Well, here it is. Some of you who saw that post might have been waiting for this thread to see what B3-n/S1e2-a3-e4e is like. You won't be disappointed.iddi01 wrote: ↑March 24th, 2024, 6:04 amNote that recently, B3-n/S1e2-a3-e4e is quickly climbing the leaderboard of my favorite rules.
It is already my second favorite, and will likely become the first in the future.
I have already posted three posts mentioning it already, and a thread will come soon.
I have decided to call it "tflock" because when looking at the ash of random patterns you will think that this rule is a hybrid of flock and tlife. (now it's renamed "tflock 2" because "tflock" is taken.)
However, the chaos is like neither tlife nor flock. Reactions by themselves stabilize quickly, but generating lots of t-ships that collide with objects and start a chain reaction, like this:
Code: Select all
x = 73, y = 20, rule = B3-n/S1e2-a3-e4e
6$3b3o$3bobo$3bobo5$66b2o$65b4o$64bo4bo$65b4o$66b2o!
The whole article is split into two parts: objects & apgsearch, and reactions & constructions. You may start with the one you're more interested in.
Note that this article will not be updated. Notable later discoveries are listed at the bottom of this post.
Objects & Apgsearch
Code: Select all
x = 2, y = 3, rule = B3-n/S1e2-a3-e4e
o$2o$o!
#C [[ THUMBNAIL THUMBSIZE 4 AUTOSTART TRACKLOOP 2 0.5 0 GPS 2 THEME Golly ]]
There are two other common spaceships: a "century ship" (one of its phases resembles century), and a "slow ship" (not actually slow, just appears slow).
Before listing other objects, note that this is one of the fastest rules to apgsearch in terms of object occurences,
with over 15,000 objects per second on my 10-year-old computer (probably gonna reach 100,000 on modern computers).
The object versatility is also surprisingly high for a rule where objects tend to be small: 2500+ distinct objects from only 475,000 soups, and well over 7000 for 4 million soups. Thus, this rule is a great target for apgsearch.
The following stuff are mostly discovered by apgsearch:
Here are some spaceships (c/2, c/3, 3c/6, 5c/10, including "century ship" and "slow ship", a c/3 tagalong, and a rake)
Code: Select all
x = 144, y = 46, rule = B3-n/S1e2-a3-e4e
9$50bo$21bo6bo10bo9b4o14b3o$20b3o4bobo7b2obo12bo13bo2bo2b3o$6b3o10bo6b
2ob2o7bob2o11b2o12bo3bo$5bo65b3o$4bo4bo61bo$5bo2b2o30b3o10b3o$39bo12bo
$40bo12bo2$125bo$125bo$114b2o9bo9b2o2$113bo3bo15bo3bo$117b2o2bo3bo3bo
2b2o$114b4o3b2ob3ob2o3b4o4$124b3o$121b2ob3ob2o$121bo7bo$121bobo3bobo2$
122b2o3b2o3$122bo5bo$123bo3bo$124b3o!
Every oscillator period below 13 is covered except 9. Here are the most common non-trivial oscillators of every known period*:
Code: Select all
x = 115, y = 14, rule = B3-n/S1e2-a3-e4e
94bo$71bo7bo11bo2bo2bo$70bobobobobobo10bobobobo$57bo3b2o7bobobobobobo
12bob2o12bo$44b2o8b2obo13bo2bobo2bo13bo13bobob2o$43bobo11bo2b3o44bobo
3bo$14bo18b3o7b3o27bo39bo$14bo8bo9bobo23b2o10bobo35b2o$12bo10bo9bobo8b
2o27bo$2bo11bo9bo8b3o7bo13b4o$b2o9bo9b2o19bo12bo$bo10bo43bobo$57bobo$
58bo!
