Kiepert's Hyperbola
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geometry Geometry (; ) is, with arithmetic, one of the oldest branches of mathematics. It is concerned with properties of space such as the distance, shape, size, and relative position of figures. A mathematician who works in the field of geometry is c ...
, Napoleon points are a pair of special points associated with a
plane Plane(s) most often refers to: * Aero- or airplane, a powered, fixed-wing aircraft * Plane (geometry), a flat, 2-dimensional surface Plane or planes may also refer to: Biology * Plane (tree) or ''Platanus'', wetland native plant * Planes (gen ...
triangle A triangle is a polygon with three Edge (geometry), edges and three Vertex (geometry), vertices. It is one of the basic shapes in geometry. A triangle with vertices ''A'', ''B'', and ''C'' is denoted \triangle ABC. In Euclidean geometry, an ...
. It is generally believed that the existence of these points was discovered by
Napoleon Bonaparte Napoleon Bonaparte ; it, Napoleone Bonaparte, ; co, Napulione Buonaparte. (born Napoleone Buonaparte; 15 August 1769 – 5 May 1821), later known by his regnal name Napoleon I, was a French military commander and political leader who ...
, the
Emperor of the French Emperor of the French ( French: ''Empereur des Français'') was the title of the monarch and supreme ruler of the First and the Second French Empires. Details A title and office used by the House of Bonaparte starting when Napoleon was procl ...
from 1804 to 1815, but many have questioned this belief. The Napoleon points are
triangle center In geometry, a triangle center (or triangle centre) is a point in the plane that is in some sense a center of a triangle akin to the centers of squares and circles, that is, a point that is in the middle of the figure by some measure. For example ...
s and they are listed as the points X(17) and X(18) in
Clark Kimberling Clark Kimberling (born November 7, 1942 in Hinsdale, Illinois) is a mathematician, musician, and composer. He has been a mathematics professor since 1970 at the University of Evansville. His research interests include triangle centers, integer seq ...
's
Encyclopedia of Triangle Centers The Encyclopedia of Triangle Centers (ETC) is an online list of thousands of points or "centers" associated with the geometry of a triangle. It is maintained by Clark Kimberling, Professor of Mathematics at the University of Evansville. , the l ...
. The name "Napoleon points" has also been applied to a different pair of triangle centers, better known as the
isodynamic point In Euclidean geometry, the isodynamic points of a triangle are points associated with the triangle, with the properties that an inversion centered at one of these points transforms the given triangle into an equilateral triangle, and that the dis ...
s.


Definition of the points


First Napoleon point

Let ''ABC'' be any given
plane Plane(s) most often refers to: * Aero- or airplane, a powered, fixed-wing aircraft * Plane (geometry), a flat, 2-dimensional surface Plane or planes may also refer to: Biology * Plane (tree) or ''Platanus'', wetland native plant * Planes (gen ...
triangle A triangle is a polygon with three Edge (geometry), edges and three Vertex (geometry), vertices. It is one of the basic shapes in geometry. A triangle with vertices ''A'', ''B'', and ''C'' is denoted \triangle ABC. In Euclidean geometry, an ...
. On the sides ''BC'', ''CA'', ''AB'' of the triangle, construct outwardly drawn
equilateral triangle In geometry, an equilateral triangle is a triangle in which all three sides have the same length. In the familiar Euclidean geometry, an equilateral triangle is also equiangular; that is, all three internal angles are also congruent to each othe ...
s ''DBC'', ''ECA'' and ''FAB'' respectively. Let the
centroid In mathematics and physics, the centroid, also known as geometric center or center of figure, of a plane figure or solid figure is the arithmetic mean position of all the points in the surface of the figure. The same definition extends to any ob ...
s of these triangles be ''X'', ''Y'' and ''Z'' respectively. Then the lines ''AX'', ''BY'' and ''CZ'' are
concurrent Concurrent means happening at the same time. Concurrency, concurrent, or concurrence may refer to: Law * Concurrence, in jurisprudence, the need to prove both ''actus reus'' and ''mens rea'' * Concurring opinion (also called a "concurrence"), a ...
. The point of concurrence ''N1'' is the first Napoleon point, or the outer Napoleon point, of the triangle ''ABC''. The triangle ''XYZ'' is called the outer Napoleon triangle of the triangle ''ABC''.
Napoleon's theorem In geometry, Napoleon's theorem states that if equilateral triangles are constructed on the sides of any triangle, either all outward or all inward, the lines connecting the centres of those equilateral triangles themselves form an equilateral tr ...
asserts that this triangle is an
equilateral triangle In geometry, an equilateral triangle is a triangle in which all three sides have the same length. In the familiar Euclidean geometry, an equilateral triangle is also equiangular; that is, all three internal angles are also congruent to each othe ...
. In
Clark Kimberling Clark Kimberling (born November 7, 1942 in Hinsdale, Illinois) is a mathematician, musician, and composer. He has been a mathematics professor since 1970 at the University of Evansville. His research interests include triangle centers, integer seq ...
's
Encyclopedia of Triangle Centers The Encyclopedia of Triangle Centers (ETC) is an online list of thousands of points or "centers" associated with the geometry of a triangle. It is maintained by Clark Kimberling, Professor of Mathematics at the University of Evansville. , the l ...
, the first Napoleon point is denoted by X(17). * The
trilinear coordinates In geometry, the trilinear coordinates of a point relative to a given triangle describe the relative directed distances from the three sidelines of the triangle. Trilinear coordinates are an example of homogeneous coordinates. The ratio is t ...
of N1: :: \begin & \left(\csc\left(A + \frac\right), \csc\left(B + \frac\right), \csc\left(C + \frac\right)\right) \\ & = \left( \sec\left(A -\frac\right), \sec\left(B -\frac\right), \sec\left(C - \frac\right)\right) \end * The
barycentric coordinates In mathematics, an affine space is a geometric structure that generalizes some of the properties of Euclidean spaces in such a way that these are independent of the concepts of distance and measure of angles, keeping only the properties related ...
of N1: :: \left(a \csc\left(A + \frac\right), b \csc\left(B +\frac\right), c \csc\left(C + \frac\right)\right)


