2o5bo4bo$19bo6b2o9bo12bo8b2o$25bobo3bo26b
o7bo3bo$24bo7bo33b2o4bo$22b2o4bo3bo34bo5bo$22bobo2b3obo36bo4bo$22bob5o
43b2o$23b2o16b2o$24b3o13bo28b3o$25bo$44bobo$35bo8bo2bo$35bo4bo3bo2bo$
34bo10b2o$34bo5bo$35b2o4$18b2ob3o$16bobo2b2o$17b2o5bo$16bo3bo3bo$16bo
3b2obo$15bob2o3bo$15bo$16bo!
These things are 18c/56, not 18c/84.

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » June 18th, 2022, 11:30 pm

(11,7)c/118 puffer:

Code: Select all

x = 5, y = 6, rule = B34z5i/S23
4bo$3b2o2$obo$2o$bo!
16c/110d puffer:

Code: Select all

x = 7, y = 7, rule = B34z5k/S23
o$o$o3bo$4b2o$6bo$4b2o$4bo!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
confocaloid
Posts: 2961
Joined: February 8th, 2022, 3:15 pm

Re: Rules 2 transitions from Life

Post by confocaloid » June 19th, 2022, 7:17 am

Alien (semi)natural oscillators (periods 3, 4, 10, 60, 62) in the maxrule of the p91 from Oscillator Discussion Thread:

Code: Select all

x = 61, y = 125, rule = B34e/S234c
38b2ob2o$38bo3bo11bobo$39b3o10b3ob3o$3o9b3o8b3o25bo7bo$3o9b3o8b3o8b2o
3b3o3b2o4bo2b3o2bo$bo11bo7b2o3b2o6bobobo3bobobo3b2obo3bob2o$21b2o3b2o
8bobo3bobo8bo3bo$bo9bo9b2o3b2o6bobobo3bobobo3b2obo3bob2o$3o7b3o10b3o8b
2o3b3o3b2o4bo2b3o2bo$3o7b3o10b3o25bo7bo$39b3o10b3ob3o$38bo3bo11bobo$
38b2ob2o8$5b3ob3o$3b2o7b2o2$bo2b4ob4o2bo$bobo9bobo$o2bo9bo2bo$o2bo9bo
2bo$o2bo9bo2bo2$o2bo9bo2bo$o2bo9bo2bo$o2bo9bo2bo$bobo9bobo$bo2b4ob4o2b
o2$3b2o7b2o$5b3ob3o11$4b2o$5bo$4bo$3b2o$ob3o3b2o$2o3b3obo$5b2o$5bo$4bo
$4b2o15$2bo15bo$2ob2o11b2ob2o$bo2bo11bo2bo$2b2o13b2o5$2b2o13b2o$bo2bo
11bo2bo$2ob2o11b2ob2o$2bo15bo19$9bo$8b3o$7b2o2bo$9b3o4$10b2o9bo$10b2o
9b2o$20bob2o$15b2o3bobo$15b2o3b2o$2b2o3b2o$bobo3b2o$2obo$b2o9b2o$2bo9b
2o4$12b3o$12bo2b2o$13b3o$14bo!
Edit 1: added p62

Edit 2: there is a period-9 180-degree reflector for the c/5o in Conway--:

Code: Select all

x = 73, y = 17, rule = B3/S2-ei3
7b3o53b3o$5b7o49b7o$5bobobobo49bobobobo$4bo2b3o2bo47bo2b3o2bo$3bob7obo
45bob7obo$b2obo7bob2o41b2obo7bob2o$bo2bo7bo2bo41bo2bo7bo2bo$5o3bo3b5o
22bo16b5o3bo3b5o$2ob2o2bobo2b2ob2o21b2o16b2ob2o2bobo2b2ob2o$5o3bo3b5o
22bo16b5o3bo3b5o$bo2bo7bo2bo41bo2bo7bo2bo$b2obo7bob2o41b2obo7bob2o$3bo
b7obo45bob7obo$4bo2b3o2bo47bo2b3o2bo$5bobobobo49bobobobo$5b7o49b7o$7b
3o53b3o!
127:1 B3/S234c User:Confocal/R (isotropic CA, incomplete)
Unlikely events happen.
My silence does not imply agreement, nor indifference. If I disagreed with something in the past, then please do not construe my silence as something that could change that.
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » June 25th, 2022, 9:54 pm

8c/74o spaceship:

Code: Select all

x = 5, y = 4, rule = B34y/S235r
2b3o$bo2bo$o2b2o$b2o!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » June 25th, 2022, 10:43 pm

(4, 3)c/20 spaceship, lower minimum population than the one already found by LaundryPizza.