Code: Select all
x = 13, y = 47, rule = B3-n/S1e2-a3-e4e
3$8bo$6bobo$4bobo$2bobo3bo$2bobobobo$6bobo$7bo$8b2o17$7b2o$6bo$5bobo$b
obobobo$bobobobo$3bobo$bobo3bo$bobobobo$3bobo$bobo3bo$bobobobo$5bobo$
6bo$7b2o!
Code: Select all
x = 22, y = 4, rule = B3-n/S1e2-a3-e4e
9bo$4o5b2o7b4o$o2bo5bo8bo2bo$4o14b4o!
Code: Select all
x = 13, y = 54, rule = B3-n/S1e2-a3-e4e
$5bo$5bo22$3o7b3o$obo7bobo$obo7bobo26$9b2o!
Reactions & Constructions
Here are all notable reactions i discovered and constructions i've done.
If you find a nice reaction, don't hesitate to post it here: other people might find it very useful!
First, here are all 7 possible reactions between dominos and t-ships (henceforth called DoT reactions):
Code: Select all
x = 15, y = 74, rule = B3-n/S1e2-a3-e4e
3$4bo$2bobo$4bo5b2o9$4bo$2bobo5b2o$4bo7$4bo$2bobo$4bo$10b2o10$10b2o2$
4bo$2bobo$4bo10$4bo6bo$2bobo6bo$4bo6$11bo$4bo6bo$2bobo$4bo6$4bo$2bobo$
4bo$11bo$11bo!
But first, reflectors are needed. Finding them is easy since t-ships can be reflected using a small spark.
Here are known reflectors (above three are one-time, below three are permanent):
Code: Select all
x = 23, y = 51, rule = B3-n/S1e2-a3-e4e
2$16bo5bo$15b3o3b2o$22bo10$2o8bo$2bo7bobo$2bo7bo5$2bo$2bo7bo$10bobo$
10bo4$b4o$bo2bo5bo$b4o5bobo$10bo5$2b2o$bo2bo$bo2bo7bo$bo2bo6b2o$2b2o8b
o4$11bo$2bo8bobo$2b2o7bo$3bo$b2o!
That natural gun has a period too low to be useful, and i find the lack of useful guns very limiting,
so i planned to construct a gun using reflectors and the topmost DoT reaction, and it turned out to be not too hard:
Code: Select all
x = 69, y = 69, rule = B3-n/S1e2-a3-e4e
2$32b3o$32bobo$32bobo$32b3o27$63b4o$b4o58bo2bo$bo2bo23bo4b2o28b4o$b4o
21bobo$28bo21$35bo$34b3o6$33b3o$33bobo$33bobo$33b3o!
Now, for some t-ship eaters:
Code: Select all
x = 16, y = 18, rule = B3-n/S1e2-a3-e4e
$14b2o$2bo10bo$obo10bo$2bo4$2bo10b2o$obo$2bo10b2o3$2bo$obo11bo$2bo10b
2o$13bo$14b2o!
Code: Select all
x = 568, y = 245, rule = B3-n/S1e2-a3-e4e
30$498bo$498bo$499b2o4$505b3o$505bobo$505bobo$505b3o12$413bo$413bo$
317bo93b2o$317bo$318b2o4$546b2o$324b3o218bo$324bobo218bo$324bobo$324b
3o3$536b4o$474b4o58bo2bo$474bo2bo23bo4b2o28b4o$474b4o21bobo$501bo5$13b
o223bo$13b2o220bobo$13bo223bo6$551b2o$550bo$550bo5$355b4o$293b4o58bo2b
o149bo$293bo2bo23bo4b2o28b4o148b3o$293b4o21bobo$320bo4$506b3o$506bobo$
287bo218bobo$287bo218b3o$285b2o2$515b2o$517bo$517bo9$327bo$326b3o6$
325b3o$325bobo$325bobo$325b3o6b2o$336bo$336bo31$415bo$414bobo$413b2ob
2o$413b2ob2o$414bobo$415bo19$459b2o$458bo$458bo4$446b2o$384b2o59b4o$
383b4o57bo4bo$382bo4bo22bo4b2o28b4o$383b4o23b2o34b2o$384b2o24bo6$375bo
$375bo$373b2o13$416b3o2$417bo4$416bo$415bobo$414b2ob2o$414b2ob2o$415bo
bo$416bo3$424b2o$426bo$426bo!
