Apollonius_point
Apollonius point
Triangle center
In Euclidean geometry, the Apollonius point is a triangle center designated as X(181) in Clark Kimberling's Encyclopedia of Triangle Centers (ETC). It is defined as the point of concurrence of the three line segments joining each vertex of the triangle to the points of tangency formed by the opposing excircle and a larger circle that is tangent to all three excircles.
In the literature, the term "Apollonius points" has also been used to refer to the isodynamic points of a triangle.[1] This usage could also be justified on the ground that the isodynamic points are related to the three Apollonian circles associated with a triangle.
The solution of the Apollonius problem has been known for centuries. But the Apollonius point was first noted in 1987.[2][3]