Isotomic conjugate

File:Isotomic conjugate of a point.svg

We assume that {{mvar|P}} is not collinear with any two vertices of {{math|△ABC}}. Let {{mvar|A', B', C'}} be the points in which the lines {{mvar|AP, BP, CP}} meet sidelines {{mvar|BC, CA, AB}} (extended if necessary). Reflecting {{mvar|A', B', C'}} in the midpoints of sides {{mvar|{{overline|BC}}, {{overline|CA}}, {{overline|AB}}}} will give points {{mvar|A", B", C"}} respectively. The isotomic lines {{mvar|AA", BB", CC"}} joining these new points to the vertices meet at a point (which can be proved using Ceva's theorem), the isotomic conjugate of {{mvar|P}}.

If the trilinears for {{mvar|P}} are {{mvar|p : q : r}}, then the trilinears for the isotomic conjugate of {{mvar|P}} are

:$a^\{-2\}p^\{-1\}\; :\; b^\{-2\}q^\{-1\}\; :\; c^\{-2\}r^\{-1\},$

where {{mvar|a, b, c}} are the side lengths opposite vertices {{mvar|A, B, C}} respectively.

The isotomic conjugate of the centroid of triangle {{math|△ABC}} is the centroid itself.

The isotomic conjugate of the symmedian point is the third Brocard point, and the isotomic conjugate of the Gergonne point is the Nagel point.

Isotomic conjugates of lines are circumconics, and conversely, isotomic conjugates of circumconics are lines. (This property holds for isogonal conjugates as well.)

• Isogonal conjugate
• Triangle center

• Robert Lachlan, An Elementary Treatise on Modern Pure Geometry, Macmillan and Co., 1893, page 57.
• Roger A. Johnson: Advanced Euclidean Geometry. Dover 2007, {{ISBN|978-0-486-46237-0}}, pp. 157–159, 278

• {{mathworld|id=IsotomicConjugate|title=Isotomic Conjugate}}
• Pauk Yiu: [http://math.fau.edu/yiu/Oldwebsites/Geometry2013Fall/Geometry2013Chapter12.pdf Isotomic and isogonal conjugates]
• Navneel Singhal: [https://pregatirematematicaolimpiadejuniori.files.wordpress.com/2016/07/isogonal-conjugates-1.pdf Isotomic and isogonal conjugates]

Category:Triangle geometry

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