Tatlo lang ang alam ko diyan sa sinabi mo... I mean.
I only know three of those language that you said because I don't know kapampangan and I know there is more languages than that.
I can only speak english and tagalog.
Tatlo lang ang alam ko diyan sa sinabi mo... I mean.
Code: Select all
x = 13, y = 20, rule = B3/S23
11b2o$11b2o4$8b2o$8b2o2$2o$2o3$3b2o$3b2o2$11b2o$10b2o$12bo$3b2o$3b2o!
Code: Select all
x = 35, y = 27, rule = B3/S23
3o2b2o$bo3bo$3ob2o2$3obobob3ob3ob3o$bo2b3ob2o2bobob2o$bo2bobob3obo3b3o2$bo$obo$obo2$
obob3ob3obobob3ob3o$obo2bo2b2o2b3ob2o2bobo$bo2b3ob3ob3ob3obo2$3ob3o$bo2bobo$bo2b3o2$
3obo3b3o$obobo3b2o$o3b3ob3o2$3ob3ob3obobob3ob3ob3ob3ob3o$o3bobobobobobob2o2bobo2bo2b2o2bobo$
3ob3obobo2bo2b3obo4bo2b3obo!
anythingsonata wrote:July 2nd, 2020, 8:33 pmconwaylife signatures are amazing[citation needed]
Press Ctrl+C while in the viewer. (This took me an embarrassingly long time to figure out, but to be fair it's not advertised, like, anywhere.)
Even less well-advertised is that Ctrl+S (after editing) rewrites the DOM element of the webpage containing the RLE with the current contents of the pattern. I requested this feature from Chris specifically so that when you're using lifelib in a Jupyter notebook, you can edit patterns in-place by launching LifeViewers.
Code: Select all
x = 171, y = 171, rule = B3/S23
82b2o3b2o$82bobobobo$85bo$85bo$85bo$85bo$85bo14$48bo5bo61bo5bo$49bo3bo
63bo3bo$49bo3bo64bobo$48b7o63b3o$49bo3bo63bo3bo$49bo3bo63bo3bo$48bo5bo
63b3o22$20b3ob3o117bo5bo$20bob3obo118b5o$146bobo$146bobo$146bobo$20b3o
b3o118b5o$20bob3obo117bo5bo28$4o160b7o$bobo160bobo$bobo160b3o$4b3o$4bo
bo161b3o$4b3o161bobo$2b2o160b7o28$23b4o119b3o$25b2o119bobo$24bobo119bo
bo$21bobo2bo117b3obo$22bo121bobobo$21bobo120b3obo$20bo127b3o22$48b5o
63b5o$48bobobo63bobobo$48bobobo63bobob3o$48bobobo63bobobobo$48bobobo
63bob5o$48bobob3o61bobobo$48bobo65bobob2o14$84b3o$83bo3bo$83bo3bo$84bo
bo$82b3ob3o2$82b7o!
Wingdings?Entity Valkyrie 2 wrote: ↑December 26th, 2019, 7:14 amCode: Select all
x = 171, y = 171, rule = B3/S23 82b2o3b2o$82bobobobo$85bo$85bo$85bo$85bo$85bo14$48bo5bo61bo5bo$49bo3bo 63bo3bo$49bo3bo64bobo$48b7o63b3o$49bo3bo63bo3bo$49bo3bo63bo3bo$48bo5bo 63b3o22$20b3ob3o117bo5bo$20bob3obo118b5o$146bobo$146bobo$146bobo$20b3o b3o118b5o$20bob3obo117bo5bo28$4o160b7o$bobo160bobo$bobo160b3o$4b3o$4bo bo161b3o$4b3o161bobo$2b2o160b7o28$23b4o119b3o$25b2o119bobo$24bobo119bo bo$21bobo2bo117b3obo$22bo121bobobo$21bobo120b3obo$20bo127b3o22$48b5o 63b5o$48bobobo63bobobo$48bobobo63bobob3o$48bobobo63bobobobo$48bobobo 63bob5o$48bobob3o61bobobo$48bobo65bobob2o14$84b3o$83bo3bo$83bo3bo$84bo bo$82b3ob3o2$82b7o!
Code: Select all
x = 13, y = 20, rule = B3/S23
11b2o$11b2o4$8b2o$8b2o2$2o$2o3$3b2o$3b2o2$11b2o$10b2o$12bo$3b2o$3b2o!
Yes. that is probably known.Gustone wrote: ↑December 26th, 2019, 12:55 pmKnown?Code: Select all
x = 13, y = 12, rule = B3/S23 9b2o$2o7b2o$bo$bob2o2b4o$2bo3bo3bo$7bo$4b2obo$2bo3bo2b2o$2b4o3bobo$11b o$2b2o7b2o$2b2o!
