HTML Table Header

Parameters	∃	v	m1	Krein Array	multiplicities	valencies	2nd Q	P	DRG	Quotient	Hyp	Comments
<42,6>	-	42	6	{6,5,27/7,12/5; 1,15/7,18/5,6}	1,6,14,15,6	1,10,20,10,1	-	01234	{10,6,3,1;1,3,6,10}	<21,10,3,6>		BCN Thm 4.4.11
<70,7>	!	70	7	{7,6,49/10,7/2; 1,21/10,7/2,7}	1,7,20,28,14	1,16,36,16,1	-	01234	{16,9,4,1;1,4,9,16}	<35,16,6,8>	FS	J(8,4)
<72,6>	+	72	6	{6,5,9/2,3; 1,3/2,3,6}	1,6,20,30,15	1,20,30,20,1	-	-		<36,15,6,6>		E6, Doubly Subtended Subquadrangles of GQ(3,9), Latin Square Type
<126,7>	+	126	7	{7,6,49/9,35/8; 1,14/9,21/8,7}	1,7,27,56,35	1,32,60,32,1	-	-		<63,30,13,15>		E7
<128,8>	!	128	8	{8,7,6,5; 1,2,3,8}	1,8,28,56,35	1,28,70,28,1	-	01234	{28,15,6,1;1,6,15,28}	<64,28,12,12>	FS	Halved 8-cube, Latin Square Type
<132,11>	+	132	11	{11,10,242/27,11/5; 1,55/27,44/5,11}	1,11,54,55,11	1,45,40,45,1	-	-		<66,20,10,4>	FS	Witt 5-(12,6,1)
<200,12>	-	200	12	{12,11,256/25,36/11; 1,44/25,96/11,12}	1,12,75,88,24	1,66,66,66,1	-	-		<100,33,14,9>		Gavrilyuk, Vidali [GV]
<240,8>	+	240	8	{8,7,32/5,6; 1,8/5,2,8}	1,8,35,112,84	1,56,126,56,1	-	-		<120,56,28,24>		E8
<240,15>	+	240	15	{15,14,25/2,5; 1,5/2,10,15}	1,15,84,105,35	1,63,112,63,1	-	-		<120,56,28,24>	FS	NO+(8,2)
<240,18>	+	240	18	{18,17,72/5,6; 1,18/5,12,18}	1,18,85,102,34	1,51,136,51,1	-	-		<120,51,18,24>	FS	Doubly Subtended Subquadrangles of GQ(4,16)
<252,21>	-	252	21	{21,20,49/3,7; 1,14/3,14,21}	1,21,90,105,35	1,45,160,45,1	-	01234	{45,32,9,1;1,9,32,45}	<126,45,12,18>		Jurisic and Koolen
<260,13>	?	260	13	{13,12,169/15,13/3; 1,26/15,26/3,13}	1,13,90,117,39	1,81,96,81,1	-	-		<130,48,20,16>
<308,28>	?	308	28	{28,27,245/11,14/3; 1,63/11,70/3,28}	1,28,132,126,21	1,72,162,72,1	-	-		<154,72,26,40>
<324,36>	-	324	36	{36,35,27,6; 1,9,30,36}	1,36,140,126,21	1,56,210,56,1	-	01234	{56,45,12,1;1,12,45,56}	<162,56,10,24>		BCN, Thm. 11.4.6
<378,21>	?	378	21	{21,20,147/8,7/2; 1,21/8,35/2,21}	1,21,160,168,28	1,128,120,128,1	-	-		<189,60,27,15>
<380,15>	?	380	15	{15,14,250/19,45/7; 1,35/19,60/7,15}	1,15,114,175,75	1,105,168,105,1	-	-		<190,84,38,36>
<392,21>	?	392	21	{21,20,35/2,9; 1,7/2,12,21}	1,21,120,175,75	1,75,240,75,1	-	-		<196,75,26,30>
<462,21>	-	462	21	{21,20,196/11,49/5; 1,35/11,56/5,21}	1,21,132,210,98	1,90,280,90,1	-	-		<231,90,33,36>		Gavrilyuk, Vidali [GV]
<486,45>	-	486	45	{45,44,36,5; 1,9,40,45}	1,45,220,198,22	1,110,264,110,1	-	-		<243,110,37,60>		Gavrilyuk, Vidali [GV]
<512,16>	+	512	16	{16,15,128/9,8; 1,16/9,8,16}	1,16,135,240,120	1,135,240,135,1	-	-		<256,120,56,56>		Lattice OBW16, Latin Square Type
<558,31>	?	558	31	{31,30,961/36,31/4; 1,155/36,93/4,31}	1,31,216,248,62	1,128,300,128,1	-	-		<279,128,52,64>	FS
<560,28>	?	560	28	{28,27,49/2,7; 1,7/2,21,28}	1,28,216,252,63	1,144,270,144,1	-	-		<280,135,70,60>	FS
<572,26>	?	572	26	{26,25,507/22,13/2; 1,65/22,39/2,26}	1,26,220,260,65	1,160,250,160,1	-	-		<286,125,60,50>	FS
<576,36>	?	576	36	{36,35,243/8,9; 1,45/8,27,36}	1,36,224,252,63	1,112,350,112,1	-	-		<288,112,36,48>	FS
<578,17>	?	578	17	{17,16,136/9,9; 1,17/9,8,17}	1,17,144,272,144	1,144,288,144,1	-	-		<289,144,71,72>		Latin Square Type
<594,9>	-	594	9	{9,8,81/11,63/8; 1,18/11,9/8,9}	1,9,44,288,252	1,128,336,128,1	-	-		<297,128,64,48>		Kodalen, Martin [KM]
<600,24>	?	600	24	{24,23,108/5,6; 1,12/5,18,24}	1,24,230,276,69	1,184,230,184,1	-	-		<300,115,50,40>
<600,40>	+	600	40	{40,39,100/3,10; 1,20/3,30,40}	1,40,234,260,65	1,104,390,104,1	-	-		<300,104,28,40>		Doubly Subtended Subquadrangles of GQ(5,25)
<644,46>	?	644	46	{46,45,529/14,23/2; 1,115/14,69/2,46}	1,46,252,276,69	1,96,450,96,1	-	01234	{96,75,16,1;1,16,75,96}	<322,96,20,32>	FS
<648,18>	?	648	18	{18,17,16,10; 1,2,8,18}	1,18,153,306,170	1,153,340,153,1	-	-		<324,153,72,72>	FS	Latin Square Type
<660,22>	?	660	22	{22,21,121/6,11/2; 1,11/6,33/2,22}	1,22,252,308,77	1,224,210,224,1	-	-		<330,105,40,30>
<672,21>	?	672	21	{21,20,147/8,35/3; 1,21/8,28/3,21}	1,21,160,315,175	1,135,400,135,1	-	-		<336,135,54,54>
<686,28>	?	686	28	{28,27,25,8; 1,3,20,28}	1,28,252,315,90	1,180,324,180,1	-	-		<343,162,81,72>
<688,43>	?	688	43	{43,42,1849/50,43/7; 1,301/50,258/7,43}	1,43,300,301,43	1,175,336,175,1	-	-		<344,168,92,72>	FS
<702,36>	-	702	36	{36,35,405/13,72/7; 1,63/13,180/7,36}	1,36,260,315,90	1,140,420,140,1	-	-		<351,140,49,60>		Gavrilyuk, Vidali [GV]
<722,19>	-	722	19	{19,18,152/9,11; 1,19/9,8,19}	1,19,162,342,198	1,162,396,162,1	-	-		<361,162,73,72>		Latin Square Type, Gavrilyuk, Vidali [GV]
<756,27>	?	756	27	{27,26,162/7,15; 1,27/7,12,27}	1,27,182,351,195	1,117,520,117,1	-	01234	{117,80,18,1;1,18,80,117}	<378,117,36,36>	FS
<756,27>a	?	756	27	{27,26,4374/175,27/13; 1,351/175,324/13,27}	1,27,350,351,27	1,325,104,325,1	-	-		<378,52,26,4>	FS
<784,35>	?	784	35	{35,34,63/2,5; 1,7/2,30,35}	1,35,340,357,51	1,255,272,255,1	-	-		<392,136,60,40>	FS
<784,70>	?	784	70	{70,69,56,10; 1,14,60,70}	1,70,345,322,46	1,115,552,115,1	-	01234	{115,96,20,1;1,20,96,115}	<392,115,18,40>	FS
<800,20>	?	800	20	{20,19,160/9,12; 1,20/9,8,20}	1,20,171,380,228	1,171,456,171,1	-	-		<400,171,74,72>	FS	Latin Square Type
<812,21>	?	812	21	{21,20,539/29,63/5; 1,70/29,42/5,21}	1,21,174,385,231	1,165,480,165,1	-	-		<406,165,68,66>
<816,34>	?	816	34	{34,33,1445/48,119/11; 1,187/48,255/11,34}	1,34,288,374,119	1,176,462,176,1	-	-		<408,176,70,80>
<882,21>	-	882	21	{21,20,56/3,13; 1,7/3,8,21}	1,21,180,420,260	1,180,520,180,1	-	-		<441,180,75,72>		Latin Square Type, Gavrilyuk, Vidali [GV]
<968,22>	?	968	22	{22,21,176/9,14; 1,22/9,8,22}	1,22,189,462,294	1,189,588,189,1	-	-		<484,189,76,72>	FS	Latin Square Type
<990,66>	-	990	66	{66,65,847/15,88/13; 1,143/15,770/13,66}	1,66,450,429,44	1,234,520,234,1	-	-		<495,234,93,126>		Gavrilyuk, Vidali [GV]
<1014,78>	-	1014	78	{78,77,65,8; 1,13,70,78}	1,78,462,429,44	1,198,616,198,1	-	-		<507,198,57,90>		Gavrilyuk, Vidali [GV]
<1054,31>	?	1054	31	{31,30,961/34,93/8; 1,93/34,155/8,31}	1,31,340,496,186	1,256,540,256,1	-	-		<527,256,120,128>	FS
<1056,32>	?	1056	32	{32,31,320/11,12; 1,32/11,20,32}	1,32,341,496,186	1,248,558,248,1	-	-		<528,248,112,120>
<1058,23>	-	1058	23	{23,22,184/9,15; 1,23/9,8,23}	1,23,198,506,330	1,198,660,198,1	-	-		<529,198,77,72>		Latin Square Type, Gavrilyuk, Vidali [GV]
<1064,19>	?	1064	19	{19,18,361/21,38/3; 1,38/21,19/3,19}	1,19,189,513,342	1,243,576,243,1	-	-		<532,243,114,108>
<1064,28>	?	1064	28	{28,27,490/19,21/2; 1,42/19,35/2,28}	1,28,342,504,189	1,288,486,288,1	-	-		<532,243,114,108>	FS
<1080,36>	?	1080	36	{36,35,162/5,27/2; 1,18/5,45/2,36}	1,36,350,504,189	1,224,630,224,1	-	-		<540,224,88,96>	FS
<1080,45>	?	1080	45	{45,44,81/2,9; 1,9/2,36,45}	1,45,440,495,99	1,275,528,275,1	-	-		<540,264,138,120>
<1080,50>	?	1080	50	{50,49,400/9,10; 1,50/9,40,50}	1,50,441,490,98	1,245,588,245,1	-	-		<540,245,100,120>	FS
<1092,21>	?	1092	21	{21,20,245/13,14; 1,28/13,7,21}	1,21,195,525,350	1,225,640,225,1	-	-		<546,225,96,90>
<1092,26>	?	1092	26	{26,25,169/7,39/4; 1,13/7,65/4,26}	1,26,350,520,195	1,320,450,320,1	-	-		<546,225,96,90>
<1100,55>	?	1100	55	{55,54,242/5,11; 1,33/5,44,55}	1,55,450,495,99	1,225,648,225,1	-	-		<550,225,80,100>	FS
<1120,40>	?	1120	40	{40,39,250/7,15; 1,30/7,25,40}	1,40,364,520,195	1,208,702,208,1	-	-		<560,208,72,80>	FS
<1120,40>a	?	1120	40	{40,39,256/7,8; 1,24/7,32,40}	1,40,455,520,104	1,325,468,325,1	-	-		<560,234,108,90>	FS
<1152,24>	?	1152	24	{24,23,64/3,16; 1,8/3,8,24}	1,24,207,552,368	1,207,736,207,1	-	-		<576,207,78,72>	FS	Latin Square Type
<1184,37>	?	1184	37	{37,36,1369/40,37/5; 1,111/40,148/5,37}	1,37,480,555,111	1,375,432,375,1	-	-		<592,216,90,72>
<1196,46>	?	1196	46	{46,45,529/13,69/4; 1,69/13,115/4,46}	1,46,390,552,207	1,192,810,192,1	-	-		<598,192,56,64>	FS
<1224,27>	?	1224	27	{27,26,405/17,18; 1,54/17,9,27}	1,27,221,585,390	1,195,832,195,1	-	-		<612,195,66,60>	FS
<1250,25>	-	1250	25	{25,24,200/9,17; 1,25/9,8,25}	1,25,216,600,408	1,216,816,216,1	-	-		<625,216,79,72>		Latin Square Type, Gavrilyuk, Vidali [GV]
<1260,35>	?	1260	35	{35,34,98/3,7; 1,7/3,28,35}	1,35,510,595,119	1,425,408,425,1	-	-		<630,204,78,60>	FS
<1260,75>	?	1260	75	{75,74,450/7,15; 1,75/7,60,75}	1,75,518,555,111	1,185,888,185,1	-	-		<630,185,40,60>	FS	Doubly Subtended Subquadrangles of GQ(6,36)?
