X(19) = CLAWSON POINT

Trilinears

\(tan A : tan B : tan C\)

\(sin 2B + sin 2C - sin 2A : :\)

\(1/(b2 + c2 - a2) : :\)

\(a2 - S2 + SA : :\)

\(SB*SC : :\)

Barycentrics

\(a*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2) : :\)

\(a tan A : b tan B : c tan C\)

Notes

X(19) is the homothetic center of the orthic and extangents triangles. The Ayme triangle, constructed at X(3610), is perspective to ABC with perspector X(19).

If you have The Geometer’s Sketchpad, you can view Clawson point. If you have GeoGebra, you can view Clawson point.

Although John Clawson studied this point in 1925, it was studied earlier by Lemoine:

Emile Lemoine, “Quelques questions se rapportant à l’étude des antiparallèles des côtes d’un triangle”, Bulletin de la S. M. F., tome 14 (1886), p. 107-128, specifically, on page 114. This article is available online at Numdam.

Let A’B’C’ be the 4th Brocard triangle. Let A″ be the trilinear product B’*C’, and define B″ and C″ cyclically. The lines AA″, BB″, CC″ concur in X(19). (Randy Hutson, November 18, 2015)

Let A’B’C’ be the orthic triangle. Let A″ be the trilinear product of the (real or imaginary) circumcircle intercepts of line B’C’. Define B″ and C″ cyclically. The lines AA″, BB″, CC″ concur in X(19). (Randy Hutson, December 26, 2015)

Let A’B’C’ be the excentral triangle. Let A″ be the pole, wrt the polar circle, of line B’C’, and define B″ and C″ cyclically. The lines A’A″, B’B″, C’C″ concur in X(19). (Randy Hutson, December 2, 2017)

Let A’B’C’ be the hexyl triangle. Let La be the trilinear polar of A’, and define Lb and Lc cyclically. Let A″ = Lb∩Lc, and define B″ and C″ cyclically. The lines AA″, BB″, CC″ concur in X(19). (Randy Hutson, December 2, 2017)

Let A’B’C’ be the hexyl triangle. Let Ab = BC∩C’A’, Ac = BC∩A’B’, and define Bc, Ba, Ca, Cb cyclically. Then Ab, Ac, Bc, Ba, Ca, Cb lie on an ellipse. Let A″ be the intersection of the tangents to the ellipse at Ba and Ca, and define B″ and C″ cyclically. The lines AA″, BB″, CC″ concur in X(19). (Randy Hutson, December 2, 2017)

Let A’B’C’ be the intouch triangle of the extangents triangle, if ABC is acute. Then A’B’C’ is homothetic to the anti-Ara triangle at X(19). (Randy Hutson, December 2, 2017)

Let La be the A-extraversion of line X(650)X(663) (the trilinear polar of X(9)), and define Lb and Lc cyclically. Let A’ = Lb∩Lc, and define B’ and C’ cyclically. The lines AA’, BB’, CC’ concur in X(19). (Randy Hutson, December 2, 2017)

Let La be the A-extraversion of line X(661)X(663) (the trilinear polar of X(19)), and define Lb and Lc cyclically. Let A’ = Lb∩Lc, and define B’ and C’ cyclically. The lines AA’, BB’, CC’ concur in X(19). (Randy Hutson, December 2, 2017)

