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%I#4 2014年11月22日22:25:37
%S 2250078775002756250045018750073530625007411887000074711809600,
%电话:537925110912038706079856642173656570624001219909299840000,
%电话:56483045388000002615222637225000010388247563437500
%N(N+1)X(6+1)0..2个数组的数目,每行和每列中每两个连续值的和不递减
%A250443第6列
%H R.H.Hardin,n表,n=1..210的a(n)</a>
%F经验:a(n)=2*a(n-1)+26*a(n-2)-54*a(n3)-324*a(-n4)+702*a n-16)+4440150*a(n-17)+2466750*a(-18)-9373650*a(-19)-3749460*a(-20)+16872570*a-26075790*a(n-23)-4345965*a 2466750*a(n-38)-4440150*a+215280*a(n-44)+161460*a(n-45)-63180*a
%F关于n mod 2=0的经验公式:a(n)=(1/46168933054965350400)*n^28+(23/5771116631870668800)*n*27+(451/12824703626379264400)*n ^26+(19057/961852771978444800)*n*25+(770023/96185277944800)*n^24+(1485127/60115798248652800)*n^23+(48523211/80154397664870400)*n=22+(26923657/2226511046 246400)*n^21+(12056968741/60115798248652800)*n^20+(4207062883/1502894956216320)*n^19+506669475617/58706834227200)*n^12+(24549610146481/14676708556800)*n^11+(665395240637933/11007531417600+(34907687/11520)*n^3+(185039/96)*n*2+(3115/4)*n+150
%F关于n mod 2=1的经验公式:a(n)=(1/46168933054965350400)*n^28+(23/5771116631870668800)*n*27+(325/923378661099307008)*n=26+(114641/5771116631870668800 445347/2885558315935334400)*n^21+(9501813256121/46168933054965350400)*n^20+(16707362824109/5771116631870668800)*n*19+/5771116631870668800)*编号14+(1310460363060759641/1442779157967667200)编号13+(208068829025881411739/46168933054965350400)编号12+(111506687915337527297/5771116631870668800)编号11+(1646408524090171699187/23084466527482675200)编号10+(43373650410367917/1923705543956889600)编号9+(345397513574221281/5699868278400)*n^8+(29299006250741638439/21374506043965440)*n^7+(14674937650257198937/5699868278390784)*n*6+(207995809091667065/527658133248 25/35184372088832)*无(71508843479390625/281474976710656)
%e n=1的一些解
%e。。0..0..0..0..1..1..2....2..0..2..0..2..2..2....0..0..0..1..0..1..2
%e。。0...0...0..1..1...2...1...0..1..2...2...2...2...2...2...2...2...2...2...2...2...2
%K nonn公司
%O 1,1号机组
%A R.H.Hardin,2014年11月22日
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