<1276,29>	-	1276	29	{29,28,841/33,58/3; 1,116/33,29/3,29}	1,29,231,609,406	1,189,896,189,1	-	01234	{189,128,27,1;1,27,128,189}	<638,189,60,54>		Jurisic and Koolen
<1278,71>	?	1278	71	{71,70,5041/81,71/8; 1,710/81,497/8,71}	1,71,567,568,71	1,288,700,288,1	-	-		<639,288,112,144>
<1280,64>	?	1280	64	{64,63,512/9,8; 1,64/9,56,64}	1,64,567,576,72	1,324,630,324,1	-	-		<640,315,170,140>
<1330,57>	?	1330	57	{57,56,361/7,57/8; 1,38/7,399/8,57}	1,57,588,608,76	1,384,560,384,1	-	-		<665,280,135,105>
<1344,56>		1344	56	{56,55,49,21; 1,7,35,56}	1,56,440,616,231	1,176,990,176,1	-	01234	{176,135,24,1;1,24,135,176}	<672,176,40,48>	FS	Meixner 2-cover, Qbip-double of Moscow-Soicher
<1344,56>a	?	1344	56	{56,55,1372/27,7; 1,140/27,49,56}	1,56,594,616,77	1,396,550,396,1	-	-		<672,275,130,100>	FS
<1352,26>	?	1352	26	{26,25,208/9,18; 1,26/9,8,26}	1,26,225,650,450	1,225,900,225,1	-	-		<676,225,80,72>	FS	Latin Square Type
<1352,91>	?	1352	91	{91,90,78,7; 1,13,84,91}	1,91,630,585,45	1,315,720,315,1	-	-		<676,315,122,168>	FS
<1360,85>	-	1360	85	{85,84,289/4,17; 1,51/4,68,85}	1,85,560,595,119	1,175,1008,175,1	-	01234	{175,144,25,1;1,25,144,175}	<680,175,30,50>		Jurisic and Koolen
<1372,21>	?	1372	21	{21,20,19,15; 1,2,6,21}	1,21,210,665,475	1,285,800,285,1	-	-		<686,285,124,114>
<1380,105>	?	1380	105	{105,104,2025/23,105/13; 1,390/23,1260/13,105}	1,105,644,585,45	1,273,832,273,1	-	-		<690,273,80,126>
<1408,96>	?	1408	96	{96,95,896/11,12; 1,160/11,84,96}	1,96,627,608,76	1,228,950,228,1	-	-		<704,228,52,84>
<1458,27>	-	1458	27	{27,26,24,19; 1,3,8,27}	1,27,234,702,494	1,234,988,234,1	-	-		<729,234,81,72>		Latin Square Type, Gavrilyuk, Vidali [GV]
<1458,36>	-	1458	36	{36,35,33,16; 1,3,20,36}	1,36,420,693,308	1,308,840,308,1	-	-		<729,308,127,132>		Gavrilyuk, Vidali [GV]
<1462,51>	?	1462	51	{51,50,2023/43,51/8; 1,170/43,357/8,51}	1,51,645,680,85	1,480,500,480,1	-	-		<731,250,105,75>
<1482,38>	-	1482	38	{38,37,12635/351,76/37; 1,703/351,1330/37,38}	1,38,702,703,38	1,666,148,666,1	-	-		<741,74,37,4>		Gavrilyuk, Vidali [GV]
<1512,21>	?	1512	21	{21,20,343/18,77/5; 1,35/18,28/5,21}	1,21,216,735,539	1,315,880,315,1	-	-		<756,315,138,126>
<1536,40>	?	1536	40	{40,39,112/3,10; 1,8/3,30,40}	1,40,585,728,182	1,455,624,455,1	-	-		<768,312,136,120>	FS
<1536,60>	?	1536	60	{60,59,54,15; 1,6,45,60}	1,60,590,708,177	1,295,944,295,1	-	-		<768,295,102,120>	FS
<1568,28>	?	1568	28	{28,27,224/9,20; 1,28/9,8,28}	1,28,243,756,540	1,243,1080,243,1	-	-		<784,243,82,72>	FS	Latin Square Type
<1584,36>	?	1584	36	{36,35,729/22,117/7; 1,63/22,135/7,36}	1,36,440,756,351	1,336,910,336,1	-	-		<792,336,140,144>	FS
<1600,48>	?	1600	48	{48,47,224/5,6; 1,16/5,42,48}	1,48,705,752,94	1,564,470,564,1	-	-		<800,235,90,60>
<1600,120>	?	1600	120	{120,119,100,15; 1,20,105,120}	1,120,714,680,85	1,204,1190,204,1	-	01234	{204,175,30,1;1,30,175,204}	<800,204,28,60>	FS
<1674,45>	-	1674	45	{45,44,1296/31,135/11; 1,99/31,360/11,45}	1,45,620,792,216	1,440,792,440,1	-	-		<837,396,195,180>		Gavrilyuk, Vidali [GV]
<1682,29>	-	1682	29	{29,28,232/9,21; 1,29/9,8,29}	1,29,252,812,588	1,252,1176,252,1	-	-		<841,252,83,72>		Latin Square Type, Gavrilyuk, Vidali [GV]
<1694,55>	-	1694	55	{55,54,352/7,15; 1,33/7,40,55}	1,55,630,792,216	1,360,972,360,1	-	-		<847,360,143,160>		Gavrilyuk, Vidali [GV]
<1798,31>	?	1798	31	{31,30,6727/232,31/2; 1,465/232,31/2,31}	1,31,464,868,434	1,448,900,448,1	-	-		<899,448,222,224>
<1800,30>	?	1800	30	{30,29,80/3,22; 1,10/3,8,30}	1,30,261,870,638	1,261,1276,261,1	-	01234	{261,176,36,1;1,36,176,261}	<900,261,84,72>	FS	Latin Square Type
<1800,30>a	?	1800	30	{30,29,225/8,15; 1,15/8,15,30}	1,30,464,870,435	1,464,870,464,1	-	-		<900,435,210,210>		Latin Square Type
<1836,36>	?	1836	36	{36,35,567/17,18; 1,45/17,18,36}	1,36,476,882,441	1,392,1050,392,1	-	-		<918,392,166,168>
<1846,71>	?	1846	71	{71,70,5041/78,71/6; 1,497/78,355/6,71}	1,71,780,852,142	1,432,980,432,1	-	-		<923,432,186,216>	FS
<1848,66>	?	1848	66	{66,65,121/2,11; 1,11/2,55,66}	1,66,780,858,143	1,468,910,468,1	-	-		<924,455,238,210>
<1850,37>	?	1850	37	{37,36,1369/40,37/2; 1,111/40,37/2,37}	1,37,480,888,444	1,384,1080,384,1	-	-		<925,384,158,160>
<1862,21>	-	1862	21	{21,20,364/19,81/5; 1,35/19,24/5,21}	1,21,228,910,702	1,390,1080,390,1	-	-		<931,390,173,156>		Gavrilyuk, Vidali [GV]
<1872,52>	?	1872	52	{52,51,10816/225,260/17; 1,884/225,624/17,52}	1,52,675,884,260	1,425,1020,425,1	-	-		<936,425,184,200>	FS
<1872,78>	?	1872	78	{78,77,845/12,13; 1,91/12,65,78}	1,78,792,858,143	1,396,1078,396,1	-	-		<936,396,150,180>
<1890,81>	?	1890	81	{81,80,729/10,27/2; 1,81/10,135/2,81}	1,81,800,864,144	1,384,1120,384,1	-	-		<945,384,138,168>	FS
<1932,21>	?	1932	21	{21,20,441/23,49/3; 1,42/23,14/3,21}	1,21,230,945,735	1,405,1120,405,1	-	-		<966,405,180,162>
<1938,57>	?	1938	57	{57,56,1805/34,19/2; 1,133/34,95/2,57}	1,57,816,912,152	1,576,784,576,1	-	-		<969,392,175,147>	FS
<1960,56>	?	1960	56	{56,55,252/5,26; 1,28/5,30,56}	1,56,550,924,429	1,264,1430,264,1	-	-		<980,264,68,72>
<1980,44>	?	1980	44	{44,43,121/3,22; 1,11/3,22,44}	1,44,516,946,473	1,344,1290,344,1	-	-		<990,344,118,120>
<2016,54>	?	2016	54	{54,53,405/8,9; 1,27/8,45,54}	1,54,848,954,159	1,636,742,636,1	-	-		<1008,371,154,126>
<2024,46>	?	2024	46	{46,45,3703/88,23; 1,345/88,23,46}	1,46,528,966,483	1,336,1350,336,1	-	-		<1012,336,110,112>
<2046,31>	?	2046	31	{31,30,961/33,527/32; 1,62/33,465/32,31}	1,31,495,992,527	1,512,1020,512,1	-	-		<1023,510,253,255>
<2046,99>	?	2046	99	{99,98,5445/62,33/2; 1,693/62,165/2,99}	1,99,868,924,154	1,336,1372,336,1	-	-		<1023,336,90,120>	FS
<2048,32>	+	2048	32	{32,31,30,17; 1,2,15,32}	1,32,496,992,527	1,496,1054,496,1	-	-		<1024,496,240,240>	FS	Dual Extended Kasami, Latin Square Type
<2058,49>	-	2058	49	{49,48,686/15,77/5; 1,49/15,168/5,49}	1,49,720,980,308	1,500,1056,500,1	-	-		<1029,500,235,250>		Gavrilyuk, Vidali [GV]
<2060,50>	-	2060	50	{50,49,4800/103,110/7; 1,350/103,240/7,50}	1,50,721,980,308	1,490,1078,490,1	-	-		<1030,490,225,240>		Gavrilyuk, Vidali [GV]
<2120,106>	?	2120	106	{106,105,2809/30,53/3; 1,371/30,265/3,106}	1,106,900,954,159	1,324,1470,324,1	-	-		<1060,324,78,108>
<2142,51>	?	2142	51	{51,50,2601/56,51/2; 1,255/56,51/2,51}	1,51,560,1020,510	1,320,1500,320,1	-	-		<1071,320,94,96>
<2142,51>a	?	2142	51	{51,50,289/6,17/2; 1,17/6,85/2,51}	1,51,900,1020,170	1,720,700,720,1	-	-		<1071,350,133,105>	FS
<2150,43>	?	2150	43	{43,42,1849/45,43/8; 1,86/45,301/8,43}	1,43,945,1032,129	1,864,420,864,1	-	-		<1075,210,65,35>
<2160,27>	?	2160	27	{27,26,243/10,21; 1,27/10,6,27}	1,27,260,1053,819	1,351,1456,351,1	-	-		<1080,351,126,108>	FS
<2180,109>	?	2180	109	{109,108,23762/245,109/9; 1,2943/245,872/9,109}	1,109,980,981,109	1,441,1296,441,1	-	-		<1090,441,152,196>	FS
<2200,50>	?	2200	50	{50,49,3125/66,25/3; 1,175/66,125/3,50}	1,50,924,1050,175	1,756,686,756,1	-	-		<1100,343,126,98>
<2256,141>	-	2256	141	{141,140,2209/18,47/7; 1,329/18,940/7,141}	1,141,1080,987,47	1,567,1120,567,1	-	-		<1128,560,316,240>	FS	No 2-graph
<2268,45>	?	2268	45	{45,44,297/7,15; 1,18/7,30,45}	1,45,770,1089,363	1,605,1056,605,1	-	-		<1134,528,252,240>
<2280,120>	?	2280	120	{120,119,2025/19,150/17; 1,255/19,1890/17,120}	1,120,1064,1020,75	1,544,1190,544,1	-	-		<1140,544,228,288>	FS
<2288,55>	?	2288	55	{55,54,1331/26,55/3; 1,99/26,110/3,55}	1,55,780,1089,363	1,495,1296,495,1	-	-		<1144,495,206,220>	FS
<2312,34>	?	2312	34	{34,33,255/8,19; 1,17/8,15,34}	1,34,528,1122,627	1,528,1254,528,1	-	-		<1156,528,242,240>		Latin Square Type
<2312,85>	?	2312	85	{85,84,153/2,25; 1,17/2,60,85}	1,85,840,1071,315	1,315,1680,315,1	-	-		<1156,315,74,90>
<2312,136>	?	2312	136	{136,135,119,10; 1,17,126,136}	1,136,1080,1020,75	1,480,1350,480,1	-	-		<1156,480,164,224>	FS
<2320,58>	?	2320	58	{58,57,841/16,29; 1,87/16,29,58}	1,58,608,1102,551	1,304,1710,304,1	-	-		<1160,304,78,80>
<2352,126>	+	2352	126	{126,125,441/4,21; 1,63/4,105,126}	1,126,1000,1050,175	1,300,1750,300,1	-	-		<1176,300,54,84>		Doubly Subtended Subquadrangles of GQ(7,49)
<2352,126>a	?	2352	126	{126,125,112,6; 1,14,120,126}	1,126,1125,1050,50	1,675,1000,675,1	-	-		<1176,500,256,180>	FS
<2394,27>	-	2394	27	{27,26,3240/133,279/13; 1,351/133,72/13,27}	1,27,266,1170,930	1,390,1612,390,1	-	-		<1197,390,141,120>		Gavrilyuk, Vidali [GV]
<2420,66>	?	2420	66	{66,65,308/5,27/2; 1,22/5,105/2,66}	1,66,975,1144,234	1,624,1170,624,1	-	-		<1210,585,296,270>
<2444,78>	?	2444	78	{78,77,3380/47,351/22; 1,286/47,1365/22,78}	1,78,987,1144,234	1,528,1386,528,1	-	-		<1222,528,212,240>
