Trilinears           sin²A csc 3A : sin²B csc 3B : sin²C csc 3C
Barycentrics    sin³A csc 3A : sin³B csc 3B : sin³C csc 3C

X(1989) plays a major role in the theory of special isocubics, as presented in Chapter 6 of

Jean-Pierre Ehrmann and Bernard Gibert,, "Special Isocubics in the Triangle Plane," downloadable from

Bernard Gibert, Cubics in the Triangle Plane.

X(1989) is the barycentric product X(13)*X(14) of the Fermat points. The line through X(50) parallel to
the line X(13)X(14) passes through X(1989).

X(1989) lies on these lines:
2,94    6,13    30,50    53,112    67,868    111,230    403,1990    1427,2006

X(1989) = isogonal conjugate of X(323)
X(1989) = complement of X(1272)
X(1989) = X(94)-Ceva conjugate of X(265)
X(1989) = cevapoint of X(I) and X(J) for these (I,J): (53,1990), (115,1637), (395,396)
X(1989) = crosspoint of X(2) and X(1138)
X(1989) = crosssum of X(6) and X(399)
X(1989) = barycentric product of X(13) and X(14)