Central Points and Central Lines in the Plane of a Triangle

“…Thus, X 37ˆI ¢ P, where P is the point with homogeneous barycentric coordinates b ‡ c : c ‡ a : a ‡ b. This happens to be the point X 10 of [2], the Spieker centre of the triangle, the incentre of the triangle formed by the midpoint of the sides of the given triangle. Without relying on this piece of knowledge, a direct, simple calculation with the barycentric coordinates leads to an easy construction of this point.…”

“…It can therefore be located as the intersection of the two lines IK and GG e . The fact that X 9 lies on both of these lines is stated in [2], along with other lines containing the same point.…”

“…Consider, for example, the`simplest unnamed centre' X 37 in [2], with trilinear coordinates b ‡ c : c ‡ a : a ‡ b. In homogeneous barycentric coordinates, this is a…b ‡ c † : b…c ‡ a † : c…a ‡ b †.…”

“…Note that an easy application of Proposition 1 shows that the line joining P, G and I ¡1 does not contain I unless the triangle is isosceles. In fact, many of the collinearity relations in [2,3] can be explained by manipulating homogeneous barycentric coordinates. We present a few more examples.…”

“…With respect to a ® xed triangle ABC (of side lengths a, b, c, and opposite angles ¬, , ® ), the trilinear coordinates of a point is a triple of numbers proportional to the signed distances of the point to the sides of the triangle. The late Jesuit mathematician Maurice Wong has given [5] a synthetic construction of the point with trilinear coordinates cot ¬ : cot : cot® , and more generally, in [4] points with trilinear coordinates a 2n x : b 2n y : c 2n z from one with trilinear coordinates x : y : z with respect to a triangle with sides a, b, c. On a much grandiose scale, Kimberling [2,3] has given extensive lists of centres associated with a triangle, in terms of trilinear coordinates, along with some collinearity relations.…”

The uses of homogeneous barycentric coordinates in plane Euclidean geometry

“…Thus, X 37ˆI ¢ P, where P is the point with homogeneous barycentric coordinates b ‡ c : c ‡ a : a ‡ b. This happens to be the point X 10 of [2], the Spieker centre of the triangle, the incentre of the triangle formed by the midpoint of the sides of the given triangle. Without relying on this piece of knowledge, a direct, simple calculation with the barycentric coordinates leads to an easy construction of this point.…”

“…It can therefore be located as the intersection of the two lines IK and GG e . The fact that X 9 lies on both of these lines is stated in [2], along with other lines containing the same point.…”

“…Consider, for example, the`simplest unnamed centre' X 37 in [2], with trilinear coordinates b ‡ c : c ‡ a : a ‡ b. In homogeneous barycentric coordinates, this is a…b ‡ c † : b…c ‡ a † : c…a ‡ b †.…”

“…Note that an easy application of Proposition 1 shows that the line joining P, G and I ¡1 does not contain I unless the triangle is isosceles. In fact, many of the collinearity relations in [2,3] can be explained by manipulating homogeneous barycentric coordinates. We present a few more examples.…”

“…With respect to a ® xed triangle ABC (of side lengths a, b, c, and opposite angles ¬, , ® ), the trilinear coordinates of a point is a triple of numbers proportional to the signed distances of the point to the sides of the triangle. The late Jesuit mathematician Maurice Wong has given [5] a synthetic construction of the point with trilinear coordinates cot ¬ : cot : cot® , and more generally, in [4] points with trilinear coordinates a 2n x : b 2n y : c 2n z from one with trilinear coordinates x : y : z with respect to a triangle with sides a, b, c. On a much grandiose scale, Kimberling [2,3] has given extensive lists of centres associated with a triangle, in terms of trilinear coordinates, along with some collinearity relations.…”

The uses of homogeneous barycentric coordinates in plane Euclidean geometry

Cubic curves in the triangle plane

On some geometrical problems of paperfolding