%I #5 Mar 31 2012 12:36:00

%S 107058241,2816118529,43935544294,503785839330,4626643143791,

%T 35627770917826,236912838360594,1389863286849772,7315301238941444,

%U 35019093954902897,154213012365058057,630709975793568592

%N Number of (n+2)X9 0..3 arrays with each 3X3 subblock having rows and columns in lexicographically nondecreasing order

%C Column 7 of A184574

%H R. H. Hardin, <a href="/A184572/b184572.txt">Table of n, a(n) for n = 1..200</a>

%F Empirical: a(n) = (4793/452457366575488002837474673950720000000)*n^37

%F + (51103/9570191067401626381991238696960000000)*n^36

%F + (4917877/3785035885123130010866905251840000000)*n^35

%F + (15705320153/77017251923374993264596159037440000000)*n^34

%F + (403479410207/17366635237623772991036388802560000000)*n^33

%F + (4851601752143/2368177532403241771504962109440000000)*n^32

%F + (15462960490711/106264376453991617952145735680000000)*n^31

%F + (2746274235427991/320849859228826304526478737408000000)*n^30

%F + (10856490117519047/25464274541970341629085614080000000)*n^29

%F + (6456752239990781/351231372992694367297732608000000)*n^28

%F + (226622562233850109/321962091909969836689588224000000)*n^27

%F + (475881640585627280657/19317725514598190201375293440000000)*n^26

%F + (18685538511769681859/23115227111485013916175564800000)*n^25

%F + (78436996080074747430437/3120555660050476878683701248000000)*n^24

%F + (9085432735871849854181/12383157381152686026522624000000)*n^23

%F + (150187159136899643608847/7635464630275964506472448000000)*n^22

%F + (40977480814594448970681991/86535265809794264406687744000000)*n^21

%F + (5226774037191381140326999133/519211594858765586440126464000000)*n^20

%F + (13071005257064306496446488163/69893868538679982790017024000000)*n^19

%F + (98722865942539034676454307634913/32710330476102231945727967232000000)*n^18

%F + (694634392196058336866261194853/16468649202556001876705280000000)*n^17

%F + (80254478670048450027363402644633/157481457999441767945994240000000)*n^16

%F + (6421634521403488005941196166071713/1207357844662386887585955840000000)*n^15

%F + (7550105556722752711894650772163617/157481457999441767945994240000000)*n^14

%F + (121356034989018715751902496676123689/325057881255258008196218880000000)*n^13

%F + (1815930478138841589986222979052727/722707739944990630871040000000)*n^12

%F + (84748143544090618090953653122309/5798806216199122452480000000)*n^11

%F + (201185582615958792018429209453875081/2743995101505424744513536000000)*n^10

%F + (6973050061034384066468555069716721959/22104404984349254886359040000000)*n^9

%F + (42410046291974983194824317540349467/36840674973915424810598400000)*n^8

%F + (3288593362113975843795222673686912623/939515931225813237424128000000)*n^7

%F + (396373545443656122094834534124529867533/45801401647258395324426240000000)*n^6

%F + (20854343491187859889043913375883746431/1235910838100623365897216000000)*n^5

%F + (22057820267586548673537627400084129/882793455786159547069440000)*n^4

%F + (65189593181950361989190823489581/2452204043850443186304000)*n^3

%F + (2022025625886313819557910577/110579186681567604000)*n^2

%F + (224306318583025111397/34694360110800)*n

%F + 151134

%e Some solutions for 4X9

%e ..0..0..0..0..0..0..0..1..3....0..0..0..0..0..0..0..0..0

%e ..0..0..0..0..0..0..1..2..3....0..0..0..0..0..0..0..0..3

%e ..0..0..0..0..0..0..1..3..1....0..0..0..0..0..0..1..3..1

%e ..0..0..0..0..0..0..2..0..3....0..0..0..0..0..0..3..3..2

%K nonn

%O 1,1

%A _R. H. Hardin_ Jan 17 2011