X(22) = EXETER POINT

Trilinears

\(a(b4 + c4 - a4) : b(c4 + a4 - b4) : c(a4 + b4 - c4)\)

Barycentrics

\(a2(b4 + c4 - a4) : b2(c4 + a4 - b4) : c2(a4 + b4 - c4)\)

\(sin 2A - tan ω : sin 2B - tan ω : : (M. Iliev, 5/13/07)\)

\(tan B + tan C - tan A + tan ω : : (R. Hutson, 10/13/15)\)

Notes

As a point on the Euler line, X(22) has Shinagawa coefficients (E + 2F, -2E - 2F).

X(22) is the perspector of the circummedial triangle and the tangential triangle; also

X(22) = X(55)-of-the-tangential triangle if ABC is acute. See the note just before X(1601) for a generalization.

Let La be the polar of X(3) wrt the A-power circle, and define Lb, Lc cyclically. Let A’ = Lb∩Lc, B’ = Lc∩La, C’ = La∩Lb. The triangle A’B’C’ is homothetic to the anticomplementary triangle, and the center of homothety is X(22). (Randy Hutson, September 5, 2015)

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

If you have GeoGebra, you can view Exeter point. X(22) lies on these lines: {1, 5310}, {2, 3}, {6, 251}, {8, 8193}, {9, 5314}, {10, 8185}, {11, 9673}, {12, 9658}, {31, 5329}, {32, 1194}, {35, 612}, {36, 614}, {40, 9626}, {42, 37576}, {49, 16266}, {51, 182}, {52, 7592}, {54, 36747}, {55, 3100}, {56, 977}, {57, 7293}, {63, 3220}, {64, 11440}, {66, 34177}, {68, 32048}, {69, 159}, {74, 2931}, {75, 21407}, {76, 1799}, {81, 36740}, {83, 41928}, {97, 19189}, {98, 925}, {99, 305}, {100, 197}, {105, 13397}, {107, 15466}, {110, 154}, {111, 2079}, {112, 3162}, {114, 23217}, {125, 41674}, {127, 11605}, {132, 35969}, {141, 20987}, {143, 36753}, {145, 8192}, {146, 9919}, {147, 9861}, {148, 13175}, {149, 13222}, {153, 9913}, {155, 1614}, {156, 6101}, {157, 183}, {160, 325}, {161, 343}, {165, 9590}, {184, 511}, {187, 1196}, {193, 19119}, {194, 9917}, {195, 12226}, {198, 27396}, {206, 3313}, {216, 10311}, {220, 26911}, {221, 19367}, {230, 8553}, {232, 577}, {238, 27661}, {262, 40393}, {264, 1629}, {280, 7172}, {315, 23208}, {316, 14558}, {321, 23847}, {323, 3167}, {324, 33971}, {347, 1617}, {348, 39732}, {353, 11173}, {371, 9683}, {373, 17508}, {385, 3164}, {386, 9571}, {388, 10831}, {389, 10984}, {390, 16541}, {399, 12219}, {476, 2697}, {477, 16167}, {485, 35776}, {486, 35777}, {487, 9921}, {488, 9922}, {491, 26307}, {492, 26306}, {497, 10832}, {515, 15177}, {519, 37546}, {524, 35707}, {543, 3455}, {567, 39522}, {569, 5446}, {573, 9570}, {574, 9699}, {575, 15004}, {576, 13366}, {595, 2922}, {599, 19596}, {616, 9916}, {617, 9915}, {627, 22657}, {628, 22656}, {638, 8996}, {669, 6563}, {675, 1305}, {689, 40362}, {842, 10420}, {901, 10016}, {907, 40189}, {930, 15959}, {940, 4265}, {956, 33090}, {958, 9712}, {962, 9911}, {991, 1790}, {999, 17024}, {1001, 20988}, {1007, 44180}, {1030, 5275}, {1040, 24611}, {1069, 9638}, {1078, 40022}, {1092, 10282}, {1112, 19154}, {1147, 9707}, {1151, 9694}, {1152, 12224}, {1154, 18445}, {1181, 5889}, {1184, 1627}, {1192, 43601}, {1199, 37493}, {1216, 10539}, {1225, 2934}, {1269, 23365}, {1270, 5594}, {1271, 5595}, {1289, 39436}, {1294, 1302}, {1295, 9058}, {1296, 14657}, {1311, 41906}, {1324, 7081}, {1351, 1994}, {1352, 31383}, {1369, 11641}, {1376, 9713}, {1383, 5024}, {1384, 5354}, {1407, 26910}, {1437, 37482}, {1460, 17126}, {1473, 3218}, {1486, 1621}, {1495, 3098}, {1498, 2917}, {1602, 1626}, {1603, 2933}, {1605, 2925}, {1606, 2926}, {1609, 7735}, {1611, 5023}, {1612, 7742}, {1613, 2076}, {1615, 2919}, {1616, 2920}, {1620, 2929}, {1634, 6148}, {1637, 25644}, {1661, 38918}, {1670, 8881}, {1671, 8880}, {1691, 3981}, {1714, 5358}, {1760, 4123}, {1843, 9813}, {1853, 23293}, {1899, 3580}, {1915, 3094}, {1972, 40870}, {1974, 