X(19) lies on the 2nd Lester circle (Yiu), the cubics K109, K145, K175, K343, K391, K431, K445, K457, K605, K678, K696, K697, K750, K864, K968, K999, K1039, K1042, K1090, the curve Q121, and these lines: {1, 28}, {2, 534}, {3, 1871}, {4, 9}, {5, 8141}, {6, 34}, {7, 5236}, {8, 1891}, {21, 4288}, {24, 2337}, {25, 33}, {27, 63}, {29, 5250}, {30, 15940}, {31, 204}, {32, 5336}, {35, 14017}, {38, 4211}, {41, 1825}, {44, 1828}, {45, 1900}, {46, 579}, {47, 921}, {51, 3611}, {52, 6237}, {53, 1846}, {54, 16031}, {56, 207}, {57, 196}, {64, 1903}, {77, 2002}, {81, 969}, {84, 3183}, {86, 14013}, {91, 920}, {100, 7466}, {101, 913}, {102, 282}, {107, 2249}, {108, 2291}, {109, 8775}, {112, 759}, {113, 12661}, {117, 5190}, {125, 10119}, {143, 32158}, {155, 12417}, {158, 1712}, {162, 897}, {163, 563}, {165, 2954}, {184, 10536}, {185, 6254}, {186, 16553}, {191, 31902}, {200, 3949}, {208, 225}, {216, 27622}, {219, 517}, {220, 1902}, {226, 1763}, {232, 444}, {264, 21371}, {269, 3942}, {270, 2363}, {273, 653}, {275, 19181}, {294, 1041}, {297, 25978}, {307, 24316}, {318, 1840}, {326, 1958}, {331, 10030}, {346, 3610}, {347, 24604}, {355, 7511}, {378, 7688}, {379, 1441}, {381, 18453}, {403, 7110}, {406, 5257}, {407, 1865}, {418, 26908}, {423, 2905}, {427, 3925}, {428, 5101}, {429, 1213}, {469, 3305}, {475, 5750}, {484, 5146}, {487, 12662}, {488, 12663}, {511, 15975}, {518, 5781}, {523, 14119}, {560, 1910}, {577, 1950}, {583, 2969}, {587, 3536}, {594, 5090}, {596, 14964}, {604, 909}, {614, 3162}, {648, 18827}, {649, 3064}, {650, 2432}, {656, 8768}, {662, 8771}, {672, 1851}, {774, 2155}, {775, 4100}, {798, 24006}, {800, 1945}, {823, 1821}, {846, 17038}, {851, 18591}, {876, 2489}, {908, 28807}, {911, 17463}, {960, 965}, {962, 27382}, {990, 3220}, {993, 4227}, {1013, 35258}, {1024, 7649}, {1030, 20832}, {1039, 2298}, {1040, 4224}, {1075, 7554}, {1086, 28017}, {1100, 11396}, {1104, 3172}, {1109, 2157}, {1122, 2097}, {1125, 7521}, {1158, 1715}, {1174, 2266}, {1212, 1593}, {1214, 11347}, {1247, 2959}, {1319, 37519}, {1333, 2217}, {1334, 28076}, {1350, 5784}, {1375, 17073}, {1405, 1866}, {1422, 7099}, {1423, 3512}, {1449, 1870}, {1457, 22063}, {1460, 7337}, {1461, 34492}, {1482, 20818}, {1572, 2300}, {1580, 17891}, {1581, 1740}, {1598, 1872}, {1604, 11399}, {1609, 2164}, {1611, 3290}, {1621, 4233}, {1633, 1721}, {1659, 3068}, {1698, 5142}, {1699, 9572}, {1707, 1719}, {1708, 1713}, {1709, 8558}, {1743, 1783}, {1745, 23619}, {1759, 21061}, {1773, 13161}, {1802, 2324}, {1830, 2246}, {1831, 2268}, {1836, 1901}, {1837, 1852}, {1843, 2876}, {1847, 10509}, {1857, 2357}, {1862, 6154}, {1864, 17810}, {1877, 2347}, {1878, 5183}, {1883, 17369}, {1944, 10446}, {1964, 2186}, {1966, 18832}, {1968, 16968}, {1969, 3403}, {1974, 16972}, {1986, 7724}, {1990, 2160}, {2128, 2129}, {2148, 2190}, {2156, 17871}, {2159, 3708}, {2166, 3376}, {2192, 7007}, {2194, 2219}, {2195, 2212}, {2203, 2214}, {2204, 2218}, {2207, 2281}, {2215, 8747}, {2255, 7151}, {2256, 3057}, {2258, 3192}, {2267, 30503}, {2273, 9620}, {2278, 17443}, {2287, 3869}, {2290, 2962}, {2305, 2652}, {2313, 9251}, {2319, 3186}, {2321, 17742}, {2326, 13739}, {2578, 2588}, {2579, 2589}, {2809, 8271}, {2822, 5667}, {2911, 21853}, {2960, 4877}, {3059, 7716}, {3060, 11445}, {3062, 10859}, {3069, 6203}, {3091, 9537}, {3144, 34920}, {3169, 34895}, {3174, 16550}, {3176, 10396}, {3189, 7718}, {3199, 21796}, {3207, 11363}, {3211, 24474}, {3219, 6994}, {3247, 4262}, {3306, 16706}, {3330, 7355}, {3333, 22088}, {3400, 3408}, {3401, 3409}, {3402, 3404}, {3462, 7344}, {3497, 3500}, {3567, 11460}, {3574, 32370}, {3575, 6253}, {3576, 7501}, {3589, 5834}, {3666, 15509}, {3683, 11323}, {3692, 5174}, {3694, 5687}, {3729, 20602}, {3731, 4222}, {3772, 16318}, {3811, 22021}, {3875, 31906}, {3877, 17519}, {3958, 12526}, {4063, 17924}, {4183, 4512}, {4194, 5296}, {4200, 5749}, {4209, 7131}, {4212, 17754}, {4228, 20243}, {4254, 11398}, {4295, 5746}, {4320, 17807}, {4327, 22769}, {4360, 31910}, {4361, 5792}, {4384, 16566}, {4394, 6591}, {4429, 5125}, {4466, 18634}, {5095, 32277}, {5130, 17275}, {5155, 17330}, {5200, 13427}, {5248, 25081}, {5282, 7102}, {5292, 34266}, {5322, 10829}, {5412, 5415}, {5413, 5416}, {5437, 17917}, {5521, 20623}, {5739, 8896}, {5742, 26066}, {5747, 12047}, {5776, 6001}, {5778, 5887}, {5802, 18391}, {5813, 28739}, {5829, 5880}, {5928, 13567}, {6059, 7083}, {6152, 6255}, {6180, 34371}, {6252, 6291}, {6404, 6406}, {6763, 31901}, {7017, 17787}, {7054, 11101}, {7190, 18162}, {7282, 8545}, {7350, 7351}, {7359, 12699}, {7412, 10268}, {7498, 31435}, {7534, 26921}, {7537, 8227}, {7559, 7989}, {7714, 34607}, {7982, 22356}, {7994, 14493}, {8148, 22147}, {8539, 8541}, {8743, 16470}, {8897, 18134}, {9310, 17452}, {9786, 12664}, {9817, 33849}, {10222, 23073}, {10311, 10315}, {10436, 15149}, {10476, 22065}, {10636, 10641}, {10637, 10642}, {10977, 33630}, {10985, 10988}, {11341, 20172}, {11433, 18921}, {12135, 17299}, {12329, 21867}, {13041, 13051}, {13042, 13052}, {14543, 17220}, {14557, 34048}, {14953, 17134}, {15344, 28847}, {16502, 20227}, {16551, 20367}, {16571, 17799}, {16572, 34498}, {16747, 32092}, {16814, 17516}, {17151, 31918}, {17465, 34080}, {17747, 28070}, {17861, 21364}, {17904, 20083}, {18163, 18677}, {18206, 31919}, {18344, 23351}, {18650, 24683}, {18679, 27659}, {18691, 20902}, {19213, 19214}, {19215, 19218}, {19216, 19217}, {19298, 19300}, {19299, 19301}, {19302, 21773}, {19432, 19446}, {19433, 19447}, {20258, 24334}, {20266, 21621}, {20291, 31015}, {20305, 24682}, {21368, 26665}, {21442, 24587}, {21770, 34434}, {22124, 34040}, {22127, 35631}, {22840, 22970}, {24315, 34830}, {24684, 25523}, {24701, 25365}, {25078, 25440}, {25590, 31925}, {26118, 34822}, {26273, 28023}, {26690, 35974}, {26704, 29068}, {26919, 26952}, {27472, 31346}, {31903, 32922}, {33790, 33793}, {36131, 36151}

X(19) = midpoint of X(4329) and X(20061)

X(19) = reflection of X(i) in X(j) for these {i,j}: {63, 34176}, {4319, 1486}, {4329, 18589}, {24701, 25365}, {30265, 3}, {31158, 2}

X(19) = isogonal conjugate of X(63)

X(19) = isotomic conjugate of X(304)

X(19) = complement of X(4329)

X(19) = anticomplement of X(18589)

X(19) = circumcircle-inverse of X(32756)

X(19) = polar-circle-inverse of X(5179)

X(19) = polar conjugate of X(75)

X(19) = complement of the isogonal conjugate of X(7169)

X(19) = complement of the isotomic conjugate of X(7219)

X(19) = isogonal conjugate of the anticomplement of X(226)

X(19) = isogonal conjugate of the complement of X(5905)

X(19) = isotomic conjugate of the anticomplement of X(16583)

X(19) = isotomic conjugate of the complement of X(21216)

X(19) = isotomic conjugate of the isogonal conjugate of X(1973)

X(19) = isogonal conjugate of the isotomic conjugate of X(92)

X(19) = isotomic conjugate of the polar conjugate of X(1096)

X(19) = isogonal conjugate of the polar conjugate of X(158)

X(19) = polar conjugate of the isotomic conjugate of X(1)

X(19) = polar conjugate of the isogonal conjugate of X(31)

X(19) = excentral-isogonal conjugate of X(2947)

X(19) = orthic-isogonal conjugate of X(33)

X(19) = perspector of circumconic centered at X(36103)

X(19) = X(i)-anticomplementary conjugate of X(j) for these (i,j): {1037, 2897}, {1041, 2893}, {7084, 3151}

X(19) = X(i)-complementary conjugate of X(j) for these (i,j): {31, 36103}, {7097, 141}, {7169, 10}, {7219, 2887}

X(19) = X(i)-Ceva conjugate of X(j) for these (i,j): {1, 204}, {2, 36103}, {4, 33}, {27, 4}, {28, 25}, {29, 3192}, {40, 8802}, {57, 208}, {63, 1712}, {84, 7008}, {92, 1}, {108, 18344}, {158, 1096}, {196, 207}, {278, 34}, {281, 2331}, {653, 7649}, {823, 24006}, {1172, 6}, {1396, 4186}, {1748, 920}, {1783, 6591}, {2190, 31}, {2322, 1249}, {2580, 2588}, {2581, 2589}, {6336, 1870}, {7003, 7129}, {7012, 8750}, {7128, 108}, {8748, 393}, {8751, 2201}, {14493, 7071}, {20624, 2202}, {24000, 32676}, {24019, 661}, {32714, 513}, {36124, 2356}, {36126, 810}, {36127, 663}

