Nine-point conic explained

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 and a point in its plane, a conic can be drawn through the following nine points:

the midpoints of the sides of,

the midpoints of the lines joining to the vertices, and

the points where these last named lines cut the sides of the triangle.The conic is an ellipse if lies in the interior of 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 is the orthocenter, one obtains the nine-point circle, and when is on the circumcircle of, 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

Further reading

External links

Notes and References

  1. [Maxime Bôcher]
  2. Maud A. Minthorn (1912) The Nine Point Conic, Master's dissertation at University of California, Berkeley, link from HathiTrust.