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[praosylen]

Yclept ytterbium, ylem yclad Yggdrasil yngling yperite; yraft yronne yttria yvel.

[praosylen]

q̴w̵e̷r̸t̸y̶u̸i̶o̸p̵a̷s̶d̴f̵g̷h̵j̷k̸l̵z̸x̸c̸v̸b̶n̵m̵,̸

[Moosey]

As every 6-year-old knows, a hyper-inaccessible cardinal is a κ that is κ-inaccessible.
Note: not related to the title

[Moosey]

I got to house #I after an uncountable amount of time and knocked but I didn’t let me in. I was frustrated because I spent more than forever just trying to get there.
I went to another house after even more time and they let me in. I don’t know what to say about the stuff inside— I can’t describe it.
The next house I stopped at was just really gassy and ethereal
The one I stopped at after that was really really subtle.
Then there were a few that I will never speak of.
There were a few remarkable ones I visited too,
(I think one was made of silver but it wasn’t really remarkable)
There were a few that I could measure
One was home to a lot of strong cardinals (one was tall too)
There were a few with zeroes, some sharps, some daggers and swords, and some pistols
One of the houses was huge.
The last one I visited was home to the Berkeleys

[Moosey]

a∀= a for all
∀= for all
∃= there exists

[Moosey]

(∀A¬= {})(∀x∈A)(∃y∈A)(x=y)
Also
(∀x∈ℕ)(∀y∈ℕ)(S(x)=S(y)↔x=y)

[fluffykitty]

https://catsarefluffy.github.io/mmsjs/unify.html and import

Code: Select all

ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp ax-17 ax-9 ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp ax-1 ax-1 ax-2 ax-mp ax-mp ax-8 ax-2 ax-mp ax-mp ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-gen ax-5 ax-mp ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-mp ax-1 ax-mp ax-3 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-gen ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp df-an df-bi1 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-gen ax-5 ax-mp ax-mp ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp ax-1 ax-1 ax-1 ax-3 ax-3 ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-2 ax-mp ax-mp df-nul df-cleq df-bi1 ax-mp ax-mp ax-4 ax-mp df-bi1 ax-mp df-clab df-bi1 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp df-sb df-bi1 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp df-an df-bi1 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp df-ex df-bi1 ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-1 ax-mp ax-2 ax-mp ax-mp ax-3 ax-mp ax-mp

[Saka]

ʂ{ɖ͡ɰˤ(ʡʼ+ɬ),[×]}? > (ɰ^4x(ɖ(ʡʼ-1))+3)!??!!?!??!!!!!


I think I might have an extra factorial somewhere though.

You forgot to velarize when retroflexicating ʡʼ-1, so it should be

(ɰ^4x(ɖ(ʡʼ-1)ˠ)+3)!!!! (Remember ! and ? cancel each other so there is no need to write them all) which is the mid-open palatal stop.

And by the Sapir-Whorf Distributive Function ⱱ(f), we can see that
(ɰ^4x(ɖ(ʡʼ-1)ˠ)+3)!!!! =
(ɰ!^4x(ɖ(ʡʼ-1)!ˠ)!+3)!=
(ɰ?4x(ɖ(ʡʼ-1)?)?3)!=
ɹx(ɖ(q))=
(ɟ)ˠ=
[ɡɣ]

[testitemqlstudop]

Expanding brackets via Fast Fourier transform:

[ɡɣ]
(ɡɣ)^(ɡɣ)
(ɡɣ)^(ɡ)^(ɣ)
and by exponential shortcut,
(ɡ)^(ɡ)^(ɣ)^(ɣ)^(ɡ)^(ɣ)
which, expanding inner (ɣ)s, give:
(g)^^^^^^^...ɣ times.....^^^^^((g)^^^^^^^^^^...ɣ^^^^^^^^...ɣ times...^^^^^^ɣ times...^^^^^(ɡ))

Of course, you can continue to expand (g) through A(g,g), but that is left as an exercise to the reader

[Ian07]

Fed the first paragraph of the glider article into Talk to Transformer:

"The glider (or featherweight spaceship) is the smallest, most common, and first-discovered spaceship. It travels diagonally across the Life grid at a speed of c/4. Gliders are important because they are easily produced (for an example see the Gosper glider gun), can be collided with each other to form more complicated objects (see glider synthesis), and can be used to transmit information over long distances. The 4 phases of a SE glider are shown in the infobox.


The basic glider design can be changed in various ways between two games using the player's ship.

Gosper glider

The Gosper glider is a glider that can be launched. It travels diagonally across the Life grid at a speed of the player's ship at c/2. Unlike Gliders of other types (such as the Grinder or the Gunner glider), it never travels into the grid, since any obstacles encountered will simply be reflected back on the player (for a better explanation see "Glider reflections", The Glider Project).

The Glider Project

The Gosper glider can be played by the player and then launched when all 6 stages are completed. The Glider Project allows one to create the Gliders used to create the spaceship (and later a spaceship containing any ships the player has"

EDIT: Same prompt:

". . . Contents show]

History Edit

Gliders were part of the First Civilization.

By the 16th century BC people and animals of a primitive human form, a human (the ancestor of humans from other forms such as Neolithic, Ape, and others), moved across the Life grid, usually using gliders. Most of the ancient history of human beings was dominated by the gliders of this civilization.

The first gliders were created by a group of advanced craftsmen living in the First Civilization, who developed the first means for communication by flying and by building and repairing airships. By the 12th century BC a glider had reached the same speed as an airplane, though it was faster as it flew faster. A glider was the next step, when computers could make the basic tools necessary to build airships.

In 12"

[Saka]

Expanding brackets via Fast Fourier transform:

[ɡɣ]
...

Fast Fourier Transform does not work properly on affricates.
You should use the Co-articulated Dental Approximant, which I am still learning how to do.

The Glider Project

I knew it! GoLSSRP is true!!

Anyway, I tried feeding the first paragraph from the OP of the Quantum Computer, aaand

If you look at the picture, notice a short distance from the center, shorter arms that point counterclockwise, and in the actual pattern that you paste into Golly, the long arms are shifted from the smaller diagonal arms so it makes a counterclockwise rotation. There are four triangular "flags" in the center on the edge of the square, and to make it clockwise, they'd have to be inverted to face the other way.

The flag from the right might actually work for this thing. It would have to be slightly different than the ones from the far right. With two flags, for a larger square, it would have to be smaller than it already is. With four flags, it would only have to be larger than that.

Now, one of the flag positions may have been a "spaghetti" or a cross between the red and the green flags. This idea would work, because when the red and green flags are on opposite sides of the square, the white flag is a very small size compared to red and the green. Thus, if your flag is on the "green" side, the blue or yellow color flags from another image may not appear in that image.

You can think of the flags being the two sides of the triangles, so that as long as that small portion is aligned properly, the yellow flags would not be moved out of its---

Another:
Seriously, you are Michael Simkin! I kept Michael Simkin in my ignore list! *shock* REMOVING NOW FROM IGNORE LIST

Oh wait, we are still rivals. I will also do a c/3 spaceship gun, other than dart, but this time the credits will be mine. And moreover, if it is to be a dart, my gun will be smaller and run at lower period! Unfortunately that means p30 with Gosper glider guns, but will hold a record!

When we get famous and scoreboards show 'Rehermann vs. Simkin' I will never admit it, but ONLY now I used your gun to make a p360 oscillator:

This is amazing, I have got that from the same p30 you mentioned!

And last but NO LEAST least, I will never stop using you to make your blaster to see if we can win a few matches each time (or at least more times)!

Thank you so much for this project, I hope more people can understand what you are doing. I was too afraid of my ego and lost my patience early. It took me 1 month for it to reach my goal: it's great, you are a very great player, you are making me so happy!

This is really fun, we might need a new thread for this:
Adam P. Goucher is a Life enthusiast currently residing in the United Kingdom.

Among his numerous contributions to the Game of Life were the construction of the Spartan universal computer-constructor and the P1 megacell. He also collaborated with Ivan Fomichev, Chris Cain and Dave Greene on the half-baked knightship, and found the first elementary knightship, Sir Robin, based on partial results by Tomas Rokicki.

He wrote the apgsearch soup searcher and the lifelib C++ library, devised the Life128 and vlife algorithms, and implemented and operates Catagolue.

He also designed and worked on a variety of computer interfaces for computers and other electronic devices, including the VMS computer interface interface, the TCL/TKL (Trojan-Controlled Keyboard Loop) keyboard interface in the early 70s, the SCSI (System-Communication System), as well as the ANSI standard SCSI interface, the CEPIC programming interface (also known as a PDP-10), and even the JPC interface.

As you may know, his latest invention is the world's first "living computer" that can generate the universe on its own, with zero user time, from its basic source code. The computer, known to us only as the P2L, has only one computer core, with

[wildmyron]

TCL/TKL (Trojan-Controlled Keyboard Loop)

I am looking forward to hearing more about the world's first living computer - the details seem to have been redacted.

@calcyman: what are you hiding from us?

[PkmnQ]

Vietnamese people speak tieesng vieejt.

[testitemqlstudop]

Fast Fourier Transform does not work properly on affricates.

Does too:

https://en.wikipedia.org/wiki/DFT_matrix

(yes this is real)

[Saka]

I am looking forward to hearing more about the world's first living computer - the details seem to have been redacted.

I refed it into the machine to get more details:

As you may know, his latest invention is the world's first "living computer" that can generate the universe on its own, with zero user time, from its basic source code. The computer, known to us only as the P2L, has only one computer core, with the rest of the code stored on floppy disks. The idea is that the computer will perform specific computations on the data that is present in that disk—like opening a door or playing a game. That's very convenient in a movie theater, or running an online service. But if you're building a living computer, you'll have to find that disk for other information, like your computer's power supply. So the P2L can solve exactly the same problem: It's a digital computer that runs directly off the data on the floppy disks, with zero user time. The machine can also generate the universe, in a matter of minutes. It can even store itself on a microchip in a small space inside a computer or chip. As a test case, I ran another P2L through the tests I've put down here so far, like the ability to generate a random string, and the ability to search a text file using random letters—all of them are extremely powerful and interesting capabilities, but the P2L's real advantage seems to be its ability to create the universe—the universe of possibilities, the

[Saka]

Fast Fourier Transform does not work properly on affricates.

Does too:

https://en.wikipedia.org/wiki/DFT_matrix

(yes this is actually a Roald Dahl book)

The problem with affricates is that the airstream interferes with the calculations, which is usually negligible, but when affricates are introduced, the effect is multiplied 539.324 times.