X(19) = X(i)-cross conjugate of X(j) for these (i,j): {25, 34}, {31, 1}, {63, 2129}, {444, 7119}, {607, 33}, {608, 7129}, {649, 32674}, {661, 24019}, {663, 36127}, {774, 9258}, {798, 32676}, {810, 36126}, {1195, 284}, {1400, 6}, {1824, 4}, {1880, 393}, {1973, 1096}, {2083, 63}, {2170, 3064}, {2179, 31}, {2181, 158}, {2183, 913}, {2310, 513}, {2312, 1910}, {2333, 25}, {2354, 1474}, {2355, 28}, {2356, 36124}, {2357, 64}, {2578, 2576}, {2579, 2577}, {2624, 36131}, {2643, 24006}, {3209, 2331}, {3708, 661}, {6591, 1783}, {7083, 2191}, {7154, 7007}, {8020, 2207}, {12723, 7}, {16583, 2}, {17442, 92}, {17872, 75}, {18344, 108}

X(19) = X(i)-isoconjugate of X(j) for these (i,j): {1, 63}, {2, 3}, {4, 394}, {5, 97}, {6, 69}, {7, 219}, {8, 222}, {9, 77}, {10, 1790}, {19, 326}, {20, 1073}, {21, 1214}, {22, 14376}, {23, 34897}, {25, 3926}, {27, 3682}, {28, 3998}, {30, 14919}, {31, 304}, {32, 305}, {33, 7183}, {34, 3719}, {37, 1444}, {38, 34055}, {39, 1799}, {41, 7182}, {42, 17206}, {46, 6513}, {48, 75}, {49, 11140}, {50, 328}, {51, 34386}, {54, 343}, {55, 348}, {56, 345}, {57, 78}, {58, 306}, {59, 26932}, {60, 26942}, {65, 1812}, {66, 20806}, {67, 22151}, {68, 1993}, {71, 86}, {72, 81}, {73, 333}, {74, 11064}, {76, 184}, {80, 22128}, {83, 3917}, {85, 212}, {87, 22370}, {88, 5440}, {89, 3940}, {90, 6505}, {92, 255}, {94, 22115}, {95, 216}, {98, 36212}, {99, 647}, {100, 905}, {101, 4025}, {103, 26006}, {105, 25083}, {106, 3977}, {109, 6332}, {110, 525}, {111, 6390}, {112, 3265}, {125, 249}, {140, 31626}, {141, 1176}, {154, 34403}, {155, 6504}, {158, 6507}, {162, 24018}, {163, 14208}, {172, 7019}, {185, 801}, {187, 30786}, {189, 7078}, {190, 1459}, {192, 23086}, {193, 6391}, {194, 3504}, {200, 7177}, {201, 2185}, {217, 34384}, {220, 7056}, {223, 271}, {225, 6514}, {226, 283}, {228, 274}, {232, 6394}, {239, 295}, {248, 325}, {250, 15526}, {251, 3933}, {253, 15905}, {254, 6503}, {257, 3955}, {261, 2197}, {264, 577}, {265, 323}, {268, 347}, {269, 3692}, {273, 2289}, {275, 5562}, {276, 418}, {278, 1259}, {279, 1260}, {280, 7011}, {281, 1804}, {282, 7013}, {284, 307}, {286, 3990}, {287, 511}, {290, 3289}, {291, 20769}, {293, 1959}, {296, 1944}, {297, 17974}, {302, 32585}, {303, 32586}, {308, 20775}, {310, 2200}, {311, 14533}, {312, 603}, {314, 1409}, {318, 7125}, {321, 1437}, {324, 19210}, {329, 1433}, {330, 20760}, {331, 6056}, {332, 1400}, {335, 7193}, {336, 1755}, {337, 1914}, {339, 23357}, {341, 7099}, {346, 7053}, {350, 2196}, {371, 11090}, {372, 11091}, {385, 36214}, {393, 3964}, {401, 14941}, {427, 28724}, {441, 1297}, {459, 35602}, {476, 8552}, {480, 30682}, {485, 5408}, {486, 5409}, {487, 494}, {488, 493}, {491, 6414}, {492, 6413}, {512, 4563}, {513, 1332}, {514, 1331}, {516, 1815}, {518, 1814}, {519, 1797}, {520, 648}, {521, 651}, {522, 1813}, {523, 4558}, {524, 895}, {561, 9247}, {563, 20571}, {571, 20563}, {593, 3695}, {604, 3718}, {607, 7055}, {608, 1264}, {610, 19611}, {649, 4561}, {650, 6516}, {652, 664}, {656, 662}, {661, 4592}, {668, 22383}, {670, 3049}, {671, 3292}, {672, 31637}, {673, 1818}, {684, 2966}, {686, 18878}, {691, 14417}, {692, 15413}, {693, 906}, {694, 12215}, {757, 3949}, {765, 3942}, {775, 6508}, {799, 810}, {805, 24284}, {811, 822}, {827, 2525}, {850, 32661}, {858, 18876}, {878, 2396}, {879, 2421}, {894, 7015}, {903, 22356}, {908, 1795}, {912, 2990}, {914, 36052}, {916, 2989}, {932, 25098}, {940, 34259}, {943, 18607}, {999, 30680}, {1000, 22129}, {1002, 23151}, {1014, 3694}, {1016, 3937}, {1025, 23696}, {1029, 22136}, {1031, 22138}, {1032, 1498}, {1037, 27509}, {1038, 2339}, {1040, 7131}, {1068, 6512}, {1069, 5905}, {1088, 1802}, {1092, 2052}, {1096, 1102}, {1101, 20902}, {1105, 6509}, {1124, 13387}, {1125, 1796}, {1126, 4001}, {1147, 5392}, {1156, 6510}, {1178, 4019}, {1211, 1798}, {1220, 22097}, {1221, 22389}, {1231, 2194}, {1249, 15394}, {1252, 1565}, {1255, 3916}, {1262, 2968}, {1265, 1407}, {1267, 34121}, {1268, 22054}, {1270, 6415}, {1271, 6416}, {1273, 11077}, {1275, 3270}, {1292, 24562}, {1301, 20580}, {1306, 17431}, {1307, 17432}, {1310, 2522}, {1333, 20336}, {1335, 13386}, {1412, 3710}, {1414, 8611}, {1415, 35518}, {1425, 7058}, {1427, 1792}, {1434, 2318}, {1439, 2287}, {1441, 2193}, {1465, 1809}, {1472, 19799}, {1473, 30701}, {1494, 3284}, {1502, 14575}, {1509, 3690}, {1576, 3267}, {1577, 4575}, {1586, 26922}, {1619, 2139}, {1634, 4580}, {1636, 16077}, {1783, 4131}, {1789, 16577}, {1791, 3666}, {1793, 18593}, {1794, 5249}, {1803, 4847}, {1807, 3218}, {1808, 16609}, {1810, 3008}, {1811, 16610}, {1819, 8808}, {1822, 2582}, {1823, 2583}, {1897, 4091}, {1909, 7116}, {1937, 6518}, {1943, 7016}, {1946, 4554}, {1958, 9255}, {1976, 6393}, {1994, 3519}, {2113, 20742}, {2148, 18695}, {2149, 17880}, {2165, 9723}, {2169, 14213}, {2207, 4176}, {2286, 30479}, {2327, 3668}, {2351, 7763}, {2353, 34254}, {2359, 4357}, {2373, 14961}, {2407, 14380}, {2420, 34767}, {2435, 34211}, {2481, 20752}, {2482, 15398}, {2504, 29241}, {2510, 2858}, {2524, 3222}, {2574, 8115}, {2575, 8116}, {2580, 2584}, {2581, 2585}, {2715, 6333}, {2972, 23582}, {2983, 18650}, {2985, 23154}, {2986, 13754}, {2987, 3564}, {2991, 34381}, {2994, 3157}, {2995, 22134}, {2996, 3167}, {2998, 20794}, {3053, 6340}, {3064, 6517}, {3083, 6213}, {3084, 6212}, {3108, 7767}, {3112, 4020}, {3158, 27832}, {3219, 7100}, {3226, 20785}, {3229, 8858}, {3260, 18877}, {3261, 32656}, {3262, 14578}, {3263, 32658}, {3264, 32659}, {3266, 14908}, {3268, 32662}, {3269, 18020}, {3295, 30679}, {3316, 5406}, {3317, 5407}, {3346, 6617}, {3433, 28420}, {3569, 17932}, {3580, 5504}, {3618, 34817}, {3669, 4571}, {3676, 4587}, {3708, 24041}, {3781, 14621}, {3784, 17743}, {3796, 18840}, {3912, 36057}, {3927, 25417}, {3952, 7254}, {3978, 17970}, {4064, 4556}, {4143, 32713}, {4358, 36058}, {4373, 20818}, {4391, 36059}, {4466, 4570}, {4552, 23189}, {4555, 22086}, {4557, 15419}, {4560, 23067}, {4562, 22384}, {4564, 7004}, {4566, 23090}, {4567, 18210}, {4574, 7192}, {4590, 20975}, {4591, 14429}, {4598, 22090}, {4652, 25430}, {4846, 15066}, {4855, 8056}, {4998, 7117}, {5391, 34125}, {5456, 16841}, {5467, 14977}, {5468, 10097}, {5490, 10132}, {5491, 10133}, {5546, 17094}, {5976, 15391}, {6010, 24560}, {6061, 20618}, {6148, 11079}, {6334, 10420}, {6335, 23224}, {6337, 8770}, {6338, 15369}, {6339, 19588}, {6356, 7054}, {6368, 18315}, {6374, 15389}, {6376, 15373}, {6511, 7040}, {6515, 15316}, {6527, 28783}, {6528, 32320}, {6542, 17972}, {6553, 23089}, {6601, 23144}, {6625, 22139}, {6626, 15377}, {6630, 22148}, {6650, 17976}, {7017, 7335}, {7023, 30681}, {7045, 34591}, {7074, 34400}, {7105, 7364}, {7114, 34404}, {7123, 17170}, {7124, 8817}, {7128, 24031}, {7219, 22119}, {7224, 23150}, {7261, 20741}, {7309, 16840}, {7319, 23140}, {7357, 20739}, {7361, 20764}, {7372, 23084}, {7473, 35911}, {7578, 23039}, {8024, 10547}, {8044, 22133}, {8046, 22141}, {8047, 22144}, {8048, 22132}, {8049, 22126}, {8050, 22154}, {8222, 8948}, {8223, 8946}, {8606, 17095}, {8677, 13136}, {8709, 22092}, {8750, 30805}, {8779, 35140}, {8813, 13615}, {8911, 34391}, {9146, 30491}, {9289, 9306}, {9295, 22158}, {9517, 17708}, {10159, 22352}, {10217, 11131}, {10218, 11130}, {10316, 18018}, {10317, 18019}, {10405, 22117}, {10411, 14582}, {10607, 34208}, {10665, 13428}, {10666, 13439}, {11517, 15474}, {11547, 16391}, {12028, 34834}, {13388, 30556}, {13389, 30557}, {13485, 22146}, {13575, 23115}, {13577, 22131}, {14206, 35200}, {14210, 36060}, {14379, 15466}, {14534, 22076}, {14570, 23286}, {14585, 18022}, {14615, 14642}, {14999, 35909}, {15329, 15421}, {15407, 15595}, {15412, 23181}, {15455, 23226}, {15740, 17811}, {15958, 18314}, {17434, 18831}, {17790, 17971}, {17946, 17977}, {17947, 17975}, {17950, 17973}, {18023, 23200}, {18026, 36054}, {18027, 23606}, {18750, 19614}, {18890, 20477}, {19126, 31360}, {19188, 31504}, {19354, 34401}, {20568, 23202}, {20777, 32020}, {21739, 23071}, {22053, 32008}, {22060, 32009}, {22061, 32010}, {22066, 32011}, {22067, 32012}, {22068, 32013}, {22074, 31643}, {22079, 31618}, {22080, 32014}, {22091, 30610}, {22093, 27805}, {22096, 31625}, {22143, 35511}, {22341, 31623}, {22344, 32017}, {22345, 30710}, {22350, 34234}, {22381, 31008}, {22388, 31624}, {22458, 35058}, {23095, 27494}, {23201, 32018}, {23210, 31622}, {26920, 34392}, {28408, 34436}, {28419, 34207}, {28696, 34427}, {28754, 34435}, {30807, 36056}, {31617, 32078}, {32657, 35517}, {32660, 35519}, {32663, 35520}, {32679, 36061}, {34483, 34545}, {35910, 35912}

