The appearance of (T, i, m, n, p) in the following list means that triangles ABC and T have X(i) as perspector, X(m) as tripolar-perspector ABC to T, X(n) as tripolar-perspector T to ABC and X(p) as tripolar-triaxial point. A dash means a not calculated center.

(Andromeda, 1, 21446, 58747, 58748), (anti-Artzt, 598, 11163, 11159, 58749), (anti-Atik, 69, 21447, 58750, 58751), (1st anti-Brocard, 1916, 6, 14931, 58752), (4th anti-Brocard, 111, 21448, 58753, 58754), (anti-Conway, 6, 8882, 58755, 58756), (2nd anti-Conway, 6, 393, 6748, 58757), (anti-excenters-reflections, 4, 459, 58758, 58759), (2nd anti-extouch, 3, 24, 1593, 58760), (anti-Honsberger, 6, 251, 58761, 18105), (anti-Hutson intouch, 64, 394, 58762, 58763), (anti-incircle-circles, 3527, 5422, 58764, -), (anti-inverse-in-incircle, 4, 76, 32006, 3267), (anti-McCay, 8587, 8860, 58765, -), (6th anti-mixtilinear, 69, 193, 141, 58766), (anti-orthocentroidal, 74, 3, 5663, 1636), (1st anti-orthosymmedial, 1297, 1176, 58767, -), (1st anti-Parry, 1296, 5468, 58768, -), (2nd anti-Parry, 74, 5466, 58769, -), (1st anti-Sharygin, 8795, 21449, 19212, -), (anti-tangential-midarc, 65, 57, 2099, 3669), (3rd anti-tri-squares, 1328, 486, -, -), (4th anti-tri-squares, 1327, 485, -, -), (AAOA, 67, 6, 58770, 42659), (Antlia, 1, 21450, 58771, -), (Apollonius, 181, 1, 58772, 58773), (Apus, 55, 1, 5217, 650), (Artzt, 262, 6, 13860, 9420), (Atik, 3062, 346, 58774, -), (Ayme, 19, 346, 58775, 58776), (BCE, 10215, 58777, 58778, -), (BCE-incenters, 1128, 16015, -, -), (BCI, 1127, 21465, -, -), (BCI-excenters, 10230, -, -, -), (1st Brocard, 76, 385, 3734, 58779), (2nd Brocard, 6, 524, 2, 1649), (3rd Brocard, 32, 385, 3972, 58779), (4th Brocard, 2, 468, 5094, 58780), (7th Brocard, 3, 230, 2549, 58781), (9th Brocard, 4, 264, 58782, 14618), (1st Brocard-reflected, 83, 3329, 7804, 58783), (circummedial, 2, 83, 10130, 58784), (circumorthic, 4, 275, 58785, 15412), (2nd circumperp, 1, 81, 4653, 1019), (Conway, 7, 86, 58786, 4560), (2nd Conway, 7, 75, 21296, 4391), (3rd Conway, 10435, 10436, -, -), (4th Conway, 1, 75, 58787, 1577), (5th Conway, 1, 86, 58788, 1019), (Ehrmann-side, 265, 3580, 58789, 58790), (Ehrmann-vertex, 4, 94, 18576, 14592), (2nd Ehrmann, 6, 111, 58791, 9178), (2nd Euler, 68, 6515, 18474, 58792), (5th Euler, 2, 4, 5094, 2501), (excenters-reflections, 1, 8056, 58793, 58794), (1st excosine, 64, 3, 58795, 58796), (2nd excosine, 64, 4, 58797, 6587), (extangents, 65, 1, 37567, 650), (2nd extouch, 4, 8, 58798, 57055), (3rd extouch, 4, 7, 58799, 905), (4th extouch, 69, 7, 58800, 3669), (5th extouch, 388, 7, 5252, 3669), (inner-Fermat, 14, 395, 36970, 58801), (outer-Fermat, 13, 396, 36969, 58802), (Feuerbach, 12, 1, 3614, 654), (Garcia-Moses, 10, 8, 1698, 