Bitches be Puzzlin

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Bitches be Puzzlin
« on: October 27, 2025, 10:34:08 pm »
Yall got puzzles?!
*WoofWoof*

Re: Bitches be Puzzlin
« Reply #1 on: October 27, 2025, 10:34:27 pm »
Check out dis puzzle.

*WoofWoof*

Re: Bitches be Puzzlin
« Reply #2 on: October 29, 2025, 10:35:12 pm »
Anyone here like Rubik's cubes?
MrPedalMan

Re: Bitches be Puzzlin
« Reply #3 on: October 30, 2025, 11:52:26 am »
Anyone here like Rubik's cubes?

I use o be able to solve a 3x3x3 in a min... now I couldn't do it maybe 15min if you handed it to me.
*WoofWoof*

Re: Bitches be Puzzlin
« Reply #4 on: October 30, 2025, 11:53:43 am »
Anyone here like Rubik's cubes?

It is super satisfying when they shift in your fingers all fast. (I used to be the dork who'd be in rubix cube club, when I was a kid)
*WoofWoof*

Re: Bitches be Puzzlin
« Reply #5 on: June 18, 2026, 01:45:33 am »
*WoofWoof*

Re: Bitches be Puzzlin
« Reply #6 on: June 23, 2026, 05:37:41 am »
I have two books by Raymond Smullyan that are all "one of us only lies, the other only tells the truth" type puzzles.

In this puzzle on the island of knights and knaves, knights are unavoidably honest and knaves always say contrary things.  I was visiting the island when I saw three strangers (A, B, and C) spending time in a garden.  As I approached the group, I asked A "If you don't mind, are you a knight or a knave?"  A obligingly answered but I wasn't close enough to hear, so when I got closer I asked B "what did A say?"  B said "A told you he's a knave," but C interrupted to say "Don't believe B, she's lying."   Can you figure out the knight/knave status of B and C?

Re: Bitches be Puzzlin
« Reply #7 on: July 06, 2026, 01:21:16 pm »
Anyone here like Rubik's cubes?

In the summer of 2000, I was unemployed for a few months, so I bought a Rubik's cube and came up with my own algorithm for solving it.  It is very, very slow requiring hundreds of moves.  I also have the 12 sided Rubik's which I can solve using the conventional method.  I'm not really interested is solving them fast, as my hands are slow by my nature.

I once was working on a C++ program to solve it, but I couldn't figure out how to represent an entire cube correctly.  I think if I did it today, I'd use some kind of 9 x 3 tensor with each individual cube starting out as the identity matrix in its respective slot.  (the identity matrix is
100
010
001
So a whole Rubik's cube would be 27 of those.)
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