Nagel point

Given a triangle , let be the extouch points in which the -excircle meets line , the -excircle meets line , and the -excircle meets line , respectively. The lines concur in the Nagel point of triangle . Another construction of the point is to start at and trace around triangle half its perimeter, and similarly for and . Because of this construction, the Nagel point is sometimes also called the bisected perimeter point, and the segments are called the triangle's splitters. There exists an easy construction of the Nagel point. Starting from each vertex of a triangle, it suffices to carry twice the length of the opposite edge. We obtain three lines which concur at the Nagel point. == Relation to other triangle centers ==

The Nagel point is the isotomic conjugate of the Gergonne point. The Nagel point, the centroid, and the incenter are collinear on a line called the Nagel line. The incenter is the Nagel point of the medial triangle; equivalently, the Nagel point is the incenter of the anticomplementary triangle. The isogonal conjugate of the Nagel point is the point of concurrency of the lines joining the mixtilinear touchpoint and the opposite vertex. == Barycentric coordinates ==

The un-normalized barycentric coordinates of the Nagel point are (s-a:s-b:s-c) where s = \tfrac{a+b+c}{2} is the semi-perimeter of the reference triangle . == Trilinear coordinates ==

The trilinear coordinates of the Nagel point are as :\csc^2\left(\frac{A}{2}\right)\,:\,\csc^2\left(\frac{B}{2}\right)\,:\,\csc^2\left(\frac{C}{2}\right) or, equivalently, in terms of the side lengths a=\left|\overline{BC}\right|, b=\left|\overline{CA}\right|, c=\left|\overline{AB}\right|, :\frac{b + c - a}{a}\,:\,\frac{c + a - b}{b}\,:\,\frac{a + b - c}{c}. ==History==

The Nagel point is named after Christian Heinrich von Nagel, a nineteenth-century German mathematician, who wrote about it in 1836. Early contributions to the study of this point were also made by August Leopold Crelle and Carl Gustav Jacob Jacobi. == See also ==