In mathematics, modern triangle geometry, or new triangle geometry, is the body of knowledge relating to the properties of a

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 ...

discovered and developed roughly since the beginning of the last quarter of the nineteenth century. Triangles and their properties were the subject of investigation since at least the time of

Euclid Euclid (; grc-gre, Wikt:Εὐκλείδης, Εὐκλείδης; BC) was an ancient Greek mathematician active as a geometer and logician. Considered the "father of geometry", he is chiefly known for the ''Euclid's Elements, Elements'' trea ...

. In fact, Euclid's '' Elements'' contains description of the four special points –

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 ...

incenter In geometry, the incenter of a triangle is a triangle center, a point defined for any triangle in a way that is independent of the triangle's placement or scale. The incenter may be equivalently defined as the point where the internal angle bisec ...

circumcenter In geometry, the circumscribed circle or circumcircle of a polygon is a circle that passes through all the vertices of the polygon. The center of this circle is called the circumcenter and its radius is called the circumradius. Not every polyg ...

and

orthocenter In geometry, an altitude of a triangle is a line segment through a vertex and perpendicular to (i.e., forming a right angle with) a line containing the base (the side opposite the vertex). This line containing the opposite side is called the '' ...

- associated with a triangle. Even though

Pascal Pascal, Pascal's or PASCAL may refer to: People and fictional characters * Pascal (given name), including a list of people with the name * Pascal (surname), including a list of people and fictional characters with the name ** Blaise Pascal, Fren ...

and

Ceva Ceva, the ancient Ceba, is a small Italian town in the province of Cuneo, region of Piedmont, east of Cuneo. It lies on the right bank of the Tanaro on a wedge of land between that river and the Cevetta stream. History In the pre-Roman period th ...

in the seventeenth century,

Euler Leonhard Euler ( , ; 15 April 170718 September 1783) was a Swiss mathematician, physicist, astronomer, geographer, logician and engineer who founded the studies of graph theory and topology and made pioneering and influential discoveries in ma ...

in the eighteenth century and

Feuerbach Ludwig Andreas von Feuerbach (; 28 July 1804 – 13 September 1872) was a German anthropologist and philosopher, best known for his book ''The Essence of Christianity'', which provided a critique of Christianity that strongly influenced gener ...

in the nineteenth century and many other mathematicians had made important discoveries regarding the properties of the triangle, it was the publication in 1873 of a paper by

Emile Lemoine Emil or Emile may refer to: Literature *''Emile, or On Education'' (1762), a treatise on education by Jean-Jacques Rousseau * ''Émile'' (novel) (1827), an autobiographical novel based on Émile de Girardin's early life *''Emil and the Detective ...

(1840–1912) with the title "On a remarkable point of the triangle" that was considered to have, according to Nathan Altschiller-Court, "laid the foundations...of the modern geometry of the triangle as a whole." The ''

American Mathematical Monthly ''The American Mathematical Monthly'' is a mathematical journal founded by Benjamin Finkel in 1894. It is published ten times each year by Taylor & Francis for the Mathematical Association of America. The ''American Mathematical Monthly'' is an e ...

'', in which much of Lemoine's work is published, declared that "To none of these eometersmore than Émile-Michel-Hyacinthe Lemoine is due the honor of starting this movement of modern triangle geometry". The publication of this paper caused a remarkable upsurge of interest in investigating the properties of the triangle during the last quarter of the nineteenth century and the early years of the twentieth century. A hundred-page article on triangle geometry in

Klein's Encyclopedia of Mathematical Sciences Felix Klein's ''Encyclopedia of Mathematical Sciences'' is a German mathematics, mathematical encyclopedia published in six volumes from 1898 to 1933. Klein and Wilhelm Franz Meyer were organizers of the encyclopedia. Its full title in English is ...

published in 1914 bears witness to this upsurge of interest in triangle geometry. In the early days, the expression "new triangle geometry" referred to only the set of interesting objects associated with a triangle like the

Lemoine point In geometry, the Lemoine point, Grebe point or symmedian point is the intersection of the three symmedians (medians reflected at the associated angle bisectors) of a triangle. Ross Honsberger called its existence "one of the crown jewels of m ...

, Lemoine circle,

Brocard circle In geometry, the Brocard circle (or seven-point circle) is a circle derived from a given triangle. It passes through the circumcenter and symmedian of the triangle, and is centered at the midpoint of the line segment joining them (so that this s ...

and the

Lemoine line In geometry, central lines are certain special straight lines that lie in the plane of a triangle. The special property that distinguishes a straight line as a central line is manifested via the equation of the line in trilinear coordinates. This s ...

. Later the theory of correspondences which was an offshoot of the theory of geometric transformations was developed to give coherence to the various isolated results. With its development, the expression "new triangle geometry" indicated not only the many remarkable objects associated with a triangle but also the methods used to study and classify these objects. Here is a definition of triangle geometry from 1887: "Being given a point M in the plane of the triangle, we can always find, in an infinity of manners, a second point M' that corresponds to the first one according to an imagined geometrical law; these two points have between them geometrical relations whose simplicity depends on the more or less the lucky choice of the law which unites them and each geometrical law gives rise to a method of transformation a mode of conjugation which it remains to study." (See the conference paper titled "Teaching new geometrical methods with an ancient figure in the nineteenth and twentieth centuries: the new triangle geometry in textbooks in Europe and USA (1888–1952)" by Pauline Romera-Lebret presented in 2009.) However, this escalation of interest soon collapsed and triangle geometry was completely neglected until the closing years of the twentieth century. In his "Development of Mathematics",