Code: Select all

x = 5, y = 4, rule = B3-y/S234w
2b3o$bo2bo$o2b2o$b2o!
EDIT: Completely unrelated p26:

Code: Select all

x = 5, y = 2, rule = B34y5a/S23
2b3o$3o!
EDIT2: Some puffers and a shuttle for a (2, 5)c/21 replicator:

Code: Select all

x = 112, y = 26, rule = B34y/S23-e
48bo30b3o$47bobo28bo2bo$46b2ob2o27b3o27b2o$46bo2bo58b2o$45b2ob2o$46bo
bo$11bo27b3o5bo$10b3o25bo2bo$b3o5bo2bo25b3o68bo$o2bo5b3o96bobo$3o7bo72b
3o21b2ob2o$82bo2bo21bo2bo$82b3o21b2ob2o$107bobo$108bo$75b2o$43b3o29bo
bo$42bo2bo28b4o$5b3o34b3o$4bo2bo$4b3o$74b4o$74bobo$75b2o$110b2o$110b2o
!
I did not find a repship.
Last edited by Period1GliderGun on June 26th, 2022, 1:07 am, edited 2 times in total.
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » June 26th, 2022, 12:04 am

30c/60o glide-symmetric puffer:

Code: Select all

x = 23, y = 7, rule = B34y/S234z
7b2o$6bobo10b2o$6bo11bo2b2o$o5b3o4bo3b3o2bo$o11b3o2bo4bo$o11bobo2b5o$
12b2o4b2o!
EDIT: Large, sparky gutter-symmetric p158:

Code: Select all

x = 16, y = 23, rule = B34y/S235y
5bo$bo3bo$bo3bo$obo$bo$bo2$9b2o2b2o$14b2o$9b3ob2o$13bo2$13bo$9b3ob2o$
14b2o$9b2o2b2o2$bo$bo$obo$bo3bo$bo3bo$5bo!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » June 28th, 2022, 3:42 pm

5c/20d in an explosive rule:

Code: Select all

x = 4, y = 6, rule = B3-q4w/S23
3bo$b2o$o$o2bo$o2bo$b2o!
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » June 28th, 2022, 5:05 pm

p54 isn a borderline stable rule.

Code: Select all

x = 4, y = 4, rule = B34y/S234t
b2o$2b2o$obo$2o!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
hwor1
Posts: 9
Joined: May 6th, 2022, 3:05 am

Re: Rules 2 transitions from Life

Post by hwor1 » July 4th, 2022, 12:48 am

Here are 15 distinct spaceship speeds in b34c/s234c.

