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X(3), X(4), X(30), X(74) 

Let us consider the two following decomposed cubics : one is the union of the line at infinity and the Jerabek hyperbola, the other is the union of the circumcircle of ABC and the Euler line. Each one is clearly the isogonal transform of the other. These cubics generate a pencil of circular circumcubics passing through O, H, X(30), X(74). This pencil is stable under isogonal conjugation and contains the Neuberg cubic K001 (the only selfisogonal pK) and K187 (the only selfisogonal nK). The singular foci lie on the line OX(74)X(110)etc and two isogonal conjugate cubics have their respective foci inverse in the circumcircle. The orthic line is the Euler line. This pencil also contains K446, its isogonal transform K447 and K448, an axial cubic. K448 is symmetric about the perpendicular bisector of OH which must contain the singular focus F = X(14670). 