Second Napoleon point

Let ''ABC'' be any given
plane Plane(s) most often refers to: * Aero- or airplane, a powered, fixed-wing aircraft * Plane (geometry), a flat, 2-dimensional surface Plane or planes may also refer to: Biology * Plane (tree) or ''Platanus'', wetland native plant * Planes (gen ...
triangle A triangle is a polygon with three Edge (geometry), edges and three Vertex (geometry), vertices. It is one of the basic shapes in geometry. A triangle with vertices ''A'', ''B'', and ''C'' is denoted \triangle ABC. In Euclidean geometry, an ...
. On the sides ''BC'', ''CA'', ''AB'' of the triangle, construct inwardly drawn equilateral triangles ''DBC'', ''ECA'' and ''FAB'' respectively. Let the
centroid In mathematics and physics, the centroid, also known as geometric center or center of figure, of a plane figure or solid figure is the arithmetic mean position of all the points in the surface of the figure. The same definition extends to any ob ...
s of these triangles be ''X'', ''Y'' and ''Z'' respectively. Then the lines ''AX'', ''BY'' and ''CZ'' are concurrent. The point of concurrence ''N2'' is the second Napoleon point, or the inner Napoleon point, of the triangle ''ABC''. The triangle ''XYZ'' is called the inner Napoleon triangle of the triangle ''ABC''.
Napoleon's theorem In geometry, Napoleon's theorem states that if equilateral triangles are constructed on the sides of any triangle, either all outward or all inward, the lines connecting the centres of those equilateral triangles themselves form an equilateral tr ...
asserts that this triangle is an equilateral triangle. In Clark Kimberling's Encyclopedia of Triangle Centers, the second Napoleon point is denoted by ''X''(18). * The trilinear coordinates of N2: :: \begin & \left(\csc\left(A - \frac\right), \csc\left(B - \frac\right), \csc\left(C - \frac\right)\right) \\ & = \left(\sec\left(A + \frac\right), \sec\left(B +\frac\right), \sec\left(C + \frac\right)\right) \end * The barycentric coordinates of N2: :: \left(a \csc\left(A - \frac\right), b \csc\left(B -\frac\right), c \csc \left(C - \frac\right)\right) Two points closely related to the Napoleon points are the Fermat-Torricelli points (ETC's X13 and X14). If instead of constructing lines joining the equilateral triangles' centroids to the respective vertices one now constructs lines joining the equilateral triangles' apices to the respective vertices of the triangle, the three lines so constructed are again concurrent. The points of concurrence are called the Fermat-Torricelli points, sometimes denoted F1 and F2. The intersection of the Fermat line (i.e., that line joining the two Fermat-Torricelli points) and the Napoleon line (i.e., that line joining the two Napoleon points) is the triangle's
symmedian point In geometry, symmedians are three particular lines associated with every triangle. They are constructed by taking a median of the triangle (a line connecting a vertex with the midpoint of the opposite side), and reflecting the line over the corr ...
(ETC's X6).


