Take the 15 smallest dominoes in a set (double blank through double four.)

In how many ways can they be arranged in a row such that the numbers on consecutive pieces match.

Count the two directions separately.

It might be wrong, but here's my first attempt.  I'll explain more after a day at the beach, unless it turns out that I am wrong:

Consider complete 10-chains without doubles.  (See my previous post)

Cut these complete chains in the two places the zeroes join.  This forms either a 3-row and a 7 row, or a 4 row and a 6 row, or two 5 rows.

While I could be wrong, I calculate 12 different chains yield a pair of five rows, 48 different chains give a 4 row and a 6 row, 36 different chains give a 3 row and a 7 row.  Altogether, 12 + 48 + 36 = 96 different unique 10-domino chains (without doubles).

Doubles can be inserted in 2x2x2x2x2 = 32 different ways, giving 3072 unique 15-chains, including doubles.

And each of these 15 chains can be cut in 15 ways, with each cut yielding a unique row.  Final  (and possibly correct) answer =  3072 * 15 = 46,080 15-domino rows where consecutive pieces match.

This = 2^10 * 15 * 3, which suggests a better method that I'll explore later.

Posted by Steve Herman on 2006-05-28 09:30:19