[testitemqlstudop]

Fast Fourier Transform does not work properly on affricates.

Does too:

https://en.wikipedia.org/wiki/DFT_matrix

(yes this is actually a Roald Dahl book)

The problem with affricates is that the airstream interferes with the calculations, which is usually negligible, but when affricates are introduced, the effect multiplied 539.324 times.

roald dahl is illuminati is einstein is pewdiepie confirmed

[testitemqlstudop]

WHAT! 77.777% in x3vi!

Screenshot from 2019-06-19 19-00-42.png (180.26 KiB) Viewed 6444 times

[Moosey]

Expanding brackets via Fast Fourier transform:

[ɡɣ]
(ɡɣ)^(ɡɣ)
(ɡɣ)^(ɡ)^(ɣ)
and by exponential shortcut,
(ɡ)^(ɡ)^(ɣ)^(ɣ)^(ɡ)^(ɣ)
which, expanding inner (ɣ)s, give:
(g)^^^^^^^...ɣ times.....^^^^^((g)^^^^^^^^^^...ɣ^^^^^^^^...ɣ times...^^^^^^ɣ times...^^^^^(ɡ))

Of course, you can continue to expand (g) through A(g,g), but that is left as an exercise to the reader

remember that by Vince Guaraldi's law, that is equal to
ɰ((g^ɣ)!!!!!!..ɣ! times....!!!!!!!!!+2ɣ?+SCG(13)-TREE(3)+BH(ceiling(ɣ))-1)+1

[testitemqlstudop]

A revelation in functional logic-chain theory! Computer proves that indeed,

→ C((x)o) = [T(x) ˄ My. → My,T = Y^T(x)o] → C((x)o) = [M((x)My^T(x) ˄ My(x)M – yo → My(x)Mx^T(x) ˄ My. → My(x)Y]:

