Brianchon's theorem

Brianchon's theorem Brianchon's theorem In geometry, Brianchon's theorem is a theorem stating that when a hexagon is circumscribed around a conic section, its principal diagonals (those connecting opposite vertices) meet in a single point. It is named after Charles Julien Brianchon (1783–1864).

Contents 1 Formal statement 2 Connection to Pascal's theorem 3 Degenerations 4 In the affine plane 5 Proof 6 See also 7 References Formal statement Let {displaystyle P_{1}P_{2}P_{3}P_{4}P_{5}P_{6}} be a hexagon formed by six tangent lines of a conic section. Then lines {displaystyle {overline {P_{1}P_{4}}},;{overline {P_{2}P_{5}}},;{overline {P_{3}P_{6}}}} (extended diagonals each connecting opposite vertices) intersect at a single point {displaystyle B} , the Brianchon point.[1]: p. 218 [2] Connection to Pascal's theorem The polar reciprocal and projective dual of this theorem give Pascal's theorem.

Degenerations 3-tangents degeneration of Brianchon's theorem As for Pascal's theorem there exist degenerations for Brianchon's theorem, too: Let coincide two neighbored tangents. Their point of intersection becomes a point of the conic. In the diagram three pairs of neighbored tangents coincide. This procedure results in a statement on inellipses of triangles. From a projective point of view the two triangles {displaystyle P_{1}P_{3}P_{5}} and {displaystyle P_{2}P_{4}P_{6}} lie perspectively with center {displaystyle B} . That means there exists a central collineation, which maps the one onto the other triangle. But only in special cases this collineation is an affine scaling. For example for a Steiner inellipse, where the Brianchon point is the centroid.

In the affine plane Brianchon's theorem is true in both the affine plane and the real projective plane. However, its statement in the affine plane is in a sense less informative and more complicated than that in the projective plane. Consider, for example, five tangent lines to a parabola. These may be considered sides of a hexagon whose sixth side is the line at infinity, but there is no line at infinity in the affine plane. In two instances, a line from a (non-existent) vertex to the opposite vertex would be a line parallel to one of the five tangent lines. Brianchon's theorem stated only for the affine plane would therefore have to be stated differently in such a situation.

The projective dual of Brianchon's theorem has exceptions in the affine plane but not in the projective plane.

Proof Brianchon's theorem can be proved by the idea of radical axis or reciprocation.

See also Seven circles theorem Pascal's theorem References ^ Whitworth, William Allen. Trilinear Coordinates and Other Methods of Modern Analytical Geometry of Two Dimensions, Forgotten Books, 2012 (orig. Deighton, Bell, and Co., 1866). ^ Coxeter, H. S. M. (1987). Projective Geometry (2nd ed.). Springer-Verlag. Theorem 9.15, p. 83. ISBN 0-387-96532-7. Categories: Conic sectionsTheorems in projective geometryEuclidean plane geometryTheorems about polygons

Si quieres conocer otros artículos parecidos a Brianchon's theorem puedes visitar la categoría Conic sections.

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