|
%I #4 Aug 08 2014 07:41:39
%S 298,11441,88804,525041,1744494,5208673,12257032,27206945,53051890,
%T 99643601,172531308,290962321,464076214,725751041,1089854224,
%U 1611694913,2311078842,3273303025,4525364980,6193054001,8311825918,11060605601
%N Number of length 6+3 0..n arrays with some pair in every consecutive four terms totalling exactly n
%C Row 6 of A245950
%H R. H. Hardin, <a href="/A245956/b245956.txt">Table of n, a(n) for n = 1..210</a>
%F Empirical: a(n) = 3*a(n-1) +2*a(n-2) -14*a(n-3) +5*a(n-4) +25*a(n-5) -20*a(n-6) -20*a(n-7) +25*a(n-8) +5*a(n-9) -14*a(n-10) +2*a(n-11) +3*a(n-12) -a(n-13)
%e Some solutions for n=3
%e ..2....0....1....2....2....0....1....2....1....0....3....3....2....1....3....2
%e ..1....3....1....0....1....2....3....1....2....3....2....3....2....2....2....2
%e ..3....1....2....2....2....1....2....0....0....3....1....2....1....1....3....1
%e ..0....0....3....3....2....1....1....1....3....0....3....1....0....2....1....3
%e ..0....2....1....1....0....2....3....3....3....3....3....2....3....0....3....3
%e ..0....3....2....2....3....2....2....1....0....0....0....0....3....0....0....2
%e ..3....3....0....2....2....1....1....0....3....2....3....0....2....3....0....1
%e ..3....1....3....0....0....3....0....3....3....3....0....3....1....3....3....1
%e ..3....0....1....1....0....1....0....3....2....3....1....0....0....3....3....0
%K nonn
%O 1,1
%A _R. H. Hardin_, Aug 08 2014
| 