<2466,36>	-	2466	36	{36,35,4617/137,144/7; 1,315/137,108/7,36}	1,36,548,1197,684	1,532,1400,532,1	-	-		<1233,532,231,228>		Gavrilyuk, Vidali [GV]
<2484,69>	?	2484	69	{69,68,1587/25,23; 1,138/25,46,69}	1,69,850,1173,391	1,425,1632,425,1	-	-		<1242,425,136,150>
<2538,141>	?	2538	141	{141,140,2209/18,47/2; 1,329/18,235/2,141}	1,141,1080,1128,188	1,288,1960,288,1	-	01234	{288,245,36,1;1,36,245,288}	<1269,288,42,72>	FS
<2550,85>	-	2550	85	{85,84,1156/15,187/7; 1,119/15,408/7,85}	1,85,900,1190,374	1,350,1848,350,1	-	-		<1275,350,85,100>		Gavrilyuk, Vidali [GV]
<2576,23>	+	2576	23	{23,22,2645/126,207/11; 1,253/126,46/11,23}	1,23,252,1265,1035	1,495,1584,495,1	-	-		<1288,495,206,180>	FS	Weight 12 words in Extended Binary Golay Code
<2576,46>	?	2576	46	{46,45,529/12,23/3; 1,23/12,115/3,46}	1,46,1080,1242,207	1,972,630,972,1	-	-		<1288,315,98,70>
<2576,56>	?	2576	56	{56,55,10976/207,126/11; 1,616/207,490/11,56}	1,56,1035,1232,252	1,792,990,792,1	-	-		<1288,495,206,180>
<2592,36>	?	2592	36	{36,35,135/4,21; 1,9/4,15,36}	1,36,560,1260,735	1,560,1470,560,1	-	-		<1296,560,244,240>	FS	Latin Square Type
<2652,51>	?	2652	51	{51,50,31212/637,51/25; 1,1275/637,1224/25,51}	1,51,1274,1275,51	1,1225,200,1225,1	-	-		<1326,100,50,4>	FS
<2662,121>	-	2662	121	{121,120,5324/49,77/5; 1,605/49,528/5,121}	1,121,1176,1210,154	1,490,1680,490,1	-	-		<1331,490,153,196>		Gavrilyuk, Vidali [GV]
<2706,66>	-	2706	66	{66,65,2541/41,44/3; 1,165/41,154/3,66}	1,66,1066,1287,286	1,702,1300,702,1	-	-		<1353,650,325,300>		Gavrilyuk, Vidali [GV]
<2730,78>	-	2730	78	{78,77,507/7,52/3; 1,39/7,182/3,78}	1,78,1078,1287,286	1,594,1540,594,1	-	-		<1365,594,243,270>		Gavrilyuk, Vidali [GV]
<2750,25>	-	2750	25	{25,24,250/11,185/9; 1,25/11,40/9,25}	1,25,264,1350,1110	1,486,1776,486,1	-	-		<1375,486,189,162>		Gavrilyuk, Vidali [GV]
<2756,52>	?	2756	52	{52,51,2535/53,494/17; 1,221/53,390/17,52}	1,52,636,1326,741	1,408,1938,408,1	-	-		<1378,408,122,120>
<2816,22>	+	2816	22	{22,21,121/6,55/3; 1,11/6,11/3,22}	1,22,252,1386,1155	1,567,1680,567,1	-	-		<1408,567,246,216>		2nd Derived Design of Leech Lattice
<2816,64>	?	2816	64	{64,63,640/11,34; 1,64/11,30,64}	1,64,693,1344,714	1,336,2142,336,1	-	01234	{336,255,40,1;1,40,255,336}	<1408,336,80,80>	FS
<2852,46>	?	2852	46	{46,45,2645/62,161/6; 1,207/62,115/6,46}	1,46,620,1380,805	1,480,1890,480,1	-	-		<1426,480,164,160>	FS
<2862,53>	-	2862	53	{53,52,11236/225,265/13; 1,689/225,424/13,53}	1,53,900,1378,530	1,650,1560,650,1	-	-		<1431,650,289,300>		Gavrilyuk, Vidali [GV]
<2888,38>	?	2888	38	{38,37,285/8,23; 1,19/8,15,38}	1,38,592,1406,851	1,592,1702,592,1	-	-		<1444,592,246,240>		Latin Square Type
<2890,85>	?	2890	85	{85,84,1275/16,25/4; 1,85/16,315/4,85}	1,85,1344,1360,100	1,1024,840,1024,1	-	-		<1445,420,163,105>	FS
<2890,153>	-	2890	153	{153,152,136,9; 1,17,144,153}	1,153,1368,1292,76	1,684,1520,684,1	-	-		<1445,684,283,360>		Gavrilyuk, Vidali [GV]
<2912,91>	?	2912	91	{91,90,8281/100,91/3; 1,819/100,182/3,91}	1,91,1000,1365,455	1,375,2160,375,1	-	-		<1456,375,86,100>	FS
<2912,91>a	?	2912	91	{91,90,169/2,13; 1,13/2,78,91}	1,91,1260,1365,195	1,735,1440,735,1	-	-		<1456,720,376,336>	FS
<2912,98>	?	2912	98	{98,97,1176/13,14; 1,98/13,84,98}	1,98,1261,1358,194	1,679,1552,679,1	-	-		<1456,679,294,336>	FS
<2916,63>	?	2916	63	{63,62,60,7; 1,3,56,63}	1,63,1302,1395,155	1,1085,744,1085,1	-	-		<1458,372,126,84>	FS
<2916,189>	?	2916	189	{189,188,162,21; 1,27,168,189}	1,189,1316,1269,141	1,329,2256,329,1	-	01234	{329,288,42,1;1,42,288,329}	<1458,329,40,84>	FS
<2926,171>	-	2926	171	{171,170,11552/77,171/17; 1,1615/77,2736/17,171}	1,171,1386,1292,76	1,612,1700,612,1	-	-		<1463,612,211,288>		Gavrilyuk, Vidali [GV]
<2940,105>	?	2940	105	{105,104,675/7,15; 1,60/7,90,105}	1,105,1274,1365,195	1,637,1664,637,1	-	-		<1470,637,252,294>
<2940,105>a	?	2940	105	{105,104,875/9,5; 1,70/9,100,105}	1,105,1404,1365,65	1,1053,832,1053,1	-	-		<1470,416,172,96>
<2970,54>	-	2970	54	{54,53,567/11,12; 1,27/11,42,54}	1,54,1166,1431,318	1,954,1060,954,1	-	-		<1485,530,205,180>		Gavrilyuk, Vidali [GV]
<3040,50>	?	3040	50	{50,49,900/19,20; 1,50/19,30,50}	1,50,931,1470,588	1,735,1568,735,1	-	-		<1520,735,350,360>	FS
<3042,65>	-	3042	65	{65,64,182/3,25; 1,13/3,40,65}	1,65,960,1456,560	1,560,1920,560,1	-	-		<1521,560,199,210>		Gavrilyuk, Vidali [GV]
<3060,34>	?	3060	34	{34,33,289/9,85/4; 1,17/9,51/4,34}	1,34,594,1496,935	1,704,1650,704,1	-	-		<1530,704,328,320>
<3060,45>	?	3060	45	{45,44,729/17,18; 1,36/17,27,45}	1,45,935,1485,594	1,825,1408,825,1	-	-		<1530,704,328,320>
<3074,106>	-	3074	106	{106,105,2809/29,212/9; 1,265/29,742/9,106}	1,106,1218,1431,318	1,486,2100,486,1	-	-		<1537,486,135,162>		Gavrilyuk, Vidali [GV]
<3080,55>	?	3080	55	{55,54,363/7,22; 1,22/7,33,55}	1,55,945,1485,594	1,675,1728,675,1	-	-		<1540,675,290,300>	FS
<3080,77>	?	3080	77	{77,76,17787/250,539/19; 1,1463/250,924/19,77}	1,77,1000,1463,539	1,475,2128,475,1	-	-		<1540,475,138,150>
<3080,77>a	?	3080	77	{77,76,363/5,11; 1,22/5,66,77}	1,77,1330,1463,209	1,931,1216,931,1	-	-		<1540,608,264,224>	FS
<3096,36>	?	3096	36	{36,35,1458/43,45/2; 1,90/43,27/2,36}	1,36,602,1512,945	1,672,1750,672,1	-	-		<1548,672,296,288>	FS
<3096,43>	?	3096	43	{43,42,1849/45,86/5; 1,86/45,129/5,43}	1,43,945,1505,602	1,875,1344,875,1	-	-		<1548,672,296,288>
<3172,61>	?	3172	61	{61,60,3721/65,122/5; 1,244/65,183/5,61}	1,61,975,1525,610	1,625,1920,625,1	-	-		<1586,625,240,250>
<3174,184>	-	3174	184	{184,183,161,16; 1,23,168,184}	1,184,1464,1403,122	1,488,2196,488,1	-	-		<1587,488,109,168>		Gavrilyuk, Vidali [GV]
<3192,133>	?	3192	133	{133,132,361/3,19; 1,38/3,114,133}	1,133,1386,1463,209	1,539,2112,539,1	-	-		<1596,539,154,196>	FS
<3200,40>	?	3200	40	{40,39,75/2,25; 1,5/2,15,40}	1,40,624,1560,975	1,624,1950,624,1	-	-		<1600,624,248,240>	FS	Latin Square Type
<3212,73>	?	3212	73	{73,72,5329/77,73/7; 1,292/77,438/7,73}	1,73,1386,1533,219	1,1029,1152,1029,1	-	-		<1606,576,232,192>
<3250,50>	-	3250	50	{50,49,625/13,100/9; 1,25/13,350/9,50}	1,50,1274,1575,350	1,1134,980,1134,1	-	-		<1625,490,165,140>		Gavrilyuk, Vidali [GV]
<3300,120>	?	3300	120	{120,119,1215/11,12; 1,105/11,108,120}	1,120,1496,1530,153	1,816,1666,816,1	-	-		<1650,816,374,432>
<3332,136>	?	3332	136	{136,135,867/7,68/5; 1,85/7,612/5,136}	1,136,1512,1530,153	1,720,1890,720,1	-	-		<1666,720,278,336>
<3348,36>	?	3348	36	{36,35,1053/31,162/7; 1,63/31,90/7,36}	1,36,620,1638,1053	1,728,1890,728,1	-	-		<1674,728,322,312>
<3360,70>	?	3360	70	{70,69,196/3,28; 1,14/3,42,70}	1,70,1035,1610,644	1,575,2208,575,1	-	-		<1680,575,190,200>	FS
<3360,70>a	?	3360	70	{70,69,200/3,10; 1,10/3,60,70}	1,70,1449,1610,230	1,1127,1104,1127,1	-	-		<1680,552,208,168>	FS
<3360,147>	?	3360	147	{147,146,1323/10,21; 1,147/10,126,147}	1,147,1460,1533,219	1,511,2336,511,1	-	-		<1680,511,126,168>	FS
<3392,106>	?	3392	106	{106,105,25281/256,53/5; 1,1855/256,477/5,106}	1,106,1536,1590,159	1,960,1470,960,1	-	-		<1696,735,350,294>
<3402,126>	-	3402	126	{126,125,343/3,28; 1,35/3,98,126}	1,126,1350,1575,350	1,450,2500,450,1	-	-		<1701,450,99,126>		Gavrilyuk, Vidali [GV]
<3404,46>	?	3404	46	{46,45,1587/37,115/4; 1,115/37,69/4,46}	1,46,666,1656,1035	1,576,2250,576,1	-	-		<1702,576,200,192>	FS
<3432,99>	?	3432	99	{99,98,1210/13,33/7; 1,77/13,660/7,99}	1,99,1638,1617,77	1,1323,784,1323,1	-	-		<1716,392,148,72>	FS
<3480,75>	?	3480	75	{75,74,2025/29,30; 1,150/29,45,75}	1,75,1073,1665,666	1,555,2368,555,1	-	-		<1740,555,170,180>	FS
<3498,77>	-	3498	77	{77,76,3872/53,231/19; 1,209/53,1232/19,77}	1,77,1484,1672,264	1,1064,1368,1064,1	-	-		<1749,684,291,252>		Gavrilyuk, Vidali [GV]
<3500,100>	?	3500	100	{100,99,375/4,10; 1,25/4,90,100}	1,100,1584,1650,165	1,1056,1386,1056,1	-	-		<1750,693,308,252>
<3528,42>	?	3528	42	{42,41,315/8,27; 1,21/8,15,42}	1,42,656,1722,1107	1,656,2214,656,1	-	-		<1764,656,250,240>		Latin Square Type
<3564,27>	?	3564	27	{27,26,270/11,23; 1,27/11,4,27}	1,27,286,1755,1495	1,585,2392,585,1	-	-		<1782,585,216,180>	FS
<3564,66>	?	3564	66	{66,65,121/2,77/2; 1,11/2,55/2,66}	1,66,780,1716,1001	1,416,2730,416,1	-	01234	{416,315,48,1;1,48,315,416}	<1782,416,100,96>	FS
<3584,64>	?	3584	64	{64,63,1280/21,52/3; 1,64/21,140/3,64}	1,64,1323,1728,468	1,972,1638,972,1	-	-		<1792,819,386,364>	FS
<3610,133>	-	3610	133	{133,132,608/5,21; 1,57/5,112,133}	1,133,1540,1672,264	1,616,2376,616,1	-	-		<1805,616,183,224>		Gavrilyuk, Vidali [GV]