Code: Select all

x = 4425, y = 97, rule = B3/S23
1372b37o1033b37o1141b37o$1372b37o1033b37o1141b37o$1371b10o6b6o8b8o
1032b10o6b6o8b8o1140b10o6b6o8b8o$1371b5o11b6o11b5o1032b5o11b6o11b5o
1140b5o11b6o11b5o$469b13o889b3o13b6o12b4o673b13o346b3o13b6o12b4o1140b
3o13b6o12b4o$468b15o887b4o12b6o13b3o673b15o344b4o12b6o13b3o1140b4o12b
6o13b3o$468b15o887b3o13b6o13b3o673b15o344b3o13b6o13b3o1140b3o13b6o13b
3o$468b15o886b4o13b6o13b3o673b15o343b4o13b6o13b3o1139b4o13b6o13b3o$
468b4o897b3o14b6o13b3o673b4o354b3o14b6o13b3o1139b3o14b6o13b3o$468b4o
897b3o13b6o14b3o673b4o354b3o13b6o14b3o1139b3o13b6o14b3o$468b4o896b3o
14b6o14b3o673b4o353b3o14b6o14b3o1138b3o14b6o14b3o$468b4o896b3o14b6o14b
3o673b4o353b3o14b6o14b3o1138b3o14b6o14b3o$468b4o896b2o15b6o14b2o674b4o
353b2o15b6o14b2o1139b2o15b6o14b2o$162b3o27b3o52b3o76b3o139b4o92b3o52b
3o762b6o47b3o52b3o73b12o195b3o27b3o52b3o76b3o139b4o119b3o27b3o52b3o
162b6o46b3o52b3o253b3o52b3o533b3o52b3o166b6o46b3o52b3o516b3o52b3o97b
12o$161b3o27b3o53b4o75b4o138b4o91b3o53b4o761b6o46b3o53b4o72b12o194b3o
27b3o53b4o75b4o138b4o118b3o27b3o53b4o161b6o45b3o53b4o251b3o53b4o531b3o
53b4o165b6o45b3o53b4o514b3o53b4o96b12o$160b4o26b4o54b4o75b4o137b4o90b
4o54b4o760b6o45b4o54b4o71b12o193b4o26b4o54b4o75b4o137b4o117b4o26b4o54b
4o160b6o44b4o54b4o249b4o54b4o529b4o54b4o164b6o44b4o54b4o512b4o54b4o95b
12o$122b11o26b4o26b4o56b4o75b4o136b4o89b4o56b4o759b6o44b4o56b4o78b4o
155b11o26b4o26b4o56b4o75b4o136b4o116b4o26b4o56b4o159b6o43b4o56b4o247b
4o56b4o527b4o56b4o163b6o43b4o56b4o510b4o56b4o102b4o$119b15o24b4o26b4o
58b4o75b4o135b4o88b4o58b4o119b15o34b15o199b15o34b15o238b18o20b16o19b6o
44b4o58b4o77b4o152b15o24b4o26b4o58b4o75b4o135b4o29b15o34b15o22b4o26b4o
58b4o35b15o34b15o58b6o43b4o58b4o119b15o34b15o62b4o58b4o35b15o34b15o
300b15o34b15o62b4o58b4o35b15o34b15o62b6o43b4o58b4o119b15o34b15o199b15o
34b15o62b4o58b4o35b18o20b16o12b4o$116b19o22b4o26b4o60b4o75b4o134b4o20b
47o20b4o60b4o117b16o34b15o198b16o34b15o84b47o105b22o18b17o18b6o43b4o
60b4o76b4o149b19o22b4o26b4o60b4o75b4o134b4o28b16o34b15o21b4o26b4o60b4o
33b16o34b15o58b6o42b4o60b4o117b16o34b15o61b4o60b4o33b16o34b15o299b16o
34b15o61b4o60b4o33b16o34b15o62b6o42b4o60b4o117b16o34b15o198b16o34b15o
61b4o60b4o32b22o18b17o11b4o$114b21o21b4o26b4o62b4o75b4o133b4o19b48o19b
4o62b4o116b16o33b16o198b16o33b16o83b48o105b22o18b17o18b6o42b4o62b4o75b
4o147b21o21b4o26b4o62b4o75b4o133b4o28b16o33b16o20b4o26b4o62b4o32b16o
33b16o58b6o41b4o62b4o116b16o33b16o60b4o62b4o32b16o33b16o299b16o33b16o
60b4o62b4o32b16o33b16o62b6o41b4o62b4o116b16o33b16o198b16o33b16o60b4o
62b4o31b22o18b17o11b4o$113b22o20b4o26b4o63b4o75b4o133b4o19b48o18b4o63b
4o122b10o32b13o208b10o32b13o87b48o109b15o22b14o20b6o41b4o63b4o75b4o
146b22o20b4o26b4o63b4o75b4o133b4o34b10o32b13o23b4o26b4o63b4o38b10o32b
13o62b6o40b4o63b4o122b10o32b13o63b4o63b4o38b10o32b13o309b10o32b13o63b
4o63b4o38b10o32b13o66b6o40b4o63b4o122b10o32b13o208b10o32b13o63b4o63b4o
35b15o22b14o13b4o$111b7o9b8o19b5o25b5o64b4o75b4o132b4o19b8o12b8o13b7o
17b5o64b4o122b10o31b9o213b10o31b9o91b8o12b8o13b7o112b9o27b8o23b6o41b5o
64b4o74b4o144b7o9b8o19b5o25b5o64b4o75b4o132b4o35b10o31b9o26b5o25b5o64b
4o38b10o31b9o65b6o40b5o64b4o122b10o31b9o66b5o64b4o38b10o31b9o314b10o
31b9o66b5o64b4o38b10o31b9o69b6o40b5o64b4o122b10o31b9o213b10o31b9o66b5o
64b4o37b9o27b8o17b4o$110b6o12b7o19b4o26b4o66b4o75b4o131b4o18b6o15b7o
16b5o17b4o66b4o121b10o30b10o213b10o30b10o90b6o15b7o16b5o112b9o27b6o25b
6o41b4o66b4o73b4o143b6o12b7o19b4o26b4o66b4o75b4o131b4o35b10o30b10o26b
4o26b4o66b4o37b10o30b10o65b6o40b4o66b4o121b10o30b10o66b4o66b4o37b10o
30b10o314b10o30b10o66b4o66b4o37b10o30b10o69b6o40b4o66b4o121b10o30b10o
213b10o30b10o66b4o66b4o36b9o27b6o19b4o$108b6o14b7o18b5o25b5o66b4o75b4o
131b4o18b5o16b7o16b5o16b5o66b4o121b10o29b10o214b10o29b10o91b5o16b7o16b
5o113b8o27b4o27b6o40b5o66b4o73b4o141b6o14b7o18b5o25b5o66b4o75b4o131b4o
35b10o29b10o26b5o25b5o66b4o37b10o29b10o66b6o39b5o66b4o121b10o29b10o66b
5o66b4o37b10o29b10o315b10o29b10o66b5o66b4o37b10o29b10o70b6o39b5o66b4o
121b10o29b10o214b10o29b10o66b5o66b4o37b8o27b4o21b4o$107b6o15b7o18b4o
26b4o68b4o75b4o130b4o18b4o16b8o17b3o17b4o68b4o54b3o63b10o29b2ob7o214b
10o29b2ob7o91b4o16b8o17b3o114b9o25b4o28b6o40b4o68b4o72b4o140b6o15b7o
18b4o26b4o68b4o75b4o130b4o35b10o29b2ob7o26b4o26b4o68b4o36b10o29b2ob7o
66b6o39b4o68b4o54b3o63b10o29b2ob7o66b4o68b4o36b10o29b2ob7o315b10o29b2o
b7o66b4o68b4o36b10o29b2ob7o70b6o39b4o68b4o54b3o63b10o29b2ob7o214b10o
29b2ob7o66b4o68b4o36b9o25b4o22b4o$106b6o16b6o18b5o25b5o68b5o74b5o129b
4o17b4o17b8o17b3o16b5o68b5o52b5o61b4ob6o28b3ob7o213b4ob6o28b3ob7o90b4o
17b8o17b3o115b8o24b4o28b6o40b5o68b5o71b4o139b6o16b6o18b5o25b5o68b5o74b
5o129b4o34b4ob6o28b3ob7o25b5o25b5o68b5o34b4ob6o28b3ob7o65b6o39b5o68b5o
52b5o61b4ob6o28b3ob7o65b5o68b5o34b4ob6o28b3ob7o314b4ob6o28b3ob7o65b5o
68b5o34b4ob6o28b3ob7o69b6o39b5o68b5o52b5o61b4ob6o28b3ob7o213b4ob6o28b
3ob7o65b5o68b5o36b8o24b4o23b4o$105b6o16b7o18b4o26b4o70b4o75b4o129b4o
17b4o17b7o18b3o16b4o70b4o52b5o61b3o2b6o27b3o2b7o213b3o2b6o27b3o2b7o90b
4o17b7o18b3o115b8o23b4o29b6o40b4o70b4o71b4o138b6o16b7o18b4o26b4o70b4o
75b4o129b4o34b3o2b6o27b3o2b7o25b4o26b4o70b4o34b3o2b6o27b3o2b7o65b6o39b
4o70b4o52b5o61b3o2b6o27b3o2b7o65b4o70b4o34b3o2b6o27b3o2b7o314b3o2b6o
27b3o2b7o65b4o70b4o34b3o2b6o27b3o2b7o69b6o39b4o70b4o52b5o61b3o2b6o27b
3o2b7o213b3o2b6o27b3o2b7o65b4o70b4o36b8o23b4o24b4o$104b6o17b6o18b5o25b
5o70b5o74b5o128b4o17b3o18b7o18b3o15b5o70b5o51b5o61b3o2b6o27b2o2b7o214b
3o2b6o27b2o2b7o91b3o18b7o18b3o115b9o21b4o30b6o39b5o70b5o70b4o137b6o17b
6o18b5o25b5o70b5o74b5o128b4o34b3o2b6o27b2o2b7o25b5o25b5o70b5o33b3o2b6o
27b2o2b7o66b6o38b5o70b5o51b5o61b3o2b6o27b2o2b7o65b5o70b5o33b3o2b6o27b
2o2b7o315b3o2b6o27b2o2b7o65b5o70b5o33b3o2b6o27b2o2b7o70b6o38b5o70b5o
51b5o61b3o2b6o27b2o2b7o214b3o2b6o27b2o2b7o65b5o70b5o35b9o21b4o25b4o$
104b5o18b6o18b4o26b4o71b5o74b5o128b4o16b4o17b8o18b3o15b4o71b5o50b7o60b
3o2b7o25b3o2b7o214b3o2b7o25b3o2b7o90b4o17b8o18b3o116b8o20b4o31b6o39b4o
71b5o70b4o137b5o18b6o18b4o26b4o71b5o74b5o128b4o34b3o2b7o25b3o2b7o25b4o
26b4o71b5o33b3o2b7o25b3o2b7o66b6o38b4o71b5o50b7o60b3o2b7o25b3o2b7o65b
4o71b5o33b3o2b7o25b3o2b7o315b3o2b7o25b3o2b7o65b4o71b5o33b3o2b7o25b3o2b
7o70b6o38b4o71b5o50b7o60b3o2b7o25b3o2b7o214b3o2b7o25b3o2b7o65b4o71b5o
36b8o20b4o26b4o$103b6o17b6o18b5o25b5o72b5o74b5o127b4o16b3o18b8o18b3o
14b5o72b5o49b7o59b4o2b7o24b3o3b7o213b4o2b7o24b3o3b7o90b3o18b8o18b3o
116b8o20b4o30b6o39b5o72b5o69b4o136b6o17b6o18b5o25b5o72b5o74b5o127b4o
33b4o2b7o24b3o3b7o24b5o25b5o72b5o31b4o2b7o24b3o3b7o65b6o38b5o72b5o49b
7o59b4o2b7o24b3o3b7o64b5o72b5o31b4o2b7o24b3o3b7o314b4o2b7o24b3o3b7o64b
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2b7o24b3o3b7o64b5o72b5o35b8o20b4o26b4o$49b3o50b6o18b6o18b5o25b5o72b5o
74b5o127b4o16b3o18b7o19b3o14b5o72b5o48b9o58b3o3b7o24b3o3b7o148b3o62b3o
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18b6o18b5o25b5o72b5o74b5o127b4o33b3o3b7o24b3o3b7o24b5o25b5o72b5o31b3o
3b7o24b3o3b7o65b6o38b5o72b5o48b9o58b3o3b7o24b3o3b7o64b5o72b5o31b3o3b7o
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18b4o27b4o$48b4o50b5o18b6o18b5o25b5o73b5o74b5o127b4o15b3o19b7o18b3o14b
5o73b5o48b4ob4o58b3o3b7o23b3o3b7o148b4o62b3o3b7o23b3o3b7o90b3o19b7o18b
