Morley centers

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In plane geometry, the Morley centers are two special points associated with a triangle. Both of them are triangle centers. One of them called first Morley center^[1] (or simply, the Morley center^[2] ) is designated as X(356) in Clark Kimberling's Encyclopedia of Triangle Centers, while the other point called second Morley center^[1] (or the 1st Morley–Taylor–Marr Center^[2]) is designated as X(357). The two points are also related to Morley's trisector theorem which was discovered by Frank Morley in around 1899.

Let Template:Math be the triangle formed by the intersections of the adjacent angle trisectors of triangle Template:Math. Template:Math is called the Morley triangle of Template:Math. Morley's trisector theorem states that the Morley triangle of any triangle is always an equilateral triangle.

Let Template:Math be the Morley triangle of Template:Math. The centroid of Template:Math is called the first Morley center of Template:Math.^[1][3]

Let Template:Math be the Morley triangle of Template:Math. Then, the lines Template:Mvar are concurrent. The point of concurrence is called the second Morley center of triangle Template:Math.^[1][3]

The trilinear coordinates of the first Morley center of triangle Template:Math are ^[1] $${\displaystyle \cos \frac{A}{3}+2\cos \frac{B}{3}\cos \frac{C}{3}:\cos \frac{B}{3}+2\cos \frac{C}{3}\cos \frac{A}{3}:\cos \frac{C}{3}+2\cos \frac{A}{3}\cos \frac{B}{3}}$$

The trilinear coordinates of the second Morley center are

$${\displaystyle \sec \frac{A}{3}:\sec \frac{B}{3}:\sec \frac{C}{3}}$$

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