<3618,81>	?	3618	81	{81,80,5103/67,351/16; 1,324/67,945/16,81}	1,81,1340,1728,468	1,768,2080,768,1	-	-		<1809,768,312,336>
<3640,52>	?	3640	52	{52,51,338/7,65/2; 1,26/7,39/2,52}	1,52,714,1768,1105	1,544,2550,544,1	-	-		<1820,544,168,160>	FS
<3726,36>	-	3726	36	{36,35,783/23,24; 1,45/23,12,36}	1,36,644,1827,1218	1,812,2100,812,1	-	-		<1863,812,361,348>		Gavrilyuk, Vidali [GV]
<3740,85>	?	3740	85	{85,84,867/11,34; 1,68/11,51,85}	1,85,1155,1785,714	1,525,2688,525,1	-	-		<1870,525,140,150>
<3762,57>	?	3762	57	{57,56,1805/33,247/16; 1,76/33,665/16,57}	1,57,1386,1824,494	1,1152,1456,1152,1	-	-		<1881,728,295,273>
<3800,190>	?	3800	190	{190,189,5415/32,19; 1,665/32,171,190}	1,190,1728,1710,171	1,576,2646,576,1	-	-		<1900,576,134,192>
<3808,56>	?	3808	56	{56,55,882/17,35; 1,70/17,21,56}	1,56,748,1848,1155	1,528,2750,528,1	-	-		<1904,528,152,144>	FS
<3822,91>	?	3822	91	{91,90,8281/96,91/10; 1,455/96,819/10,91}	1,91,1728,1820,182	1,1280,1260,1280,1	-	-		<1911,630,245,189>
<3840,96>	?	3840	96	{96,95,448/5,26; 1,32/5,70,96}	1,96,1425,1824,494	1,684,2470,684,1	-	-		<1920,684,228,252>	FS
<3872,44>	?	3872	44	{44,43,165/4,29; 1,11/4,15,44}	1,44,688,1892,1247	1,688,2494,688,1	-	-		<1936,688,252,240>	FS	Latin Square Type
<3872,55>	?	3872	55	{55,54,209/4,25; 1,11/4,30,55}	1,55,1080,1881,855	1,855,2160,855,1	-	-		<1936,855,374,380>	FS
<3952,26>	?	3952	26	{26,25,1352/57,338/15; 1,130/57,52/15,26}	1,26,285,1950,1690	1,675,2600,675,1	-	-		<1976,675,258,216>	FS
<4026,61>	?	4026	61	{61,60,3721/66,305/8; 1,305/66,183/8,61}	1,61,792,1952,1220	1,512,3000,512,1	-	-		<2013,512,136,128>	FS
<4032,63>	?	4032	63	{63,62,243/4,9; 1,9/4,54,63}	1,63,1736,1953,279	1,1519,992,1519,1	-	-		<2016,496,152,112>	FS
<4032,144>	?	4032	144	{144,143,23328/175,90/13; 1,1872/175,1782/13,144}	1,144,1925,1872,90	1,1300,1430,1300,1	-	-		<2016,715,314,220>
<4032,196>	+	4032	196	{196,195,1568/9,28; 1,196/9,168,196}	1,196,1755,1820,260	1,455,3120,455,1	-	-		<2016,455,70,112>	FS	Doubly Subtended Subquadrangles of GQ(8,64)
<4050,162>	-	4050	162	{162,161,729/5,36; 1,81/5,126,162}	1,162,1610,1863,414	1,414,3220,414,1	-	01234	{414,350,45,1;1,45,350,414}	<2025,414,63,90>		Jurisic and Koolen
<4070,55>	-	4070	55	{55,54,1936/37,77/3; 1,99/37,88/3,55}	1,55,1110,1980,924	1,900,2268,900,1	-	-		<2035,900,395,400>		Gavrilyuk, Vidali [GV]
<4096,24>	?	4096	24	{24,23,22,21; 1,2,3,24}	1,24,276,2024,1771	1,759,2576,759,1	-	-		<2048,759,310,264>	FS
<4104,36>	?	4104	36	{36,35,648/19,99/4; 1,36/19,45/4,36}	1,36,665,2016,1386	1,896,2310,896,1	-	-		<2052,896,400,384>
<4120,30>	?	4120	30	{30,29,2800/103,750/29; 1,290/103,120/29,30}	1,30,309,2030,1750	1,609,2900,609,1	-	-		<2060,609,208,168>	FS
<4160,64>	?	4160	64	{64,63,768/13,40; 1,64/13,24,64}	1,64,819,2016,1260	1,504,3150,504,1	-	-		<2080,504,128,120>
<4160,100>	?	4160	100	{100,99,1200/13,40; 1,100/13,60,100}	1,100,1287,1980,792	1,495,3168,495,1	-	-		<2080,495,110,120>	FS
<4216,85>	?	4216	85	{85,84,4913/62,255/7; 1,357/62,340/7,85}	1,85,1240,2023,867	1,595,3024,595,1	-	-		<2108,595,162,170>
<4232,46>	?	4232	46	{46,45,345/8,31; 1,23/8,15,46}	1,46,720,2070,1395	1,720,2790,720,1	-	-		<2116,720,254,240>		Latin Square Type
<4240,40>	?	4240	40	{40,39,2000/53,55/2; 1,120/53,25/2,40}	1,40,689,2080,1430	1,832,2574,832,1	-	-		<2120,832,336,320>	FS
<4250,85>	?	4250	85	{85,84,1445/18,51/2; 1,85/18,119/2,85}	1,85,1512,2040,612	1,864,2520,864,1	-	-		<2125,864,338,360>	FS
<4250,85>a	?	4250	85	{85,84,2601/32,17/2; 1,119/32,153/2,85}	1,85,1920,2040,204	1,1536,1176,1536,1	-	-		<2125,588,203,147>
<4250,119>	-	4250	119	{119,118,13872/125,1309/59; 1,1003/125,5712/59,119}	1,119,1750,2006,374	1,826,2596,826,1	-	-		<2125,826,297,336>		Gavrilyuk, Vidali [GV]
<4318,127>	?	4318	127	{127,126,16129/136,127/8; 1,1143/136,889/8,127}	1,127,1904,2032,254	1,1024,2268,1024,1	-	-		<2159,1024,456,512>	FS
<4320,120>	?	4320	120	{120,119,225/2,15; 1,15/2,105,120}	1,120,1904,2040,255	1,1088,2142,1088,1	-	-		<2160,1071,558,504>	FS
<4340,217>	?	4340	217	{217,216,961/5,31; 1,124/5,186,217}	1,217,1890,1953,279	1,441,3456,441,1	-	01234	{441,384,49,1;1,49,384,441}	<2170,441,56,98>
<4352,136>	?	4352	136	{136,135,2023/16,17; 1,153/16,119,136}	1,136,1920,2040,255	1,960,2430,960,1	-	-		<2176,960,392,448>	FS
<4368,112>	?	4368	112	{112,111,1372/13,14; 1,84/13,98,112}	1,112,1924,2072,259	1,1184,1998,1184,1	-	-		<2184,999,486,432>	FS
<4370,190>	-	4370	190	{190,189,3971/23,76/7; 1,399/23,1254/7,190}	1,190,2070,1995,114	1,1050,2268,1050,1	-	-		<2185,1050,455,550>		Gavrilyuk, Vidali [GV]
<4392,61>	?	4392	61	{61,60,3721/63,61/7; 1,122/63,366/7,61}	1,61,1890,2135,305	1,1715,960,1715,1	-	-		<2196,480,136,96>
<4410,210>	-	4410	210	{210,209,189,12; 1,21,198,210}	1,210,2090,1995,114	1,950,2508,950,1	-	-		<2205,950,355,450>		Gavrilyuk, Vidali [GV]
<4424,56>	?	4424	56	{56,55,4116/79,406/11; 1,308/79,210/11,56}	1,56,790,2156,1421	1,616,3190,616,1	-	-		<2212,616,180,168>
<4440,148>	?	4440	148	{148,147,1369/10,37/2; 1,111/10,259/2,148}	1,148,1960,2072,259	1,896,2646,896,1	-	-		<2220,896,328,384>	FS
<4452,106>	?	4452	106	{106,105,2809/28,53/4; 1,159/28,371/4,106}	1,106,1960,2120,265	1,1280,1890,1280,1	-	-		<2226,945,432,378>	FS
<4464,24>	-	4464	24	{24,23,2048/93,488/23; 1,184/93,64/23,24}	1,24,279,2208,1952	1,828,2806,828,1	-	-		<2232,828,339,288>		Gavrilyuk, Vidali [GV], Kodalen, Martin [KM]
<4472,91>	?	4472	91	{91,90,3718/43,91/5; 1,195/43,364/5,91}	1,91,1806,2145,429	1,1155,2160,1155,1	-	-		<2236,1080,540,504>	FS
<4500,105>	?	4500	105	{105,104,99,21; 1,6,84,105}	1,105,1820,2145,429	1,1001,2496,1001,1	-	-		<2250,1001,424,462>
<4508,46>	?	4508	46	{46,45,2116/49,253/8; 1,138/49,115/8,46}	1,46,735,2208,1518	1,768,2970,768,1	-	-		<2254,768,272,256>	FS
<4526,73>	-	4526	73	{73,72,10658/155,511/15; 1,657/155,584/15,73}	1,73,1240,2190,1022	1,750,3024,750,1	-	-		<2263,750,245,250>		Gavrilyuk, Vidali [GV]
<4558,86>	-	4558	86	{86,85,12943/159,1376/51; 1,731/159,3010/51,86}	1,86,1590,2193,688	1,918,2720,918,1	-	-		<2279,918,357,378>		Gavrilyuk, Vidali [GV]
<4560,160>	?	4560	160	{160,159,2800/19,20; 1,240/19,140,160}	1,160,2014,2120,265	1,848,2862,848,1	-	-		<2280,848,280,336>
<4590,75>	-	4590	75	{75,74,1200/17,35; 1,75/17,40,75}	1,75,1258,2220,1036	1,740,3108,740,1	-	-		<2295,740,235,240>		Gavrilyuk, Vidali [GV]
<4600,23>	+	4600	23	{23,22,529/25,184/9; 1,46/25,23/9,23}	1,23,275,2277,2024	1,891,2816,891,1	-	-		<2300,891,378,324>		Derived Design of Leech Lattice
<4600,100>	?	4600	100	{100,99,4375/46,25/2; 1,225/46,175/2,100}	1,100,2024,2200,275	1,1408,1782,1408,1	-	-		<2300,891,378,324>	FS
<4600,115>	?	4600	115	{115,114,529/5,46; 1,46/5,69,115}	1,115,1425,2185,874	1,475,3648,475,1	-	01234	{475,384,50,1;1,50,384,475}	<2300,475,90,100>	FS
<4600,115>a	?	4600	115	{115,114,5290/49,23; 1,345/49,92,115}	1,115,1862,2185,437	1,931,2736,931,1	-	-		<2300,931,354,392>	FS
<4608,48>	?	4608	48	{48,47,45,33; 1,3,15,48}	1,48,752,2256,1551	1,752,3102,752,1	-	-		<2304,752,256,240>	FS	Latin Square Type
<4608,48>a	?	4608	48	{48,47,1152/25,24; 1,48/25,24,48}	1,48,1175,2256,1128	1,1175,2256,1175,1	-	-		<2304,1128,552,552>		Latin Square Type
<4648,70>	?	4648	70	{70,69,5488/83,770/23; 1,322/83,840/23,70}	1,70,1245,2254,1078	1,805,3036,805,1	-	-		<2324,805,276,280>	FS
<4700,175>	?	4700	175	{175,174,7500/47,875/29; 1,725/47,4200/29,175}	1,175,1974,2175,375	1,609,3480,609,1	-	-		<2350,609,128,168>	FS
<4708,66>	?	4708	66	{66,65,6776/107,561/26; 1,286/107,1155/26,66}	1,66,1605,2288,748	1,1248,2210,1248,1	-	-		<2354,1105,528,510>
<4732,78>	?	4732	78	{78,77,520/7,51/2; 1,26/7,105/2,78}	1,78,1617,2288,748	1,1056,2618,1056,1	-	-		<2366,1056,460,480>
<4752,96>	?	4752	96	{96,95,1008/11,12; 1,48/11,84,96}	1,96,2090,2280,285	1,1520,1710,1520,1	-	-		<2376,855,342,288>
<4752,126>	?	4752	126	{126,125,1296/11,126/5; 1,90/11,504/5,126}	1,126,1925,2250,450	1,875,3000,875,1	-	-		<2376,875,298,336>	FS
<4752,176>	?	4752	176	{176,175,484/3,22; 1,44/3,154,176}	1,176,2100,2200,275	1,800,3150,800,1	-	-		<2376,800,232,288>	FS
<4758,117>	-	4758	117	{117,116,6760/61,273/29; 1,377/61,3120/29,117}	1,117,2196,2262,182	1,1566,1624,1566,1	-	-		<2379,812,325,252>		Gavrilyuk, Vidali [GV]
<4760,40>	?	4760	40	{40,39,4500/119,370/13; 1,260/119,150/13,40}	1,40,714,2340,1665	1,936,2886,936,1	-	-		<2380,936,380,360>
<4794,141>	?	4794	141	{141,140,2209/17,611/16; 1,188/17,1645/16,141}	1,141,1785,2256,611	1,576,3640,576,1	-	-		<2397,576,120,144>