Generalizations

The results regarding the existence of the Napoleon points can be generalized in different ways. In defining the Napoleon points we begin with equilateral triangles drawn on the sides of the triangle ''ABC'' and then consider the centers ''X'', ''Y'', and ''Z'' of these triangles. These centers can be thought as the vertices of
isosceles triangle In geometry, an isosceles triangle () is a triangle that has two sides of equal length. Sometimes it is specified as having ''exactly'' two sides of equal length, and sometimes as having ''at least'' two sides of equal length, the latter versio ...
s erected on the sides of triangle ABC with the base angles equal to /6 (30 degrees). The generalizations seek to determine other triangles that, when erected over the sides of the triangle ''ABC'', have concurrent lines joining their external vertices and the vertices of triangle ''ABC''.


Isosceles triangles

This generalization asserts the following: :''If the three triangles XBC, YCA and ZAB, constructed on the sides of the given triangle ABC as bases, are similar,
isosceles In geometry, an isosceles triangle () is a triangle that has two sides of equal length. Sometimes it is specified as having ''exactly'' two sides of equal length, and sometimes as having ''at least'' two sides of equal length, the latter versio ...
and similarly situated, then the lines AX, BY, CZ concur at a point N.'' If the common base angle is \theta, then the vertices of the three triangles have the following trilinear coordinates. * X ( - \sin \theta, \sin( C + \theta) , \sin( B + \theta) ) * Y ( \sin( C + \theta), - \sin \theta , \sin( A + \theta) ) * Z ( \sin( B + \theta ) , \sin( A + \theta), -\sin \theta ) The trilinear coordinates of ''N'' are :(\csc(A+\theta),\csc(B+\theta),\csc(C+\theta)). A few special cases are interesting. : Moreover, the
locus Locus (plural loci) is Latin for "place". It may refer to: Entertainment * Locus (comics), a Marvel Comics mutant villainess, a member of the Mutant Liberation Front * ''Locus'' (magazine), science fiction and fantasy magazine ** ''Locus Award' ...
of ''N'' as the base angle \theta varies between −/2 and /2 is the
conic In mathematics, a conic section, quadratic curve or conic is a curve obtained as the intersection of the surface of a cone with a plane. The three types of conic section are the hyperbola, the parabola, and the ellipse; the circle is a special ...
:\frac x + \frac y + \frac z = 0. This
conic In mathematics, a conic section, quadratic curve or conic is a curve obtained as the intersection of the surface of a cone with a plane. The three types of conic section are the hyperbola, the parabola, and the ellipse; the circle is a special ...
is a
rectangular hyperbola In mathematics, a hyperbola (; pl. hyperbolas or hyperbolae ; adj. hyperbolic ) is a type of smooth curve lying in a plane, defined by its geometric properties or by equations for which it is the solution set. A hyperbola has two pieces, cal ...
and it is called the
Kiepert hyperbola *Friedrich Wilhelm August Ludwig Kiepert, German mathematician *Heinrich Kiepert, German Geographer *Richard Kiepert Richard Kiepert (September 13, 1846 – August 4, 1915) was a German cartographer born in Weimar. He was the son of famed geograp ...
in honor of
Ludwig Kiepert Friedrich Wilhelm August Ludwig Kiepert (6 October 1846 – 5 September 1934) was a German mathematician who introduced the Kiepert hyperbola. Selected works ''De curvis quarum arcus integralibus ellipticis primi generis exprimuntur'' 1870, diss ...
(1846–1934), the mathematician who discovered this result. This hyperbola is the unique conic which passes through the five points A, B, C, G and O.


Similar triangles

The three triangles ''XBC'', ''YCA'', ''ZAB'' erected over the sides of the triangle ''ABC'' need not be isosceles for the three lines ''AX'', ''BY'', ''CZ'' to be concurrent. :''If similar triangles XBC, AYC, ABZ are constructed outwardly on the sides of any triangle ABC then the lines AX, BY and CZ are concurrent.''


