Schiffler point

A triangle ABC with the incenter I has its Schiffler point at the point of concurrence of the Euler lines of the four triangles BCI, CAI, ABI, and ABC. Schiffler's theorem states that these four lines all meet at a single point.

Trilinear coordinates for the Schiffler point are

${\displaystyle \left[{\frac {1}{\cos B+\cos C}},{\frac {1}{\cos C+\cos A}},{\frac {1}{\cos A+\cos B}}\right]}$

or, equivalently,

${\displaystyle \left[{\frac {b+c-a}{b+c}},{\frac {c+a-b}{c+a}},{\frac {a+b-c}{a+b}}\right]}$

where a, b, and c denote the side lengths of triangle ABC.

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