X(19) = cevapoint of X(i) and X(j) for these (i,j): {1, 1707}, {2, 21216}, {6, 2178}, {25, 607}, {31, 1973}, {42, 2198}, {44, 17465}, {63, 2128}, {444, 1829}, {512, 14936}, {513, 17463}, {608, 3209}, {649, 2170}, {661, 3708}, {672, 17464}, {798, 2643}, {896, 17466}, {1400, 1880}, {1575, 20600}, {1755, 17462}, {1824, 2333}, {1953, 2180}, {2082, 30677}, {2179, 2181}, {2501, 8735}, {6203, 6204}, {8020, 16583}, {8769, 19213}, {19215, 19216}

X(19) = crosspoint of X(i) and X(j) for these (i,j): {1, 2184}, {2, 7219}, {4, 278}, {6, 8761}, {27, 28}, {57, 84}, {92, 158}, {107, 23984}, {108, 7128}, {112, 7115}, {281, 7003}, {648, 15742}, {653, 7012}, {823, 24000}, {1172, 8748}, {24033, 32714}

X(19) =

X(19) = crosssum of X(i) and X(j) for these (i,j): {1, 610}, {2, 6360}, {3, 219}, {6, 3556}, {9, 40}, {19, 1712}, {48, 255}, {71, 72}, {220, 12329}, {222, 7011}, {394, 6511}, {520, 35072}, {521, 34591}, {523, 6506}, {525, 26932}, {647, 3937}, {652, 7004}, {656, 3708}, {822, 2632}, {905, 3942}, {1400, 12089}, {3049, 22386}, {3916, 3958}

X(19) = X(i)-vertex conjugate of X(j) for these (i,j): {1, 3422}, {1946, 2202}, {2191, 3433}