Code: Select all
x = 70, y = 65, rule = B3/S23
27b2o2b2o$27bo4bo$28b4o2$30b4o$30bo3bo$32b2obo$19b2o14bo$12b2o6bo9bo3b
o$13bo6bobo6bob2o2b3o$7b2o4bob2o4b2o6bo7bo$8bo5bo8b2o2b3o$8bobo7bo4bo
2bo$9b3o4b2obo4b2obo$11b3o5bo7bo$12bobo4b3o5b3o$14bo7bo7bo$14b2o5bobo
5b2o2bo$21bobo9b3o$12b4o2b2obobobo3b4o3bo$12bo3bo3bo3b3obo3bo2b2o$2b2o
11bo10b2obo$3bo11bob2o8bobo$3bobo6b2o2bo3bo3bo3bo2b2o$4b2o5bobo3b4o3b
4o3bobo2b2o$7b2o2bo21bo2bobo$7bobobo5b2o5b4o5b2obobo$9bob2o3bo2bo3bo3b
o7bobo$9bobo5b2o4b2o10bo$7b2o2bo21bobo$7bo3bob2o2b4o12b2o$5bobo4bo3bo
3bo9b2o$4b3o10bo11bobo$2b3o9b2ob2o10bo$bobo8bo3bob3o6bobo$bo10b4o3bobo
5b2o$2o19bo$14b2o5bobo3b4o$15bo6b2o2bo3bo$15bobo7bobo$13bobob3o5bob2o$
13b2o5bobo3bob3o$10b2o7b2ob4o3bobo$9bobo19bo$9bo14b2o5b2o$8b2o6bo7bo$
16b3o3bobo$19bo2b2o$18bobo$18bobo$19bo3bo$20b4o2$20b4o$19bo4bo$19b2o2b
2o7$67b3o$67bo$68bo!
Code: Select all
x = 21, y = 16, rule = B3/S23
3b2ob2o$4bobo$3bo3bo$bo2b3obo$b3o2bobo2bo7b2o$4b2o2bobobo5bobo$3bo2b2o
2bobo2bo2bo$4b2o2b2o2bobobob2o$6b2o2b2o2bobobo$2b3o3b2o2b2o2bobo$2bo2b
2o3b2o2b2o2b2o$3bo3b2o3b2o2bobo$3o4bob2o3b2o2bo$o10b2o5b2o$11bob3o$15b
o!
Code: Select all
x = 4, y = 5, rule = B3/S23
bo$4o$2b2o$4o$bo!
x = 4, y = 5, rule = B3/S2c35
bo$4o$2b2o$4o$bo!
Code: Select all
x = 13, y = 20, rule = B3/S23
11b2o$11b2o4$8b2o$8b2o2$2o$2o3$3b2o$3b2o2$11b2o$10b2o$12bo$3b2o$3b2o!
What is your star sign?JP21 wrote: ↑December 26th, 2019, 9:00 amWingdings?Entity Valkyrie 2 wrote: ↑December 26th, 2019, 7:14 amCode: Select all
x = 171, y = 171, rule = B3/S23 82b2o3b2o$82bobobobo$85bo$85bo$85bo$85bo$85bo14$48bo5bo61bo5bo$49bo3bo 63bo3bo$49bo3bo64bobo$48b7o63b3o$49bo3bo63bo3bo$49bo3bo63bo3bo$48bo5bo 63b3o22$20b3ob3o117bo5bo$20bob3obo118b5o$146bobo$146bobo$146bobo$20b3o b3o118b5o$20bob3obo117bo5bo28$4o160b7o$bobo160bobo$bobo160b3o$4b3o$4bo bo161b3o$4b3o161bobo$2b2o160b7o28$23b4o119b3o$25b2o119bobo$24bobo119bo bo$21bobo2bo117b3obo$22bo121bobobo$21bobo120b3obo$20bo127b3o22$48b5o 63b5o$48bobobo63bobobo$48bobobo63bobob3o$48bobobo63bobobobo$48bobobo 63bob5o$48bobob3o61bobobo$48bobo65bobob2o14$84b3o$83bo3bo$83bo3bo$84bo bo$82b3ob3o2$82b7o!
Code: Select all
Note left of 线程1: 收到WM_CLOSE消息
线程1->线程2: SetEvent(退出程序的事件句柄)
Note right of 线程2: 调用DestroyWindow
线程2->线程1: WaitForSingleObject(线程2的句柄)
Note left of 线程1: 释放资源
Code: Select all
x = 13, y = 20, rule = B3/S23
11b2o$11b2o4$8b2o$8b2o2$2o$2o3$3b2o$3b2o2$11b2o$10b2o$12bo$3b2o$3b2o!
Code: Select all
x = 14, y = 30, rule = B3/S23
10b2o$10b2o8$9b3o$8bo3bo$7bo5bo$7b2obob2o3$10bo$3b2o4bobo$3bobo3bobo$
5bo4bo$5b2o$2bo6b2o$2b5o2b2o$6bo$2b2o$2bo7b2o$obo4bo2bo$2o4bobobobo$5b
obobob2o$5bo3bo$4b2o2b2o!