<4802,49>	-	4802	49	{49,48,1176/25,25; 1,49/25,24,49}	1,49,1200,2352,1200	1,1200,2400,1200,1	-	-		<2401,1200,599,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<4840,165>	?	4840	165	{165,164,1375/9,15; 1,110/9,150,165}	1,165,2214,2255,205	1,1107,2624,1107,1	-	-		<2420,1107,466,540>	FS
<4864,144>	?	4864	144	{144,143,2560/19,144/11; 1,176/19,1440/11,144}	1,144,2223,2288,208	1,1287,2288,1287,1	-	-		<2432,1144,576,504>	FS
<4900,280>	?	4900	280	{280,279,245,28; 1,35,252,280}	1,280,2232,2170,217	1,496,3906,496,1	-	01234	{496,441,56,1;1,56,441,496}	<2450,496,54,112>
<4940,190>	?	4940	190	{190,189,9025/52,95/4; 1,855/52,665/4,190}	1,190,2184,2280,285	1,768,3402,768,1	-	-		<2470,768,200,256>	FS
<4968,27>	-	4968	27	{27,26,567/23,24; 1,54/23,3,27}	1,27,299,2457,2184	1,819,3328,819,1	-	-		<2484,819,306,252>		Kodalen, Martin [KM]
<4968,92>	?	4968	92	{92,91,21160/243,391/13; 1,1196/243,805/13,92}	1,92,1701,2392,782	1,936,3094,936,1	-	-		<2484,936,340,360>
<4968,92>a	?	4968	92	{92,91,529/6,23/2; 1,23/6,161/2,92}	1,92,2184,2392,299	1,1664,1638,1664,1	-	-		<2484,819,306,252>	FS
<5000,50>	?	5000	50	{50,49,375/8,35; 1,25/8,15,50}	1,50,784,2450,1715	1,784,3430,784,1	-	-		<2500,784,258,240>		Latin Square Type
<5000,50>a	?	5000	50	{50,49,48,26; 1,2,24,50}	1,50,1225,2450,1274	1,1225,2548,1225,1	-	-		<2500,1225,600,600>	FS	Latin Square Type
<5040,56>	?	5040	56	{56,55,784/15,77/2; 1,56/15,35/2,56}	1,56,825,2464,1694	1,704,3630,704,1	-	-		<2520,704,208,192>	FS
<5046,261>	-	5046	261	{261,260,232,21; 1,29,240,261}	1,261,2340,2262,182	1,702,3640,702,1	-	-		<2523,702,141,216>		Gavrilyuk, Vidali [GV]
<5060,55>	?	5060	55	{55,54,1210/23,143/5; 1,55/23,132/5,55}	1,55,1242,2475,1287	1,1125,2808,1125,1	-	-		<2530,1125,500,500>	FS
<5096,91>	?	5096	91	{91,90,2366/27,13/3; 1,91/27,260/3,91}	1,91,2430,2457,117	1,2187,720,2187,1	-	-		<2548,360,116,40>	FS
<5112,71>	?	5112	71	{71,70,10082/147,71/5; 1,355/147,284/5,71}	1,71,2058,2485,497	1,1715,1680,1715,1	-	-		<2556,840,300,264>	FS
<5200,70>	?	5200	70	{70,69,880/13,14; 1,30/13,56,70}	1,70,2093,2530,506	1,1771,1656,1771,1	-	-		<2600,828,288,252>	FS
<5200,208>	?	5200	208	{208,207,4732/25,26; 1,468/25,182,208}	1,208,2300,2392,299	1,736,3726,736,1	-	-		<2600,736,168,224>	FS
<5202,51>	-	5202	51	{51,50,1224/25,27; 1,51/25,24,51}	1,51,1250,2550,1350	1,1250,2700,1250,1	-	-		<2601,1250,601,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<5280,30>	-	5280	30	{30,29,300/11,80/3; 1,30/11,10/3,30}	1,30,319,2610,2320	1,783,3712,783,1	-	-		<2640,783,270,216>		Kodalen, Martin [KM]
<5280,88>	?	5280	88	{88,87,847/10,11; 1,33/10,77,88}	1,88,2320,2552,319	1,1856,1566,1856,1	-	-		<2640,783,270,216>	FS
<5292,231>	?	5292	231	{231,230,210,11; 1,21,220,231}	1,231,2530,2415,115	1,1265,2760,1265,1	-	-		<2646,1265,544,660>	FS
<5304,221>	?	5304	221	{221,220,48841/243,221/11; 1,4862/243,2210/11,221}	1,221,2430,2431,221	1,891,3520,891,1	-	-		<2652,891,250,324>	FS
<5324,121>	?	5324	121	{121,120,9317/81,11; 1,484/81,110,121}	1,121,2430,2541,231	1,1701,1920,1701,1	-	-		<2662,960,392,320>
<5336,253>	?	5336	253	{253,252,13225/58,253/21; 1,1449/58,5060/21,253}	1,253,2552,2415,115	1,1155,3024,1155,1	-	-		<2668,1155,434,550>
<5346,81>	?	5346	81	{81,80,1701/22,57/2; 1,81/22,105/2,81}	1,81,1760,2592,912	1,1152,3040,1152,1	-	-		<2673,1152,486,504>	FS
<5408,52>	?	5408	52	{52,51,195/4,37; 1,13/4,15,52}	1,52,816,2652,1887	1,816,3774,816,1	-	-		<2704,816,260,240>	FS	Latin Square Type
<5408,52>a	?	5408	52	{52,51,1248/25,28; 1,52/25,24,52}	1,52,1275,2652,1428	1,1275,2856,1275,1	-	-		<2704,1275,602,600>	FS	Latin Square Type
<5436,27>	-	5436	27	{27,26,3726/151,315/13; 1,351/151,36/13,27}	1,27,302,2691,2415	1,897,3640,897,1	-	-		<2718,897,336,276>		Kodalen, Martin [KM]
<5476,148>	?	5476	148	{148,147,555/4,22; 1,37/4,126,148}	1,148,2352,2590,385	1,1120,3234,1120,1	-	-		<2738,1120,426,480>
<5476,222>	?	5476	222	{222,221,407/2,15/2; 1,37/2,429/2,222}	1,222,2652,2516,85	1,1632,2210,1632,1	-	-		<2738,1105,528,390>	FS
<5480,100>	-	5480	100	{100,99,12800/137,140/3; 1,900/137,160/3,100}	1,100,1507,2640,1232	1,660,4158,660,1	-	-		<2740,660,155,160>		Gavrilyuk, Vidali [GV]
<5504,64>	?	5504	64	{64,63,2560/43,44; 1,192/43,20,64}	1,64,903,2688,1848	1,672,4158,672,1	-	-		<2752,672,176,160>	FS
<5566,66>	-	5566	66	{66,65,1463/23,24; 1,55/23,42,66}	1,66,1794,2717,988	1,1482,2600,1482,1	-	-		<2783,1300,615,600>		Gavrilyuk, Vidali [GV]
<5568,232>	?	5568	232	{232,231,841/4,29; 1,87/4,203,232}	1,232,2464,2552,319	1,704,4158,704,1	-	-		<2784,704,136,192>	FS
<5590,78>	-	5590	78	{78,77,3211/43,312/11; 1,143/43,546/11,78}	1,78,1806,2717,988	1,1254,3080,1254,1	-	-		<2795,1254,553,570>		Gavrilyuk, Vidali [GV]
<5610,85>	?	5610	85	{85,84,7225/88,85/8; 1,255/88,595/8,85}	1,85,2464,2720,340	1,2048,1512,2048,1	-	-		<2805,756,243,189>	FS
<5618,53>	-	5618	53	{53,52,1272/25,29; 1,53/25,24,53}	1,53,1300,2756,1508	1,1300,3016,1300,1	-	-		<2809,1300,603,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<5618,106>	-	5618	106	{106,105,901/9,36; 1,53/9,70,106}	1,106,1890,2703,918	1,918,3780,918,1	-	-		<2809,918,287,306>		Gavrilyuk, Vidali [GV]
<5618,265>	?	5618	265	{265,264,477/2,35/2; 1,53/2,495/2,265}	1,265,2640,2544,168	1,960,3696,960,1	-	-		<2809,960,266,360>	FS
<5632,176>	?	5632	176	{176,175,484/3,143/3; 1,44/3,385/3,176}	1,176,2100,2640,715	1,540,4550,540,1	-	01234	{540,455,54,1;1,54,455,540}	<2816,540,84,108>	FS
<5642,91>	-	5642	91	{91,90,2704/31,65/3; 1,117/31,208/3,91}	1,91,2170,2730,650	1,1470,2700,1470,1	-	-		<2821,1350,663,630>		Gavrilyuk, Vidali [GV]
<5670,105>	-	5670	105	{105,104,98,49; 1,7,56,105}	1,105,1560,2730,1274	1,650,4368,650,1	-	-		<2835,650,145,150>		Gavrilyuk, Vidali [GV]
<5670,105>a	-	5670	105	{105,104,100,25; 1,5,80,105}	1,105,2184,2730,650	1,1274,3120,1274,1	-	-		<2835,1274,553,588>		Gavrilyuk, Vidali [GV]
<5700,38>	?	5700	38	{38,37,361/10,57/2; 1,19/10,19/2,38}	1,38,740,2812,2109	1,1184,3330,1184,1	-	-		<2850,1184,508,480>
<5700,75>	?	5700	75	{75,74,1350/19,39; 1,75/19,36,75}	1,75,1406,2775,1443	1,925,3848,925,1	-	-		<2850,925,300,300>	FS
<5792,181>	?	5792	181	{181,180,32761/196,181/5; 1,2715/196,724/5,181}	1,181,2352,2715,543	1,735,4320,735,1	-	-		<2896,735,158,196>	FS
<5800,40>	?	5800	40	{40,39,1100/29,30; 1,60/29,10,40}	1,40,754,2860,2145	1,1144,3510,1144,1	-	-		<2900,1144,468,440>
<5822,71>	?	5822	71	{71,70,25205/369,213/8; 1,994/369,355/8,71}	1,71,1845,2840,1065	1,1440,2940,1440,1	-	-		<2911,1440,704,720>
<5832,54>	?	5832	54	{54,53,405/8,39; 1,27/8,15,54}	1,54,848,2862,2067	1,848,4134,848,1	-	-		<2916,848,262,240>		Latin Square Type
<5832,54>a	?	5832	54	{54,53,1296/25,30; 1,54/25,24,54}	1,54,1325,2862,1590	1,1325,3180,1325,1	-	-		<2916,1325,604,600>	FS	Latin Square Type
<5852,55>	?	5852	55	{55,54,7018/133,275/9; 1,297/133,220/9,55}	1,55,1330,2871,1595	1,1305,3240,1305,1	-	-		<2926,1305,584,580>	FS
<5852,76>	?	5852	76	{76,75,3249/44,38/5; 1,95/44,342/5,76}	1,76,2640,2850,285	1,2400,1050,2400,1	-	-		<2926,525,140,84>
<5888,64>	?	5888	64	{64,63,12800/207,24; 1,448/207,40,64}	1,64,1863,2880,1080	1,1620,2646,1620,1	-	-		<2944,1323,602,588>
<5920,111>	?	5920	111	{111,110,9583/90,111/11; 1,407/90,1110/11,111}	1,111,2700,2849,259	1,2079,1760,2079,1	-	-		<2960,880,312,240>	FS
<5936,106>	?	5936	106	{106,105,2809/28,1007/27; 1,159/28,1855/27,106}	1,106,1960,2862,1007	1,972,3990,972,1	-	-		<2968,972,306,324>
<5978,61>	?	5978	61	{61,60,3721/63,183/8; 1,122/63,305/8,61}	1,61,1890,2928,1098	1,1728,2520,1728,1	-	-		<2989,1260,539,525>
<6016,94>	?	6016	94	{94,93,2209/25,47; 1,141/25,47,94}	1,94,1550,2914,1457	1,775,4464,775,1	-	-		<3008,775,198,200>	FS
<6050,55>	-	6050	55	{55,54,264/5,31; 1,11/5,24,55}	1,55,1350,2970,1674	1,1350,3348,1350,1	-	-		<3025,1350,605,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<6068,82>	?	6068	82	{82,81,11767/148,41/4; 1,369/148,287/4,82}	1,82,2664,2952,369	1,2304,1458,2304,1	-	-		<3034,729,216,162>	FS
<6120,85>	?	6120	85	{85,84,1445/18,221/5; 1,85/18,204/5,85}	1,85,1512,2975,1547	1,875,4368,875,1	-	-		<3060,875,250,250>
<6120,153>	?	6120	153	{153,152,289/2,17; 1,17/2,136,153}	1,153,2736,2907,323	1,1539,3040,1539,1	-	-		<3060,1520,790,720>
<6120,162>	?	6120	162	{162,161,2592/17,18; 1,162/17,144,162}	1,162,2737,2898,322	1,1449,3220,1449,1	-	-		<3060,1449,648,720>	FS
<6144,84>	?	6144	84	{84,83,81,21; 1,3,63,84}	1,84,2324,2988,747	1,1743,2656,1743,1	-	-		<3072,1328,592,560>	FS