#C [[ STEP 5 ]]
Using everything above, we can finish all three logic gates* (even though the size difference is ridiculous):
Code: Select all
x = 448, y = 273, rule = B3-n/S1e2-a3-e4eHistory
5$5.3A$6.A17$43.D2.D2.D2.3D$43.2D.D.D.D2.D$43.4D.D.D2.D$43.D.2D.D.D2.
D$43.D2.D2.D3.D8$271.D4.3D$270.D.D3.D.D$270.D.D3.2D$270.D.D3.D.D$271.
D4.D.D7$49.A$49.A$50.2A$148.D2.D2.D.2D$147.D.D.2D.D.D.D$56.3A88.3D.4D
.D.D$56.A.A88.D.D.D.2D.D.D$56.A.A88.D.D.D2.D.2D$56.3A10$386.A$386.A$
387.2A3$161.2A$139.A12.A7.A232.3A$137.A.A10.A.A7.A232.A.A$139.A12.A
240.A.A$160.A23.A208.3A$96.2A54.A6.2A23.A.A$95.A56.A7.A23.A$95.A54.2A
5$87.4A$25.4A58.A2.A$25.A2.A23.A4.2A28.4A$25.4A21.A.A$52.A248.A$301.A
$205.A93.2A$205.A$206.2A4$434.2A$212.3A218.A$212.A.A218.A$212.A.A$
212.3A3$424.4A$362.4A58.A2.A$362.A2.A23.A4.2A28.4A$362.4A21.A.A$389.A
2$59.A$58.3A2$125.A$123.A.A$125.A2$57.3A$57.A.A$57.A.A$57.3A$439.2A$
438.A$66.2A370.A$68.A$68.A3$243.4A$181.4A58.A2.A149.A$181.A2.A23.A4.
2A28.4A148.3A$181.4A21.A.A$208.A4$394.3A$394.A.A$175.A218.A.A$175.A
218.3A$173.2A2$403.2A$405.A$405.A9$215.A$214.3A6$213.3A$213.A.A$213.A
.A$213.3A6.2A$224.A$224.A31$303.A$302.A.A$301.2A.2A$301.2A.2A$302.A.A
$303.A19$347.2A$346.A$346.A4$334.2A$272.2A59.4A$271.4A57.A4.A$270.A4.
A22.A4.2A28.4A$271.4A23.2A34.2A$272.2A24.A6$263.A$263.A$261.2A13$304.
3A2$305.A4$304.A$303.A.A$302.2A.2A$302.2A.2A$303.A.A$304.A3$312.2A$
314.A$314.A4$293.3A2$294.A!
* It's actually pseudo-OR gate because the output lane in that OR gate is different for different input paths.
Conclusion
There has been many nice later discoveries, which proves the rule omniperiodic, and almost Turing-complete.
A Rule 110 unit cell (which will prove the rule Turing-complete) is almost finished, but is unable to turn off due to a small problem.
Proof for omniperiodicity:
There are still many things waiting to be discovered, including:EvinZL wrote: ↑This officially gives omniperiodicity, since we have oscillators of all periods below 18 from soupAbhpzTa wrote: ↑ Stable 90-degree T reflector, repeat time 18:Code: Select all
x = 28, y = 8, rule = B3-n/S1e2-a3-e4e o8bo14b2o$2o7b2o$o8bo13b5o2$16bo8b2o$16bo3bobobobo$17b2obobob2o$20bobo !