This was announced in Build 301 here in the official LifeViewer thread.
...which just made me realise that there's been well over 100 builds in this past year. The viewer has come a long way in 2019.
True, and Ian07's right - I really do need to do some documentation!
Code: Select all
#C [[ GPS 1 TRACKLOOP 7 0 -0.2857 ]]
#C P7H2V0 Odd Symmetry partials:
x = 23, y = 80, rule = B3/S23
x = 103, y = 82, rule = B3/S23
12bo39bo38bo$12bo39bo38bo$11bobo37bobo36bobo$12bo39bo38bo$12bo39bo38bo
$10b5o71b3o5b3o$9bobobobo26b3o4b3ob3o4b3o24bo7bo$8bo7bo24bo3bo2bo2bobo
2bo2bo3bo$6bob2obobob2obo29bob2ob2obo29bobo5bobo$5b4obo3bob4o28b2o5b2o
28bo11bo$5bo13bo21bo3bobob2o3b2obobo3bo22bo3bobo3bo$6b3o3bo3b3o24bobob
obo5bobobobo26b3ob3o$7b11o24b2obobobo5bobobob2o20b3o2bo5bo2b3o$9bo5bo
29bo3b2o3b2o3bo23b2o3b3ob3o3b2o$9b3ob3o29bo3bo5bo3bo23b2ob2o7b2ob2o$8b
obo3bobo27bo3bo7bo3bo23b3ob2o3b2ob3o$3bo3b2o7b2o3bo21b3o2bo7bo2b3o23b
2o9b2o$3bo5bo5bo5bo24b2o9b2o$2bobo15bobo21b2o2bo7bo2b2o24b3obo3bob3o$
3bo3b2o7b2o3bo23bo13bo28bobobobo$3bo6bobobo6bo23b2ob2o5b2ob2o21b3o15b
3o$4bo4b2obob2o4bo25bo2bo5bo2bo22bo2b5ob3ob5o2bo$12bo30b4o3b2ob2o3b4o
19bob5o7b5obo$2b3obobo2bobo2bobob3o19b3ob2o3bobo3b2ob3o$10b2ob2o$11bob
o30bo15bo26b9o$7b5ob5o24b2ob3ob3ob3ob3ob2o23bobobobobobo$6b4o5b4o23bob
2o4bo3bo4b2obo23bo9bo$5bo2b2o5b2o2bo24bo3bo7bo3bo24bob2o5b2obo$4bo15bo
20bo2bo4bo5bo4bo2bo21b2obobobobob2o$4bo2bo9bo2bo20bo2bo2b2o7b2o2bo2bo
23b2obobob2o$3b2obo11bob2o24bo2bo5bo2bo25b2obobo3bobob2o$3b2obo11bob2o
21b7o5b7o21bo3bo7bo3bo$3bo4b3o3b3o4bo26bo7bo25bo4bo7bo4bo$2b2obo2b2o5b
2o2bob2o22bobo9bobo22bo5bo5bo5bo$3bo4b2o5b2o4bo23bobo9bobo23bo15bo$3b
3ob2o7b2ob3o22bo3b2o5b2o3bo23bo4b2ob2o4bo$7b2o7b2o26bo5bo3bo5bo24b4obo
bob4o$3bo17bo29bobo30bo2bo7bo2bo$8bo3bo3bo27bo6bobo6bo28b2ob2o$4bo4bob
obobo4bo24b6o3b6o24b2o2bo5bo2b2o$3bo3b2o7b2o3bo22bobo2bo5bo2bobo20b2o
6b2ob2o6b2o$b3o4b4ob4o4b3o19b2o2b3o5b3o2b2o18bo2bo4bo5bo4bo2bo$bo8bo3b
o8bo20bobobobo3bobobobo19bo4bo3b2ob2o3bo4bo$2b3o15b3o22bo4bo3bo4bo26bo
bobobobobo$3b2o3b2o5b2o3b2o24bo3bo3bo3bo22bo4b3obobob3o4bo$2b2ob3o2bo
3bo2b3ob2o23bo11bo23b2o5bo3bo5b2o$2bo3bo3bo3bo3bo3bo23bo3bo3bo3bo27b3o
5b3o$6b2obo5bob2o28bob2o3b2obo27bobo7bobo$8bo7bo33bo3bo29b2o11b2o$47b
3o5b3o27bob2o5b2obo$3bobo13bobo24bo2bo5bo2bo26bo2bo5bo2bo$5bo6bo6bo25b
ob3o5b3obo25bo11bo$2b2o2bo4bobo4bo2b2o22b3o9b3o25bo2bo5bo2bo$bo8bo3bo
8bo64bo5bo$11bobo32bo11bo26bo2bo5bo2bo$3b2o6b3o6b2o25b2o7b2o$3b3o13b3o
25bobo5bobo28b3o5b3o$3b3o3b3ob3o3b3o24bo11bo28b2obobob2o$6b2o4bo4b2o
26bo3b2o3b2o3bo$6bob9obo26bo2b3o3b3o2bo27b2o5b2o$3bo4b2o5b2o4bo26b3o3b
3o31bobobobo$4b2obobo2bo2bobob2o26bob2o3b2obo26bo4b2ob2o4bo$8bobo3bobo
29bobobo3bobobo23b2obo3b2ob2o3bob2o$3bo2bo3b2ob2o3bo2bo24bo11bo23b2o2b
o4bo4bo2b2o$3b2obo11bob2o26bobo3bobo27bo2bo7bo2bo$5b3o2b2ob2o2b3o28b2o
5b2o27bo2bo7bo2bo$5bobo9bobo65b2o9b2o$4b3o11b3o25bo11bo23bob2o11b2obo$
4bo15bo25bo11bo22bo2bo13bo2bo$3b3o13b3o23bobo9bobo22bo3bo9bo3bo$2b3o
15b3o21b3o11b3o$4b2o13b2o22b4o11b4o22bobo9bobo$42b5o11b5o22bo11bo2$42b
o3bo11bo3bo20b2ob2o7b2ob2o$42bo3bo11bo3bo19bo17bo$41bo21bo22b2o7b2o$
44bo15bo20bo2bo13bo2bo$82b2o15b2o$81bo19bo$84bo13bo!