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7o23b3o3b7o148b4o62b3o3b7o23b3o3b7o64b5o73b5o36b8o17b4o28b4o$49b4o48b
6o18b6o18b5o25b5o74b5o74b5o126b4o15b3o18b8o18b3o14b5o74b5o46b5ob5o57b
3o4b6o23b2o4b7o149b4o61b3o4b6o23b2o4b7o90b3o18b8o18b3o118b9o15b4o33b6o
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4b7o24b5o25b5o74b5o30b3o4b6o23b2o4b7o66b6o37b5o74b5o46b5ob5o57b3o4b6o
23b2o4b7o64b5o74b5o30b3o4b6o23b2o4b7o250b4o61b3o4b6o23b2o4b7o64b5o74b
5o30b3o4b6o23b2o4b7o70b6o37b5o74b5o46b5ob5o57b3o4b6o23b2o4b7o149b4o61b
3o4b6o23b2o4b7o64b5o74b5o35b9o15b4o29b4o$49b4o47b6o18b6o19b5o25b5o74b
5o74b5o126b4o15b3o18b8o18b3o14b5o74b5o46b4o3b4o56b4o4b6o22b3o4b7o149b
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4o47b6o18b6o19b5o25b5o74b5o74b5o126b4o32b4o4b6o22b3o4b7o24b5o25b5o74b
5o29b4o4b6o22b3o4b7o65b6o38b5o74b5o46b4o3b4o56b4o4b6o22b3o4b7o64b5o74b
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7o69b6o38b5o74b5o46b4o3b4o56b4o4b6o22b3o4b7o149b4o60b4o4b6o22b3o4b7o
64b5o74b5o36b8o14b4o30b4o$49b4o47b6o18b5o19b5o25b5o75b5o74b5o126b4o14b
3o19b7o19b3o13b5o75b5o45b5o3b5o55b3o5b6o21b3o5b7o149b4o60b3o5b6o21b3o
5b7o89b3o19b7o19b3o119b8o13b4o34b6o38b5o75b5o68b4o82b4o47b6o18b5o19b5o
25b5o75b5o74b5o126b4o32b3o5b6o21b3o5b7o23b5o25b5o75b5o29b3o5b6o21b3o5b
7o65b6o37b5o75b5o45b5o3b5o55b3o5b6o21b3o5b7o63b5o75b5o29b3o5b6o21b3o5b
7o250b4o60b3o5b6o21b3o5b7o63b5o75b5o29b3o5b6o21b3o5b7o69b6o37b5o75b5o
45b5o3b5o55b3o5b6o21b3o5b7o149b4o60b3o5b6o21b3o5b7o63b5o75b5o36b8o13b
4o31b4o$49b5o45b6o19b3o21b5o25b5o76b4o75b4o126b4o15bo20b7o20bo14b5o76b
4o45b4o5b4o55b3o5b6o21b2o5b7o150b5o59b3o5b6o21b2o5b7o91bo20b7o20bo120b
9o11b4o33b9o37b5o76b4o68b4o82b5o45b6o19b3o21b5o25b5o76b4o75b4o126b4o
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2o5b7o150b5o59b3o5b6o21b2o5b7o64b5o76b4o36b9o11b4o32b4o$50b4o45b6o43b
5o25b5o29b8o9b8o22b5o40b10o24b5o125b4o35b8o35b5o29b8o9b8o22b5o44b4o5b
4o55b3o5b7o19b3o5b7o23b7o19bo101b4o59b3o5b7o19b3o5b7o23b7o19bo61b8o
142b8o11b4o27b21o31b5o29b8o9b8o22b5o40b10o17b4o83b4o45b6o43b5o25b5o29b
8o9b8o22b5o40b10o24b5o125b4o32b3o5b7o19b3o5b7o24b5o25b5o29b8o9b8o22b5o
28b3o5b7o19b3o5b7o22b7o19bo9b21o30b5o29b8o9b8o22b5o44b4o5b4o55b3o5b7o
19b3o5b7o24b7o19bo13b5o29b8o9b8o22b5o28b3o5b7o19b3o5b7o116b7o19bo109b
4o59b3o5b7o19b3o5b7o24b7o19bo13b5o29b8o9b8o22b5o28b3o5b7o19b3o5b7o27b
8o9b8o10b21o30b5o29b8o9b8o22b5o44b4o5b4o55b3o5b7o19b3o5b7o23b7o19bo
101b4o59b3o5b7o19b3o5b7o24b7o19bo13b5o29b8o9b8o22b5o36b8o11b4o32b4o$
50b4o44b7o43b5o25b5o27b12o5b11o21b5o37b15o22b5o125b4o35b8o35b5o27b12o
5b11o21b5o43b4o6b5o53b4o5b7o18b3o6b7o21b10o16b4o100b4o58b4o5b7o18b3o6b
7o21b10o16b4o60b8o142b8o10b4o28b21o31b5o27b12o5b11o21b5o37b15o15b4o83b
4o44b7o43b5o25b5o27b12o5b11o21b5o37b15o22b5o125b4o31b4o5b7o18b3o6b7o
24b5o25b5o27b12o5b11o21b5o27b4o5b7o18b3o6b7o20b10o16b4o8b21o30b5o27b
12o5b11o21b5o43b4o6b5o53b4o5b7o18b3o6b7o22b10o16b4o12b5o27b12o5b11o21b
5o27b4o5b7o18b3o6b7o114b10o16b4o108b4o58b4o5b7o18b3o6b7o22b10o16b4o12b
5o27b12o5b11o21b5o27b4o5b7o18b3o6b7o25b12o5b11o9b21o30b5o27b12o5b11o
21b5o43b4o6b5o53b4o5b7o18b3o6b7o21b10o16b4o100b4o58b4o5b7o18b3o6b7o22b
10o16b4o12b5o27b12o5b11o21b5o36b8o10b4o33b4o$51b4o43b6o43b5o25b5o27b5o
3b6o3b4o4b5o20b5o35b7o5b6o21b5o125b4o35b7o35b5o27b5o3b6o3b4o4b5o20b5o
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2b5o14b6o59b7o143b9o8b4o80b5o27b5o3b6o3b4o4b5o20b5o35b7o5b6o14b4o84b4o
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2o7b7o23b5o25b5o27b5o3b6o3b4o4b5o20b5o27b3o6b7o18b2o7b7o19b5o2b5o14b6o
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3o6b7o18b2o7b7o21b5o2b5o14b6o10b5o27b5o3b6o3b4o4b5o20b5o27b3o6b7o18b2o
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6o3b4o4b5o20b5o36b9o8b4o34b4o$51b4o42b7o43b5o25b5o26b4o6b5o2b4o4b6o20b
5o34b6o8b6o20b5o125b4o35b7o35b5o26b4o6b5o2b4o4b6o20b5o42b5o7b5o52b3o7b
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5o26b4o6b5o2b4o4b6o20b5o34b6o8b6o20b5o125b4o31b3o7b6o17b3o6b7o24b5o25b
5o26b4o6b5o2b4o4b6o20b5o27b3o7b6o17b3o6b7o19b4o4b5o14b6o57b5o26b4o6b5o
2b4o4b6o20b5o42b5o7b5o52b3o7b6o17b3o6b7o21b4o4b5o14b6o10b5o26b4o6b5o2b
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37b8o7b4o35b4o$52b4o41b7o43b5o25b5o25b3o9b9o5b7o19b6o31b7o10b6o19b6o
124b4o34b8o35b5o25b3o9b9o5b7o19b6o41b4o9b4o52b3o7b6o16b3o7b7o20b3o5b6o
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6o16b3o7b7o19b3o5b6o13b6o57b5o25b3o9b9o5b7o19b6o41b4o9b4o52b3o7b6o16b
3o7b7o21b3o5b6o13b6o10b5o25b3o9b9o5b7o19b6o26b3o7b6o16b3o7b7o113b3o5b
6o13b6o109b4o56b3o7b6o16b3o7b7o21b3o5b6o13b6o10b5o25b3o9b9o5b7o19b6o
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25b3o9b9o5b7o19b6o36b8o6b4o36b4o$52b5o40b6o44b5o25b5o24b3o10b8o5b8o20b
5o30b7o12b5o20b5o124b4o34b8o35b5o24b3o10b8o5b8o20b5o40b5o9b5o50b4o7b6o
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8o20b5o40b5o9b5o50b4o7b6o16b3o7b7o19b3o6b6o12b6o102b5o54b4o7b6o16b3o7b
7o20b3o6b6o12b6o11b5o24b3o10b8o5b8o20b5o37b8o4b4o37b4o$53b5o38b7o44b5o
25b5o23b4o10b8o5b7o21b5o29b7o13b6o19b5o33b51o40b4o34b7o36b5o23b4o10b8o
5b7o21b5o40b4o11b4o50b3o8b6o15b3o8b7o19b3o6b6o12b6o103b5o53b3o8b6o15b
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111b5o53b3o8b6o15b3o8b7o20b3o6b6o12b6o11b5o23b4o10b8o5b7o21b5o25b3o8b
6o15b3o8b7o21b4o10b8o5b7o58b5o23b4o10b8o5b7o21b5o40b4o11b4o50b3o8b6o
15b3o8b7o19b3o6b6o12b6o103b5o53b3o8b6o15b3o8b7o20b3o6b6o12b6o11b5o23b
4o10b8o5b7o21b5o37b8o3b4o38b4o$54b5o37b7o44b5o25b5o23b3o11b7o6b7o21b5o
28b7o15b5o19b5o33b51o40b4o34b7o36b5o23b3o11b7o6b7o21b5o39b5o11b4o50b3o
8b7o14b2o8b7o19b3o7b6o12b6o104b5o52b3o8b7o14b2o8b7o19b3o7b6o12b6o59b7o
52b51o43b9o2b3o85b5o23b3o11b7o6b7o21b5o28b7o15b5o11b4o87b5o37b7o44b5o
25b5o23b3o11b7o6b7o21b5o28b7o15b5o19b5o33b51o40b4o30b3o8b7o14b2o8b7o
25b5o25b5o23b3o11b7o6b7o21b5o25b3o8b7o14b2o8b7o18b3o7b6o12b6o58b5o23b
3o11b7o6b7o21b5o39b5o11b4o50b3o8b7o14b2o8b7o20b3o7b6o12b6o11b5o23b3o
11b7o6b7o21b5o25b3o8b7o14b2o8b7o112b3o7b6o12b6o112b5o52b3o8b7o14b2o8b
7o20b3o7b6o12b6o11b5o23b3o11b7o6b7o21b5o25b3o8b7o14b2o8b7o22b3o11b7o6b
7o58b5o23b3o11b7o6b7o21b5o39b5o11b4o50b3o8b7o14b2o8b7o19b3o7b6o12b6o
104b5o52b3o8b7o14b2o8b7o20b3o7b6o12b6o11b5o23b3o11b7o6b7o21b5o37b9o2b
3o39b4o$54b6o36b7o44b5o25b5o22b3o12b7o6b6o22b5o28b6o16b6o18b5o33b51o
40b4o33b8o36b5o22b3o12b7o6b6o22b5o39b4o13b4o49b3o8b7o13b3o8b7o19b3o7b
6o12b6o104b6o51b3o8b7o13b3o8b7o19b3o7b6o12b6o58b8o52b51o44b8ob4o85b5o
22b3o12b7o6b6o22b5o28b6o16b6o10b4o87b6o36b7o44b5o25b5o22b3o12b7o6b6o
22b5o28b6o16b6o18b5o33b51o40b4o30b3o8b7o13b3o8b7o25b5o25b5o22b3o12b7o
6b6o22b5o25b3o8b7o13b3o8b7o18b3o7b6o12b6o58b5o22b3o12b7o6b6o22b5o39b4o
13b4o49b3o8b7o13b3o8b7o20b3o7b6o12b6o11b5o22b3o12b7o6b6o22b5o25b3o8b7o
13b3o8b7o112b3o7b6o12b6o112b6o51b3o8b7o13b3o8b7o20b3o7b6o12b6o11b5o22b
3o12b7o6b6o22b5o25b3o8b7o13b3o8b7o21b3o12b7o6b6o59b5o22b3o12b7o6b6o22b
5o39b4o13b4o49b3o8b7o13b3o8b7o19b3o7b6o12b6o104b6o51b3o8b7o13b3o8b7o
20b3o7b6o12b6o11b5o22b3o12b7o6b6o22b5o38b8ob4o39b4o$55b6o35b6o44b6o24b
6o22b3o12b6o8b4o23b5o27b6o17b6o18b5o124b4o33b8o35b6o22b3o12b6o8b4o23b
5o39b4o13b4o48b4o8b7o12b3o9b7o18b4o6b6o12b6o106b6o49b4o8b7o12b3o9b7o
18b4o6b6o12b6o59b8o147b12o85b6o22b3o12b6o8b4o23b5o27b6o17b6o10b4o88b6o
