|
|
|
Isogonal Conjugate |
|
Given a triangle  ABC.
The cevian AA2 is said to be isogonal
to cevian AA1 if
these cevians form equal angles with the internal
angle bisector of vertex A.
Similarly, define isogonal cevians passing through vertex B and C.
The Isogonal Conjugate of a point P
is the point of concurrence of the
three cevians isogonal to the respective cevians through point P.
Q - Isogonal Conjugate of P. |