https://conwaylife.com/wiki/2c/7_orthogonalmscibing wrote: ↑December 30th, 2019, 8:56 pmI think scholar is a fine name. My search program found such a friend at 8:21 this morning after 11 days of searching on a Ryzen 5 2400G.Moosey wrote: ↑March 26th, 2019, 12:18 pmAlso, if one is found, it should be called scholar or something, because a weekender is a person who spends time in a certain place on weekends while a scholar spends time in a certain place on weekdays.I've upload the search script to https://gitlab.com/andrew-j-wade/life_slice_ship_search. The partial spaceship extraction isn't working 100% reliably which manifests as occasional file not found errors, but it doesn't impact the search.Code: Select all
#C 383P7H2V0
#C [[ TRACK 0 -0.2857 ]]
x = 23, y = 82, rule = B3/S23
11bo$10b3o$10b3o2$6b3o5b3o2$6bobo5bobo$6bobo5bobo$7bo7bo$6bo2bo3bo2bo$
7bob2ob2obo$4bo4bo3bo4bo$4b6o3b6o$4bo4bo3bo4bo$5b2obo5bob2o$9bo3bo$5bo
11bo$5bo3bo3bo3bo$6bo2bo3bo2bo$6bo2bo3bo2bo$b3o3bobo3bobo3b3o$o2bo3b9o
3bo2bo$o2bo2b2ob5ob2o2bo2bo$7b2o2bo2b2o$6b2o3bo3b2o$6b2o7b2o$9b2ob2o$
6bo3bobo3bo$6bo3bobo3bo$6b2o2bobo2b2o$8b3ob3o$4b2ob2o5b2ob2o$3bo2b2o7b
2o2bo$2bo17bo$3bob3o7b3obo$6bo2bo3bo2bo$7b3o3b3o$4b2o4bobo4b2o$9bo3bo$
5bo4bobo4bo$2bo6b2ob2o6bo$b2o2b3obo3bob3o2b2o$o5b4o3b4o5bo$bo3b2o2bo3b
o2b2o3bo$2b3o2bobo3bobo2b3o2$7b3o3b3o$6b2o7b2o$5b2o9b2o$5bobo7bobo$6bo
9bo$7bobo3bobo$7bobo3bobo$6bo9bo$6bo9bo$6bo3bobo3bo$7bo2bobo2bo$7bo2bo
bo2bo2$8b3ob3o$8bobobobo$9b5o$3b3o11b3o$3b3o11b3o$bo3bo11bo3bo$5bo11bo
$6bo9bo$bo3bo3bobobo3bo3bo$2b2o4bo5bo4b2o$3bo15bo$4b3o9b3o$5bo5bo5bo$
10b3o$9b2ob2o$9b5o$6b3o2bo2b3o$4bo13bo$4bobo9bobo$6bo9bo$3bobo11bobo$
2bo2bo11bo2bo$3b2o13b2o!
The width is not necessarily minimal; I jumped straight into a width 23 odd symmetric search without trying a width 21 search first.
-- Andrew Wade
Sign out = Logout
Code: Select all
x = 13, y = 20, rule = B3/S23
11b2o$11b2o4$8b2o$8b2o2$2o$2o3$3b2o$3b2o2$11b2o$10b2o$12bo$3b2o$3b2o!
Code: Select all
$ ./gfind b3s23/l100/f2h0/o8/o9/d8/d9
gfind 4.9, D. Eppstein, 20 August 2011
Rule: b3s23/l100/f2h0/o8/o9/d8/d9
Searching for speed c/8, width 6.