X(19) = X(i)-line conjugate of X(j) for these (i,j): {1, 8766},{8768, 656}

X(19) = trilinear pole of line {661, 663}

X(19) = crossdifference of every pair of points on line {521, 656}

X(19) = X(i)-Hirst inverse of X(j) for these (i,j): (1,240), (4,242)

X(19) = X(i)-aleph conjugate of X(j) for these (i,j): (2,610), (92,19), (508,223), (648,163)

X(19) = X(i)-beth conjugate of X(j) for these (i,j): (9,198), (19,608), (112,604), (281,281), (648,273), (653,19)

X(19) = inverse-in-polar-circle of X(5179)

X(19) = inverse-in-circumconic-centered-at-X(9) of X(1861)

X(19) = Zosma transform of X(9)

X(19) = perspector of ABC and extraversion triangle of X(19) (which is also the anticevian triangle of X(19))

X(19) = intersection of tangents at X(9) and X(57) to Thomson cubic K002

X(19) = intersection of tangents at X(40) and X(84) to Darboux cubic K004

X(19) = trilinear product of PU(i) for these i: 4, 23, 157

X(19) = barycentric product of PU(15)

X(19) = vertex conjugate of PU(19)

X(19) = bicentric sum of PU(127)

X(19) = PU(127)-harmonic conjugate of X(656)

X(19) = perspector of ABC and unary cofactor triangle of hexyl triangle

X(19) = perspector of unary cofactor triangles of 2nd and 4th extouch triangles

X(19) = perspector of ABC and unary cofactor triangle of extraversion triangle of X(9)

X(19) = complement of X(4329)

X(19) = {X(48),:ref:X(1953) <X(1953)>}-harmonic conjugate of X(1)

X(19) = {X(92),:ref:X(1748) <X(1748)>}-harmonic conjugate of X(63)

X(19) = trilinear product X(2)

X(19) = trilinear pole of line X(661)X(663) (the polar of X(75) wrt polar circle)

X(19) = pole wrt polar circle of trilinear polar of X(75) (line X(514)X(661))

X(19) = polar conjugate of X(75)

X(19) = X(i)-isoconjugate of X(j) for these {i,j}: {1,63}, {6,69}, {31,304}, {48,75}, {67, 22151}, {92,255}

X(19) = X(571)-of-excentral-triangle

X(19) = perspector, wrt excentral triangle, of polar circle

X(19) = barycentric product X(i)*X(j) for these {i,j}: {1, 4}, {3, 158}, {5, 2190}, {6, 92}, {7, 33}, {8, 34}, {9, 278}, {10, 28}, {11, 7012}, {12, 270}, {21, 225}, {24, 91}, {25, 75}, {27, 37}, {29, 65}, {30, 36119}, {31, 264}, {32, 1969}, {38, 32085}, {41, 331}, {42, 286}, {44, 6336}, {46, 7040}, {47, 847}, {48, 2052}, {53, 2167}, {55, 273}, {56, 318}, {57, 281}, {63, 393}, {64, 1895}, {69, 1096}, {72, 8747}, {73, 1896}, {74, 1784}, {76, 1973}, {77, 1857}, {78, 1118}, {79, 6198}, {80, 1870}, {81, 1826}, {82, 427}, {83, 17442}, {84, 7952}, {85, 607}, {86, 1824}, {88, 8756}, {90, 1068}, {93, 2964}, {95, 2181}, {98, 240}, {100, 7649}, {101, 17924}, {104, 1785}, {105, 1861}, {107, 656}, {108, 522}, {110, 24006}, {112, 1577}, {125, 24000}, {162, 523}, {163, 14618}, {185, 821}, {186, 2166}, {189, 2331}, {190, 6591}, {196, 282}, {200, 1119}, {204, 253}, {207, 1034}, {208, 280}, {220, 1847}, {221, 7020}, {223, 7003}, {226, 1172}, {232, 1821}, {235, 775}, {242, 291}, {243, 1937}, {244, 15742}, {250, 1109}, {251, 20883}, {254, 920}, {255, 1093}, {256, 7009}, {257, 7119}, {267, 451}, {269, 7046}, {274, 2333}, {275, 1953}, {276, 2179}, {277, 7719}, {279, 7079}, {293, 6530}, {294, 5236}, {297, 1910}, {304, 2207}, {306, 5317}, {309, 3195}, {312, 608}, {313, 2203}, {321, 1474}, {322, 7151}, {324, 2148}, {326, 6524}, {329, 7129}, {333, 1880}, {335, 2201}, {336, 34854}, {341, 1398}, {342, 2192}, {346, 1435}, {347, 7008}, {349, 2204}, {388, 1039}, {394, 6520}, {403, 36053}, {415, 2652}, {419, 1581}, {423, 9278}, {429, 2363}, {436, 9251}, {458, 2186}, {459, 610}, {460, 8773}, {467, 2168}, {468, 897}, {469, 2214}, {470, 2153}, {471, 2154}, {477, 36063}, {497, 1041}, {502, 2906}, {511, 36120}, {512, 811}, {513, 1897}, {514, 1783}, {515, 36121}, {516, 36122}, {517, 36123}, {518, 36124}, {519, 36125}, {520, 36126}, {521, 36127}, {524, 36128}, {525, 24019}, {526, 36129}, {560, 18022}, {561, 1974}, {577, 6521}, {596, 4222}, {604, 7017}, {647, 823}, {648, 661}, {649, 6335}, {650, 653}, {651, 3064}, {657, 13149}, {662, 2501}, {663, 18026}, {664, 18344}, {673, 5089}, {693, 8750}, {757, 7140}, {759, 860}, {765, 2969}, {774, 1105}, {798, 6331}, {799, 2489}, {810, 6528}, {822, 15352}, {849, 7141}, {850, 32676}, {862, 18827}, {896, 17983}, {915, 1737}, {917, 1736}, {921, 3542}, {933, 2618}, {941, 5307}, {943, 1838}, {969, 4207}, {977, 5090}, {994, 5136}, {1018, 17925}, {1020, 17926}, {1043, 1426}, {1061, 1478}, {1063, 1479}, {1065, 1905}, {1088, 7071}, {1097, 31942}, {1101, 2970}, {1110, 2973}, {1113, 2588}, {1114, 2589}, {1120, 1878}, {1123, 6212}, {1128, 8120}, {1146, 7128}, {1148, 3362}, {1156, 23710}, {1170, 1855}, {1214, 8748}, {1220, 1829}, {1222, 1828}, {1247, 3144}, {1249, 2184}, {1255, 1839}, {1257, 1842}, {1268, 2355}, {1300, 1725}, {1301, 17898}, {1304, 36035}, {1309, 1769}, {1320, 1877}, {1336, 6213}, {1390, 1890}, {1395, 3596}, {1396, 2321}, {1400, 31623}, {1407, 7101}, {1411, 5081}, {1427, 2322}, {1441, 2299}, {1446, 2332}, {1488, 8122}, {1490, 7149}, {1503, 8767}, {1594, 2216}, {1697, 11546}, {1707, 34208}, {1712, 3346}, {1733, 3563}, {1734, 26705}, {1735, 32706}, {1738, 15344}, {1745, 7049}, {1748, 2165}, {1755, 16081}, {1757, 17982}, {1760, 13854}, {1820, 11547}, {1825, 3615}, {1827, 21453}, {1835, 6740}, {1843, 3112}, {1848, 2298}, {1867, 5331}, {1876, 14942}, {1886, 36101}, {1929, 17927}, {1940, 7105}, {1945, 1948}, {1947, 7106}, {1952, 2202}, {1957, 9307}, {1959, 6531}, {1966, 17980}, {1967, 17984}, {1990, 2349}, {2074, 5620}, {2089, 8121}, {2129, 6392}, {2155, 15466}, {2156, 17907}, {2161, 17923}, {2169, 13450}, {2173, 16080}, {2183, 16082}, {2185, 8736}, {2189, 6358}, {2212, 6063}, {2217, 17555}, {2218, 5125}, {2312, 6330}, {2326, 6354}, {2334, 5342}, {2354, 30710}, {2356, 2481}, {2358, 27398}, {2362, 14121}, {2432, 24035}, {2433, 24001}, {2435, 24024}, {2517, 32691}, {2574, 2586}, {2575, 2587}, {2576, 2592}, {2577, 2593}, {2580, 8105}, {2581, 8106}, {2616, 35360}, {2631, 15459}, {2632, 32230}, {2643, 18020}, {2648, 17985}, {2766, 21180}, {2799, 36104}, {2804, 36110}, {2962, 3518}, {2968, 24033}, {2971, 24037}, {2972, 24021}, {2995, 3192}, {3068, 19218}, {3069, 19217}, {3120, 5379}, {3176, 3345}, {3186, 3223}, {3209, 34404}, {3239, 32714}, {3270, 24032}, {3377, 13429}, {3378, 13440}, {3424, 23052}, {3577, 34231}, {3668, 4183}, {3708, 23582}, {3718, 7337}, {3900, 36118}, {3912, 8751}, {3924, 34406}, {4185, 31359}, {4186, 34860}, {4213, 13610}, {4235, 23894}, {4336, 34398}, {4358, 8752}, {4391, 32674}, {4564, 8735}, {4858, 7115}, {5338, 5936}, {5627, 35201}, {5663, 36130}, {5932, 7007}, {6059, 7182}, {6149, 6344}, {6353, 8769}, {6525, 19611}, {6529, 24018}, {6590, 36099}, {6995, 23051}, {7073, 7282}, {7090, 16232}, {7094, 17902}, {7096, 17904}, {7097, 17903}, {7108, 7120}, {7133, 13390}, {7219, 36103}, {8119, 10215}, {8749, 14206}, {8753, 14210}, {8754, 24041}, {8755, 36100}, {8772, 35142}, {8791, 16568}, {8806, 8885}, {8882, 14213}, {9239, 11380}, {9247, 18027}, {9258, 9308}, {11019, 14493}, {11109, 34434}, {11325, 18832}, {13476, 14004}, {14208, 32713}, {14248, 18156}, {14249, 19614}, {14273, 36085}, {14304, 36067}, {14312, 36044}, {14377, 17916}, {14571, 34234}, {14581, 33805}, {14776, 36038}, {14975, 20565}, {15149, 18785}, {15369, 33787}, {16230, 36084}, {16263, 18477}, {17171, 18098}, {17763, 17981}, {17954, 17987}, {17994, 36036}, {18070, 35325}, {18486, 22455}, {18833, 27369}, {20879, 33631}, {20902, 23964}, {20975, 23999}, {21185, 26706}, {21189, 26704}, {21666, 24027}, {23290, 36134}, {23604, 30733}, {23984, 34591}, {27376, 34055}

