Trilinears b + c : c + a : a + b
Barycentrics a(b + c) : b(c + a) : c(a + b)
Let A'B'C' be the cevian triangle of X(1). Let A" be the centroid of triangle AB'C', and define B" and C" cyclically. Then the lines AA", BB", CC" concur in X(37). (Eric Danneels, Hyacinthos 7892, 9/13/03)
X(37) lies on these lines:
1,6 2,75 3,975 7,241 8,941 10,594 12,225 19,25 21,172 35,267 38,354 39,596 12,225 41,584 48,205 63,940 65,71 73,836 78,965 82,251 86,190 91,498 100,111 101,284 141,742 142,1086 145,391 158,281 171,846 226,440 256,694 347,948 513,876 517,573 537,551 579,942 626,746 665,900 971,991
X(37) is the {X(1),X(9)}-harmonic conjugate of X(6).
X(37) = midpoint of X(I) and X(J) for these (I,J): (75,192), (190,335)
X(37) = isogonal conjugate of X(81)
X(37) = isotomic conjugate of X(274)
X(37) = complement of X(75)
X(37) = X(I)-Ceva conjugate of X(J) for these (I,J):
(1,42), (2,10), (4,209), (9,71), (10,210), (190,513), (226,65), (321,72), (335,518)
X(37) = cevapoint of X(213) and X(228)
X(37) = X(I)-cross conjugate of X(J) for these (I,J): (42,65), (228,72)
X(37) = crosspoint of X(I) and X(J) for these (I,J): (1,2), (9,281), (10,226)
X(37) = X(1)-line conjugate of X(238)
X(37) = crosssum of X(I) and X(J) for these (I,J): (1,6), (57,222), (58,284), (1333,1437)
X(37) = crossdifference of any two points on line X(36)X(238)
X(37) = X(10)-Hirst inverse of X(740)
X(37) = X(1)-aleph conjugate of X(1051)
X(37) = X(I)-beth conjugate of X(J) for these (I,J): (9,37), (644,37), (645,894), (646,37), (1018,37)
, select the center name from the list and, then, click on the vertices A, B and C successively.