Queue full, depth 7, deepening 8, 524k/572k -> 40k/49k
Queue full, depth 8, deepening 15, 524k/577k -> 19k/29k
Queue full, depth 11, deepening 20, 524k/923k -> 11k/40k
Queue full, depth 14, deepening 25, 524k/722k -> 7.1k/31k
Queue full, depth 19, deepening 28, 524k/1.0M -> 2.5k/22k
Queue full, depth 26, deepening 29, 524k/1.1M -> 950/13k
Queue full, depth 35, deepening 28, 524k/1.5M -> 510/7.6k
Queue full, depth 42, deepening 29, 524k/724k -> 468/5.0k
Queue full, depth 50, deepening 29, 524k/857k -> 473/4.5k
Queue full, depth 59, deepening 28, 524k/1.4M -> 368/4.3k
Queue full, depth 81, deepening 14, 314k/3.9M -> 563/6.3k
Searching for speed c/8, width 6, glide-reflect symmetry.
Queue full, depth 7, deepening 8, 524k/572k -> 40k/49k
Queue full, depth 8, deepening 15, 524k/577k -> 18k/29k
Queue full, depth 11, deepening 20, 524k/919k -> 9.9k/35k
Queue full, depth 14, deepening 25, 524k/715k -> 5.7k/26k
Queue full, depth 19, deepening 28, 524k/977k -> 1.5k/14k
Queue full, depth 27, deepening 28, 524k/1.1M -> 519/7.5k
Queue full, depth 40, deepening 23, 524k/2.8M -> 222/3.7k
Queue full, depth 66, deepening 8, 275k/3.9M -> 5.1k/17k
Searching for speed c/8, width 7, glide-reflect symmetry.
Queue full, depth 6, deepening 8, 524k/556k -> 13k/15k
Queue full, depth 8, deepening 14, 524k/560k -> 15k/19k
Queue full, depth 10, deepening 20, 524k/883k -> 5.8k/18k
Queue full, depth 13, deepening 25, 524k/651k -> 2.1k/9.6k
Queue full, depth 18, deepening 28, 524k/1.0M -> 661/5.1k
Queue full, depth 24, deepening 30, 524k/950k -> 203/2.4k
Queue full, depth 33, deepening 29, 524k/1.0M -> 109/1.5k
Queue full, depth 41, deepening 29, 524k/886k -> 79/992
Queue full, depth 47, deepening 31, 524k/886k -> 63/742
Queue full, depth 54, deepening 32, 524k/733k -> 64/513
Queue full, depth 68, deepening 26, 524k/1.5M -> 10/271
Searching for speed c/8, width 11, bilateral symmetry.
Queue full, depth 7, deepening 8, 524k/566k -> 50k/59k
Queue full, depth 8, deepening 15, 524k/572k -> 28k/41k
Queue full, depth 10, deepening 21, 524k/965k -> 13k/43k
Queue full, depth 13, deepening 26, 524k/719k -> 8.5k/36k
Queue full, depth 16, deepening 31, 524k/970k -> 4.2k/26k
Queue full, depth 21, deepening 34, 524k/757k -> 2.6k/21k
Queue full, depth 26, deepening 37, 524k/913k -> 1.4k/15k
Queue full, depth 32, deepening 39, 524k/952k -> 907/12k
Queue full, depth 38, deepening 41, 524k/768k -> 703/9.5k
Queue full, depth 42, deepening 45, 524k/641k -> 585/6.4k
Queue full, depth 48, deepening 47, 524k/836k -> 485/5.9k
Queue full, depth 54, deepening 49, 524k/891k -> 334/5.2k
Queue full, depth 61, deepening 50, 524k/938k -> 250/4.3k
Queue full, depth 69, deepening 50, 524k/969k -> 167/3.7k
Queue full, depth 81, deepening 46, 524k/1.9M -> 130/3.1k
Queue full, depth 90, deepening 45, 524k/1.1M -> 88/2.2k
Queue full, depth 104, deepening 39, 524k/2.2M -> 91/2.5k
Queue full, depth 120, deepening 31, 524k/2.5M -> 137/2.6k
Queue full, depth 146, deepening 13, 148k/3.9M -> 706/6.7k
Searching for speed c/8, width 12, bilateral symmetry.
