Yff center of congruence

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In geometry, the Yff center of congruence is a special point associated with a triangle. This special point is a triangle center and Peter Yff initiated the study of this triangle center in 1987.^[1]

An isoscelizer of an angle Template:Mvar in a triangle Template:Math is a line through points Template:Math, where Template:Math lies on Template:Mvar and Template:Math on Template:Mvar, such that the triangle Template:Math is an isosceles triangle. An isoscelizer of angle Template:Mvar is a line perpendicular to the bisector of angle Template:Mvar. Isoscelizers were invented by Peter Yff in 1963.^[2]

Let Template:Math be any triangle. Let Template:Math be an isoscelizer of angle Template:Mvar, Template:Math be an isoscelizer of angle Template:Mvar, and Template:Math be an isoscelizer of angle Template:Mvar. Let Template:Math be the triangle formed by the three isoscelizers. The four triangles Template:Math and Template:Math are always similar.

There is a unique set of three isoscelizers Template:Math such that the four triangles Template:Math and Template:Math are congruent. In this special case Template:Math formed by the three isoscelizers is called the Yff central triangle of Template:Math.^[3]

The circumcircle of the Yff central triangle is called the Yff central circle of the triangle.

Let Template:Math be any triangle. Let Template:Math be the isoscelizers of the angles Template:Mvar such that the triangle Template:Math formed by them is the Yff central triangle of Template:Math. The three isoscelizers Template:Math are continuously parallel-shifted such that the three triangles Template:Math are always congruent to each other until Template:Math formed by the intersections of the isoscelizers reduces to a point. The point to which Template:Math reduces to is called the Yff center of congruence of Template:Math.

• The trilinear coordinates of the Yff center of congruence are^[1] $${\displaystyle \sec \frac{A}{2}:\sec \frac{B}{2}:\sec \frac{C}{2}}$$
• Any triangle Template:Math is the triangle formed by the lines which are externally tangent to the three excircles of the Yff central triangle of Template:Math.
• Let Template:Mvar be the incenter of Template:Math. Let Template:Mvar be the point on side Template:Mvar such that Template:Math, Template:Mvar a point on side Template:Mvar such that Template:Math, and Template:Mvar a point on side Template:Mvar such that Template:Math. Then the lines Template:Mvar are concurrent at the Yff center of congruence. This fact gives a geometrical construction for locating the Yff center of congruence.^[4]
• A computer assisted search of the properties of the Yff central triangle has generated several interesting results relating to properties of the Yff central triangle.^[5]

The geometrical construction for locating the Yff center of congruence has an interesting generalization. The generalisation begins with an arbitrary point Template:Mvar in the plane of a triangle Template:Math. Then points Template:Mvar are taken on the sides Template:Mvar such that $${\displaystyle \mathrm{\angle }BPD=\mathrm{\angle }DPC,\mathrm{\angle }CPE=\mathrm{\angle }EPA,\mathrm{\angle }APF=\mathrm{\angle }FPB.}$$ The generalization asserts that the lines Template:Mvar are concurrent.^[4]

• Congruent isoscelizers point
• Central triangle

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