- An oblique spaceship
- A binary counter
- A Geminoid/orthogonoid/demonoid
Notable later discoveries
Reflectors, splitters, guns, etc (by silversmith):
Code: Select all
x = 182, y = 98, rule = B3-n/S1e2-a3-e4e
9$164b2o2$163b2o$173b2o$162b2o11bo$175bo$161b3o2$160b3o2$159b2o$175bo$
175bo$173b2o2$172b2o2$170b3o2$171b2o$165bo$164b3o6$20b2o2$18b3o2$20b2o
$67b2o16b2o30bo$36b2o46bo32bobo$66b2o17b2o32bobo$6b2o15b2o11b2o83bo$5b
o16bo28b2o12b2o9b3o5b2o$6b2o15b2o10b2o40bo$37bo4b3o5b3o31b2o26b2o$5b2o
7b3o5b2o10b3o6bo$15bo36b2o59b3o$22b2o11bo$35bo46b2o28b2o$36b2o$48b2o
28bo2b2o14bo3bo$20b2o15b2o38bobo17bobobob2o$39bo4bo2b2o26bobobob2o16bo
bo$16bo2b2o16b2o4bobo29bo3bo23b2o$15bobo23bobobob2o$13bobobob2o20bo3bo
47b2o9b2o$13bo3bo94b2o$94b2o$111b2o$94b2o$99bo10b2o$98b3o$117b3o$118bo
$65bo3bo10bo3bo$65bobobob2o7bobobob2o$67bobo12bobo79b3o$68bo2b2o10bo2b
2o$46bobo63b2o51bo$13bobo15bobobo7b2obobobo21b2o13b2o13bo$13bobo3bobob
o4b2obobobobo4bo3bobobob2o28bo17bobo10b2o2bo$11bobobobobobobo3bo3bobob
obo4bo5bobo3bo7bo18b3o14bobo15bobo$8b2obobobobobobo5bo5bobo18bo7bo35bo
14b2obobobo$7bo3bobobobobobo12bo28b2o51bo3bo$7bo3bobobo2bo34b3o11bo$
15bo22bo27b3o8bo$38bo15b2o21bo$36b2o40b2o2$48bo$33bo9bo3b3o$32b3o8bo$
44b2o4$67bo$66b3o$16bo$15b3o2$82bo$81b3o!
Code: Select all
x = 28, y = 8, rule = B3-n/S1e2-a3-e4e
o8bo14b2o$2o7b2o$o8bo13b5o2$16bo8b2o$16bo3bobobobo$17b2obobob2o$20bobo!
Code: Select all
x = 10, y = 10, rule = B3-n/S1e2-a3-e4e
5b2obo$4bo3b2o$4bo$3b2o$b3o$o$o2$2o$bo!
Code: Select all
x = 261, y = 903, rule = B3-n/S1e2-a3-e4e
53$59bo$59bo$57b2o2$50b3o$49b5o3$49b5o$50b3o19$11b2o$13bo21bo$13bo21bo
bo$35bo3$18bo2bo$17b2o2b2o57bo2bo$17b2o2b2o56b2o2b2o$17b2o2b2o27b2o3bo
23b2o2b2o$18bo2bo32b2o23b2o2b2o$55bo24bo2bo20$48b3o2$49bo5$49b3o$48b5o
3$41b3o4b5o$42bo6b3o2$41b2o$40bo$40bo39$78bo$78bo$76b2o$183bo$69b3o
111bo$68b5o111b2o2$190b3o$68b5o116b5o$69b3o2$189b5o$190b3o14$172bo$
172bo$30b2o$32bo21bo$32bo21bobo$54bo175b2o$194bo34bo$194b2o33bo$37bo2b
o153bo$36b2o2b2o57bo2bo$36b2o2b2o56b2o2b2o$36b2o2b2o27b2o3bo23b2o2b2o