Queue full, depth 7, deepening 8, 524k/569k -> 60k/70k
Queue full, depth 8, deepening 15, 524k/575k -> 34k/50k
Queue full, depth 10, deepening 21, 524k/980k -> 16k/51k
Queue full, depth 13, deepening 26, 524k/730k -> 10k/43k
Queue full, depth 16, deepening 31, 524k/973k -> 5.8k/33k
Queue full, depth 21, deepening 34, 524k/814k -> 3.6k/27k
Queue full, depth 26, deepening 37, 524k/941k -> 1.8k/20k
Queue full, depth 32, deepening 39, 524k/1.1M -> 1.0k/15k
Queue full, depth 38, deepening 41, 524k/994k -> 592/10k
Queue full, depth 44, deepening 43, 524k/726k -> 480/7.8k
Queue full, depth 50, deepening 45, 524k/718k -> 341/6.3k
Queue full, depth 60, deepening 43, 524k/1.5M -> 301/6.1k
Queue full, depth 71, deepening 40, 524k/1.9M -> 271/5.4k
Queue full, depth 82, deepening 37, 524k/1.6M -> 237/4.9k
Queue full, depth 97, deepening 30, 524k/2.1M -> 213/5.1k
Queue full, depth 122, deepening 13, 246k/3.9M -> 727/8.4k
Queue full, depth 170, deepening 8, 279k/3.9M -> 6.3k/24k
Queue full, depth 194, deepening 8, 202k/3.9M -> 6.9k/22k
Queue full, depth 219, deepening 8, 128k/3.9M -> 2.4k/12k
Searching for speed c/8, width 13, bilateral symmetry, gutter.
Queue full, depth 7, deepening 8, 524k/572k -> 42k/51k
Queue full, depth 8, deepening 15, 524k/578k -> 23k/35k
Queue full, depth 11, deepening 20, 524k/951k -> 15k/52k
Queue full, depth 14, deepening 25, 524k/716k -> 11k/47k
Queue full, depth 18, deepening 29, 524k/1.2M -> 5.3k/40k
Queue full, depth 23, deepening 32, 524k/1.0M -> 2.5k/27k
Queue full, depth 29, deepening 34, 524k/961k -> 1.3k/18k
Queue full, depth 36, deepening 35, 524k/957k -> 871/13k
Queue full, depth 42, deepening 37, 524k/696k -> 716/9.3k
Queue full, depth 48, deepening 39, 524k/828k -> 581/7.6k
Queue full, depth 55, deepening 40, 524k/857k -> 384/5.8k
Queue full, depth 64, deepening 39, 524k/1.4M -> 263/5.4k
Queue full, depth 78, deepening 33, 524k/2.1M -> 241/5.3k
Queue full, depth 89, deepening 30, 524k/1.4M -> 380/4.9k
Queue full, depth 97, deepening 30, 524k/1.2M -> 266/4.1k
Queue full, depth 110, deepening 25, 524k/2.2M -> 470/5.6k
Queue full, depth 120, deepening 23, 524k/1.5M -> 389/4.9k
Queue full, depth 132, deepening 19, 524k/1.8M -> 567/5.2k
Queue full, depth 155, deepening 8, 126k/3.9M -> 1.5k/10k
Searching for speed 3c/8, width 6.
Searching for speed 3c/8, width 6, glide-reflect symmetry.
Searching for speed 3c/8, width 7, glide-reflect symmetry.
Queue full, depth 9, deepening 8, 524k/1.3M -> 451/1.4k
Searching for speed 3c/8, width 11, bilateral symmetry.
Searching for speed 3c/8, width 12, bilateral symmetry.
Searching for speed 3c/8, width 13, bilateral symmetry, gutter.
Searching for speed c/8, width 6, diagonal.
Queue full, depth 7, deepening 8, 524k/580k -> 6.5k/8.6k
Queue full, depth 12, deepening 11, 524k/1.0M -> 4.7k/15k
Queue full, depth 17, deepening 14, 524k/1.3M -> 2.6k/12k
Queue full, depth 24, deepening 15, 524k/1.0M -> 616/4.7k
Queue full, depth 54, deepening 8, 28k/3.9M -> 3/161
Searching for speed c/8, width 11, diagonal, bilateral symmetry.
Queue full, depth 7, deepening 8, 524k/580k -> 16k/21k
Queue full, depth 10, deepening 13, 524k/1.1M -> 3.3k/10k
Queue full, depth 14, deepening 17, 524k/739k -> 1.2k/6.3k
Queue full, depth 24, deepening 15, 524k/1.6M -> 768/5.9k
Queue full, depth 44, deepening 8, 226k/3.9M -> 438/2.2k
Searching for speed c/8, width 12, diagonal, glide-reflect symmetry.
Queue full, depth 6, deepening 8, 524k/556k -> 14k/17k
Queue full, depth 7, deepening 15, 524k/559k -> 8.2k/12k
Queue full, depth 10, deepening 20, 524k/892k -> 3.5k/12k
Queue full, depth 13, deepening 25, 524k/633k -> 1.5k/7.8k
Queue full, depth 18, deepening 28, 524k/1.2M -> 567/4.9k
Queue full, depth 24, deepening 30, 524k/816k -> 294/3.1k
Queue full, depth 31, deepening 31, 524k/887k -> 176/2.1k
Queue full, depth 36, deepening 34, 524k/750k -> 99/1.2k
Queue full, depth 42, deepening 36, 524k/703k -> 90/1.0k
Queue full, depth 48, deepening 38, 524k/802k -> 79/1.0k
Queue full, depth 57, deepening 37, 524k/1.0M -> 42/942
Queue full, depth 68, deepening 34, 524k/1.2M -> 45/796
Queue full, depth 76, deepening 34, 524k/800k -> 39/606
Queue full, depth 87, deepening 31, 524k/1.6M -> 32/707
Queue full, depth 115, deepening 11, 465k/3.9M -> 224/1.8k
Searching for speed c/8, width 13, diagonal, bilateral symmetry, gutter.