35b6o44b6o24b6o22b3o12b6o8b4o23b5o27b6o17b6o18b5o124b4o29b4o8b7o12b3o
9b7o24b6o24b6o22b3o12b6o8b4o23b5o24b4o8b7o12b3o9b7o17b4o6b6o12b6o58b6o
22b3o12b6o8b4o23b5o39b4o13b4o48b4o8b7o12b3o9b7o19b4o6b6o12b6o11b6o22b
3o12b6o8b4o23b5o24b4o8b7o12b3o9b7o111b4o6b6o12b6o114b6o49b4o8b7o12b3o
9b7o19b4o6b6o12b6o11b6o22b3o12b6o8b4o23b5o24b4o8b7o12b3o9b7o21b3o12b6o
8b4o59b6o22b3o12b6o8b4o23b5o39b4o13b4o48b4o8b7o12b3o9b7o18b4o6b6o12b6o
106b6o49b4o8b7o12b3o9b7o19b4o6b6o12b6o11b6o22b3o12b6o8b4o23b5o38b12o
40b4o$56b6o33b7o44b6o24b6o22b2o13b6o35b5o26b7o17b6o18b5o124b4o33b7o36b
6o22b2o13b6o35b5o38b4o14b5o47b3o10b6o12b2o10b7o18b3o7b6o12b6o107b6o48b
3o10b6o12b2o10b7o18b3o7b6o12b6o59b7o148b11o86b6o22b2o13b6o35b5o26b7o
17b6o10b4o89b6o33b7o44b6o24b6o22b2o13b6o35b5o26b7o17b6o18b5o124b4o29b
3o10b6o12b2o10b7o24b6o24b6o22b2o13b6o35b5o24b3o10b6o12b2o10b7o17b3o7b
6o12b6o58b6o22b2o13b6o35b5o38b4o14b5o47b3o10b6o12b2o10b7o19b3o7b6o12b
6o11b6o22b2o13b6o35b5o24b3o10b6o12b2o10b7o111b3o7b6o12b6o115b6o48b3o
10b6o12b2o10b7o19b3o7b6o12b6o11b6o22b2o13b6o35b5o24b3o10b6o12b2o10b7o
21b2o13b6o71b6o22b2o13b6o35b5o38b4o14b5o47b3o10b6o12b2o10b7o18b3o7b6o
12b6o107b6o48b3o10b6o12b2o10b7o19b3o7b6o12b6o11b6o22b2o13b6o35b5o38b
11o41b4o$57b7o31b7o44b6o24b6o21b3o13b6o35b5o26b6o18b6o18b5o124b4o33b7o
36b6o21b3o13b6o35b5o38b4o15b4o47b3o10b6o11b3o9b7o19b3o7b6o12b6o108b7o
46b3o10b6o11b3o9b7o19b3o7b6o12b6o59b7o149b9o87b6o21b3o13b6o35b5o26b6o
18b6o10b4o90b7o31b7o44b6o24b6o21b3o13b6o35b5o26b6o18b6o18b5o124b4o29b
3o10b6o11b3o9b7o25b6o24b6o21b3o13b6o35b5o24b3o10b6o11b3o9b7o18b3o7b6o
12b6o58b6o21b3o13b6o35b5o38b4o15b4o47b3o10b6o11b3o9b7o20b3o7b6o12b6o
11b6o21b3o13b6o35b5o24b3o10b6o11b3o9b7o112b3o7b6o12b6o116b7o46b3o10b6o
11b3o9b7o20b3o7b6o12b6o11b6o21b3o13b6o35b5o24b3o10b6o11b3o9b7o21b3o13b
6o71b6o21b3o13b6o35b5o38b4o15b4o47b3o10b6o11b3o9b7o19b3o7b6o12b6o108b
7o46b3o10b6o11b3o9b7o20b3o7b6o12b6o11b6o21b3o13b6o35b5o39b9o42b4o$58b
8o29b7o44b6o24b6o21b3o13b6o35b5o25b7o18b6o18b5o124b4o32b8o36b6o21b3o
13b6o35b5o37b5o15b5o46b3o10b6o10b3o10b7o19b2o7b6o13b6o109b8o44b3o10b6o
10b3o10b7o19b2o7b6o13b6o58b8o149b8o88b6o21b3o13b6o35b5o25b7o18b6o10b4o
91b8o29b7o44b6o24b6o21b3o13b6o35b5o25b7o18b6o18b5o124b4o29b3o10b6o10b
3o10b7o25b6o24b6o21b3o13b6o35b5o24b3o10b6o10b3o10b7o18b2o7b6o13b6o58b
6o21b3o13b6o35b5o37b5o15b5o46b3o10b6o10b3o10b7o20b2o7b6o13b6o11b6o21b
3o13b6o35b5o24b3o10b6o10b3o10b7o112b2o7b6o13b6o117b8o44b3o10b6o10b3o
10b7o20b2o7b6o13b6o11b6o21b3o13b6o35b5o24b3o10b6o10b3o10b7o21b3o13b6o
71b6o21b3o13b6o35b5o37b5o15b5o46b3o10b6o10b3o10b7o19b2o7b6o13b6o109b8o
44b3o10b6o10b3o10b7o20b2o7b6o13b6o11b6o21b3o13b6o35b5o39b8o43b4o$68o
27b7o44b5o25b5o37b6o36b5o25b7o17b7o18b5o124b4o32b8o36b5o37b6o36b5o37b
4o17b4o45b4o10b6o10b2o11b7o28b6o12b6o52b68o41b4o10b6o10b2o11b7o28b6o
12b6o59b8o149b7o89b5o37b6o36b5o25b7o17b7o10b4o33b68o27b7o44b5o25b5o37b
6o36b5o25b7o17b7o18b5o124b4o28b4o10b6o10b2o11b7o25b5o25b5o37b6o36b5o
23b4o10b6o10b2o11b7o27b6o12b6o59b5o37b6o36b5o37b4o17b4o45b4o10b6o10b2o
11b7o29b6o12b6o12b5o37b6o36b5o23b4o10b6o10b2o11b7o40b47o34b6o12b6o60b
68o41b4o10b6o10b2o11b7o29b6o12b6o12b5o37b6o36b5o23b4o10b6o10b2o11b7o
36b6o72b5o37b6o36b5o37b4o17b4o45b4o10b6o10b2o11b7o28b6o12b6o52b68o41b
4o10b6o10b2o11b7o29b6o12b6o12b5o37b6o36b5o39b7o44b4o$68o27b7o44b5o25b
5o37b6o36b6o23b7o18b7o18b6o123b4o32b7o37b5o37b6o36b6o35b5o17b5o44b3o
11b7o8b3o11b7o28b6o12b6o52b68o41b3o11b7o8b3o11b7o28b6o12b6o59b7o150b7o
89b5o37b6o36b6o23b7o18b7o10b4o33b68o27b7o44b5o25b5o37b6o36b6o23b7o18b
7o18b6o123b4o28b3o11b7o8b3o11b7o25b5o25b5o37b6o36b6o22b3o11b7o8b3o11b
7o27b6o12b6o59b5o37b6o36b6o35b5o17b5o44b3o11b7o8b3o11b7o29b6o12b6o12b
5o37b6o36b6o22b3o11b7o8b3o11b7o40b47o34b6o12b6o60b68o41b3o11b7o8b3o11b
7o29b6o12b6o12b5o37b6o36b6o22b3o11b7o8b3o11b7o36b6o72b5o37b6o36b6o35b
5o17b5o44b3o11b7o8b3o11b7o28b6o12b6o52b68o41b3o11b7o8b3o11b7o29b6o12b
6o12b5o37b6o36b6o38b7o44b4o$68o27b7o44b5o25b5o37b6o36b6o23b7o18b7o18b
6o123b4o32b7o37b5o37b6o36b6o35b4o19b4o44b3o11b7o7b3o11b7o28b6o13b6o52b
68o41b3o11b7o7b3o11b7o28b6o13b6o59b7o150b7o89b5o37b6o36b6o23b7o18b7o
10b4o33b68o27b7o44b5o25b5o37b6o36b6o23b7o18b7o18b6o123b4o28b3o11b7o7b
3o11b7o26b5o25b5o37b6o36b6o22b3o11b7o7b3o11b7o27b6o13b6o59b5o37b6o36b
6o35b4o19b4o44b3o11b7o7b3o11b7o29b6o13b6o12b5o37b6o36b6o22b3o11b7o7b3o
11b7o41b47o33b6o13b6o60b68o41b3o11b7o7b3o11b7o29b6o13b6o12b5o37b6o36b
6o22b3o11b7o7b3o11b7o37b6o72b5o37b6o36b6o35b4o19b4o44b3o11b7o7b3o11b7o
28b6o13b6o52b68o41b3o11b7o7b3o11b7o29b6o13b6o12b5o37b6o36b6o38b7o44b4o
$2b64o29b7o44b5o25b5o37b6o36b5o24b7o18b7o18b5o124b4o31b8o37b5o37b6o36b
5o35b5o19b4o44b3o11b7o7b3o11b7o28b6o13b6o54b64o43b3o11b7o7b3o11b7o28b
6o13b6o58b8o149b8o89b5o37b6o36b5o24b7o18b7o10b4o35b64o29b7o44b5o25b5o
37b6o36b5o24b7o18b7o18b5o124b4o28b3o11b7o7b3o11b7o26b5o25b5o37b6o36b5o
23b3o11b7o7b3o11b7o27b6o13b6o59b5o37b6o36b5o35b5o19b4o44b3o11b7o7b3o
11b7o29b6o13b6o12b5o37b6o36b5o23b3o11b7o7b3o11b7o43b44o34b6o13b6o62b
64o43b3o11b7o7b3o11b7o29b6o13b6o12b5o37b6o36b5o23b3o11b7o7b3o11b7o37b
6o72b5o37b6o36b5o35b5o19b4o44b3o11b7o7b3o11b7o28b6o13b6o54b64o43b3o11b
7o7b3o11b7o29b6o13b6o12b5o37b6o36b5o38b8o44b4o$58b6o31b7o44b6o24b6o35b
6o37b5o23b7o19b7o18b5o124b4o31b8o37b6o35b6o37b5o35b4o21b4o42b4o11b7o6b
3o12b7o28b6o12b6o111b6o44b4o11b7o6b3o12b7o28b6o12b6o59b8o149b7o90b6o
35b6o37b5o23b7o19b7o10b4o91b6o31b7o44b6o24b6o35b6o37b5o23b7o19b7o18b5o
124b4o27b4o11b7o6b3o12b7o26b6o24b6o35b6o37b5o22b4o11b7o6b3o12b7o27b6o
12b6o60b6o35b6o37b5o35b4o21b4o42b4o11b7o6b3o12b7o29b6o12b6o13b6o35b6o
37b5o22b4o11b7o6b3o12b7o121b6o12b6o119b6o44b4o11b7o6b3o12b7o29b6o12b6o
13b6o35b6o37b5o22b4o11b7o6b3o12b7o36b6o73b6o35b6o37b5o35b4o21b4o42b4o
11b7o6b3o12b7o28b6o12b6o111b6o44b4o11b7o6b3o12b7o29b6o12b6o13b6o35b6o
37b5o38b7o45b4o$56b7o31b8o44b6o24b6o35b6o37b5o23b7o18b7o19b5o124b4o31b
7o38b6o35b6o37b5o35b4o21b4o42b3o13b6o6b2o13b7o27b6o13b6o109b7o45b3o13b
6o6b2o13b7o27b6o13b6o59b7o150b7o90b6o35b6o37b5o23b7o18b7o11b4o89b7o31b
8o44b6o24b6o35b6o37b5o23b7o18b7o19b5o124b4o27b3o13b6o6b2o13b7o26b6o24b
6o35b6o37b5o22b3o13b6o6b2o13b7o26b6o13b6o60b6o35b6o37b5o35b4o21b4o42b
3o13b6o6b2o13b7o28b6o13b6o13b6o35b6o37b5o22b3o13b6o6b2o13b7o120b6o13b
6o117b7o45b3o13b6o6b2o13b7o28b6o13b6o13b6o35b6o37b5o22b3o13b6o6b2o13b
7o36b6o73b6o35b6o37b5o35b4o21b4o42b3o13b6o6b2o13b7o27b6o13b6o109b7o45b
3o13b6o6b2o13b7o28b6o13b6o13b6o35b6o37b5o38b7o45b4o$55b6o34b7o44b6o24b
6o35b6o37b5o23b7o18b7o19b5o124b4o31b7o38b6o35b6o37b5o34b4o22b5o41b3o
13b6o5b3o12b7o28b6o13b6o108b6o47b3o13b6o5b3o12b7o28b6o13b6o59b7o150b7o
90b6o35b6o37b5o23b7o18b7o11b4o88b6o34b7o44b6o24b6o35b6o37b5o23b7o18b7o
19b5o124b4o27b3o13b6o5b3o12b7o27b6o24b6o35b6o37b5o22b3o13b6o5b3o12b7o
27b6o13b6o60b6o35b6o37b5o34b4o22b5o41b3o13b6o5b3o12b7o29b6o13b6o13b6o
35b6o37b5o22b3o13b6o5b3o12b7o121b6o13b6o116b6o47b3o13b6o5b3o12b7o29b6o
13b6o13b6o35b6o37b5o22b3o13b6o5b3o12b7o37b6o73b6o35b6o37b5o34b4o22b5o
41b3o13b6o5b3o12b7o28b6o13b6o108b6o47b3o13b6o5b3o12b7o29b6o13b6o13b6o
35b6o37b5o38b7o45b4o$55b5o35b7o44b6o24b6o34b7o37b5o23b7o18b7o19b5o124b
4o30b8o38b6o34b7o37b5o34b4o23b4o41b3o13b6o4b3o13b7o28b6o13b6o108b5o48b
3o13b6o4b3o13b7o28b6o13b6o58b8o149b8o90b6o34b7o37b5o23b7o18b7o11b4o88b