Code: Select all

x = 238, y = 108, rule = B34c/S234c
157b3ob3o$157bo5bo$158b2ob2o$160bo2$158b2ob2o$157bo5bo$155b2ob2ob2ob2o
$154bo4b3o4bo$154bo4bobo4bo$159bobo$157bobobobo$159bobo$156b2obobob2o$
156b2obobob2o$157bobobobo$158b2ob2o$157bobobobo$156b2obobob2o$156b3o3b
3o2$156bobo3bobo$155bo2bo3bo2bo$156bo7bo$156bobo3bobo$157b2o3b2o$141b
3o12bo7bo$39b3o2bo2b3o5b3o2bo2b3o75b3o15bobo$39bobobobobobo5bobobobobo
bo90b2o5b2o$38bo4bobo4bo3bo4bobo4bo73bo3bo9bo11bo$38bob2obobob2obo3bob
2obobob2obo72bobobobo8b2o9b2o$39b2o3bo3b2o5b2o3bo3b2o70bob2obobob2obo
5b2o9b2o$136bo11bo7bo7bo$135bobo9bobo4b2o9b2o$136b3o7b3o5b2ob2o3b2ob2o
$137b2o7b2o2$17b3o3b3o110b3o7b3o6b3o5b3o$17bo2bobo2bo111b2o7b2o7bob7ob
o$16bo9bo14bobobobo9bobobobo72b3o7b3o6bobob3obobo$15bo11bo13b2o3b2o9b
2o3b2o73bobo5bobo11b3o$16bo9bo108bob2o7b2obo6bo3bo3bo$135b3o9b3o10bo$
16b3obobob3o13b2o5b2o7b2o5b2o70bo13bo7bo5bo$17b2obobob2o13b3o5b3o5b3o
5b3o92b2ob2o$19b2ob2o14bo11bo3bo11bo68b3o9b3o7b2o3b2o$39b2o7b2o5b2o7b
2o70b2o9b2o7b2o5b2o$40b2o5b2o7b2o5b2o13b3o10b3o43bo9bo7bo2bo3bo2bo$42b
o3bo11bo3bo15bobo10bobo45bo5bo10bobo3bobo$42bo3bo11bo3bo14bo2bo10bo2bo
40b2obobo3bobob2o8bo3bo$43bobo13bobo16bo14bo62bobobobobo$44bo15bo19bo
10bo48bo3bo15bo13bo14bo23b4o13bo$79bob3o4b3obo43bo11bo8b3ob3o6b6o12b6o
35bobo$80b2o2bo2bo2b2o23b3o10b3o4b2ob2o5b2ob2o20bo4bo3b2o2b2o3bo4bo19b
o2bo12bobo$20bobo60b2o2b2o14b3o9bobo10bobo6b3o5b3o8bo2b3o2bo5b6o3b2o2b
2o3b6o18bob2obo12bo$20b3o59bobo2bobo13b3o9b3o10b3o7b2ob3ob2o9bo3bo3bo
7b3o5bo2bo5b3o20bo4bo$20b3o20bo17bo21bo4bo13bo3bo9b2o4b2o4b2o8bo7bo9bo
7bo12b2o6b2o$43bo17bo22b4o33bo2bo31b3o3b3o12b2ob4ob2o25bo4bo$2bo15bo5b
o16bobobo13bobobo18bob4obo12bo3bo10bobo6bobo7b2o4bo4b2o7bo2bobo2bo11bo
4b2o4bo24b2o2b2o6b3o7b3o$b3o9b2o3bo5bo3b2o9b2o5b2o9b2o5b2o15bob2o2b2ob
o8bob2o3b2obo8b10o7b2obobobobobob2o9bobo14bo3bo2bo3bo11bo5bo6b6o6b3o7b
3o$2obo9b2o3bo5bo3b2o9b2o5b2o9b2o5b2o14b2o8b2o6bob2obobob2obo9bo4bo9b
3o2bo3bo2b3o5bobobobobobo32bobo3bobo6bo2bo6bo3bo5bo3bo$3o36b2o5b2o9b2o
5b2o13bobo8bobo4bo3b3ob3o3bo8bo4bo10bobo7bobo6bob2o3b2obo11b2o6b2o10b
2obo3bob2o6b2o7bo2bo7bo2bo$b2o17b3o17b2o3b2o11b2o3b2o18b2o2b2o9b2obobo
bobob2o9bo4bo11bo9bo6b2o9b2o10bo8bo13b2ob2o9b2o7bo2bo7bo2bo10$bo5b4o
13b2o$o4b2o4b2o10bo2bo$3o2b2o5bo11bo$7b2obobo12b4o$12bo13b3o$8bo3bo$8b
o4bo17bo$10b3o3bo11b2o4bo$10b2o4bo12b2o4bo$16b2o13b2o2bo$18bo12b2ob3o$
18b3o13b3o$34b3o2b2o$34b3o3b2o$21bo18b2o$20bob5o13bo$19b2o5bo10b4o$19b
2o3bo2bo9bo2b2o2b2o$27bo9b2ob7o$21b2obo2bo11bo2bo3bo$24bo2bo12bobo$25b
2o13b3o$25b2o18b4o$45b6o$45b4o2bo2$48b2o$48b2o2bo$50bo$50b2o$51bo2b2o$
54b2o$54b2obo$55bo2bo$56bobo$57bo!
The diagonal ones are c/4, c/5, c/6 and are known from standard Life. The orthogonal ones are, from left to right:

c/2 (2c/4)
17c/35
4c/9 (12c/27)
2c/5
c/3
2c/7
c/4
c/5
c/6
c/7
c/10
c/17

For me, the highlights are the 4c/9, which is two copies of a fairly common semi-natural puffer placed side by side, the very cool 17c/35, and the little c/17. There's a version of that which pushes a pond instead of a beehive. Some of the others I imported from Life, like the copperhead and the weekender, which also work here.
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » July 5th, 2022, 8:27 am

c/2o originally found in some other rule, can't remember which one.