Queue full, depth 7, deepening 8, 524k/580k -> 6.6k/8.8k
Queue full, depth 12, deepening 11, 524k/1.0M -> 5.8k/19k
Queue full, depth 16, deepening 15, 524k/994k -> 3.3k/15k
Queue full, depth 22, deepening 17, 524k/1.0M -> 1.1k/8.3k
Queue full, depth 31, deepening 16, 524k/1.3M -> 668/5.1k
Queue full, depth 42, deepening 13, 524k/1.8M -> 437/3.1k
Queue full, depth 55, deepening 8, 524k/2.1M -> 1.1k/3.6k
Searching for speed c/8, width 14, diagonal, skew gutter.
Queue full, depth 7, deepening 8, 524k/580k -> 6.5k/8.6k
Queue full, depth 12, deepening 11, 524k/1.0M -> 3.0k/9.9k
Queue full, depth 18, deepening 13, 524k/1.4M -> 966/4.5k
Searching for speed c/9, width 5.
Queue full, depth 8, deepening 9, 524k/598k -> 21k/27k
Queue full, depth 12, deepening 14, 524k/1.2M -> 17k/54k
Queue full, depth 15, deepening 20, 524k/821k -> 7.5k/33k
Queue full, depth 21, deepening 23, 524k/1.1M -> 2.0k/18k
Queue full, depth 36, deepening 17, 524k/3.3M -> 1.0k/13k
Queue full, depth 57, deepening 9, 524k/2.7M -> 6.7k/23k
Queue full, depth 80, deepening 9, 101k/3.9M -> 1.5k/9.8k
Searching for speed c/9, width 5, glide-reflect symmetry.
Queue full, depth 8, deepening 9, 524k/598k -> 21k/27k
Queue full, depth 12, deepening 14, 524k/1.2M -> 16k/50k
Queue full, depth 15, deepening 20, 524k/813k -> 6.0k/27k
Queue full, depth 22, deepening 22, 524k/1.1M -> 1.8k/16k
Queue full, depth 36, deepening 17, 470k/3.9M -> 778/9.7k
Queue full, depth 57, deepening 9, 524k/2.6M -> 7.0k/24k
Queue full, depth 82, deepening 9, 67k/3.9M -> 793/6.1k
Searching for speed c/9, width 6, glide-reflect symmetry.
Queue full, depth 7, deepening 9, 524k/580k -> 7.6k/9.5k
Queue full, depth 9, deepening 16, 524k/585k -> 12k/19k
Queue full, depth 13, deepening 21, 524k/895k -> 2.6k/11k
Queue full, depth 19, deepening 24, 524k/1.2M -> 510/4.2k
Queue full, depth 37, deepening 15, 497k/3.9M -> 189/2.3k
Searching for speed c/9, width 9, bilateral symmetry.
Queue full, depth 8, deepening 9, 524k/602k -> 48k/61k
Queue full, depth 9, deepening 17, 524k/606k -> 15k/31k
Queue full, depth 14, deepening 21, 524k/929k -> 6.7k/31k
Queue full, depth 20, deepening 24, 524k/1.2M -> 4.3k/30k
Queue full, depth 25, deepening 28, 524k/824k -> 2.5k/20k
Queue full, depth 33, deepening 29, 524k/940k -> 1.1k/14k
Queue full, depth 43, deepening 28, 524k/1.6M -> 712/10k
Queue full, depth 52, deepening 28, 524k/1.5M -> 1.3k/10k
Queue full, depth 59, deepening 30, 524k/1.3M -> 1.1k/10k
Queue full, depth 68, deepening 30, 524k/1.3M -> 983/10k
Queue full, depth 76, deepening 31, 524k/1.2M -> 472/7.1k
Queue full, depth 99, deepening 17, 374k/3.9M -> 1.2k/12k
Searching for speed c/9, width 10, bilateral symmetry.
Queue full, depth 8, deepening 9, 524k/605k -> 52k/66k
Queue full, depth 11, deepening 15, 524k/1.3M -> 18k/62k
Queue full, depth 15, deepening 20, 524k/889k -> 11k/46k
Queue full, depth 21, deepening 23, 524k/1.4M -> 7.6k/50k
Queue full, depth 25, deepening 28, 524k/821k -> 3.3k/28k
Queue full, depth 33, deepening 29, 524k/1.0M -> 1.5k/19k
Queue full, depth 46, deepening 25, 524k/2.3M -> 1.1k/16k
Queue full, depth 57, deepening 23, 524k/1.4M -> 889/12k
Queue full, depth 73, deepening 16, 524k/2.7M -> 1.6k/15k
Searching for speed c/9, width 11, bilateral symmetry, gutter.