11574}, {1975, 8024}, {1992, 32621}, {2000, 21370}, {2056, 5104}, {2077, 36984}, {2172, 4456}, {2178, 26242}, {2192, 11446}, {2194, 4259}, {2370, 9059}, {2393, 27365}, {2493, 38872}, {2693, 9060}, {2770, 14729}, {2777, 22109}, {2782, 5986}, {2799, 42659}, {2888, 9920}, {2896, 9918}, {2923, 24303}, {2924, 24304}, {2930, 14682}, {2932, 35221}, {2967, 23606}, {2975, 22654}, {3006, 23361}, {3007, 18613}, {3011, 36152}, {3051, 5017}, {3052, 5078}, {3066, 11451}, {3085, 10037}, {3086, 10046}, {3124, 38880}, {3197, 11445}, {3219, 7085}, {3291, 5206}, {3292, 44110}, {3295, 9538}, {3410, 18440}, {3434, 10829}, {3436, 10830}, {3447, 5968}, {3448, 12310}, {3504, 8782}, {3556, 3869}, {3563, 13398}, {3567, 36752}, {3576, 9625}, {3592, 34516}, {3594, 34515}, {3616, 11365}, {3648, 16119}, {3681, 12329}, {3705, 15654}, {3721, 21771}, {3734, 8891}, {3736, 44118}, {3746, 9643}, {3757, 23850}, {3781, 26885}, {3784, 26884}, {3819, 5651}, {3868, 37547}, {3870, 40910}, {3871, 20020}, {3873, 22769}, {3926, 40123}, {3955, 26892}, {3964, 37668}, {4057, 20294}, {4252, 33774}, {4260, 5320}, {4383, 5096}, {4440, 24822}, {4549, 32111}, {4550, 16194}, {5010, 5268}, {5013, 9608}, {5050, 9777}, {5085, 5640}, {5092, 5943}, {5093, 16981}, {5134, 24054}, {5138, 40952}, {5157, 9969}, {5172, 29665}, {5188, 42671}, {5191, 38553}, {5201, 14614}, {5204, 7292}, {5217, 5297}, {5272, 7280}, {5276, 36744}, {5304, 8573}, {5324, 24597}, {5406, 12305}, {5407, 12306}, {5408, 11825}, {5409, 8989}, {5412, 11514}, {5413, 11513}, {5462, 13336}, {5480, 37649}, {5523, 13854}, {5552, 26309}, {5562, 6759}, {5601, 8190}, {5602, 8191}, {5621, 9140}, {5687, 33091}, {5695, 23848}, {5706, 41723}, {5858, 14179}, {5859, 14173}, {5864, 11126}, {5865, 11127}, {5866, 19583}, {5890, 37489}, {5897, 9064}, {5907, 26883}, {5921, 39879}, {5938, 6031}, {5966, 14656}, {5976, 14713}, {5987, 13188}, {6090, 8780}, {6193, 9908}, {6194, 22655}, {6198, 9645}, {6200, 8854}, {6221, 9695}, {6223, 9910}, {6224, 9912}, {6225, 9914}, {6241, 8718}, {6243, 12161}, {6284, 9672}, {6337, 40125}, {6360, 20999}, {6396, 8855}, {6462, 8194}, {6463, 8195}, {6467, 40318}, {6480, 32567}, {6481, 32574}, {6503, 7710}, {6515, 6776}, {6527, 15589}, {6560, 18289}, {6561, 18290}, {6688, 22112}, {6781, 9745}, {7071, 9539}, {7083, 17127}, {7193, 26893}, {7262, 24436}, {7354, 9659}, {7585, 19006}, {7586, 19005}, {7669, 8667}, {7689, 10575}, {7750, 15270}, {7754, 8267}, {7761, 21248}, {7774, 20775}, {7779, 20794}, {7781, 19568}, {7787, 10790}, {7802, 16275}, {7823, 8878}, {7842, 30747}, {7878, 42037}, {7893, 19597}, {7910, 30785}, {7998, 17811}, {7999, 43598}, {8053, 20291}, {8125, 8131}, {8126, 8132}, {8276, 9540}, {8277, 13935}, {8280, 35820}, {8281, 35821}, {8546, 8584}, {8588, 20481}, {8591, 9876}, {8680, 24321}, {8717, 14855}, {8743, 10316}, {8793, 19613}, {8879, 41361}, {8903, 8904}, {8911, 26875}, {8939, 19406}, {8943, 19407}, {8972, 13889}, {9056, 41904}, {9057, 41905}, {9070, 39435}, {9084, 20187}, {9123, 34519}, {9209, 39228}, {9536, 11406}, {9537, 10306}, {9732, 10132}, {9733, 10133}, {9744, 23195}, {9781, 43651}, {9786, 10574}, {9833, 14516}, {9865, 23173}, {9874, 12411}, {9924, 12272}, {9927, 11750}, {9934, 12825}, {9937, 11411}, {9967, 44077}, {10192, 11064}, {10203, 13423}, {10263, 32046}, {10314, 10979}, {10330, 25046}, {10519, 14826}, {10527, 26308}, {10528, 10834}, {10529, 10835}, {10540, 15068}, {10541, 12834}, {10545, 31860}, {10546, 41424}, {10602, 37784}, {10605, 15072}, {10606, 11454}, {10641, 11516}, {10642, 11515}, {10733, 19457}, {10982, 13434}, {11012, 36986}, {11061, 32262}, {11174, 41328}, {11202, 