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Nine-point conic

From Wikipedia, the free encyclopedia
  Four constituent points of the quadrangle (A, B, C, P)
  Six constituent lines of the quadrangle
  Nine-point conic (a nine-point hyperbola, since P is across side AC)
If P were inside triangle ABC, the nine-point conic would be an ellipse.

In geometry, the nine-point conic of a complete quadrangle is a conic that passes through the three diagonal points and the six midpoints of sides of the complete quadrangle.

The nine-point conic was described by Maxime Bôcher in 1892.[1] The better-known nine-point circle is an instance of Bôcher's conic. The nine-point hyperbola is another instance.

Bôcher used the four points of the complete quadrangle as three vertices of a triangle with one independent point:

Given a triangle ABC and a point P in its plane, a conic can be drawn through the following nine points:
the midpoints of the sides of ABC,
the midpoints of the lines joining P to the vertices, and
the points where these last named lines cut the sides of the triangle.

The conic is an ellipse if P lies in the interior of ABC or in one of the regions of the plane separated from the interior by two sides of the triangle, otherwise the conic is a hyperbola. Bôcher notes that when P is the orthocenter, one obtains the nine-point circle, and when P is on the circumcircle of ABC, then the conic is an equilateral hyperbola.

In 1912 Maud Minthorn showed that the nine-point conic is the locus of the center of a conic through four given points.[2]

References

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  1. ^ Maxime Bôcher (1892) Nine-point Conic, Annals of Mathematics, link from Jstor.
  2. ^ Maud A. Minthorn (1912) The Nine Point Conic, Master's dissertation at University of California, Berkeley, link from HathiTrust.

Further reading

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