5o35b7o44b6o24b6o34b7o37b5o23b7o18b7o19b5o124b4o27b3o13b6o4b3o13b7o27b
6o24b6o34b7o37b5o22b3o13b6o4b3o13b7o27b6o13b6o60b6o34b7o37b5o34b4o23b
4o41b3o13b6o4b3o13b7o29b6o13b6o13b6o34b7o37b5o22b3o13b6o4b3o13b7o121b
6o13b6o17b10o89b5o48b3o13b6o4b3o13b7o29b6o13b6o13b6o34b7o37b5o22b3o13b
6o4b3o13b7o36b7o73b6o34b7o37b5o34b4o23b4o41b3o13b6o4b3o13b7o28b6o13b6o
108b5o48b3o13b6o4b3o13b7o29b6o13b6o13b6o34b7o37b5o37b8o45b4o$54b5o36b
8o27b2o15b5o25b5o34b6o38b5o23b7o17b7o20b5o33b51o40b4o30b8o39b5o34b6o
38b5o33b5o23b5o40b3o13b6o4b2o14b7o27b6o13b6o108b5o49b3o13b6o4b2o14b7o
27b6o13b6o59b8o55b51o43b7o92b5o34b6o38b5o23b7o17b7o12b4o87b5o36b8o27b
2o15b5o25b5o34b6o38b5o23b7o17b7o20b5o33b51o40b4o27b3o13b6o4b2o14b7o28b
5o25b5o34b6o38b5o22b3o13b6o4b2o14b7o26b6o13b6o62b5o34b6o38b5o33b5o23b
5o40b3o13b6o4b2o14b7o28b6o13b6o15b5o34b6o38b5o22b3o13b6o4b2o14b7o120b
6o13b6o16b13o87b5o49b3o13b6o4b2o14b7o28b6o13b6o15b5o34b6o38b5o22b3o13b
6o4b2o14b7o36b6o75b5o34b6o38b5o33b5o23b5o40b3o13b6o4b2o14b7o27b6o13b6o
108b5o49b3o13b6o4b2o14b7o28b6o13b6o15b5o34b6o38b5o37b7o46b4o$53b5o37b
8o24b5o15b5o25b5o34b6o13b2o23b5o23b6o18b7o20b5o33b51o40b4o30b7o40b5o
34b6o13b2o23b5o33b4o25b4o39b3o14b7o2b3o14b7o27b6o13b6o107b5o49b3o14b7o
2b3o14b7o27b6o13b6o59b7o56b51o43b7o92b5o34b6o13b2o23b5o23b6o18b7o12b4o
86b5o37b8o24b5o15b5o25b5o34b6o13b2o23b5o23b6o18b7o20b5o33b51o40b4o26b
3o14b7o2b3o14b7o28b5o25b5o34b6o13b2o23b5o21b3o14b7o2b3o14b7o26b6o13b6o
62b5o34b6o13b2o23b5o33b4o25b4o39b3o14b7o2b3o14b7o28b6o13b6o15b5o34b6o
13b2o23b5o21b3o14b7o2b3o14b7o120b6o13b6o15b6o4b5o85b5o49b3o14b7o2b3o
14b7o28b6o13b6o15b5o34b6o13b2o23b5o21b3o14b7o2b3o14b7o36b6o13b2o60b5o
34b6o13b2o23b5o33b4o25b4o39b3o14b7o2b3o14b7o27b6o13b6o107b5o49b3o14b7o
2b3o14b7o28b6o13b6o15b5o34b6o13b2o23b5o37b7o46b4o$52b5o38b8o23b6o15b5o
25b5o34b6o12b3o23b5o23b6o18b6o21b5o33b51o40b4o30b7o40b5o34b6o12b3o23b
5o32b5o25b5o38b3o14b7ob3o14b7o28b6o13b6o106b5o50b3o14b7ob3o14b7o28b6o
13b6o59b7o56b51o43b7o92b5o34b6o12b3o23b5o23b6o18b6o13b4o85b5o38b8o23b
6o15b5o25b5o34b6o12b3o23b5o23b6o18b6o21b5o33b51o40b4o26b3o14b7ob3o14b
7o29b5o25b5o34b6o12b3o23b5o21b3o14b7ob3o14b7o27b6o13b6o62b5o34b6o12b3o
23b5o32b5o25b5o38b3o14b7ob3o14b7o29b6o13b6o15b5o34b6o12b3o23b5o21b3o
14b7ob3o14b7o121b6o13b6o13b6o7b5o83b5o50b3o14b7ob3o14b7o29b6o13b6o15b
5o34b6o12b3o23b5o21b3o14b7ob3o14b7o37b6o12b3o60b5o34b6o12b3o23b5o32b5o
25b5o38b3o14b7ob3o14b7o28b6o13b6o106b5o50b3o14b7ob3o14b7o29b6o13b6o15b
5o34b6o12b3o23b5o37b7o46b4o$52b4o39b9o21b6o16b5o25b5o33b7o12b3o23b5o
23b6o17b7o21b5o124b4o29b8o40b5o33b7o12b3o23b5o32b4o27b4o38b3o14b7ob2o
15b7o28b6o13b6o106b4o51b3o14b7ob2o15b7o28b6o13b6o58b8o150b7o92b5o33b7o
12b3o23b5o23b6o17b7o13b4o85b4o39b9o21b6o16b5o25b5o33b7o12b3o23b5o23b6o
17b7o21b5o124b4o26b3o14b7ob2o15b7o29b5o25b5o33b7o12b3o23b5o21b3o14b7ob
2o15b7o27b6o13b6o62b5o33b7o12b3o23b5o32b4o27b4o38b3o14b7ob2o15b7o29b6o
13b6o15b5o33b7o12b3o23b5o21b3o14b7ob2o15b7o121b6o13b6o12b6o9b5o82b4o
51b3o14b7ob2o15b7o29b6o13b6o15b5o33b7o12b3o23b5o21b3o14b7ob2o15b7o36b
7o12b3o60b5o33b7o12b3o23b5o32b4o27b4o38b3o14b7ob2o15b7o28b6o13b6o106b
4o51b3o14b7ob2o15b7o29b6o13b6o15b5o33b7o12b3o23b5o37b7o46b4o$51b5o39b
9o21b5o17b5o25b5o21b4o8b6o13b3o22b6o23b6o17b6o21b6o124b4o29b8o40b5o21b
4o8b6o13b3o22b6o31b5o27b4o38b3o15b9o15b7o28b6o12b6o19bo86b5o51b3o15b9o
15b7o28b6o12b6o19bo39b8o149b7o93b5o21b4o8b6o13b3o22b6o23b6o17b6o14b4o
84b5o39b9o21b5o17b5o25b5o21b4o8b6o13b3o22b6o23b6o17b6o21b6o124b4o26b3o
15b9o15b7o29b5o25b5o21b4o8b6o13b3o22b6o21b3o15b9o15b7o27b6o12b6o63b5o
21b4o8b6o13b3o22b6o31b5o27b4o38b3o15b9o15b7o29b6o12b6o16b5o21b4o8b6o
13b3o22b6o21b3o15b9o15b7o121b6o12b6o12b6o11b4o81b5o51b3o15b9o15b7o29b
6o12b6o16b5o21b4o8b6o13b3o22b6o21b3o15b9o15b7o24b4o8b6o13b3o60b5o21b4o
8b6o13b3o22b6o31b5o27b4o38b3o15b9o15b7o28b6o12b6o19bo86b5o51b3o15b9o
15b7o29b6o12b6o16b5o21b4o8b6o13b3o22b6o36b7o47b4o$51b4o41b9o19b5o18b5o
25b5o20b6o7b6o12b3o23b5o24b6o16b6o22b5o125b4o29b7o41b5o20b6o7b6o12b3o
23b5o32b4o29b4o36b3o16b8o16b7o28b6o12b6o17b5o84b4o51b3o16b8o16b7o28b6o
12b6o17b6o36b7o150b7o93b5o20b6o7b6o12b3o23b5o24b6o16b6o15b4o84b4o41b9o
19b5o18b5o25b5o20b6o7b6o12b3o23b5o24b6o16b6o22b5o125b4o25b3o16b8o16b7o
29b5o25b5o20b6o7b6o12b3o23b5o21b3o16b8o16b7o27b6o12b6o63b5o20b6o7b6o
12b3o23b5o32b4o29b4o36b3o16b8o16b7o29b6o12b6o16b5o20b6o7b6o12b3o23b5o
21b3o16b8o16b7o121b6o12b6o11b6o12b5o80b4o51b3o16b8o16b7o29b6o12b6o16b
5o20b6o7b6o12b3o23b5o21b3o16b8o16b7o23b6o7b6o12b3o61b5o20b6o7b6o12b3o
23b5o32b4o29b4o36b3o16b8o16b7o28b6o12b6o17b5o84b4o51b3o16b8o16b7o29b6o
12b6o16b5o20b6o7b6o12b3o23b5o37b7o47b4o$50b5o41b10o17b6o18b6o24b6o18b
8o5b7o12b3o23b5o25b6o14b7o22b5o125b4o29b7o41b6o18b8o5b7o12b3o23b5o32b
4o29b4o36b3o16b8o15b7o29b6o12b6o16b7o82b5o51b3o16b8o15b7o29b6o12b6o16b
7o36b7o150b7o93b6o18b8o5b7o12b3o23b5o25b6o14b7o15b4o83b5o41b10o17b6o
18b6o24b6o18b8o5b7o12b3o23b5o25b6o14b7o22b5o125b4o25b3o16b8o15b7o30b6o
24b6o18b8o5b7o12b3o23b5o21b3o16b8o15b7o28b6o12b6o63b6o18b8o5b7o12b3o
23b5o32b4o29b4o36b3o16b8o15b7o30b6o12b6o16b6o18b8o5b7o12b3o23b5o21b3o
16b8o15b7o122b6o12b6o11b5o13b5o79b5o51b3o16b8o15b7o30b6o12b6o16b6o18b
8o5b7o12b3o23b5o21b3o16b8o15b7o23b8o5b7o12b3o61b6o18b8o5b7o12b3o23b5o
32b4o29b4o36b3o16b8o15b7o29b6o12b6o16b7o82b5o51b3o16b8o15b7o30b6o12b6o
16b6o18b8o5b7o12b3o23b5o37b7o47b4o$50b4o42b11o15b5o21b5o25b5o18b8o5b7o
11b3o24b5o25b6o14b6o23b5o125b4o28b8o42b5o18b8o5b7o11b3o24b5o31b4o30b5o
34b4o16b7o16b7o29b6o11b7o15b9o81b4o51b4o16b7o16b7o29b6o11b7o15b9o34b8o
149b8o94b5o18b8o5b7o11b3o24b5o25b6o14b6o16b4o83b4o42b11o15b5o21b5o25b
5o18b8o5b7o11b3o24b5o25b6o14b6o23b5o125b4o24b4o16b7o16b7o31b5o25b5o18b
8o5b7o11b3o24b5o20b4o16b7o16b7o28b6o11b7o64b5o18b8o5b7o11b3o24b5o31b4o
30b5o34b4o16b7o16b7o30b6o11b7o17b5o18b8o5b7o11b3o24b5o20b4o16b7o16b7o
122b6o11b7o10b6o13b5o79b4o51b4o16b7o16b7o30b6o11b7o17b5o18b8o5b7o11b3o
24b5o20b4o16b7o16b7o23b8o5b7o11b3o63b5o18b8o5b7o11b3o24b5o31b4o30b5o
34b4o16b7o16b7o29b6o11b7o15b9o81b4o51b4o16b7o16b7o30b6o11b7o17b5o18b8o
5b7o11b3o24b5o36b8o47b4o$49b5o43b11o13b5o22b5o25b5o18b7o5b8o10b3o25b5o
26b5o13b6o24b5o125b4o28b8o42b5o18b7o5b8o10b3o25b5o31b4o31b4o33b5o16b6o
17b7o29b6o10b7o16b9o80b5o50b5o16b6o17b7o29b6o10b7o16b9o34b8o149b7o95b
5o18b7o5b8o10b3o25b5o26b5o13b6o17b4o82b5o43b11o13b5o22b5o25b5o18b7o5b
8o10b3o25b5o26b5o13b6o24b5o125b4o23b5o16b6o17b7o31b5o25b5o18b7o5b8o10b
3o25b5o19b5o16b6o17b7o28b6o10b7o65b5o18b7o5b8o10b3o25b5o31b4o31b4o33b
5o16b6o17b7o30b6o10b7o18b5o18b7o5b8o10b3o25b5o19b5o16b6o17b7o122b6o10b
7o11b5o14b5o78b5o50b5o16b6o17b7o30b6o10b7o18b5o18b7o5b8o10b3o25b5o19b
5o16b6o17b7o23b7o5b8o10b3o64b5o18b7o5b8o10b3o25b5o31b4o31b4o33b5o16b6o
17b7o29b6o10b7o16b9o80b5o50b5o16b6o17b7o30b6o10b7o18b5o18b7o5b8o10b3o
25b5o36b7o48b4o$49b4o45b12o9b6o23b5o25b5o18b7o5b3ob5o8b4o25b4o27b6o10b
7o25b4o126b4o27b9o42b5o18b7o5b3ob5o8b4o25b4o31b5o31b5o31b8o14b6o16b8o
30b5o9b8o16b9o80b4o50b8o14b6o16b8o30b5o9b8o16b10o32b9o148b8o95b5o18b7o
5b3ob5o8b4o25b4o27b6o10b7o18b4o82b4o45b12o9b6o23b5o25b5o18b7o5b3ob5o8b
4o25b4o27b6o10b7o25b4o126b4o22b8o14b6o16b8o31b5o25b5o18b7o5b3ob5o8b4o
25b4o19b8o14b6o16b8o29b5o9b8o65b5o18b7o5b3ob5o8b4o25b4o31b5o31b5o31b8o
14b6o16b8o31b5o9b8o18b5o18b7o5b3ob5o8b4o25b4o19b8o14b6o16b8o123b5o9b8o