36987}, {11245, 37644}, {11363, 37613}, {11422, 11477}, {11424, 13598}, {11433, 25406}, {11439, 15811}, {11443, 17813}, {11444, 17814}, {11447, 17819}, {11448, 17820}, {11449, 17821}, {11452, 17826}, {11453, 17827}, {11455, 11472}, {11456, 13754}, {11457, 12359}, {11459, 14157}, {11464, 37483}, {11480, 37776}, {11481, 37775}, {11511, 44102}, {11550, 21243}, {11580, 15655}, {11610, 22075}, {11629, 14184}, {11630, 14183}, {11643, 33998}, {11671, 14652}, {11820, 35450}, {11898, 14683}, {12017, 15018}, {12118, 19908}, {12160, 19347}, {12164, 43605}, {12203, 40814}, {12221, 12978}, {12222, 12979}, {12256, 12972}, {12257, 12973}, {12270, 17835}, {12271, 17836}, {12273, 17838}, {12274, 17839}, {12275, 17842}, {12276, 17840}, {12277, 17843}, {12278, 17845}, {12280, 17846}, {12284, 15085}, {12289, 12293}, {12383, 12412}, {12384, 12413}, {12414, 12849}, {12429, 34799}, {12824, 15462}, {12827, 36201}, {12893, 16111}, {13009, 13055}, {13010, 13056}, {13015, 17841}, {13016, 17844}, {13289, 16163}, {13321, 15037}, {13330, 14153}, {13340, 22115}, {13346, 13367}, {13348, 43652}, {13352, 18475}, {13394, 23292}, {13421, 32136}, {13567, 18911}, {13630, 37490}, {13638, 44192}, {13678, 13680}, {13758, 44193}, {13798, 13800}, {13858, 36329}, {13859, 35751}, {13941, 13943}, {14370, 17042}, {14389, 31670}, {14547, 22390}, {14577, 15355}, {14602, 43183}, {14673, 34186}, {14793, 24239}, {14852, 25739}, {14927, 32064}, {15024, 15805}, {15033, 37506}, {15043, 37514}, {15053, 20791}, {15060, 33533}, {15069, 15581}, {15109, 31489}, {15241, 31842}, {15302, 15815}, {15360, 43273}, {15512, 33495}, {15513, 40350}, {15520, 44111}, {15578, 23332}, {15588, 35213}, {15801, 19468}, {15812, 26156}, {15931, 30265}, {16030, 43768}, {16102, 39346}, {16261, 32620}, {16318, 42459}, {16472, 31757}, {16681, 23339}, {16989, 40981}, {16990, 22062}, {16998, 18666}, {17018, 37580}, {17093, 38859}, {17150, 20247}, {17165, 20249}, {17824, 32338}, {17837, 22534}, {17907, 41375}, {18124, 34436}, {18287, 39653}, {18392, 18405}, {18436, 32139}, {18438, 34397}, {18616, 20911}, {18617, 33936}, {18912, 41587}, {19122, 19132}, {19131, 39588}, {19137, 44091}, {19153, 22151}, {19167, 19180}, {19357, 34148}, {19412, 19430}, {19413, 19431}, {19588, 20080}, {19724, 19759}, {19725, 19760}, {19785, 41230}, {19798, 19841}, {19799, 19842}, {19835, 19845}, {20045, 20222}, {20127, 32227}, {20676, 28395}, {20878, 23385}, {20998, 21001}, {21072, 29065}, {21167, 35283}, {21368, 24430}, {22089, 30474}, {22135, 34137}, {22241, 32817}, {22647, 22658}, {22676, 35278}, {22802, 23358}, {23061, 37672}, {23115, 39575}, {23128, 41480}, {23216, 36849}, {23368, 23374}, {23380, 26232}, {23381, 32929}, {23383, 26230}, {23843, 26227}, {23864, 26248}, {23958, 26866}, {24163, 30117}, {24686, 25343}, {25335, 34437}, {25524, 29666}, {26228, 37579}, {26275, 39478}, {26302, 26394}, {26303, 26418}, {26304, 26494}, {26305, 26503}, {26895, 26909}, {26912, 26953}, {26913, 26958}, {29680, 37564}, {30270, 36212}, {30435, 34482}, {32248, 32276}, {32354, 32357}, {32379, 41590}, {32458, 39644}, {32762, 38227}, {32911, 36741}, {33854, 36743}, {33974, 37667}, {34013, 36521}, {34247, 36559}, {34424, 36836}, {34425, 36843}, {34565, 39561}, {34809, 37689}, {34966, 41615}, {35260, 37669}, {35325, 38663}, {36988, 37813}, {37492, 37685}, {37511, 44080}, {37516, 44085}, {37517, 44109}, {37779, 39899}, {38738, 39854}, {38749, 39825}, {39172, 40358}, {39807, 39820}, {39836, 39849}, {40120, 44064}, {40643, 41262}, {41447, 41468}, {41448, 41469}, {41594, 41730}, {41602, 41736}, {41605, 41740}, {41612, 41743}, {43816, 43829}