Arbitrary triangles

The concurrence of the lines ''AX'', ''BY'', and ''CZ'' holds even in much relaxed conditions. The following result states one of the most general conditions for the lines ''AX'', ''BY'', ''CZ'' to be concurrent. :''If triangles XBC, YCA, ZAB are constructed outwardly on the sides of any triangle ABC such that ::∠CBX = ∠ABZ, ∠ACY = ∠BCX, ∠BAZ = ∠CAY, :then the lines AX, BY and CZ are concurrent.'' The point of concurrency is known as the
Jacobi point In plane geometry, a Jacobi point is a point in the Euclidean plane determined by a triangle ''ABC'' and a triple of angles ''α'', ''β'', and ''γ''. This information is sufficient to determine three points ''X'', ''Y'', and ''Z'' ...
.


History

Coxeter and Greitzer state the Napoleon Theorem thus: ''If equilateral triangles are erected externally on the sides of any triangle, their centers form an equilateral triangle''. They observe that Napoleon Bonaparte was a bit of a mathematician with a great interest in geometry. However, they doubt whether Napoleon knew enough geometry to discover the theorem attributed to him. The earliest recorded appearance of the result embodied in Napoleon's theorem is in an article in
The Ladies' Diary ''The Ladies' Diary: or, Woman's Almanack'' appeared annually in London from 1704 to 1841 after which it was succeeded by ''The Lady's and Gentleman's Diary''. It featured material relating to calendars etc. including sunrise and sunset times an ...
appeared in 1825. The Ladies' Diary was an annual periodical which was in circulation in London from 1704 to 1841. The result appeared as part of a question posed by W. Rutherford, Woodburn. :VII. Quest.(1439); by Mr. W. Rutherford, Woodburn." ''Describe equilateral triangles (the vertices being either all outward or all inward) upon the three sides of any triangle ABC: then the lines which join the centers of gravity of those three equilateral triangles will constitute an equilateral triangle. Required a demonstration.''" However, there is no reference to the existence of the so-called Napoleon points in this question. Christoph J. Scriba, a German
historian of mathematics The history of mathematics deals with the origin of discoveries in mathematics and the mathematical methods and notation of the past. Before the modern age and the worldwide spread of knowledge, written examples of new mathematical developments ...
, has studied the problem of attributing the Napoleon points to
Napoleon Napoleon Bonaparte ; it, Napoleone Bonaparte, ; co, Napulione Buonaparte. (born Napoleone Buonaparte; 15 August 1769 – 5 May 1821), later known by his regnal name Napoleon I, was a French military commander and political leader who ...
in a paper in
Historia Mathematica ''Historia Mathematica: International Journal of History of Mathematics'' is an academic journal on the history of mathematics published by Elsevier. It was established by Kenneth O. May in 1971 as the free newsletter ''Notae de Historia Mathemat ...
.


See also

*
Triangle center In geometry, a triangle center (or triangle centre) is a point in the plane that is in some sense a center of a triangle akin to the centers of squares and circles, that is, a point that is in the middle of the figure by some measure. For example ...
*
Triangle conic In triangle geometry, a triangle conic is a conic in the plane of the reference triangle and associated with it in some way. For example, the circumcircle and the incircle of the reference triangle are triangle conics. Other examples are the Steine ...
*
Napoleon's theorem In geometry, Napoleon's theorem states that if equilateral triangles are constructed on the sides of any triangle, either all outward or all inward, the lines connecting the centres of those equilateral triangles themselves form an equilateral tr ...
*
Napoleon's problem Napoleon's problem is a compass construction problem. In it, a circle and its center are given. The challenge is to divide the circle into four equal arcs using only a compass. Napoleon was known to be an amateur mathematician, but it is not ...
*
Van Aubel's theorem In plane geometry, Van Aubel's theorem describes a relationship between squares constructed on the sides of a quadrilateral. Starting with a given convex quadrilateral, construct a square, external to the quadrilateral, on each side. Van Aubel's ...
*
Fermat point In Euclidean geometry, the Fermat point of a triangle, also called the Torricelli point or Fermat–Torricelli point, is a point such that the sum of the three distances from each of the three vertices of the triangle to the point is the smallest ...


References


Further reading

* * * * * * * * {{cite web, last=Wetzel, first=John E., title=Converses of Napoleon's Theorem, date=April 1992, url=http://apollonius.math.nthu.edu.tw/d1/disk5/js/geometry/napoleon/9.pdf, access-date=24 April 2012, url-status=dead, archive-url=https://web.archive.org/web/20140429191842/http://apollonius.math.nthu.edu.tw/d1/disk5/js/geometry/napoleon/9.pdf, archive-date=29 April 2014 Triangle centers