10b6o14b5o78b4o50b8o14b6o16b8o31b5o9b8o18b5o18b7o5b3ob5o8b4o25b4o19b8o
14b6o16b8o23b7o5b3ob5o8b4o64b5o18b7o5b3ob5o8b4o25b4o31b5o31b5o31b8o14b
6o16b8o30b5o9b8o16b9o80b4o50b8o14b6o16b8o31b5o9b8o18b5o18b7o5b3ob5o8b
4o25b4o36b8o48b4o$49b4o45b26o24b5o25b5o18b6o5b3o2b5o7b4o25b5o28b6o8b6o
26b5o126b4o17b28o33b5o18b6o5b3o2b5o7b4o25b5o31b4o33b4o25b18o10b5o10b
21o24b6o7b9o16b9o80b4o44b18o10b5o10b21o24b6o7b9o16b10o22b28o132b22o88b
5o18b6o5b3o2b5o7b4o25b5o28b6o8b6o20b4o82b4o45b26o24b5o25b5o18b6o5b3o2b
5o7b4o25b5o28b6o8b6o26b5o126b4o16b18o10b5o10b21o25b5o25b5o18b6o5b3o2b
5o7b4o25b5o13b18o10b5o10b21o23b6o7b9o65b5o18b6o5b3o2b5o7b4o25b5o31b4o
33b4o25b18o10b5o10b21o25b6o7b9o18b5o18b6o5b3o2b5o7b4o25b5o13b18o10b5o
10b21o117b6o7b9o10b6o13b6o78b4o44b18o10b5o10b21o25b6o7b9o18b5o18b6o5b
3o2b5o7b4o25b5o13b18o10b5o10b21o17b6o5b3o2b5o7b4o65b5o18b6o5b3o2b5o7b
4o25b5o31b4o33b4o25b18o10b5o10b21o24b6o7b9o16b9o80b4o44b18o10b5o10b21o
25b6o7b9o18b5o18b6o5b3o2b5o7b4o25b5o29b22o41b4o$49b4o46b23o27b5o25b5o
18b4o4b5o3b5o4b5o26b5o29b7o4b7o27b5o126b4o16b30o33b5o18b4o4b5o3b5o4b5o
26b5o30b5o33b5o24b19o10b3o10b23o24b6o4b11o17b7o81b4o44b19o10b3o10b23o
24b6o4b11o17b9o21b30o131b22o89b5o18b4o4b5o3b5o4b5o26b5o29b7o4b7o21b4o
82b4o46b23o27b5o25b5o18b4o4b5o3b5o4b5o26b5o29b7o4b7o27b5o126b4o16b19o
10b3o10b23o25b5o25b5o18b4o4b5o3b5o4b5o26b5o13b19o10b3o10b23o23b6o4b11o
66b5o18b4o4b5o3b5o4b5o26b5o30b5o33b5o24b19o10b3o10b23o25b6o4b11o19b5o
18b4o4b5o3b5o4b5o26b5o13b19o10b3o10b23o117b6o4b11o10b5o14b6o78b4o44b
19o10b3o10b23o25b6o4b11o19b5o18b4o4b5o3b5o4b5o26b5o13b19o10b3o10b23o
17b4o4b5o3b5o4b5o67b5o18b4o4b5o3b5o4b5o26b5o30b5o33b5o24b19o10b3o10b
23o24b6o4b11o17b7o81b4o44b19o10b3o10b23o25b6o4b11o19b5o18b4o4b5o3b5o4b
5o26b5o29b22o41b4o$48b4o48b20o29b5o25b5o18b12o5b12o27b5o31b14o29b5o
126b4o16b30o33b5o18b12o5b12o27b5o30b4o35b4o24b18o11b3o10b23o25b19o19b
5o81b4o45b18o11b3o10b23o25b19o19b8o21b30o131b22o89b5o18b12o5b12o27b5o
31b14o23b4o81b4o48b20o29b5o25b5o18b12o5b12o27b5o31b14o29b5o126b4o16b
18o11b3o10b23o25b5o25b5o18b12o5b12o27b5o13b18o11b3o10b23o24b19o67b5o
18b12o5b12o27b5o30b4o35b4o24b18o11b3o10b23o26b19o20b5o18b12o5b12o27b5o
13b18o11b3o10b23o118b19o10b6o14b6o77b4o45b18o11b3o10b23o26b19o20b5o18b
12o5b12o27b5o13b18o11b3o10b23o17b12o5b12o68b5o18b12o5b12o27b5o30b4o35b
4o24b18o11b3o10b23o25b19o19b5o81b4o45b18o11b3o10b23o26b19o20b5o18b12o
5b12o27b5o29b22o41b4o$49b3o50b16o31b5o25b5o20b8o9b8o28b5o33b11o30b5o
127b4o79b5o20b8o9b8o28b5o31b4o35b4o116b9o2b6o106b3o137b9o2b6o24b3o293b
5o20b8o9b8o28b5o33b11o25b4o82b3o50b16o31b5o25b5o20b8o9b8o28b5o33b11o
30b5o127b4o106b5o25b5o20b8o9b8o28b5o105b9o2b6o67b5o20b8o9b8o28b5o31b4o
35b4o117b9o2b6o20b5o20b8o9b8o28b5o199b9o2b6o10b6o14b5o79b3o138b9o2b6o
20b5o20b8o9b8o28b5o98b8o9b8o70b5o20b8o9b8o28b5o31b4o35b4o116b9o2b6o
106b3o138b9o2b6o20b5o20b8o9b8o28b5o93b4o$104b11o35b5o25b5o72b5o74b5o
127b4o80b5o72b5o31b3o37b3o127b6o257b6o24b3o294b5o72b5o69b4o137b11o35b
5o25b5o72b5o74b5o127b4o107b5o25b5o72b5o116b6o68b5o72b5o31b3o37b3o128b
6o21b5o72b5o210b6o10b6o13b6o231b6o21b5o72b5o194b5o72b5o31b3o37b3o127b
6o258b6o21b5o72b5o93b4o$150b5o25b5o72b4o75b4o128b4o80b5o72b4o201b7o
256b7o24b3o294b5o72b4o70b4o183b5o25b5o72b4o75b4o128b4o107b5o25b5o72b4o
116b7o68b5o72b4o202b7o21b5o72b4o210b7o10b6o13b6o230b7o21b5o72b4o195b5o
72b4o201b7o257b7o21b5o72b4o94b4o$151b4o26b4o71b5o74b5o128b4o81b4o71b5o
201b6o257b6o25b3o295b4o71b5o70b4o184b4o26b4o71b5o74b5o128b4o108b4o26b
4o71b5o116b6o70b4o71b5o202b6o23b4o71b5o210b6o11b5o13b6o231b6o23b4o71b
5o196b4o71b5o201b6o258b6o23b4o71b5o94b4o$151b5o25b5o70b5o74b5o128b4o
81b5o70b5o184b4o13b6o240b4o13b6o25b2o296b5o70b5o70b4o184b5o25b5o70b5o
74b5o128b4o108b5o25b5o70b5o99b4o13b6o70b5o70b5o185b4o13b6o23b5o70b5o
193b4o13b6o11b5o13b6o214b4o13b6o23b5o70b5o196b5o70b5o184b4o13b6o241b4o
13b6o23b5o70b5o94b4o$152b4o26b4o70b4o75b4o129b4o82b4o70b4o184b6o11b6o
240b6o11b6o25b3o297b4o70b4o71b4o185b4o26b4o70b4o75b4o129b4o109b4o26b4o
70b4o99b6o11b6o72b4o70b4o185b6o11b6o25b4o70b4o193b6o11b6o13b5o11b6o
214b6o11b6o25b4o70b4o198b4o70b4o184b6o11b6o241b6o11b6o25b4o70b4o95b4o$
152b5o25b5o68b5o74b5o129b4o82b5o68b5o183b7o11b6o239b7o11b6o25b3o297b5o
68b5o71b4o185b5o25b5o68b5o74b5o129b4o109b5o25b5o68b5o98b7o11b6o72b5o
68b5o184b7o11b6o25b5o68b5o192b7o11b6o13b5o11b5o214b7o11b6o25b5o68b5o
198b5o68b5o183b7o11b6o240b7o11b6o25b5o68b5o95b4o$153b4o26b4o68b4o75b4o
130b4o83b4o68b4o184b7o10b6o240b7o10b6o26b2o299b4o68b4o72b4o186b4o26b4o
68b4o75b4o130b4o110b4o26b4o68b4o99b7o10b6o74b4o68b4o185b7o10b6o27b4o
68b4o193b7o10b6o14b5o10b5o215b7o10b6o27b4o68b4o200b4o68b4o184b7o10b6o
241b7o10b6o27b4o68b4o96b4o$153b5o25b5o66b4o75b4o131b4o83b5o66b4o185b7o
9b6o241b7o9b6o26b3o299b5o66b4o73b4o186b5o25b5o66b4o75b4o131b4o110b5o
25b5o66b4o100b7o9b6o75b5o66b4o186b7o9b6o28b5o66b4o194b7o9b6o16b5o7b6o
216b7o9b6o28b5o66b4o201b5o66b4o185b7o9b6o242b7o9b6o28b5o66b4o97b4o$
154b4o26b4o65b5o74b5o131b4o84b4o65b5o184b7o10b6o240b7o10b6o26b3o300b4o
65b5o73b4o187b4o26b4o65b5o74b5o131b4o111b4o26b4o65b5o99b7o10b6o76b4o
65b5o185b7o10b6o29b4o65b5o193b7o10b6o17b5o4b7o216b7o10b6o29b4o65b5o
202b4o65b5o184b7o10b6o241b7o10b6o29b4o65b5o97b4o$154b5o25b5o64b4o75b4o
132b4o84b5o64b4o186b6o9b6o242b6o9b6o26b3o301b5o64b4o74b4o187b5o25b5o
64b4o75b4o132b4o111b5o25b5o64b4o101b6o9b6o77b5o64b4o187b6o9b6o30b5o64b
4o195b6o9b6o19b13o219b6o9b6o30b5o64b4o203b5o64b4o186b6o9b6o243b6o9b6o
30b5o64b4o98b4o$155b4o26b4o63b4o75b4o133b4o85b4o63b4o187b3o11b6o243b3o
11b6o26b3o303b4o63b4o75b4o188b4o26b4o63b4o75b4o133b4o112b4o26b4o63b4o
102b3o11b6o79b4o63b4o188b3o11b6o32b4o63b4o196b3o11b6o22b9o221b3o11b6o
32b4o63b4o205b4o63b4o187b3o11b6o244b3o11b6o32b4o63b4o99b4o$156b4o26b4o
62b4o75b4o133b4o86b4o62b4o187b4o8b6o245b4o8b6o27b4o304b4o62b4o75b4o
189b4o26b4o62b4o75b4o133b4o113b4o26b4o62b4o102b4o8b6o82b4o62b4o188b4o
8b6o35b4o62b4o196b4o8b6o254b4o8b6o35b4o62b4o206b4o62b4o187b4o8b6o246b
4o8b6o35b4o62b4o99b4o$157b4o26b4o60b4o75b4o134b4o87b4o60b4o189b5o4b7o
247b5o4b7o28b3o306b4o60b4o76b4o190b4o26b4o60b4o75b4o134b4o114b4o26b4o
60b4o104b5o4b7o84b4o60b4o190b5o4b7o37b4o60b4o198b5o4b7o256b5o4b7o37b4o
60b4o208b4o60b4o189b5o4b7o248b5o4b7o37b4o60b4o100b4o$158b4o26b4o58b4o
75b4o135b4o88b4o58b4o191b13o250b13o29b3o308b4o58b4o77b4o191b4o26b4o58b
4o75b4o135b4o115b4o26b4o58b4o106b13o87b4o58b4o192b13o40b4o58b4o200b13o
259b13o40b4o58b4o210b4o58b4o191b13o251b13o40b4o58b4o101b4o$159b4o26b4o
56b4o75b4o136b4o89b4o56b4o194b9o254b9o343b4o56b4o78b4o192b4o26b4o56b4o
75b4o136b4o116b4o26b4o56b4o109b9o90b4o56b4o195b9o43b4o56b4o203b9o263b
9o43b4o56b4o212b4o56b4o194b9o255b9o43b4o56b4o102b4o$160b4o26b4o54b4o
75b4o137b4o90b4o54b4o811b4o54b4o71b12o193b4o26b4o54b4o75b4o137b4o117b
4o26b4o54b4o210b4o54b4o249b4o54b4o529b4o54b4o214b4o54b4o512b4o54b4o95b
12o$161b3o27b3o53b4o75b4o138b4o91b3o53b4o813b3o53b4o72b12o194b3o27b3o
53b4o75b4o138b4o118b3o27b3o53b4o212b3o53b4o251b3o53b4o531b3o53b4o216b
3o53b4o514b3o53b4o96b12o$162b3o27b3o52b3o76b3o139b4o92b3o52b3o815b3o
52b3o73b12o195b3o27b3o52b3o76b3o139b4o119b3o27b3o52b3o214b3o52b3o253b
3o52b3o533b3o52b3o218b3o52b3o516b3o52b3o97b12o$468b4o1609b4o$468b4o
1609b4o$468b4o1609b4o$468b4o1609b4o$468b15o1598b15o$468b15o1598b15o$
468b15o1598b15o$468b15o1598b15o!