117bo2bo$37bo2bo32b2o23b2o2b2o55bo2bo57b2o2b2o$74bo24bo2bo55b2o2b2o56b
2o2b2o$158b2o2b2o11bo15b2o27b2o2b2o$158b2o2b2o9bobo45bo2bo$159bo2bo12b
o$142b2o$133bo7bo$131bobo7bo$133bo$141bo$133bo6b2o$133bo7bo$131b2o6$
193bo2$192b3o$67b3o130bo2$68bo130b3o5$68b3o$67b5o2$191b3o$60b3o4b5o
118b5o$61bo6b3o2$60b2o128b5o$59bo131b3o$59bo$200b2o$202bo$202bo37$169b
o$168b3o18$117b3o2$118bo43$59bo$59bo$57b2o2$50b3o$49b5o3$49b5o$50b3o
19$11b2o$13bo21bo$13bo21bobo$35bo3$18bo2bo$17b2o2b2o57bo2bo$17b2o2b2o
56b2o2b2o$17b2o2b2o27b2o3bo23b2o2b2o$18bo2bo32b2o23b2o2b2o$55bo24bo2bo
20$48b3o2$49bo5$49b3o$48b5o3$41b3o4b5o$42bo6b3o2$41b2o$40bo$40bo39$78b
o$78bo$76b2o$183bo$69b3o111bo$68b5o111b2o2$190b3o$68b5o116b5o$69b3o2$
189b5o$190b3o14$172bo$172bo$30b2o$32bo21bo$32bo21bobo$54bo175b2o$194bo
34bo$194b2o33bo$37bo2bo153bo$36b2o2b2o57bo2bo$36b2o2b2o56b2o2b2o$36b2o
2b2o27b2o3bo23b2o2b2o117bo2bo$37bo2bo32b2o23b2o2b2o55bo2bo57b2o2b2o$
74bo24bo2bo55b2o2b2o56b2o2b2o$158b2o2b2o11bo15b2o27b2o2b2o$158b2o2b2o
9bobo45bo2bo$159bo2bo12bo$142b2o$133bo7bo$131bobo7bo$133bo$141bo$133bo
6b2o$133bo7bo$131b2o6$193bo2$192b3o$67b3o130bo2$68bo130b3o5$68b3o$67b
5o2$191b3o$60b3o4b5o118b5o$61bo6b3o2$60b2o128b5o$59bo131b3o$59bo$200b
2o$202bo$202bo56$117b3o2$118bo43$59bo$59bo$57b2o2$50b3o$49b5o3$49b5o$
50b3o19$11b2o$13bo21bo$13bo21bobo$35bo3$18bo2bo$17b2o2b2o57bo2bo$17b2o
2b2o56b2o2b2o$17b2o2b2o27b2o3bo23b2o2b2o$18bo2bo32b2o23b2o2b2o$55bo24b
o2bo20$48b3o2$49bo5$49b3o$48b5o3$41b3o4b5o$42bo6b3o2$41b2o$40bo$40bo
39$78bo$78bo$76b2o$183bo$69b3o111bo$68b5o111b2o2$190b3o$68b5o116b5o$
69b3o2$189b5o$190b3o14$172bo$172bo$30b2o$32bo21bo$32bo21bobo$54bo175b
2o$194bo34bo$194b2o33bo$37bo2bo153bo$36b2o2b2o57bo2bo$36b2o2b2o56b2o2b
2o$36b2o2b2o27b2o3bo23b2o2b2o117bo2bo$37bo2bo32b2o23b2o2b2o55bo2bo57b
2o2b2o$74bo24bo2bo55b2o2b2o56b2o2b2o$158b2o2b2o11bo15b2o27b2o2b2o$158b
2o2b2o9bobo45bo2bo$159bo2bo12bo$142b2o$133bo7bo$131bobo7bo$133bo$141bo
$133bo6b2o$133bo7bo$131b2o6$193bo2$192b3o$67b3o130bo2$68bo130b3o5$68b
3o$67b5o2$191b3o$60b3o4b5o118b5o$61bo6b3o2$60b2o128b5o$59bo131b3o$59bo
$200b2o$202bo$202bo37$169bo$168b3o!
