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. [1] [2]
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 AB. Form the circumcircle of △ABC and let M be the midpoint of the arc of the circumcircle from A through C to B. 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 AC and BC. [1] [2]
The three cleavers concur at a point, the center of the Spieker circle. [1] [2]