X(22) is the {X(3),:ref:X(25) <X(25)>}-harmonic conjugate of X(2). For a list of other harmonic conjugates of X(22), click Tables at the top of this page.

X(22) = reflection of X(378) in X(3)

X(22) = isogonal conjugate of X(66)

X(22) = isotomic conjugate of X(18018)

X(22) = complement of X(7391)

X(22) = anticomplement of X(427)

X(22) = circumcircle-inverse of X(858)

X(22) = polar-circle-inverse of X(37981)

X(22) = X(76)-Ceva conjugate of X(6)

X(22) = cevapoint of X(3) and X(159)

X(22) = crosspoint of X(99) and X(250)

X(22) = crosssum of X(125) and X(512)

X(22) = crossdifference of every pair of points on the line X(647)X(826)

X(22) = X(i)-beth conjugate of X(j) for these (i,j): (643,345), (833,22)

X(22) = pole, with respect to circumcircle, of the de Longchamps line

X(22) = isotomic conjugate of the isogonal conjugate of X(206)

X(22) = tangential isogonal conjugate of X(6)

X(22) = crosspoint of X(3) and X(159) wrt both the excentral and tangential triangles

X(22) = homothetic center of the tangential triangle and the orthic triangle of the anticomplementary triangle

X(22) = insimilicenter of circumcircle and tangential circle when ABC is acute

X(22) = exsimilicenter of circumcircle and tangential circle when ABC is obtuse

X(22) = inverse-in-de-Longchamps-circle of X(5189)

X(22) = inverse-in-{circumcircle, nine-point circle}-inverter of X(2072)

X(22) = X(75)-isoconjugate of X(2353)

X(22) = trilinear pole of line X(2485)X(8673)

X(22) = homothetic center of anticomplementary and Ara triangles

X(22) = Thomson-isogonal conjugate of X(5654)

X(22) = Lucas-isogonal conjugate of X(11459)

X(22) = X(19)-isoconjugate of X(14376)