Hi mbop;

Welcome to the forum.

What happens when one hat has all the marbles? Does the game stop and we start again from the initial position? How about when a bag runs out of marbles?

I think itis impossible to get all three to be 7. I'm working on a proof.

Hi Phoolwati

Why not make a new thread for your problem?

Hi phontister and anonimnystefy;

I believe it to be impossible. There is an incomplete proof of that on the net.

Hi Phoolwati;

Welcome to the forum. If you tack on to a post as you have done it is very likely
you will never get an answer. Please make a new thread in "Help Me' if you need halp and in "Puzzles and Games" if you already know the answer.

Hi,

I've got a formula for the '21 marbles in 3 hats' problem that with one quick calculation identifies whether or not it is possible for a particular combination to reach 7,7,7 after some number of moves.

For a test combination in hats A, B & C:
1. If (A-C) mod 3 = 0, it is possible.
2. If (A-C) mod 3 ≠ 0, it is impossible.

With 11,6,4 (the puzzle question) it's impossible, as (A-C) mod 3 = 1.

I think the formula works for all cases...but I might be wrong.

Last edited by phrontister (2012-08-23 19:02:06)

Hi Bobby,

A big hail storm woke me up!

9,6,6 to 7,7,7 is possible:

9,6,6 --> 8,5,8 and 8,5,8 --> 7,7,7.

9,6,6: A-1=8, B-1=5, C+2=8.
8,5,8: A-1=7, B+2=7, C-1=7.

If you have a look at my post #7 you can trace the path of those moves.

Back to bed.

Hi Bobby,

All rested up now, thanks.

I've altered my post #10 to clarify my point.

The formula isn't a proof, of course, but I composed it from a proof that I worked out. I ran short of time last night and only just quickly posted the formula as I haven't thought of a good way of expressing the proof yet. I'll post it once I clear my thinking about it.

Off to work first, though. Catchya later.

Last edited by phrontister (2012-08-23 09:52:36)

Hi phrontister;

See if I am right with this:

(11,6,4)->(10,5,6)->(9,7,5)->(8,6,7)->(7,8,6)->(6,7,8)

Hi phrontister;

Looks pretty good now!

Ok. Here's my proof. I hope I can get the idea across.

There are three hats A, B & C (always in that order).

At each move the hats' contents increase/decrease by the amounts from one of the following three (the maximum number possible) options:

Hats          A   |  B    |  C
               ------------------
Option1     -1  |  -1   |  +2
Option2     -1  |  +2  |  -1
Option3    +2  |  -1   |  -1

The sum of the difference (ie, not absolute, but including the sign) between the three possible hat pairs AB, AC & BC can be used to determine connectivity between different groups of hat contents (eg, the puzzle's groups 11,6,4 and 7,7,7).

Those sums are (A-B)+(A-C)+(B-C), resulting in:

Option1: (-1-(-1))+(-1-2)+(-1-(-1)) = -6
Option2: (-1-2)+(-1-(-1))+(2-(-1)) = 0
Option3: (2-(-1))+(2-(-1))+(-1-(-1)) = 6

From this we can get the following formula that is common to all three Options (it has a common result: "0", in this case):

When applying that formula to different groups of hat contents, the results, which are either "0", "1" or "2", must be identical for those groups to be in the same stream. Any groups that satisfy that condition can reach each other after some number of moves.

Applying this formula to the two puzzle groups yields the following different results:
"0" for 7,7,7 and "1" for 11,6,4...which means that 11,6,4 can't reach 7,7,7 as the formula results aren't identical.

Hope that makes sense!

Last edited by phrontister (2012-08-28 09:36:09)

Thanks, Bobby!

Tricky little puzzle, that was. Took me ages to find something to hang my hat on!