<6144,112>	?	6144	112	{112,111,320/3,28; 1,16/3,84,112}	1,112,2331,2960,740	1,1295,3552,1295,1	-	-		<3072,1295,526,560>	FS
<6148,29>	-	6148	29	{29,28,4205/159,551/21; 1,406/159,58/21,29}	1,29,318,3045,2755	1,945,4256,945,1	-	-		<3074,945,336,270>		Kodalen, Martin [KM]
<6156,171>	?	6156	171	{171,170,1444/9,19; 1,95/9,152,171}	1,171,2754,2907,323	1,1377,3400,1377,1	-	-		<3078,1377,576,648>	FS
<6164,46>	?	6164	46	{46,45,5819/134,69/2; 1,345/134,23/2,46}	1,46,804,3036,2277	1,1056,4050,1056,1	-	-		<3082,1056,380,352>	FS
<6204,141>	?	6204	141	{141,140,4418/33,47/3; 1,235/33,376/3,141}	1,141,2772,2961,329	1,1701,2800,1701,1	-	-		<3102,1400,670,600>	FS
<6272,56>	?	6272	56	{56,55,105/2,41; 1,7/2,15,56}	1,56,880,3080,2255	1,880,4510,880,1	-	-		<3136,880,264,240>	FS	Latin Square Type
<6272,56>a	?	6272	56	{56,55,1344/25,32; 1,56/25,24,56}	1,56,1375,3080,1760	1,1375,3520,1375,1	-	-		<3136,1375,606,600>	FS	Latin Square Type
<6272,96>	?	6272	96	{96,95,640/7,36; 1,32/7,60,96}	1,96,1995,3040,1140	1,1140,3990,1140,1	-	-		<3136,1140,404,420>
<6278,73>	-	6278	73	{73,72,21316/301,365/21; 1,657/301,1168/21,73}	1,73,2408,3066,730	1,2058,2160,2058,1	-	-		<3139,1080,393,360>		Gavrilyuk, Vidali [GV]
<6300,135>	?	6300	135	{135,134,900/7,15; 1,45/7,120,135}	1,135,2814,3015,335	1,1809,2680,1809,1	-	-		<3150,1340,610,540>	FS
<6300,189>	?	6300	189	{189,188,882/5,21; 1,63/5,168,189}	1,189,2820,2961,329	1,1269,3760,1269,1	-	-		<3150,1269,468,540>	FS
<6320,79>	?	6320	79	{79,78,18723/250,553/13; 1,1027/250,474/13,79}	1,79,1500,3081,1659	1,975,4368,975,1	-	-		<3160,975,302,300>	FS
<6348,115>	?	6348	115	{115,114,322/3,55; 1,23/3,60,115}	1,115,1710,3059,1463	1,665,5016,665,1	-	-		<3174,665,136,140>	FS
<6358,85>	-	6358	85	{85,84,884/11,45; 1,51/11,40,85}	1,85,1540,3094,1638	1,910,4536,910,1	-	-		<3179,910,261,260>		Gavrilyuk, Vidali [GV]
<6370,49>	?	6370	49	{49,48,2401/52,147/4; 1,147/52,49/4,49}	1,49,832,3136,2352	1,1024,4320,1024,1	-	-		<3185,1024,348,320>	FS
<6422,91>	-	6422	91	{91,90,1664/19,119/5; 1,65/19,336/5,91}	1,91,2394,3120,816	1,1680,3060,1680,1	-	-		<3211,1530,745,714>		Gavrilyuk, Vidali [GV]
<6426,147>	-	6426	147	{147,146,2352/17,35; 1,147/17,112,147}	1,147,2482,3066,730	1,1022,4380,1022,1	-	-		<3213,1022,301,336>		Gavrilyuk, Vidali [GV]
<6432,201>	?	6432	201	{201,200,4489/24,67/3; 1,335/24,536/3,201}	1,201,2880,3015,335	1,1215,4000,1215,1	-	-		<3216,1215,414,486>
<6450,105>	-	6450	105	{105,104,4320/43,357/13; 1,195/43,1008/13,105}	1,105,2408,3120,816	1,1456,3536,1456,1	-	-		<3225,1456,639,672>		Gavrilyuk, Vidali [GV]
<6480,80>	?	6480	80	{80,79,700/9,10; 1,20/9,70,80}	1,80,2844,3160,395	1,2528,1422,2528,1	-	-		<3240,711,198,144>	FS
<6480,288>	+	6480	288	{288,287,1296/5,36; 1,144/5,252,288}	1,288,2870,2952,369	1,656,5166,656,1	-	-		<3240,656,88,144>		Doubly Subtended Subquadrangles of GQ(9,81)
<6498,57>	-	6498	57	{57,56,1368/25,33; 1,57/25,24,57}	1,57,1400,3192,1848	1,1400,3696,1400,1	-	-		<3249,1400,607,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<6552,126>	?	6552	126	{126,125,1568/13,14; 1,70/13,112,126}	1,126,2925,3150,350	1,2025,2500,2025,1	-	-		<3276,1250,520,450>	FS
<6624,216>	?	6624	216	{216,215,4608/23,24; 1,360/23,192,216}	1,216,2967,3096,344	1,1161,4300,1161,1	-	-		<3312,1161,360,432>	FS
<6728,58>	?	6728	58	{58,57,435/8,43; 1,29/8,15,58}	1,58,912,3306,2451	1,912,4902,912,1	-	-		<3364,912,266,240>		Latin Square Type
<6728,58>a	?	6728	58	{58,57,1392/25,34; 1,58/25,24,58}	1,58,1425,3306,1938	1,1425,3876,1425,1	-	-		<3364,1425,608,600>	FS	Latin Square Type
<6734,111>	?	6734	111	{111,110,1369/13,333/8; 1,74/13,555/8,111}	1,111,2145,3256,1221	1,1056,4620,1056,1	-	-		<3367,1056,320,336>
<6760,156>	?	6760	156	{156,155,728/5,51; 1,52/5,105,156}	1,156,2325,3224,1054	1,744,5270,744,1	-	-		<3380,744,148,168>
<6764,190>	?	6764	190	{190,189,15884/89,95/6; 1,1026/89,1045/6,190}	1,190,3115,3192,266	1,1680,3402,1680,1	-	-		<3382,1680,788,880>
<6776,121>	?	6776	121	{121,120,14641/126,121/9; 1,605/126,968/9,121}	1,121,3024,3267,363	1,2187,2400,2187,1	-	-		<3388,1200,470,400>
<6800,100>	?	6800	100	{100,99,1600/17,52; 1,100/17,48,100}	1,100,1683,3300,1716	1,825,5148,825,1	-	-		<3400,825,200,200>	FS
<6800,100>a	?	6800	100	{100,99,80000/833,300/11; 1,3300/833,800/11,100}	1,100,2499,3300,900	1,1617,3564,1617,1	-	-		<3400,1617,752,784>	FS
<6804,210>	?	6804	210	{210,209,196,35/2; 1,14,385/2,210}	1,210,3135,3192,266	1,1520,3762,1520,1	-	-		<3402,1520,628,720>
<6848,64>	?	6848	64	{64,63,6400/107,328/7; 1,448/107,120/7,64}	1,64,963,3360,2460	1,840,5166,840,1	-	-		<3424,840,224,200>
<6880,172>	?	6880	172	{172,171,12943/80,559/19; 1,817/80,2709/19,172}	1,172,2880,3268,559	1,1216,4446,1216,1	-	-		<3440,1216,396,448>	FS
<6888,56>	?	6888	56	{56,55,2156/41,42; 1,140/41,14,56}	1,56,902,3388,2541	1,968,4950,968,1	-	-		<3444,968,292,264>
<6952,316>	?	6952	316	{316,315,6241/22,79/2; 1,711/22,553/2,316}	1,316,3080,3160,395	1,640,5670,640,1	-	01234	{640,567,64,1;1,64,567,640}	<3476,640,72,128>	FS
<6958,71>	?	6958	71	{71,70,10082/147,355/12; 1,355/147,497/12,71}	1,71,2058,3408,1420	1,1728,3500,1728,1	-	-		<3479,1728,852,864>
<6960,72>	?	6960	72	{72,71,2016/29,30; 1,72/29,42,72}	1,72,2059,3408,1420	1,1704,3550,1704,1	-	-		<3480,1704,828,840>
<6962,59>	-	6962	59	{59,58,1416/25,35; 1,59/25,24,59}	1,59,1450,3422,2030	1,1450,4060,1450,1	-	-		<3481,1450,609,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<6972,83>	?	6972	83	{83,82,137780/1701,83/41; 1,3403/1701,3320/41,83}	1,83,3402,3403,83	1,3321,328,3321,1	-	-		<3486,164,82,4>	FS
<6992,76>	?	6992	76	{76,75,5054/69,95/3; 1,190/69,133/3,76}	1,76,2070,3420,1425	1,1620,3750,1620,1	-	-		<3496,1620,744,756>	FS
<6996,53>	?	6996	53	{53,52,2809/55,159/5; 1,106/55,106/5,53}	1,53,1430,3445,2067	1,1625,3744,1625,1	-	-		<3498,1625,760,750>
<6996,66>	?	6996	66	{66,65,3388/53,55/2; 1,110/53,77/2,66}	1,66,2067,3432,1430	1,1872,3250,1872,1	-	-		<3498,1625,760,750>
<7020,78>	?	7020	78	{78,77,676/9,65/2; 1,26/9,91/2,78}	1,78,2079,3432,1430	1,1584,3850,1584,1	-	-		<3510,1584,708,720>
<7020,78>a	?	7020	78	{78,77,1521/20,39/4; 1,39/20,273/4,78}	1,78,3080,3432,429	1,2816,1386,2816,1	-	-		<3510,693,180,126>
<7020,117>	?	7020	117	{117,116,338/3,13; 1,13/3,104,117}	1,117,3132,3393,377	1,2349,2320,2349,1	-	-		<3510,1160,430,360>	FS
<7020,243>	?	7020	243	{243,242,2916/13,27; 1,243/13,216,243}	1,243,3146,3267,363	1,1089,4840,1089,1	-	-		<3510,1089,288,360>	FS
<7040,55>	?	7040	55	{55,54,847/16,33; 1,33/16,22,55}	1,55,1440,3465,2079	1,1575,3888,1575,1	-	-		<3520,1575,710,700>	FS
<7040,64>	?	7040	64	{64,63,2048/33,80/3; 1,64/33,112/3,64}	1,64,2079,3456,1440	1,1944,3150,1944,1	-	-		<3520,1575,710,700>
<7040,120>	?	7040	120	{120,119,1250/11,45; 1,70/11,75,120}	1,120,2244,3400,1275	1,1020,4998,1020,1	-	-		<3520,1020,284,300>	FS
<7074,81>	?	7074	81	{81,80,10206/131,135/4; 1,405/131,189/4,81}	1,81,2096,3456,1440	1,1536,4000,1536,1	-	-		<3537,1536,660,672>
<7200,60>	?	7200	60	{60,59,225/4,45; 1,15/4,15,60}	1,60,944,3540,2655	1,944,5310,944,1	-	-		<3600,944,268,240>	FS	Latin Square Type
<7200,60>a	?	7200	60	{60,59,288/5,36; 1,12/5,24,60}	1,60,1475,3540,2124	1,1475,4248,1475,1	-	-		<3600,1475,610,600>	FS	Latin Square Type
<7210,103>	-	7210	103	{103,102,84872/875,927/17; 1,5253/875,824/17,103}	1,103,1750,3502,1854	1,850,5508,850,1	-	-		<3605,850,201,200>		Gavrilyuk, Vidali [GV]
<7220,190>	?	7220	190	{190,189,1425/8,65/2; 1,95/8,315/2,190}	1,190,3024,3420,585	1,1152,4914,1152,1	-	-		<3610,1152,332,384>	FS
<7260,77>	?	7260	77	{77,76,374/5,21; 1,11/5,56,77}	1,77,2660,3553,969	1,2261,2736,2261,1	-	-		<3630,1368,534,504>	FS
<7308,261>	?	7308	261	{261,260,1682/7,29; 1,145/7,232,261}	1,261,3276,3393,377	1,1053,5200,1053,1	-	-		<3654,1053,252,324>	FS
<7310,43>	?	7310	43	{43,42,5547/136,473/14; 1,301/136,129/14,43}	1,43,816,3612,2838	1,1344,4620,1344,1	-	-		<3655,1344,518,480>
<7360,92>	?	7360	92	{92,91,529/6,115/3; 1,23/6,161/3,92}	1,92,2184,3588,1495	1,1404,4550,1404,1	-	-		<3680,1404,528,540>
<7372,133>	?	7372	133	{133,132,12274/97,399/11; 1,627/97,1064/11,133}	1,133,2716,3553,969	1,1309,4752,1309,1	-	-		<3686,1309,444,476>	FS
<7442,61>	-	7442	61	{61,60,1464/25,37; 1,61/25,24,61}	1,61,1500,3660,2220	1,1500,4440,1500,1	-	-		<3721,1500,611,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<7448,154>	?	7448	154	{154,153,2800/19,22/3; 1,126/19,440/3,154}	1,154,3553,3570,170	1,2805,1836,2805,1	-	-		<3724,918,312,198>	FS