X(19) = barycentric quotient X(i)/X(j) for these {i,j}: {1, 69}, {2, 304}, {3, 326}, {4, 75}, {5, 18695}, {6, 63}, {7, 7182}, {8, 3718}, {9, 345}, {10, 20336}, {11, 17880}, {21, 332}, {25, 1}, {27, 274}, {28, 86}, {29, 314}, {31, 3}, {32, 48}, {33, 8}, {34, 7}, {37, 306}, {38, 3933}, {41, 219}, {42, 72}, {44, 3977}, {47, 9723}, {48, 394}, {53, 14213}, {55, 78}, {56, 77}, {57, 348}, {58, 1444}, {63, 3926}, {64, 19611}, {65, 307}, {71, 3998}, {75, 305}, {77, 7055}, {78, 1264}, {81, 17206}, {82, 1799}, {91, 20563}, {92, 76}, {98, 336}, {100, 4561}, {101, 1332}, {105, 31637}, {107, 811}, {108, 664}, {109, 6516}, {110, 4592}, {112, 662}, {115, 20902}, {125, 17879}, {132, 17875}, {136, 17881}, {158, 264}, {162, 99}, {163, 4558}, {169, 28420}, {181, 201}, {184, 255}, {200, 1265}, {204, 20}, {205, 22132}, {207, 5932}, {208, 347}, {210, 3710}, {212, 1259}, {213, 71}, {219, 3719}, {220, 3692}, {221, 7013}, {222, 7183}, {225, 1441}, {226, 1231}, {228, 3682}, {232, 1959}, {235, 17858}, {240, 325}, {242, 350}, {244, 1565}, {250, 24041}, {251, 34055}, {255, 3964}, {256, 7019}, {264, 561}, {269, 7056}, {270, 261}, {273, 6063}, {278, 85}, {281, 312}, {284, 1812}, {286, 310}, {291, 337}, {293, 6394}, {318, 3596}, {326, 4176}, {331, 20567}, {393, 92}, {394, 1102}, {407, 18698}, {419, 1966}, {422, 5209}, {427, 1930}, {429, 18697}, {430, 4647}, {431, 18692}, {451, 20932}, {458, 3403}, {460, 1733}, {461, 4673}, {468, 14210}, {469, 33935}, {512, 656}, {513, 4025}, {514, 15413}, {522, 35518}, {523, 14208}, {560, 184}, {577, 6507}, {603, 1804}, {604, 222}, {607, 9}, {608, 57}, {614, 17170}, {647, 24018}, {648, 799}, {649, 905}, {650, 6332}, {653, 4554}, {656, 3265}, {661, 525}, {662, 4563}, {663, 521}, {667, 1459}, {669, 810}, {672, 25083}, {685, 36036}, {692, 1331}, {728, 30681}, {738, 30682}, {756, 3695}, {798, 647}, {800, 6508}, {810, 520}, {811, 670}, {823, 6331}, {847, 20571}, {860, 35550}, {862, 740}, {869, 3781}, {872, 3690}, {884, 23696}, {896, 6390}, {897, 30786}, {902, 5440}, {904, 7015}, {905, 30805}, {910, 26006}, {911, 1815}, {913, 2990}, {922, 3292}, {923, 895}, {1015, 3942}, {1019, 15419}, {1021, 15411}, {1039, 30479}, {1041, 8817}, {1042, 1439}, {1055, 6510}, {1068, 20930}, {1096, 4}, {1100, 4001}, {1104, 18650}, {1106, 7053}, {1109, 339}, {1118, 273}, {1119, 1088}, {1148, 18749}, {1172, 333}, {1196, 18671}, {1197, 22065}, {1249, 18750}, {1253, 1260}, {1254, 6356}, {1333, 1790}, {1334, 3694}, {1395, 56}, {1396, 1434}, {1397, 603}, {1398, 269}, {1400, 1214}, {1402, 73}, {1407, 7177}, {1415, 1813}, {1422, 34400}, {1426, 3668}, {1430, 5088}, {1435, 279}, {1438, 1814}, {1459, 4131}, {1460, 1038}, {1474, 81}, {1500, 3949}, {1501, 9247}, {1576, 4575}, {1577, 3267}, {1580, 12215}, {1611, 2128}, {1707, 6337}, {1712, 6527}, {1748, 7763}, {1755, 36212}, {1760, 34254}, {1781, 28754}, {1783, 190}, {1784, 3260}, {1785, 3262}, {1824, 10}, {1826, 321}, {1827, 4847}, {1828, 3663}, {1829, 4357}, {1839, 4359}, {1840, 3963}, {1841, 5249}, {1842, 17863}, {1843, 38}, {1848, 20911}, {1851, 3673}, {1852, 18690}, {1855, 1229}, {1856, 23528}, {1857, 318}, {1859, 6734}, {1860, 17866}, {1861, 3263}, {1862, 4986}, {1870, 320}, {1875, 22464}, {1876, 9436}, {1878, 1266}, {1880, 226}, {1886, 30807}, {1889, 32092}, {1890, 26234}, {1895, 14615}, {1897, 668}, {1900, 4967}, {1910, 287}, {1911, 295}, {1914, 20769}, {1917, 14575}, {1918, 228}, {1919, 22383}, {1922, 2196}, {1923, 20775}, {1924, 3049}, {1927, 17970}, {1950, 7364}, {1951, 6518}, {1953, 343}, {1957, 1975}, {1959, 6393}, {1964, 3917}, {1967, 36214}, {1968, 1958}, {1969, 1502}, {1973, 6}, {1974, 31}, {1976, 293}, {1981, 15418}, {1990, 14206}, {2052, 1969}, {2082, 27509}, {2083, 6389}, {2085, 20819}, {2112, 20742}, {2128, 6338}, {2129, 6339}, {2148, 97}, {2155, 1073}, {2156, 14376}, {2157, 34897}, {2159, 14919}, {2164, 6513}, {2166, 328}, {2167, 34386}, {2170, 26932}, {2171, 26942}, {2172, 20806}, {2173, 11064}, {2175, 212}, {2176, 22370}, {2177, 3940}, {2178, 6505}, {2179, 216}, {2181, 5}, {2184, 34403}, {2187, 7078}, {2189, 2185}, {2190, 95}, {2192, 271}, {2193, 6514}, {2194, 283}, {2199, 7011}, {2200, 3990}, {2201, 239}, {2202, 1944}, {2203, 58}, {2204, 284}, {2205, 2200}, {2206, 1437}, {2208, 1433}, {2209, 20760}, {2210, 7193}, {2211, 1755}, {2212, 55}, {2223, 1818}, {2251, 22356}, {2258, 34259}, {2260, 18607}, {2280, 23151}, {2295, 4019}, {2299, 21}, {2300, 22097}, {2308, 3916}, {2310, 2968}, {2312, 441}, {2326, 7058}, {2328, 1792}, {2331, 329}, {2332, 2287}, {2333, 37}, {2342, 1809}, {2345, 19799}, {2354, 3666}, {2355, 1125}, {2356, 518}, {2358, 8808}, {2484, 2522}, {2489, 661}, {2501, 1577}, {2576, 8115}, {2577, 8116}, {2586, 15164}, {2587, 15165}, {2588, 22339}, {2589, 22340}, {2624, 8552}, {2642, 14417}, {2643, 125}, {2908, 22130}, {2969, 1111}, {2970, 