Search found 7 matches

by Keyboard masher
Tue Jan 19, 2016 2:02 pm UTC
Forum: General
Topic: Easy Posting In Zero Count Forums
Replies: 814
Views: 300631

Re: Easy Posting In Zero Count Forums

2?
by Keyboard masher
Tue Jan 19, 2016 1:52 pm UTC
Forum: General
Topic: Easy Posting In Zero Count Forums
Replies: 814
Views: 300631

Re: Easy Posting In Zero Count Forums

1,2,3,4,5,4,3,2,1.
by Keyboard masher
Mon Jan 18, 2016 7:19 pm UTC
Forum: Forum Games
Topic: My Number is Bigger! (Everymen Needed!)
Replies: 1780
Views: 81505

Re: My Number is Bigger! (Everymen Needed!)

Let's expand the {n}m notation a bit. When the "n" is the letter, say, "w", then {w}m={m}m. Notice that {w}{w}m is not equal to {m}{m}m, it is equal to {m{m}}{m}m, because we first solve the left part before changing the "w" into m. We can of course perform addition on ...
by Keyboard masher
Sun Jan 17, 2016 6:07 pm UTC
Forum: Forum Games
Topic: My Number is Bigger (Crazy Edition)
Replies: 25
Views: 2352

Re: My Number is Bigger (Crazy Edition)

{ZFC}[PRA|200](200)!

Yes, that's factorial.

@emlightened Thanks!
by Keyboard masher
Sun Jan 17, 2016 5:56 pm UTC
Forum: Forum Games
Topic: My Number is Bigger! (Everymen Needed!)
Replies: 1780
Views: 81505

Re: My Number is Bigger! (Everymen Needed!)

1+2{3}4=1+{3}{3}4>1+{3}2^^4=1+{3}65536>1+2^^65536>2^^65536.

Clearly, the 1+ was the key.
by Keyboard masher
Thu Jan 14, 2016 7:58 pm UTC
Forum: Forum Games
Topic: My Number is Bigger (Crazy Edition)
Replies: 25
Views: 2352

Re: My Number is Bigger (Crazy Edition)

{PRA}[ZFC|{ZFC}g_65(100)](100000000000000000000000000000)!

Where PRA stands for primitive recursive arithmetic. Because why not :mrgreen:
by Keyboard masher
Thu Jan 14, 2016 4:16 pm UTC
Forum: Forum Games
Topic: My Number is Bigger! (Everymen Needed!)
Replies: 1780
Views: 81505

Re: My Number is Bigger! (Everymen Needed!)

Hey there! I'm a googologist. Most people are familiar with the factorial: n!=n*(n-1)*(n-2)...*3*2*1, or formally: 1!=1 n!=n*n-1! Define n^!=n^(n-1)^(n-2)^...^3^2^1. 3^!=3^2^1=9 4^!=4^3^!=4^9~10^6 These are quite small. I'll send in this: 7^!=7^6^5^4^3^2^1=7^6^5^4^9~7^6^5^10^6~10^10^10^10^6=10^10^10...

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