Simson line explained

In geometry, given a triangle and a point on its circumcircle, the three closest points to on lines,, and are collinear.[1] The line through these points is the Simson line of, named for Robert Simson.[2] The concept was first published, however, by William Wallace in 1799,[3] and is sometimes called the Wallace line.[4]

The converse is also true; if the three closest points to on three lines are collinear, and no two of the lines are parallel, then lies on the circumcircle of the triangle formed by the three lines. Or in other words, the Simson line of a triangle and a point is just the pedal triangle of and that has degenerated into a straight line and this condition constrains the locus of to trace the circumcircle of triangle .

Equation

Placing the triangle in the complex plane, let the triangle with unit circumcircle have vertices whose locations have complex coordinates,,, and let P with complex coordinates be a point on the circumcircle. The Simson line is the set of points satisfying[5]

2abc\bar{z}-2pz+p2+(a+b+c)p-(bc+ca+ab)-

abc
p

=0,

where an overbar indicates complex conjugation.

Properties

Proof of existence

It suffices to show that

\angleNMP+\anglePML=180\circ

.

PCAB

is a cyclic quadrilateral, so

\anglePBA+\angleACP=\anglePBN+\angleACP=180\circ

.

PMNB

is a cyclic quadrilateral (since

\anglePMB=\anglePNB=90\circ

), so

\anglePBN+\angleNMP=180\circ

. Hence

\angleNMP=\angleACP

. Now

PLCM

is cyclic, so

\anglePML=\anglePCL=180\circ-\angleACP

.

Therefore

\angleNMP+\anglePML=\angleACP+(180\circ-\angleACP)=180\circ

.

Generalizations

Generalization 1

Generalization 2

Generalization 3

See also

References

  1. H.S.M. Coxeter and S.L. Greitzer, Geometry revisited, Math. Assoc. America, 1967: p.41.
  2. Web site: Gibson History 7 - Robert Simson. 2008-01-30. MacTutor History of Mathematics archive.
  3. Web site: William Wallace. MacTutor History of Mathematics archive.
  4. Clawson . J. W. . A Theorem in the Geometry of the Triangle . The American Mathematical Monthly . 1919 . 26 . 2 . 59–62 . 2973140 .
  5. Todor Zaharinov, "The Simson triangle and its properties", Forum Geometricorum 17 (2017), 373--381. http://forumgeom.fau.edu/FG2017volume17/FG201736.pdf
  6. http://forumgeom.fau.edu/FG2013volume13/FG201316.pdf Daniela Ferrarello, Maria Flavia Mammana, and Mario Pennisi, "Pedal Polygons", Forum Geometricorum 13 (2013) 153–164: Theorem 4.
  7. Olga Radko and Emmanuel Tsukerman, "The Perpendicular Bisector Construction, the Isoptic point, and the Simson Line of a Quadrilateral", Forum Geometricorum 12 (2012). http://forumgeom.fau.edu/FG2012volume12/FG201214.pdf
  8. Tsukerman . Emmanuel . 2013 . On Polygons Admitting a Simson Line as Discrete Analogs of Parabolas . Forum Geometricorum . 13 . 197–208 .
  9. Web site: A Generalization of Simson Line. Cut-the-knot. April 2015.
  10. http://journals.cambridge.org/action/displayAbstract?fromPage=online&aid=10362951&fileId=S0025557216000772 Nguyen Le Phuoc and Nguyen Chuong Chi (2016). 100.24 A synthetic proof of Dao's generalisation of the Simson line theorem. The Mathematical Gazette, 100, pp 341-345. doi:10.1017/mag.2016.77.

External links