23994}, {2971, 2643}, {2972, 24020}, {3049, 822}, {3051, 4020}, {3052, 4855}, {3063, 652}, {3064, 4391}, {3079, 1097}, {3122, 18210}, {3124, 3708}, {3125, 4466}, {3162, 18596}, {3172, 610}, {3176, 33672}, {3186, 17149}, {3192, 3869}, {3194, 8822}, {3195, 40}, {3199, 1953}, {3209, 223}, {3213, 18623}, {3239, 15416}, {3248, 3937}, {3270, 24031}, {3271, 7004}, {3377, 13441}, {3378, 13430}, {3542, 33808}, {3553, 26872}, {3554, 26871}, {3563, 8773}, {3575, 17859}, {3708, 15526}, {3709, 8611}, {3725, 22076}, {3914, 20235}, {3939, 4571}, {4017, 17094}, {4118, 4121}, {4183, 1043}, {4185, 10436}, {4186, 3875}, {4206, 1010}, {4212, 33943}, {4213, 17762}, {4214, 25590}, {4222, 4360}, {4235, 24039}, {4705, 4064}, {4730, 14429}, {5089, 3912}, {5095, 24038}, {5101, 33937}, {5139, 17876}, {5151, 20900}, {5190, 17878}, {5254, 21406}, {5307, 34284}, {5317, 27}, {5338, 3616}, {5379, 4600}, {5521, 17877}, {5523, 20884}, {6059, 33}, {6139, 14414}, {6186, 7100}, {6187, 1807}, {6198, 319}, {6212, 1267}, {6213, 5391}, {6331, 4602}, {6335, 1978}, {6336, 20568}, {6353, 18156}, {6423, 19215}, {6424, 19216}, {6520, 2052}, {6521, 18027}, {6524, 158}, {6525, 1895}, {6529, 823}, {6531, 1821}, {6591, 514}, {6620, 4008}, {6748, 20879}, {7003, 34404}, {7007, 1034}, {7008, 280}, {7009, 1909}, {7012, 4998}, {7017, 28659}, {7032, 3784}, {7040, 20570}, {7046, 341}, {7071, 200}, {7076, 7283}, {7079, 346}, {7083, 1040}, {7102, 4385}, {7104, 7116}, {7113, 22128}, {7115, 4564}, {7118, 268}, {7119, 894}, {7120, 1943}, {7121, 23086}, {7122, 3955}, {7128, 1275}, {7129, 189}, {7140, 1089}, {7147, 20618}, {7151, 84}, {7154, 282}, {7156, 27382}, {7337, 34}, {7649, 693}, {7713, 17321}, {7719, 344}, {7952, 322}, {8020, 16583}, {8022, 22364}, {8061, 2525}, {8105, 2582}, {8106, 2583}, {8557, 6350}, {8609, 914}, {8640, 22090}, {8678, 23874}, {8735, 4858}, {8736, 6358}, {8743, 1760}, {8744, 16568}, {8745, 1748}, {8747, 286}, {8748, 31623}, {8749, 2349}, {8750, 100}, {8751, 673}, {8752, 88}, {8753, 897}, {8754, 1109}, {8756, 4358}, {8767, 35140}, {8769, 6340}, {8772, 3564}, {8792, 21378}, {8879, 20931}, {8882, 2167}, {9247, 577}, {9258, 9289}, {9292, 9255}, {9406, 3284}, {9417, 3289}, {9454, 20752}, {9456, 1797}, {9459, 23202}, {10151, 18699}, {10312, 18042}, {11325, 1740}, {11363, 3879}, {11380, 1582}, {11383, 997}, {11396, 17272}, {11406, 936}, {12723, 34822}, {14004, 17143}, {14213, 28706}, {14248, 8769}, {14398, 2631}, {14560, 36061}, {14571, 908}, {14580, 18669}, {14581, 2173}, {14585, 4100}, {14593, 91}, {14618, 20948}, {14776, 36037}, {14827, 1802}, {14936, 34591}, {14975, 35}, {15148, 2669}, {15149, 18157}, {15487, 28409}, {15742, 7035}, {16080, 33805}, {16228, 17894}, {16229, 17893}, {16240, 1099}, {16502, 7289}, {16544, 28696}, {16545, 28408}, {16583, 18589}, {16584, 20727}, {16716, 18648}, {17171, 16703}, {17408, 21147}, {17409, 2172}, {17442, 141}, {17453, 10316}, {17469, 7767}, {17516, 17151}, {17562, 17394}, {17872, 1368}, {17902, 20926}, {17903, 20914}, {17904, 20444}, {17905, 20927}, {17906, 21580}, {17907, 20641}, {17910, 21585}, {17911, 18137}, {17912, 18050}, {17913, 18138}, {17914, 21604}, {17915, 18040}, {17916, 17233}, {17917, 21605}, {17920, 20923}, {17922, 20949}, {17923, 20924}, {17924, 3261}, {17925, 7199}, {17927, 20947}, {17980, 1581}, {17982, 18032}, {17984, 1926}, {18020, 24037}, {18022, 1928}, {18026, 4572}, {18191, 17219}, {18210, 17216}, {18266, 17976}, {18344, 522}, {18384, 2166}, {18596, 28419}, {18676, 21579}, {18677, 21581}, {18680, 21583}, {18681, 21584}, {18756, 23079}, {19118, 1707}, {19215, 8222}, {19216, 8223}, {19217, 5491}, {19218, 5490}, {19554, 20741}, {19614, 15394}, {20613, 28739}, {20624, 8777}, {20883, 8024}, {20970, 3958}, {20975, 2632}, {20978, 10167}, {20979, 25098}, {21148, 1763}, {21389, 28423}, {21750, 23620}, {21760, 20785}, {21832, 24459}, {21833, 21046}, {22363, 22057}, {22383, 4091}, {23050, 10327}, {23503, 2524}, {23566, 20736}, {23710, 30806}, {23894, 14977}, {23985, 7128}, {24000, 18020}, {24006, 850}, {24018, 4143}, {24019, 648}, {24022, 32230}, {27369, 1964}, {27376, 20883}, {28044, 3886}, {28615, 1796}, {31623, 28660}, {31900, 16709}, {31905, 30940}, {32085, 3112}, {32230, 23999}, {32664, 20739}, {32674, 651}, {32676, 110}, {32691, 1310}, {32696, 36084}, {32713, 162}, {32714, 658}, {32715, 36034}, {32739, 906}, {32740, 36060}, {33581, 19614}, {33781, 19583}, {34121, 3084}, {34125, 3083}, {34248, 3504}, {34397, 6149}, {34417, 18477}, {34591, 23983}, {34854, 240}, {34858, 1795}, {35201, 6148}, {36059, 6517}, {36063, 35520}, {36084, 17932}, {36103, 4329}, {36104, 2966}, {36114, 18878}, {36118, 4569}, {36119, 1494}, {36120, 290}, {36121, 34393}, {36122, 18025}, {36123, 18816}, {36124, 2481}, {36125, 903}, {36126, 6528}, {36127, 18026}, {36128, 671}, {36129, 35139}