Code: Select all

x = 8, y = 5, rule = B3/S2-i34a
2o4b2o$b6o$bo4bo$b2o2b2o$3b2o!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » July 10th, 2022, 5:22 pm

2 different sizes of octagon:

Code: Select all

x = 24, y = 13, rule = B3/S23-a6c
17bo3$15bo3bo$bo2bo9bob3obo$ob2obo9bo3bo$bo2bo6bo3bo3bo3bo$bo2bo10bo3b
o$ob2obo8bob3obo$bo2bo10bo3bo3$17bo!
EDIT: Different rule, same story:

Code: Select all

x = 24, y = 13, rule = B3-e/S236c
17bo3$15bo3bo$bo2bo9bob3obo$ob2obo9bo3bo$bo2bo6bo3bo3bo3bo$bo2bo10bo3b
o$ob2obo8bob3obo$bo2bo10bo3bo3$17bo!
EDIT3: 2c/8:

Code: Select all

x = 7, y = 5, rule = B3/S23-q7e
2o3b2o$o2bo2bo$bo3bo$2bobo$3bo!
Completely unrelated EDIT4: 2-engine repship in B3/S23-a4a:

Code: Select all

x = 32, y = 42, rule = B3/S23-a4a
26b4o$25b6o$24bo6bo$25b6o$26b4o$4b2o$2b2o2b2o$bo6bo$bo6bo$o8bo$bo6bo$
bo6bo$2b2o2b2o$4b2o4$19b2o$19b2o$21bo$20bob2o$20bobo$21bo9$16b2o$16bo
2bo7b3o$19bo2b3o2b4o$16b3ob2ob4o4bo$15bo3bo2b2o3b4o$13b3o2bo3b3ob4o$9b
4ob2o8b2o$8b5obo5bo$9b2obo$9b3o$10bo!
Last edited by Period1GliderGun on July 10th, 2022, 7:39 pm, edited 1 time in total.
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
Period1GliderGun
Posts: 727
Joined: March 9th, 2022, 1:50 am
Location: Everywhere you look
Contact:
Contact Period1GliderGun

Re: Rules 2 transitions from Life

Post by Period1GliderGun » July 10th, 2022, 6:21 pm

Conwaylife won't let me delete this post.
It's OK to abbreviate my username to "P1GG," but never, never, call me "pig."

Code: Select all

x = 36, y = 9, rule = B3/S23
23bobo$21bo3bo$13bo7bo$12b4o4bo4bo8b2o$11b2obobo4bo12b2o$2o8b3obo2bo3b
o3bo$2o9b2obobo6bobo$12b4o$13bo!
[[ STEP 30 ]]
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » July 11th, 2022, 1:06 am

110-generation honey farm variant:

Code: Select all

x = 5, y = 3, rule = B34y/S234i
b3o$o3bo$b3o!
p124/4 glider gun:

Code: Select all

x = 5, y = 14, rule = B34y/S234j
b2o$b2o3$3bo$2bobo$2b3o4$bob2o$o3bo$bobo$2bo!
12c/26o:

Code: Select all

x = 5, y = 6, rule = B34y/S23-n
2o$o$b3o$3b2o$bobo$bo!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
User avatar
LaundryPizza03
Posts: 2324
Joined: December 15th, 2017, 12:05 am
Location: Unidentified location "https://en.wikipedia.org/wiki/Texas"

Re: Rules 2 transitions from Life

Post by LaundryPizza03 » July 14th, 2022, 4:05 pm

29c/58o and p36:

Code: Select all

x = 11, y = 26, rule = B34y/S23-j
bo$2o2$5bobo$4b2ob2o$3bo4b2o$8b3o$3bo4b2o$4b2ob2o$5bobo2$2o$bo9$8b2o$
7b3o2$8b2o$9bo!
c/13o:

Code: Select all

x = 3, y = 9, rule = B34y/S23-i
b2o$b2o$o$2o2$2o$o$b2o$b2o!

Code: Select all

x = 4, y = 3, rule = B3-q4z5y/S234k5j
2b2o$b2o$2o!
LaundryPizza03 at Wikipedia
Top
Post Reply

Return to “Other Cellular Automata”