Queue full, depth 8, deepening 9, 524k/598k -> 21k/28k
Queue full, depth 12, deepening 14, 524k/1.2M -> 20k/64k
Queue full, depth 15, deepening 20, 524k/847k -> 11k/48k
Queue full, depth 21, deepening 23, 524k/1.4M -> 4.6k/38k
Queue full, depth 29, deepening 24, 524k/1.4M -> 1.9k/22k
Queue full, depth 37, deepening 25, 524k/1.1M -> 1.0k/12k
Queue full, depth 49, deepening 22, 524k/2.5M -> 1.0k/11k
Queue full, depth 57, deepening 23, 524k/830k -> 978/9.5k
Queue full, depth 74, deepening 15, 492k/3.9M -> 2.0k/19k
Queue full, depth 98, deepening 9, 106k/3.9M -> 1.7k/11k
Searching for speed 2c/9, width 5.
Queue full, depth 8, deepening 9, 524k/601k -> 3.9k/6.8k
Queue full, depth 14, deepening 12, 524k/1.0M -> 2.7k/11k
Searching for speed 2c/9, width 5, glide-reflect symmetry.
Queue full, depth 8, deepening 9, 524k/601k -> 3.8k/6.7k
Queue full, depth 14, deepening 12, 524k/1.0M -> 2.4k/10k
Searching for speed 2c/9, width 6, glide-reflect symmetry.
Queue full, depth 7, deepening 9, 524k/585k -> 4.4k/7.3k
Queue full, depth 12, deepening 13, 524k/874k -> 1.8k/6.0k
Searching for speed 2c/9, width 9, bilateral symmetry.
Queue full, depth 8, deepening 9, 524k/602k -> 7.5k/12k
Queue full, depth 15, deepening 11, 524k/1.6M -> 4.6k/18k
Queue full, depth 33, deepening 9, 230k/3.9M -> 4.7k/29k
Queue full, depth 55, deepening 9, 96k/3.9M -> 1.5k/11k
Searching for speed 2c/9, width 10, bilateral symmetry.
Queue full, depth 12, deepening 9, 524k/1.8M -> 9.5k/27k
Queue full, depth 21, deepening 9, 524k/2.2M -> 8.8k/36k
Queue full, depth 47, deepening 9, 56k/3.9M -> 783/7.9k
Searching for speed 2c/9, width 11, bilateral symmetry, gutter.
Queue full, depth 8, deepening 9, 524k/601k -> 4.0k/7.0k
Queue full, depth 14, deepening 12, 524k/1.0M -> 3.1k/13k
Queue full, depth 37, deepening 9, 207k/3.9M -> 2.9k/15k
Searching for speed 4c/9, width 5.
Searching for speed 4c/9, width 5, glide-reflect symmetry.
Searching for speed 4c/9, width 6, glide-reflect symmetry.
Searching for speed 4c/9, width 9, bilateral symmetry.
Searching for speed 4c/9, width 10, bilateral symmetry.
Searching for speed 4c/9, width 11, bilateral symmetry, gutter.
Searching for speed c/9, width 5, diagonal.
Queue full, depth 9, deepening 9, 524k/614k -> 4.0k/6.2k
Queue full, depth 15, deepening 12, 524k/939k -> 1.8k/7.5k
Searching for speed c/9, width 9, diagonal, bilateral symmetry.
Queue full, depth 9, deepening 9, 524k/615k -> 11k/16k
Queue full, depth 14, deepening 13, 524k/1.0M -> 1.8k/6.3k
Searching for speed c/9, width 11, diagonal, bilateral symmetry, gutter.
Queue full, depth 9, deepening 9, 524k/614k -> 4.0k/6.2k
Queue full, depth 15, deepening 12, 524k/943k -> 3.5k/13k
Queue full, depth 25, deepening 11, 524k/1.7M -> 3.7k/18k
Searching for speed c/9, width 12, diagonal, skew gutter.
Queue full, depth 9, deepening 9, 524k/614k -> 3.9k/6.1k
Queue full, depth 15, deepening 12, 524k/937k -> 505/2.1k
Searching for speed 2c/9, width 5, diagonal.
Searching for speed 2c/9, width 9, diagonal, bilateral symmetry.
Searching for speed 2c/9, width 11, diagonal, bilateral symmetry, gutter.
Searching for speed 2c/9, width 12, diagonal, skew gutter.
Search complete.
Code: Select all
x = 13, y = 20, rule = B3/S23
11b2o$11b2o4$8b2o$8b2o2$2o$2o3$3b2o$3b2o2$11b2o$10b2o$12bo$3b2o$3b2o!