X(19) = {X(i),X(j)}-harmonic conjugate of X(k) for these (i,j,k): {1, 240, 23052}, {1, 610, 48}, {1, 16545, 18596}, {1, 18594, 610}, {2, 3101, 10319}, {2, 4329, 18589}, {2, 9536, 3101}, {2, 18589, 31261}, {2, 20061, 4329}, {2, 26789, 27127}, {2, 26837, 27180}, {4, 40, 11471}, {4, 281, 1826}, {4, 6197, 40}, {4, 7719, 7079}, {5, 8141, 8251}, {6, 1841, 34}, {6, 2182, 2261}, {6, 3197, 19350}, {6, 14571, 2331}, {6, 21767, 1409}, {7, 7291, 7289}, {8, 4198, 1891}, {8, 5279, 5227}, {9, 40, 71}, {9, 281, 7079}, {9, 2270, 2183}, {9, 16547, 169}, {9, 16548, 1766}, {25, 1824, 33}, {25, 2355, 5338}, {25, 11406, 55}, {27, 92, 5307}, {28, 1172, 1474}, {31, 1096, 204}, {31, 2181, 1096}, {33, 5338, 25}, {37, 910, 198}, {41, 2171, 3553}, {46, 1723, 579}, {46, 1731, 1732}, {48, 1953, 1}, {48, 2173, 610}, {48, 18597, 18596}, {51, 3611, 11435}, {55, 1859, 33}, {57, 278, 1435}, {57, 2257, 2260}, {65, 2182, 19350}, {65, 2264, 6}, {75, 92, 20883}, {75, 1760, 63}, {75, 16568, 1760}, {75, 20915, 20884}, {75, 21582, 21406}, {92, 1748, 63}, {169, 1766, 9}, {225, 1452, 208}, {269, 18725, 3942}, {284, 1630, 48}, {326, 18713, 1959}, {346, 10327, 3610}, {573, 15830, 71}, {579, 1723, 1732}, {579, 1731, 1723}, {604, 2170, 3554}, {607, 608, 6}, {607, 1880, 2331}, {607, 4185, 7119}, {608, 1880, 34}, {610, 18594, 2173}, {610, 18595, 18596}, {1195, 1400, 1182}, {1610, 2303, 48}, {1707, 1957, 8765}, {1707, 8769, 33781}, {1726, 1730, 1708}, {1729, 1765, 1741}, {1733, 1747, 920}, {1755, 16567, 63}, {1762, 24310, 63}, {1820, 2180, 920}, {1824, 2355, 25}, {1826, 1839, 4}, {1826, 8756, 281}, {1827, 7071, 33}, {1829, 4185, 34}, {1839, 8756, 1826}, {1841, 14571, 1880}, {1842, 1869, 4}, {1857, 30223, 7008}, {1861, 1890, 4}, {1950, 1951, 577}, {1953, 2173, 48}, {1958, 1959, 326}, {1973, 17442, 1}, {2082, 2285, 6}, {2164, 2178, 1609}, {2182, 2262, 6}, {2207, 16583, 36103}, {2264, 3197, 2261}, {2358, 3209, 207}, {2358, 7154, 7129}, {2362, 16232, 34}, {3209, 7154, 1033}, {3377, 3378, 920}, {4329, 18589, 31158}, {5271, 21376, 63}, {5341, 7297, 6}, {5341, 7300, 5356}, {5356, 7297, 7300}, {5356, 7300, 6}, {6203, 7348, 3069}, {6204, 7347, 3068}, {6212, 6213, 4}, {7713, 7719, 2333}, {8735, 8736, 53}, {9816, 10319, 2}, {10536, 11428, 184}, {11190, 11435, 3611}, {12329, 21867, 28043}, {13438, 13460, 208}, {14206, 21406, 21582}, {16027, 16033, 5}, {16031, 16036, 54}, {16545, 18595, 18597}, {16547, 16548, 9}, {18650, 25935, 26130}, {19555, 19591, 63}, {21160, 30265, 3}, {24683, 26130, 18650}, {26998, 27059, 2}, {31158, 31261, 18589}, {34121, 34125, 25}