3239), (1st half-diamonds-central, 18, 3180, -, -), (2nd half-diamonds-central, 17, 3181, -, -), (1st half-diamonds, 13, 3180, -, -), (2nd half-diamonds, 14, 3181, -, -), (1st half-squares, 4, 492, 58803, -), (2nd half-squares, 4, 491, 58804, -), (Hatzipolakis-Moses, 54, 58805, 58806, -), (1st Hatzipolakis, 1118, 21452, -, -), (3rd Hatzipolakis, 54, 21451, 58807, -), (hexyl, 84, 63, 58808, 57233), (Honsberger, 7, 21453, 58809, 56322), (Hutson extouch, 7, 10578, 3474, 58810), (Hutson intouch, 8, 5435, 3476, 58811), (outer-Hutson, 8372, 188, -, -), (2nd Hyacinth, 3, 3542, 1885, 58812), (incircle-circles, 3296, 21454, 58813, -), (inverse-in-Conway, 1, 274, 58814, 7199), (inverse-in-excircles, 1, 3672, 3664, 58815), (inverse-in-incircle, 1, 279, 58816, 58817), (Jenkins-contact, 3596, 32937, 58818, -), (Jenkins-tangential, 37865, 312, 58819, -), (1st Jenkins, 3597, 58820, 58821, -), (2nd Jenkins, 10, 8, 58822, 3239), (3rd Jenkins, 37868, 1, 58823, -), (1st Kenmotu diagonals, 6, 8577, 58824, 58825), (2nd Kenmotu diagonals, 6, 8576, 58826, 58827), (Kosnita, 54, 1994, 18475, 58828), (inner-Malfatti, 1, 21455, 31495, -), (outer-Malfatti, 1, 58829, 58830, -), (inner-Malfatti-touchpoints, 179, 21455, 31495, -), (outer-Malfatti-touchpoints, 400, 58829, 58830, -), (Mandart-excircles, 56, 3086, 7354, -), (McCay, 7607, 8859, 58831, -), (midarc, 1, 18886, 58832, -), (2nd midarc, 1, 21456, 58833, -), (midheight, 4, 20, 5, 57201), (mixtilinear, 1, 57, 31393, 3669), (3rd mixtilinear, 56, 57, 13462, 3669), (4th mixtilinear, 55, 1, 35445, 650), (6th mixtilinear, 3062, 9, 58834, 58835), (7th mixtilinear, 3062, 7, 58836, 7658), (8th mixtilinear, 55, 57, 1, 3669), (9th mixtilinear, 56, 1, 5128, 650), (Miyamoto-Moses, 1, 10578, 11019, -), (1st Miyamoto-Moses-Apollonius, 7, 13390, 58837, 58838), (2nd Miyamoto-Moses-Apollonius, 7, 1659, 58839, 58840), (Montesdeoca-Hung, 6042, 1, 58841, 58842), (1st Morley, 357, 3602, 58843, -), (2nd Morley, 1136, 3603, 58844, -), (3rd Morley, 1134, 3604, 58845, -), (Moses-Hung, 6046, 21457, -, -), (Moses-Steiner osculatory, 4, 3266, 58846, -), (inner-Napoleon, 18, 395, 37835, 58847), (outer-Napoleon, 17, 396, 37832, 58848), (1st Neuberg, 98, 385, 58849, 58850), (2nd Neuberg, 262, 3329, 58851, -), (orthocentroidal, 4, 30, 381, 14401), (1st orthosymmedial, 4, 21458, 58852, -), (2nd orthosymmedial, 6, 21459, 58853, -), (1st Parry, 111, 1992, 58854, 58855), (2nd Parry, 110, 9214, 58856, 58857), (3rd Parry, 2, 21460, 32583, -), (reflection, 4, 5, 382, 57195), (1st Savin, 2, 5435, 226, 58858), (2nd Savin, 2, 5936, 58859, 58860), (1st Sharygin, 256, 6, 58861, 58862), (2nd Sharygin, 291, 6, 58863, 58864), (inner-Soddy, 176, 7, 1371, 514), (2nd inner-Soddy, 1, 7, 31538, 514), (outer-Soddy, 