<7452,276>	?	7452	276	{276,275,6877/27,322/25; 1,575/27,6578/25,276}	1,276,3564,3450,161	1,1800,3850,1800,1	-	-		<3726,1800,798,936>
<7482,301>	?	7482	301	{301,300,24037/87,301/40; 1,2150/87,11739/40,301}	1,301,3654,3440,86	1,2240,3000,2240,1	-	-		<3741,1500,715,525>
<7488,96>	?	7488	96	{96,95,3584/39,40; 1,160/39,56,96}	1,96,2223,3648,1520	1,1368,4750,1368,1	-	-		<3744,1368,492,504>
<7500,300>	?	7500	300	{300,299,275,14; 1,25,286,300}	1,300,3588,3450,161	1,1656,4186,1656,1	-	-		<3750,1656,654,792>
<7504,67>	?	7504	67	{67,66,4489/70,201/5; 1,201/70,134/5,67}	1,67,1540,3685,2211	1,1375,4752,1375,1	-	-		<3752,1375,510,500>	FS
<7548,85>	?	7548	85	{85,84,8959/111,340/7; 1,476/111,255/7,85}	1,85,1665,3689,2108	1,1085,5376,1085,1	-	-		<3774,1085,316,310>
<7548,111>	?	7548	111	{111,110,5476/51,37/3; 1,185/51,296/3,111}	1,111,3366,3663,407	1,2673,2200,2673,1	-	-		<3774,1100,370,300>	FS
<7590,99>	?	7590	99	{99,98,2178/23,165/4; 1,99/23,231/4,99}	1,99,2254,3696,1540	1,1344,4900,1344,1	-	-		<3795,1344,468,480>
<7616,136>	?	7616	136	{136,135,1156/9,51; 1,68/9,85,136}	1,136,2430,3672,1377	1,972,5670,972,1	-	-		<3808,972,236,252>	FS
<7688,62>	?	7688	62	{62,61,465/8,47; 1,31/8,15,62}	1,62,976,3782,2867	1,976,5734,976,1	-	-		<3844,976,270,240>		Latin Square Type
<7688,62>a	?	7688	62	{62,61,1488/25,38; 1,62/25,24,62}	1,62,1525,3782,2318	1,1525,4636,1525,1	-	-		<3844,1525,612,600>	FS	Latin Square Type
<7688,217>	?	7688	217	{217,216,403/2,49; 1,31/2,168,217}	1,217,3024,3627,819	1,819,6048,819,1	-	-		<3844,819,146,182>
<7744,99>	?	7744	99	{99,98,385/4,9; 1,11/4,90,99}	1,99,3528,3773,343	1,3087,1568,3087,1	-	-		<3872,784,216,144>	FS
<7744,396>	?	7744	396	{396,395,352,36; 1,44,360,396}	1,396,3555,3476,316	1,711,6320,711,1	-	01234	{711,640,72,1;1,72,640,711}	<3872,711,70,144>	FS
<7748,298>	?	7748	298	{298,297,88804/325,149/6; 1,8046/325,1639/6,298}	1,298,3575,3576,298	1,1200,5346,1200,1	-	-		<3874,1200,308,400>
<7776,27>	-	7776	27	{27,26,99/4,25; 1,9/4,2,27}	1,27,312,3861,3575	1,1287,5200,1287,1	-	-		<3888,1287,486,396>		Kodalen, Martin [KM]
<7776,144>	?	7776	144	{144,143,3456/25,12; 1,144/25,132,144}	1,144,3575,3744,312	1,2600,2574,2600,1	-	-		<3888,1287,486,396>
<7776,162>	?	7776	162	{162,161,1215/8,57; 1,81/8,105,162}	1,162,2576,3726,1311	1,828,6118,828,1	-	-		<3888,828,162,180>
<7802,141>	?	7802	141	{141,140,11045/83,423/8; 1,658/83,705/8,141}	1,141,2490,3760,1410	1,960,5880,960,1	-	-		<3901,960,224,240>
<7820,46>	?	7820	46	{46,45,3703/85,437/12; 1,207/85,115/12,46}	1,46,850,3864,3059	1,1344,5130,1344,1	-	-		<3910,1344,488,448>	FS
<7844,106>	?	7844	106	{106,105,11236/111,265/6; 1,530/111,371/6,106}	1,106,2331,3816,1590	1,1296,5250,1296,1	-	-		<3922,1296,420,432>
<7854,66>	-	7854	66	{66,65,1089/17,88/3; 1,33/17,110/3,66}	1,66,2210,3861,1716	1,2106,3640,2106,1	-	-		<3927,1820,847,840>		Gavrilyuk, Vidali [GV]
<7878,78>	-	7878	78	{78,77,7605/101,104/3; 1,273/101,130/3,78}	1,78,2222,3861,1716	1,1782,4312,1782,1	-	-		<3939,1782,801,810>		Gavrilyuk, Vidali [GV]
<7906,134>	-	7906	134	{134,133,22445/177,2948/57; 1,1273/177,4690/57,134}	1,134,2478,3819,1474	1,1026,5852,1026,1	-	-		<3953,1026,255,270>		Gavrilyuk, Vidali [GV]
<7920,75>	?	7920	75	{75,74,1575/22,45; 1,75/22,30,75}	1,75,1628,3885,2331	1,1295,5328,1295,1	-	-		<3960,1295,430,420>	FS
<7920,108>	?	7920	108	{108,107,1134/11,45; 1,54/11,63,108}	1,108,2354,3852,1605	1,1284,5350,1284,1	-	-		<3960,1284,408,420>	FS
<7920,108>a	?	7920	108	{108,107,1152/11,12; 1,36/11,96,108}	1,108,3531,3852,428	1,2889,2140,2889,1	-	-		<3960,1070,340,270>	FS
<7920,297>	?	7920	297	{297,296,1089/4,33; 1,99/4,264,297}	1,297,3552,3663,407	1,999,5920,999,1	-	-		<3960,999,198,270>
<7930,61>	?	7930	61	{61,60,3721/65,2989/64; 1,244/65,915/64,61}	1,61,975,3904,2989	1,1024,5880,1024,1	-	-		<3965,1024,288,256>	FS
<7938,63>	-	7938	63	{63,62,1512/25,39; 1,63/25,24,63}	1,63,1550,3906,2418	1,1550,4836,1550,1	-	-		<3969,1550,613,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<8000,125>	?	8000	125	{125,124,1875/16,65; 1,125/16,60,125}	1,125,1984,3875,2015	1,775,6448,775,1	-	01234	{775,624,75,1;1,75,624,775}	<4000,775,150,150>
<8000,280>	?	8000	280	{280,279,260,7; 1,20,273,280}	1,280,3906,3720,93	1,2604,2790,2604,1	-	-		<4000,1395,610,420>	FS
<8094,71>	?	8094	71	{71,70,5041/76,213/4; 1,355/76,71/4,71}	1,71,1064,3976,2982	1,896,6300,896,1	-	01234	{896,675,96,1;1,96,675,896}	<4047,896,220,192>	FS
<8120,100>	-	8120	100	{100,99,19200/203,620/11; 1,1100/203,480/11,100}	1,100,1827,3960,2232	1,990,6138,990,1	-	-		<4060,990,245,240>		Gavrilyuk, Vidali [GV]
<8190,90>	-	8190	90	{90,89,1125/13,40; 1,45/13,50,90}	1,90,2314,4005,1780	1,1602,4984,1602,1	-	-		<4095,1602,621,630>		Gavrilyuk, Vidali [GV]
<8192,64>	?	8192	64	{64,63,60,49; 1,4,15,64}	1,64,1008,4032,3087	1,1008,6174,1008,1	-	-		<4096,1008,272,240>	FS	Latin Square Type
<8192,64>a	?	8192	64	{64,63,1536/25,40; 1,64/25,24,64}	1,64,1575,4032,2520	1,1575,5040,1575,1	-	-		<4096,1575,614,600>	FS	Latin Square Type
<8192,176>	?	8192	176	{176,175,168,11; 1,8,165,176}	1,176,3850,3920,245	1,2695,2800,2695,1	-	-		<4096,1400,552,440>	FS
<8192,352>	?	8192	352	{352,351,320,22; 1,32,330,352}	1,352,3861,3744,234	1,1287,5616,1287,1	-	-		<4096,1287,326,440>	FS
<8228,55>	?	8228	55	{55,54,902/17,35; 1,33/17,20,55}	1,55,1530,4059,2583	1,1845,4536,1845,1	-	-		<4114,1845,836,820>
<8246,217>	-	8246	217	{217,216,3844/19,155/3; 1,279/19,496/3,217}	1,217,3192,3906,930	1,882,6480,882,1	-	-		<4123,882,161,196>		Gavrilyuk, Vidali [GV]
<8262,51>	?	8262	51	{51,50,289/6,323/8; 1,17/6,85/8,51}	1,51,900,4080,3230	1,1280,5700,1280,1	-	-		<4131,1280,424,384>	FS
<8358,199>	?	8358	199	{199,198,39601/210,199/10; 1,2189/210,1791/10,199}	1,199,3780,3980,398	1,2000,4356,2000,1	-	-		<4179,2000,910,1000>	FS
<8360,190>	?	8360	190	{190,189,361/2,19; 1,19/2,171,190}	1,190,3780,3990,399	1,2100,4158,2100,1	-	-		<4180,2079,1078,990>
<8372,91>	?	8372	91	{91,90,2028/23,143/5; 1,65/23,312/5,91}	1,91,2898,4095,1287	1,2205,3960,2205,1	-	-		<4186,1980,950,924>	FS
<8400,40>	?	8400	40	{40,39,800/21,65/2; 1,40/21,15/2,40}	1,40,819,4160,3380	1,1664,5070,1664,1	-	-		<4200,1664,688,640>
<8400,105>	?	8400	105	{105,104,405/4,33; 1,15/4,72,105}	1,105,2912,4095,1287	1,1911,4576,1911,1	-	-		<4200,1911,854,882>
<8400,105>a	?	8400	105	{105,104,1225/12,35/3; 1,35/12,280/3,105}	1,105,3744,4095,455	1,3159,2080,3159,1	-	-		<4200,1040,310,240>
<8400,120>	?	8400	120	{120,119,800/7,50; 1,40/7,70,120}	1,120,2499,4080,1700	1,1224,5950,1224,1	-	-		<4200,1224,348,360>
<8400,120>a	?	8400	120	{120,119,810/7,51/2; 1,30/7,189/2,120}	1,120,3332,4080,867	1,2176,4046,2176,1	-	-		<4200,2023,998,952>	FS
<8400,210>	?	8400	210	{210,209,3969/20,21; 1,231/20,189,210}	1,210,3800,3990,399	1,1900,4598,1900,1	-	-		<4200,1900,810,900>
<8432,31>	-	8432	31	{31,30,961/34,775/27; 1,93/34,62/27,31}	1,31,340,4185,3875	1,1215,6000,1215,1	-	-		<4216,1215,414,324>		Kodalen, Martin [KM]
<8432,136>	?	8432	136	{136,135,4046/31,289/10; 1,170/31,1071/10,136}	1,136,3348,4080,867	1,1920,4590,1920,1	-	-		<4216,1920,848,896>	FS
<8432,136>a	?	8432	136	{136,135,101728/775,34/3; 1,3672/775,374/3,136}	1,136,3875,4080,340	1,3000,2430,3000,1	-	-		<4216,1215,414,324>
<8450,65>	-	8450	65	{65,64,312/5,41; 1,13/5,24,65}	1,65,1600,4160,2624	1,1600,5248,1600,1	-	-		<4225,1600,615,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<8450,78>	-	8450	78	{78,77,377/5,36; 1,13/5,42,78}	1,78,2310,4147,1914	1,1914,4620,1914,1	-	-		<4225,1914,863,870>		Gavrilyuk, Vidali [GV]
<8470,88>	-	8470	88	{88,87,429/5,16; 1,11/5,72,88}	1,88,3480,4147,754	1,3016,2436,3016,1	-	-		<4235,1218,385,336>		Gavrilyuk, Vidali [GV]
<8470,175>	?	8470	175	{175,174,3675/22,35/2; 1,175/22,315/2,175}	1,175,3828,4060,406	1,2320,3828,2320,1	-	-		<4235,1914,913,825>	FS
<8478,27>	-	8478	27	{27,26,3888/157,327/13; 1,351/157,24/13,27}	1,27,314,4212,3924	1,1404,5668,1404,1	-	-		<4239,1404,531,432>		Kodalen, Martin [KM]
<8500,85>	?	8500	85	{85,84,2023/25,51; 1,102/25,34,85}	1,85,1750,4165,2499	1,1225,6048,1225,1	-	-		<4250,1225,360,350>
<8500,85>a	?	8500	85	{85,84,578/7,187/7; 1,17/7,408/7,85}	1,85,2940,4165,1309	1,2401,3696,2401,1	-	-		<4250,1848,818,792>	FS
<8556,92>	?	8556	92	{92,91,11109/124,230/13; 1,299/124,966/13,92}	1,92,3472,4186,805	1,2912,2730,2912,1	-	-		<4278,1365,468,420>
<8632,166>	?	8632	166	{166,165,20667/130,83/5; 1,913/130,747/5,166}	1,166,3900,4150,415	1,2500,3630,2500,1	-	-		<4316,1815,814,726>