Code: Select all
x = 175, y = 186, rule = B3-n/S1e2-a3-e4e
52bo7bo12bo7bo$50b2ob2o4bobo10bobo4b2ob2o$51bobo4b2ob2o8b2ob2o4bobo2$
54bo24bo$53b3obo18bob3o$55b4o16b4o$61b3o6b3o$54bo24bo$53bo3bo4bo8bo4bo
3bo$54bo24bo2$52bo$51bobo$50b2ob2o26b3o$81bobo$60bo12bo6bo3bo$53b3o6bo
2bo2bo2bo$2bo7bo12bo7bo23b4o3bo2bo2bo2bo2bo4b3o$2ob2o4bobo10bobo4b2ob
2o28bo2bo2bo2bo4b2o$bobo4b2ob2o8b2ob2o4bobo22b3o2bo12bo5bo$54b3o20b3o$
4bo24bo23b2o$3b3obo18bob3o49b2o$5b4o16b4o2$4bo6b3o6b3o6bo$3bo3bo18bo3b
o31bo8bo$4bo7bo8bo7bo$61b3o6b3o$2bo28bo$bobo26bobo$2ob2o24b2ob2o25b2o$
12bobo4bobo36bo2bo$12bo2bo2bo2bo37b2o$3b3o6bobo4bobo6b3o$5b4o16b4o2$5b
3o18b3o$4b3o20b3o$3b2o7bo8bo7b2o$73bo$11b3o6b3o51b3o$75bo5$9b2o12b2o
16bo$8bo2bo10bo2bo14b2o37bo$9b2o2b2o4b2o2b2o16bo37b2o$79bo4$143bo7bo
12bo7bo$141b2ob2o4bobo10bobo4b2ob2o$142bobo4b2ob2o8b2ob2o4bobo2$145bo
24bo$144b3obo18bob3o$146b4o16b4o2$145bo24bo$45bo98bo3bo4bo8bo4bo3bo$
43bobo57bo41bo6bobo6bobo6bo$45bo57b2o44bobo3bo4bo3bobo$71bo31bo39bo5bo
7b2o7bo5bo$142bobo6bo3bo4bo3bo6bobo$70b3o68b2ob2o6bobo6bobo6b2ob2o$
153bo8bo2$144b3o22b3o$146b4o16b4o2$146b3o18b3o$145b3o20b3o$144b2o24b2o
3$69bo$67bobo3bo53bo22b2o12b2o$69bo4b3o50b2o20bo2bo10bo2bo$75bo51bo22b
2o2b2o4b2o2b2o14$135bo$135bobo$135bo8$71bo2$70b3o4$111bo$111bobo$111bo
14$87bo$87bobo$87bo$60b3o$60bobo$59bo3bo2$62b3o$66b2o$64bo$64b3o2$62b
2o3$121bobo$118b2obobob2o$65b2o50bo3bobobobo$64bobo4bo45bo8b2o$64b2o$
70b3o51b5o$68bo$67b3o55b2o2$124b2o$126bo$126bo$101b2o$125b3o$68bo30b5o
$59bobo5b3o55b3o$59bobo38b2o8bo11bo$100bobobobo3bo9bobo2b2o$101b2obobo
b2o10bobobobo$62bo3bo37bobo15bob2o$61bobobobo54bo$60bo7bo$61bobobobo$
51b2o9bo3bo9b2o$57bo13bo$51b2o3bobo11bobo3b2o$55bo3bo9bo3bo$56bobo11bo
bo2$56bobo11bobo$55bo3bo9bo3bo$51b2o3bobo11bobo3b2o$57bo13bo$51b2o9bo
3bo9b2o$61bobobobo$60bo7bo$61bobobobo$62bo3bo3$59bobo5bobo$59bobo5bobo
!
