Concept

Cleaver (geometry)

Cleaver (geometry) - Wikipedia

In geometry, a cleaver of a triangle is a line segment that bisects the perimeter of the triangle and has one endpoint at the midpoint of one of the three sides. They are not to be confused with splitters, which also bisect the perimeter, but with an endpoint on one of the triangle's vertices instead of its sides. Each cleaver through the midpoint of one of the sides of a triangle is parallel to the angle bisectors at the opposite vertex of the triangle. The broken chord theorem of Archimedes provides another construction of the cleaver. Suppose the triangle to be bisected is △ABC, and that one endpoint of the cleaver is the midpoint of side . Form the circumcircle of △ABC and let M be the midpoint of the arc of the circumcircle from A to B through C. Then the other endpoint of the cleaver is the closest point of the triangle to M, and can be found by dropping a perpendicular from M to the longer of the two sides and . The three cleavers concur at a point, the center of the Spieker circle.

Official source

https://en.wikipedia.org/wiki/Cleaver_(geometry)

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In geometry, the Spieker center is a special point associated with a plane triangle. It is defined as the center of mass of the perimeter of the triangle. The Spieker center of a triangle △ABC is the center of gravity of a homogeneous wire frame in the shape of △ABC. The point is named in honor of the 19th-century German geometer Theodor Spieker. The Spieker center is a triangle center and it is listed as the point X(10) in Clark Kimberling's Encyclopedia of Triangle Centers.

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