Difference between revisions of "Simson line"
(→Simson line of a complete quadrilateral) |
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Let the points <math>D, E,</math> and <math>F</math> be collinear. | Let the points <math>D, E,</math> and <math>F</math> be collinear. | ||
− | <math>AEPD</math> is cyclic <math>\implies \angle APE = \angle ADE, \angle | + | <math>AEPD</math> is cyclic <math>\implies \angle APE = \angle ADE, \angle DPE = \angle BAC.</math> |
<math>BFDP</math> is cyclic <math>\implies \angle BPF = \angle BDF, \angle DPF = \angle ABC.</math> | <math>BFDP</math> is cyclic <math>\implies \angle BPF = \angle BDF, \angle DPF = \angle ABC.</math> | ||
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==Simson line of a complete quadrilateral== | ==Simson line of a complete quadrilateral== | ||
− | [[File:Simson complite.png| | + | [[File:Simson complite.png|430px|right]] |
Let four lines made four triangles of a complete quadrilateral. In the diagram these are <math>\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.</math> | Let four lines made four triangles of a complete quadrilateral. In the diagram these are <math>\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.</math> | ||
Latest revision as of 08:28, 5 August 2024
In geometry, given a triangle ABC and a point P on its circumcircle, the three closest points to P on lines AB, AC, and BC are collinear.
Simson line (main)
Let a triangle and a point be given.
Let and be the foots of the perpendiculars dropped from P to lines AB, AC, and BC, respectively.
Then points and are collinear iff the point lies on circumcircle of
Proof
Let the point be on the circumcircle of
is cyclic
is cyclic
is cyclic
and are collinear as desired.
Proof
Let the points and be collinear.
is cyclic
is cyclic
is cyclis as desired.
vladimir.shelomovskii@gmail.com, vvsss
Simson line of a complete quadrilateral
Let four lines made four triangles of a complete quadrilateral. In the diagram these are
Let be the Miquel point of a complete quadrilateral.
Let and be the foots of the perpendiculars dropped from to lines and respectively.
Prove that points and are collinear.
Proof
Let be the circumcircle of be the circumcircle of Then
Points and are collinear as Simson line of
Points and are collinear as Simson line of
Therefore points and are collinear, as desired.
vladimir.shelomovskii@gmail.com, vvsss
Problem
Let the points and be collinear and the point
Let and be the circumcenters of triangles and
Prove that lies on circumcircle of
Proof
Let and be the midpoints of segments and respectively.
Then points and are collinear
is Simson line of lies on circumcircle of as desired.
vladimir.shelomovskii@gmail.com, vvsss