175, 7, 1372, 514), (2nd outer-Soddy, 1, 7, 31539, 514), (inner-squares, 485, 4, 8960, 58865), (outer-squares, 486, 4, 58866, 58867), (tangential-midarc, 177, 174, 58868, 10492), (inner tri-equilateral, 6, 21461, 8603, 58869), (outer tri-equilateral, 6, 21462, 8604, 58870), (3rd tri-squares, 2, 21463, 485, -), (4th tri-squares, 2, 21464, 486, -), (Trinh, 74, 323, 58871, 58872), (inner-Vecten, 486, 3069, 6565, 58873), (2nd inner-Vecten, 486, 41516, -, -), (3rd inner-Vecten, 486, 24243, -, 54028), (outer-Vecten, 485, 3068, 6564, 58874), (2nd outer-Vecten, 485, 41515, -, -), (3rd outer-Vecten, 485, 24244, -, 54029), (Walsmith, 6, 58875, 51227, -), (Yff central, 177, 2089, 13092, -), (Yiu, 5, 1994, 50461, 58876), (1st Zaniah, 7, 144, 142, 58877), (2nd Zaniah, 8, 145, 10, 31182)



The appearance of (T, i, m, n, p) in the following list means that triangles ORTHIC and T have X(i) as perspector, X(m) as tripolar-perspector ABC to T, X(n) as tripolar-perspector T to ABC and X(p) as tripolar-triaxial point. A dash means a not calculated center.

(anti-Euler, 4, 58878, 58879, 58880), (anti-inner-Grebe, 19041, -, -, -), (anti-outer-Grebe, 19042, -, -, -), (1st anti-Kenmotu centers, 45478, -, -, -), (2nd anti-Kenmotu centers, 45479, -, -, -), (anti-orthocentroidal, 2914, 389, 58881, -), (3rd anti-tri-squares, 22589, 3070, -, -), (4th anti-tri-squares, 22620, 3071, -, -), (anticomplementary, 193, 6, 20080, 58882), (Artzt, 9752, 6, 58883, -), (Bevan antipodal, 34492, 2262, 58884, -), (9th Brocard, 4, 6, 43448, 3566), (Ehrmann-mid, 113, 1495, 58885, -), (Euler, 4, 53386, 58886, 15451), (5th Euler, 427, 4, 5094, 2501), (excentral, 46, 65, 58887, 58888), (2nd excosine, 6525, 4, 58797, 6587), (2nd extouch, 4, 58889, 58890, 661), (3rd extouch, 4, 58889, -, 661), (inner-Grebe, 1163, -, -, -), (outer-Grebe, 1162, -, -, -), (1st half-squares, 4, -, -, -), (2nd half-squares, 4, -, -, -), (Hatzipolakis-Moses, 1986, -, -, -), (3rd Hatzipolakis, 22948, -, -, -), (Johnson, 155, 184, 58891, 58892), (1st Kenmotu-centers, 44637, -, -, -), (2nd Kenmotu-centers, 44638, -, -, -), (Mandart-excircles, 513, 38389, 58893, 58894), (midheight, 4, 11381, 389, 58895), (1st Miyamoto-Moses-Apollonius, 52812, 58896, -, -), (2nd Miyamoto-Moses-Apollonius, 52814, 58897, -, -), (Moses-Soddy, 116, 1146, 58898, 58899), (Moses-Steiner osculatory, 4, -, -, -), (orthocentroidal, 4, 6000, 5890, 58900), (1st orthosymmedial, 4, 58901, 58902, -), (reflection, 4, 389, 6241, 58903), (Soddy, 2898, 1836, 58904, -), (inner-squares, 371, 4, 8960, 58865), (outer-squares, 372, 4, 58866, 58867), (Ursa-minor, 1827, 58905, 58906, -), (inner-Vecten, 371, 6, 6200, -), (outer-Vecten, 372, 6, 6396, -), (X-parabola-tangential, 512, 58907, 58908, 58909)