When asked for corollaries to such a groundbreaking theorem, it said

→ C((x)o) = [T(x) ˄ MyX. → My,T = Y^T(x)o] → C((x)o) = [M((x)MyT(x) ˄ My(x)...

but the rest was lost in a tragic boating accident.

[Moosey]

Supposedly there is a new proof of (x > y ⇒ ∄z > x&z=y), by a Fryderyk Pichon.

Sadly, though the proof is mildly incomprehensible, it doesn’t matter anyways— Pichon died on the 13th, of tuberculosis, before he finished writing the proof. Only the first three steps of the supposedly 137-step proof are known. However, it is known that one step is a meta-step, and mentions something special about the number 137



The hon. mcReporter wrote about this proof, and I will quote them here.

An awesome new mathematical proof has been found by Fryderyk Pichon.
The proof shows that if x > y, (∄z > x&z=y)
Proof:
1) Suppose there exists a set S consisting of a set of numbers from x to y, as shown in (5). Then if x is a prime then y is prime.
2) Then x^x+y^y+z^z=1.
3) From this, the product of x+y+z is then ( ⊂ ⊐ z + x) (∀y ∈ ℤ x + ∀x ∈ ℤ z ) = λ ( ⊂ ⊐ y + ( ) ⊔ (∀y ∈ ℤ x + ∀x ∈ ℤ z ) ) ℤ = x^y+z^z
Therefore, from this it follows that = x^y + z^z (∀y ∈ ℤ x + ∀x ∈ ℤ z ) = ( (∀y ∈ ℤ x + ∀x ∈ ℤ z) ℤ ) .
Since this is false, there are some sets for which y is not always prime if x is prime.
...
...Thus, if x > y, (∄z > x&z=y).

However, Pichon recently died of consumption.

[Moosey]

ɷ

ɷ, or the Noitam-Rôfnisim (nɔɪtɛm-ɻaːfɲzm) ordinal (sometimes abbreviated to NRO), is a very large, uncountable ordinal.

It is guaranteed by tamref's first theorem that ɷ>any countable ordinal. In fact, we know that ɷ is at least the first inaccessible cardinal. We also know it is grater than, say, φ where φ is the supremum of all notable ordinals less than ɷ, not including φ. Since φ is also the first ordinal n which is the nth uncountable ordinal which is actually impossible to construct without self-reference, we know that it is much larger than many other numbers, at least the caliber of the first 1-inacessible cardinal.
ɷ is thus a very large infinite ordinal. It is the first "superfluous ordinal.", e.g. a notable ordinal > φ.
It is known Vince Guaraldi's Theorem that ɷ is not transcendable, as it is the supremum where the Transcend(n) function is defined, i.e. it's the largest value which a function defined as countable values can ever approach.
The Noitam-Rôfnisim ordinal is, however, less than, say, ɷ+1, as is true for all ordinals. However, the latter is not notable, since it doesn't have the property of Pichonism (making it very hard to put in any sensible set of transfinite ordinals.)


Talk

does anybody know of a larger ordinal with Pichonism? --Tamref

[Moosey]

"I play baseball on mars for a living," said Legolas.
Gimli responded, "what’s Mars?"
"Uh, you know, space." Gandalf said.
Gollum asked, "what is space?"
"It’s where everything besides the earth is," said Chopin
Gimli asked who Chopin was.
Gandalf said, "He’s a great pianist"
Gollum exclaimed, "THE EARTH SITS ON A TURTLE ON A TURTLE ON A TURTLE!"
The next morning Gollum informed Gandalf of his discovery. Gandalf responded, "Good point, Gollum. We could use a pile of gold."
Gimli responded, "But what do we take and hold on to instead of gold?"
Gandalf explained, "the earth will expand and the moon will shrink."
Gimli said, "Oh, they’re going away." Gandalf said, "I'm going to go get some food."
Gandalf went back up to the top of the mountain to see what was to happen to the sun.
As Gandalf was standing there, he caught sight of a small village on the horizon. He said to Gimli and Legolas, "What did the sky do?"
Gimli said, "There's a strange thing about this land. The sky is always the same. It changes. And so the sun grows closer, and the moon gets smaller."
It dawned on Legolas that the moon was a duck. He thought it was cool to be able to look at something that was actually a duck. But, he had also realized that they had a connection. The ducks could tell if the earth was shifting by the way the moon stayed around the Earth during sunset. The moon, after changing positions, also stayed in the same location during noon and midnight. To Legolas, these two connections were a lot more than just coincidence.
Gimli waited for Gandalf to say something.

[Hunting]

Are there anyone who is still interested in CACoin?

Find a string S with a given prefix P, that when you run the QR code of SHA-256(S), it generates a pentadecathlon/whatever you want.

(Also, page 103 reached!)

[testitemqlstudop]

Me, but calcyman doesn't have enough time