A186092 - OEIS

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A186092

Number of (n+2)X7 0..4 arrays with each 3X3 subblock having rows and columns in lexicographically nondecreasing order

531218757, 22408644868, 558643720724, 10064164793382, 142701733009836, 1673362343532954, 16772871828446212, 147158108517530586, 1150403958641999830, 8124467805846398491, 52406651424326402992 (list; graph; refs; listen; history; text; internal format)

	OFFSET	`1,1`
	COMMENTS	`Column 5 of A186096`
	LINKS	`R. H. Hardin, Table of n, a(n) for n = 1..200`
	FORMULA	`Empirical: a(n) = (2857/17099057289994590455733180506023932559946950901760000000000)n^50` `+ (8908893143/55298351275842505533841105756481397898868439216291840000000000)n^49` `+ (3708960173/49066860049549694351234344060764328215499946065920000000000)n^48` `+ (71455317095633/3103478898134018167715572261843343759630371588669440000000000)n^47` `+ (8901338963479/1737670155730133352584306977515869966198416343040000000000)n^46` `+ (569213582908261/637985177949227704330470194643507813676713246720000000000)n^45` `+ (245732342773227599/1913955533847683112991410583930523441030139740160000000000)n^44` `+ (156662680622616323/9769826497520988180072829913111568366950154240000000000)n^43` `+ (2000663277307287301/1103568441580443847582977465268416360386396160000000000)n^42` `+ (11804106967729455061/62093364999411162779604870168555396236574720000000000)n^41` `+ (27193467773722184461/1469376367171201636919778746953044842250240000000000)n^40` `+ (40672343099488116508871/24673278165416427486611284792586544642785280000000000)n^39` `+ (1523651931957626288347/11534959404121751980650437023182115307520000000000)n^38` `+ (5646510121079431057955021897/599950237495915236779705977588157032892989440000000000)n^37` `+ (59729286276590414734014893/100713486233996178744285039044511840337920000000000)n^36` `+ (38241142794004356148960585781/1158205091690956055559277949011886163886080000000000)n^35` `+ (7535505215922304349394236372077/4632820366763824222237111796047544655544320000000000)n^34` `+ (643941369531830743262045020169/9057322320163879222359944860308005191680000000000)n^33` `+ (1341445908580777928622117929430323/484978440597865896542727956611037732536320000000000)n^32` `+ (2691114781045866285553369168085824391/28007504944526755525342539494287429053972480000000000)n^31` `+ (8387531135037793687154491396300183/2805800936137723454752809005638892912640000000000)n^30` `+ (21560764406825866619127261521982165767/258133686124670557837258428518778147962880000000000)n^29` `+ (1741673494518706995944987100414662083/828853103569373562788907420903517716480000000000)n^28` `+ (39011531007906217995956773095471768547/817717459113285392192251801958917079040000000000)n^27` `+ (31970258811937070554618775685165501893611/32637592498521564784021180617316777328640000000000)n^26` `+ (33795679871976737565724589080327550037091289/1854583197268931269492027086842823935262720000000000)n^25` `+ (1385648404852772677931417216371398537602510027/4503987764795975940194922925189715271352320000000000)n^24` `+ (2625772982811930994808663356076051071225741/556322599406617581545815578704263249920000000000)n^23` `+ (386411834865780478386517674018520333177464503/5866674684651603587210418829972230635520000000000)n^22` `+ (8996815428642328107347007026181444245000799119/10755570255194606576552434521615756165120000000000)n^21` `+ (119375691195188807023942009397811972619393784971/12348988070778992736041684080373645967360000000000)n^20` `+ (203448958836057328080623836447144113921547962821/2002825010335151281846577480998815006720000000000)n^19` `+ (398595300957144373493090805585572814458119940207/411294421765254281093493589847970938880000000000)n^18` `+ (303128137224684662233045843297749641246142003156503/36193909115342376736227435906621442621440000000000)n^17` `+ (7912190892289398114385846454320503526979267453801/121049863262014637913804133466961346560000000000)n^16` `+ (346095728574105469317423052836238175952728388549029/754039773236299515338071581387946721280000000000)n^15` `+ (44368391758850563806010176073889480837714183543929183/15364926393771552442975777441035552030720000000000)n^14` `+ (607123137130688794221177534331829215555764276998781229/37481108324200302171501517697071573893120000000000)n^13` `+ (13074272807517023449705296797965433433729256163503147/162255880191343299443729513840136683520000000000)n^12` `+ (1545417383225424592462068908471462473019627501601097/4374545789472490916375060422160547840000000000)n^11` `+ (1169109013946197045081580793847394486641703266240937/862778272569984767604249324913950720000000000)n^10` `+ (5612221849435119635973902960028754447121501585466439/1245530398391473108134565814642933760000000000)n^9` `+ (49677710792893294327970295779876458150831454490139/3869619283540171031690116921688064000000000)n^8` `+ (4207159705656663707843409986685769445226609952471359643/136319496316618313295275595017124357734400000000)n^7` `+ (130863117021586417609123530783748878217551082803353677/2132890078423279731830842643125074984960000000)n^6` `+ (249416077519984986748189783879429270952494006801499/2539154855265809204560526956101279744000000)n^5` `+ (6445872172191324903037680358774267317211070033/52795154128175502386413603960627200000)n^4` `+ (6128879188310547850073420061888775714861651/55110149016633414374869667589120000)n^3` `+ (52748674883300003732112011814165593831/790142551668533247132940992000)n^2` `+ (2179110973646842561918017241/103301483474866556880)n` `+ 464483`
	EXAMPLE	`Some solutions for 4X7` `..0..0..0..0..0..0..0....0..0..0..0..0..2..2....0..0..0..0..0..0..3` `..0..0..0..0..0..0..4....0..0..0..0..0..2..2....0..0..0..0..0..1..4` `..0..0..0..0..1..2..0....0..0..0..0..0..3..3....0..0..0..0..1..3..2` `..0..0..0..0..2..3..1....0..0..0..0..1..1..4....0..0..0..0..1..4..3`
	CROSSREFS	`Sequence in context: A207041 A339551 A319937 * A034617 A135977 A011579` `Adjacent sequences: A186089 A186090 A186091 * A186093 A186094 A186095`
	KEYWORD	`nonn`
	AUTHOR	`R. H. Hardin Feb 12 2011`
	STATUS	`approved`

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Last modified May 23 15:34 EDT 2024. Contains 372763 sequences. (Running on oeis4.)