<8652,126>	?	8652	126	{126,125,12348/103,105/2; 1,630/103,147/2,126}	1,126,2575,4200,1750	1,1200,6250,1200,1	-	-		<4326,1200,324,336>
<8692,106>	?	8692	106	{106,105,8427/82,901/40; 1,265/82,3339/40,106}	1,106,3444,4240,901	1,2560,3570,2560,1	-	-		<4346,1785,760,714>	FS
<8712,66>	?	8712	66	{66,65,495/8,51; 1,33/8,15,66}	1,66,1040,4290,3315	1,1040,6630,1040,1	-	-		<4356,1040,274,240>		Latin Square Type
<8712,66>a	?	8712	66	{66,65,1584/25,42; 1,66/25,24,66}	1,66,1625,4290,2730	1,1625,5460,1625,1	-	-		<4356,1625,616,600>	FS	Latin Square Type
<8712,121>	?	8712	121	{121,120,14641/126,1331/35; 1,605/126,2904/35,121}	1,121,3024,4235,1331	1,1715,5280,1715,1	-	-		<4356,1715,658,686>
<8736,78>	?	8736	78	{78,77,4225/56,403/11; 1,143/56,455/11,78}	1,78,2352,4290,2015	1,1980,4774,1980,1	-	-		<4368,1980,894,900>
<8750,325>	-	8750	325	{325,324,300,13; 1,25,312,325}	1,325,4212,4050,162	1,2106,4536,2106,1	-	-		<4375,2106,929,1092>		Gavrilyuk, Vidali [GV]
<8758,232>	-	8758	232	{232,231,32799/151,464/11; 1,2233/151,2088/11,232}	1,232,3624,4147,754	1,1144,6468,1144,1	-	-		<4379,1144,261,312>		Gavrilyuk, Vidali [GV]
<8760,146>	?	8760	146	{146,145,37303/270,1679/29; 1,2117/270,2555/29,146}	1,146,2700,4234,1679	1,1044,6670,1044,1	-	-		<4380,1044,238,252>
<8798,106>	-	8798	106	{106,105,8427/83,424/9; 1,371/83,530/9,106}	1,106,2490,4293,1908	1,1458,5880,1458,1	-	-		<4399,1458,477,486>		Gavrilyuk, Vidali [GV]
<8800,160>	?	8800	160	{160,159,1680/11,34; 1,80/11,126,160}	1,160,3498,4240,901	1,1696,5406,1696,1	-	-		<4400,1696,624,672>	FS
<8800,250>	?	8800	250	{250,249,1875/8,25; 1,125/8,225,250}	1,250,3984,4150,415	1,1660,5478,1660,1	-	-		<4400,1660,570,660>
<8802,351>	-	8802	351	{351,350,52488/163,351/25; 1,4725/163,8424/25,351}	1,351,4238,4050,162	1,1950,4900,1950,1	-	-		<4401,1950,773,936>		Gavrilyuk, Vidali [GV]
<8836,141>	?	8836	141	{141,140,1222/9,21; 1,47/9,120,141}	1,141,3780,4277,637	1,2457,3920,2457,1	-	-		<4418,1960,906,840>	FS
<8892,351>	?	8892	351	{351,350,6084/19,39; 1,585/19,312,351}	1,351,3990,4095,455	1,945,7000,945,1	-	-		<4446,945,144,216>	FS
<8924,46>	?	8924	46	{46,45,4232/97,299/8; 1,230/97,69/8,46}	1,46,873,4416,3588	1,1536,5850,1536,1	-	-		<4462,1536,560,512>	FS
<8978,67>	-	8978	67	{67,66,1608/25,43; 1,67/25,24,67}	1,67,1650,4422,2838	1,1650,5676,1650,1	-	-		<4489,1650,617,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<8990,155>	?	8990	155	{155,154,8649/58,31/2; 1,341/58,279/2,155}	1,155,4060,4340,434	1,2800,3388,2800,1	-	-		<4495,1694,693,605>	FS
<9000,100>	?	9000	100	{100,99,875/9,85/4; 1,25/9,315/4,100}	1,100,3564,4400,935	1,2816,3366,2816,1	-	-		<4500,1683,658,612>	FS
<9010,265>	?	9010	265	{265,264,8427/34,53/2; 1,583/34,477/2,265}	1,265,4080,4240,424	1,1600,5808,1600,1	-	-		<4505,1600,510,600>	FS
<9120,48>	?	9120	48	{48,47,864/19,39; 1,48/19,9,48}	1,48,893,4512,3666	1,1504,6110,1504,1	-	-		<4560,1504,528,480>	FS
<9120,95>	?	9120	95	{95,94,361/4,57; 1,19/4,38,95}	1,95,1880,4465,2679	1,1175,6768,1175,1	-	-		<4560,1175,310,300>	FS
<9152,91>	?	9152	91	{91,90,3887/44,91/3; 1,117/44,182/3,91}	1,91,3080,4485,1495	1,2415,4320,2415,1	-	-		<4576,2160,1032,1008>	FS
<9152,176>	?	9152	176	{176,175,19360/117,66; 1,1232/117,110,176}	1,176,2925,4400,1650	1,900,7350,900,1	-	-		<4576,900,164,180>
<9152,176>a	?	9152	176	{176,175,2178/13,187/5; 1,110/13,693/5,176}	1,176,3640,4400,935	1,1600,5950,1600,1	-	-		<4576,1600,528,576>	FS
<9180,105>	?	9180	105	{105,104,1725/17,35; 1,60/17,70,105}	1,105,3094,4485,1495	1,2093,4992,2093,1	-	-		<4590,2093,940,966>
<9240,150>	?	9240	150	{150,149,2025/14,15; 1,75/14,135,150}	1,150,4172,4470,447	1,2980,3278,2980,1	-	-		<4620,1639,638,550>
<9248,68>	?	9248	68	{68,67,255/4,53; 1,17/4,15,68}	1,68,1072,4556,3551	1,1072,7102,1072,1	-	-		<4624,1072,276,240>	FS	Latin Square Type
<9248,68>a	?	9248	68	{68,67,1632/25,44; 1,68/25,24,68}	1,68,1675,4556,2948	1,1675,5896,1675,1	-	-		<4624,1675,618,600>	FS	Latin Square Type
<9292,101>	?	9292	101	{101,100,20402/207,101/9; 1,505/207,808/9,101}	1,101,4140,4545,505	1,3645,2000,3645,1	-	-		<4646,1000,270,200>	FS
<9306,141>	?	9306	141	{141,140,4418/33,235/4; 1,235/33,329/4,141}	1,141,2772,4512,1880	1,1152,7000,1152,1	-	-		<4653,1152,276,288>
<9310,105>	-	9310	105	{105,104,17500/171,165/13; 1,455/171,1200/13,105}	1,105,4104,4550,550	1,3510,2288,3510,1	-	-		<4655,1144,333,264>		Gavrilyuk, Vidali [GV]
<9312,96>	?	9312	96	{96,95,9072/97,102/5; 1,240/97,378/5,96}	1,96,3686,4560,969	1,3040,3230,3040,1	-	-		<4656,1615,590,544>	FS
<9350,153>	-	9350	153	{153,152,8092/55,459/19; 1,323/55,2448/19,153}	1,153,3960,4522,714	1,2394,4560,2394,1	-	-		<4675,2280,1145,1080>		Gavrilyuk, Vidali [GV]
<9386,171>	-	9386	171	{171,170,2128/13,27; 1,95/13,144,171}	1,171,3978,4522,714	1,2142,5100,2142,1	-	-		<4693,2142,941,1008>		Gavrilyuk, Vidali [GV]
<9438,99>	?	9438	99	{99,98,2475/26,93/2; 1,99/26,105/2,99}	1,99,2548,4620,2170	1,1680,6076,1680,1	-	-		<4719,1680,594,600>	FS
<9440,100>	?	9440	100	{100,99,5600/59,60; 1,300/59,40,100}	1,100,1947,4620,2772	1,1155,7128,1155,1	-	-		<4720,1155,290,280>	FS
<9440,118>	?	9440	118	{118,117,27848/245,118/3; 1,1062/245,236/3,118}	1,118,3185,4602,1534	1,1911,5616,1911,1	-	-		<4720,1911,758,784>	FS
<9464,286>	?	9464	286	{286,285,1872/7,22; 1,130/7,264,286}	1,286,4389,4446,342	1,1881,5700,1881,1	-	-		<4732,1881,680,792>	FS
<9500,190>	?	9500	190	{190,189,361/2,323/8; 1,19/2,1197/8,190}	1,190,3780,4560,969	1,1536,6426,1536,1	-	-		<4750,1536,464,512>	FS
<9522,69>	-	9522	69	{69,68,1656/25,45; 1,69/25,24,69}	1,69,1700,4692,3060	1,1700,6120,1700,1	-	-		<4761,1700,619,600>		Latin Square Type, Gavrilyuk, Vidali [GV]
<9522,161>	-	9522	161	{161,160,460/3,49; 1,23/3,112,161}	1,161,3360,4600,1400	1,1400,6720,1400,1	-	-		<4761,1400,391,420>		Gavrilyuk, Vidali [GV]
<9536,64>	?	9536	64	{64,63,8960/149,152/3; 1,576/149,40/3,64}	1,64,1043,4704,3724	1,1176,7182,1176,1	-	-		<4768,1176,320,280>
<9536,298>	?	9536	298	{298,297,22201/80,149/5; 1,1639/80,1341/5,298}	1,298,4320,4470,447	1,1500,6534,1500,1	-	-		<4768,1500,410,500>
<9548,44>	?	9548	44	{44,43,9075/217,1562/43; 1,473/217,330/43,44}	1,44,868,4730,3905	1,1720,6106,1720,1	-	-		<4774,1720,654,600>
<9570,145>	?	9570	145	{145,144,841/6,29/2; 1,29/6,261/2,145}	1,145,4320,4640,464	1,3200,3168,3200,1	-	-		<4785,1584,583,495>	FS
<9702,126>	-	9702	126	{126,125,1323/11,56; 1,63/11,70,126}	1,126,2750,4725,2100	1,1350,7000,1350,1	-	-		<4851,1350,369,378>		Gavrilyuk, Vidali [GV]
<9798,71>	?	9798	71	{71,70,85697/1242,71/2; 1,2485/1242,71/2,71}	1,71,2484,4828,2414	1,2448,4900,2448,1	-	-		<4899,2448,1222,1224>	FS
<9800,70>	?	9800	70	{70,69,525/8,55; 1,35/8,15,70}	1,70,1104,4830,3795	1,1104,7590,1104,1	-	-		<4900,1104,278,240>		Latin Square Type
<9800,70>a	?	9800	70	{70,69,336/5,46; 1,14/5,24,70}	1,70,1725,4830,3174	1,1725,6348,1725,1	-	-		<4900,1725,620,600>	FS	Latin Square Type
<9800,70>b	?	9800	70	{70,69,1225/18,35; 1,35/18,35,70}	1,70,2484,4830,2415	1,2484,4830,2484,1	-	-		<4900,2415,1190,1190>		Latin Square Type
<9880,78>	?	9880	78	{78,77,2873/38,39; 1,91/38,39,78}	1,78,2508,4862,2431	1,2244,5390,2244,1	-	-		<4940,2244,1018,1020>
<9900,50>	?	9900	50	{50,49,3125/66,575/14; 1,175/66,125/14,50}	1,50,924,4900,4025	1,1568,6762,1568,1	-	-		<4950,1568,532,480>	FS
<9900,99>	?	9900	99	{99,98,484/5,11; 1,11/5,88,99}	1,99,4410,4851,539	1,3969,1960,3969,1	-	-		<4950,980,250,180>	FS
<9900,405>	?	9900	405	{405,404,4050/11,45; 1,405/11,360,405}	1,405,4444,4545,505	1,909,8080,909,1	-	-		<4950,909,108,180>	FS	Doubly Subtended Subquadrangles of GQ(10,100)?
<9920,248>	?	9920	248	{248,247,10571/45,279/19; 1,589/45,4433/19,248}	1,248,4680,4712,279	1,2736,4446,2736,1	-	-		<4960,2223,1070,936>	FS
<9968,56>	?	9968	56	{56,55,4704/89,91/2; 1,280/89,21/2,56}	1,56,979,4928,4004	1,1408,7150,1408,1	-	-		<4984,1408,432,384>	FS
<9984,24>	-	9984	24	{24,23,288/13,68/3; 1,24/13,4/3,24}	1,24,299,4968,4692	1,1863,6256,1863,1	-	-		<4992,1863,774,648>		Kodalen, Martin [KM]
<9984,32>	-	9984	32	{32,31,10240/351,928/31; 1,992/351,64/31,32}	1,32,351,4960,4640	1,1395,7192,1395,1	-	-		<4992,1395,466,360>		Kodalen, Martin [KM]
<9984,156>	?	9984	156	{156,155,1183/8,65; 1,65/8,91,156}	1,156,2976,4836,2015	1,1116,7750,1116,1	-	-		<4992,1116,240,252>
<9984,156>a	?	9984	156	{156,155,1352/9,26; 1,52/9,130,156}	1,156,4185,4836,806	1,2511,4960,2511,1	-	-		<4992,2480,1264,1200>	FS
<9990,111>	?	9990	111	{111,110,9583/90,1147/22; 1,407/90,1295/22,111}	1,111,2700,4884,2294	1,1584,6820,1584,1	-	-		<4995,1584,498,504>	FS