Equal parallelians point

Template:Short description

In geometry, the equal parallelians point^[1][2] (also called congruent parallelians point) is a special point associated with a plane triangle. It is a triangle center and it is denoted by X(192) in Clark Kimberling's Encyclopedia of Triangle Centers.^[3] There is a reference to this point in one of Peter Yff's notebooks, written in 1961.^[1]

The equal parallelians point of triangle Template:Math is a point Template:Mvar in the plane of Template:Math such that the three line segments through Template:Mvar parallel to the sidelines of Template:Math and having endpoints on these sidelines have equal lengths.^[1]

The trilinear coordinates of the equal parallelians point of triangle Template:Math are $${\displaystyle bc(ca+ab-bc):ca(ab+bc-ca):ab(bc+ca-ab)}$$

Let Template:Math be the anticomplementary triangle of triangle Template:Math. Let the internal bisectors of the angles at the vertices Template:Mvar of Template:Math meet the opposite sidelines at Template:Mvar respectively. Then the lines Template:Mvar concur at the equal parallelians point of Template:Math.^[2]

• Congruent isoscelizers point

Template:Reflist