Code: Select all
x = 46, y = 71, rule = B3-n/S1e2-a3-e4e
13$11b2o23b2o2$10b3o23b3o2$9b2ob2o21b2ob2o$14bo19bo$8b2ob3obo17bob3ob
2o$15bo17bo28$24bo$24bo$13b2o9bo9b2o2$12bo3bo15bo3bo$16b2o2bo3bo3bo2b
2o$13b4o3b2ob3ob2o3b4o4$23b3o$20b2ob3ob2o$20bo7bo$20bobo3bobo2$21b2o3b
2o3$21bo5bo$22bo3bo$23b3o!
Code: Select all
x = 314, y = 511, rule = B3-n/S1e2-a3-e4e
12$105bo2$104b3o29$53bo$53bo$51b2o2$44b3o$43b5o3$43b5o$44b3o19$5b2o$7b
o21bo$7bo21bobo$29bo3$12bo2bo$11b2o2b2o57bo2bo$11b2o2b2o56b2o2b2o$11b
2o2b2o27b2o3bo23b2o2b2o$12bo2bo32b2o23b2o2b2o$49bo24bo2bo20$42b3o2$43b
o5$43b3o$42b5o3$35b3o4b5o$36bo6b3o2$35b2o$34bo$34bo39$72bo$72bo$70b2o$
177bo$63b3o111bo$62b5o111b2o2$184b3o$62b5o116b5o$63b3o2$183b5o$184b3o
14$166bo$166bo$24b2o$26bo21bo$26bo21bobo$48bo175b2o$188bo34bo$188b2o
33bo$31bo2bo153bo$30b2o2b2o57bo2bo$30b2o2b2o56b2o2b2o$30b2o2b2o27b2o3b
o23b2o2b2o117bo2bo$31bo2bo32b2o23b2o2b2o55bo2bo57b2o2b2o$68bo24bo2bo
55b2o2b2o56b2o2b2o$152b2o2b2o11bo15b2o27b2o2b2o$152b2o2b2o9bobo45bo2bo
$153bo2bo12bo$136b2o$127bo7bo$125bobo7bo$127bo$135bo$127bo6b2o$127bo7b
o$125b2o6$187bo2$186b3o$61b3o130bo2$62bo130b3o5$62b3o$61b5o2$185b3o$
54b3o4b5o118b5o$55bo6b3o2$54b2o128b5o$53bo131b3o$53bo$194b2o$196bo$
196bo83$265bo$265bo7bo$266b2o3b2ob2o2$51bo$51bo7bo211b2ob2o$52b2o4bobo
212bo$57b2ob2o$57b2ob2o$58bobo$59bo15$139bobo131b3o32b2o$136b2obobob2o
162bo$135bo3bobobobo128bo32bo$135bo8b2o2$142b5o$303bo2bo$143b2o96bo2bo
58bo2bo$241bo2bo36bo20bo4bo$240bo4bo34b2o21bo2bo$135b2o104bo2bo30b2o4b
o21bo2bo$89b4o41bo106bo2bo$27b4o58bo2bo41bo$27bo2bo23bo4b2o28b4o$27b4o
21bobo78b3o$54bo$133b3o125bo$138bo12bo108b2o$134b2o2bobo10bo109bo$134b
obobobo8b2o8bo$135b2obo$27bo110bo$27bo$25b2o13$60b3o2$61bo212bo$272b2o
b2o3$60bo211b2ob2o$59bobo212bo$58b2ob2o$58b2ob2o219b2o$59bobo222bo$60b
o5bob2o214bo$70bo$70bo2$220bo$220bobo$220bo43$125b3o$125bobo$125bobo$
125b3o20$166b2o$165bo$165bo4$156bo2bo$94bo2bo58bo2bo$94bo2bo57bo4bo$
93bo4bo23bo3b2o28bo2bo$94bo2bo22bobo33bo2bo$94bo2bo24bo6$95bo$95bo$93b
2o13$128bo$127b3o6$126b3o$126bobo$126bobo6b2o$126b3o8bo$137bo!
#C [[ STEP 5 ZOOM 1 ]]