Eric Temple Bell Eric Temple Bell (7 February 1883 – 21 December 1960) was a Scottish-born mathematician and science fiction writer who lived in the United States for most of his life. He published non-fiction using his given name and fiction as John Tai ...

offers his judgement on the status of modern triangle geometry in 1940 thus: "The geometers of the 20th Century have long since piously removed all these treasures to the museum of geometry where the dust of history quickly dimmed their luster." (The Development of Mathematics, p. 323) Philip Davis has suggested several reasons for the decline of interest in triangle geometry. These include: *The feeling that the subject is elementary and of low professional status. *The exhaustion of its methodologic possibilities. *The visual complexity of the so-called deeper results of the subject. *The downgrading of the visual in favor of the algebraic. *A dearth of connections to other fields. *Competition with other topics with a strong visual content like

tessellation A tessellation or tiling is the covering of a surface, often a plane (mathematics), plane, using one or more geometric shapes, called ''tiles'', with no overlaps and no gaps. In mathematics, tessellation can be generalized to high-dimensional ...

fractal In mathematics, a fractal is a geometric shape containing detailed structure at arbitrarily small scales, usually having a fractal dimension strictly exceeding the topological dimension. Many fractals appear similar at various scales, as illu ...

graph theory In mathematics, graph theory is the study of ''graphs'', which are mathematical structures used to model pairwise relations between objects. A graph in this context is made up of '' vertices'' (also called ''nodes'' or ''points'') which are conne ...

, etc. A further revival of interest was witnessed with the advent of the modern electronic

computer A computer is a machine that can be programmed to Execution (computing), carry out sequences of arithmetic or logical operations (computation) automatically. Modern digital electronic computers can perform generic sets of operations known as C ...

. The triangle geometry has again become an active area of research pursued by a group of dedicated geometers. As epitomizing this revival, one can point out the formulation of the concept of a "

triangle centre 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 ...

" and the compilation by Clark Kimberling of an

encyclopedia An encyclopedia (American English) or encyclopædia (British English) is a reference work or compendium providing summaries of knowledge either general or special to a particular field or discipline. Encyclopedias are divided into articles ...

of triangle centers containing a listing of nearly 50,000 triangle centers and their properties and also the compilation of a catalogue of

triangle cubic In mathematics, a cubic plane curve is a plane algebraic curve defined by a cubic equation : applied to homogeneous coordinates for the projective plane; or the inhomogeneous version for the affine space determined by setting in such an eq ...

s with detailed descriptions of several properties of more than 1200 triangle cubics. The open access journal ''Forum Geometricorum'' founded by Paul Yiu of Florida Atlantic University in 2001 also provided a tremendous impetus in furthering this new found enthusiasm for triangle geometry. Unfortunately, since 2019, the journal is not accepting submissions although back issues are still available online.

The Lemoine geometry

Lemoine point

For a given triangle ABC with centroid G, the

symmedian 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 ...

through the vertex is the reflection of the line AG in the bisector of the angle A. There are three symmedians for a triangle one passing through each vertex. The three symmedians are concurrent and the point of concurrency, commonly denoted by K, is called the

or the symmedian point or the Grebe point of triangle ABC. If the sidelengths of triangle ABC are ''a'', ''b'', ''c'' the baricentric coordinates of the Lemoine point are ''a''² : ''b''² : ''c''². It has been described as "one of the crown jewels of modern geometry".. There are several earlier references to this point in the mathematical literature details of which are available in John Mackay' history of the symmedian point. In fact, the concurrency of the symmedians is a special case of a more general result: For any point P in the plane of triangle ABC, the isogonals of the lines AP, BP, CP are concurrent, the isogonal of AP (respectively BP, CP) being the reflection of the line AP in the bisector of the angle A (respectively B, C). The point of concurrency is called the

isogonal conjugate __notoc__ In geometry, the isogonal conjugate of a point with respect to a triangle is constructed by reflecting the lines about the angle bisectors of respectively. These three reflected lines concur at the isogonal conjugate of . (This ...

of P. In this terminology, the Lemoine point is the

of the centroid.

Lemoine circles

The points of intersections of the lines through the Lemoine point of a triangle ABC parallel to the sides of the triangle lie on a circle called the first Lemoine circle of triangle ABC. The center of the first Lemoine circle lies midway between the circumcenter and the lemoine point of the triangle, The points of intersections of the antiparallels to the sides of triangle ABC through the Lemoine point of a triangle ABC lie on a circle called the second Lemoine circle or the cosine circle of triangle ABC. The name "cosine circle" is due to the property of the second Lemoine circle that the lengths of the segments intercepted by the circle on the sides of the triangle proportional to the cosines of the angles opposite to the sides. The center of the second Lemoine circle is the Lemoine point.

Lemoine axis

Any triangle ABC and its

tangential triangle In geometry, the tangential triangle of a reference triangle (other than a right triangle) is the triangle whose sides are on the tangent lines to the reference triangle's circumcircle at the reference triangle's vertices. Thus the incircle of the ...

are in perspective and the axis of perspectivity is called the Lemoine axis of triangle ABC. It is the

trilinear polar In Euclidean geometry, trilinear polarity is a certain correspondence between the points in the Plane (geometry), plane of a triangle not lying on the sides of the triangle and lines in the plane of the triangle not passing through the Vertex (g ...

of the symmedian point of triangle ABC and also the polar of K with regard to the circumcircle of triangle ABC. Lemoine punkt.svg, A triangle with medians (black), angle bisectors (dotted) and symmedians (red). The symmedians intersect in the symmedian point (denoted by L in the figure), the angle bisectors in the

I and the medians in the

G. FirstLemoineCircle.png, First Lemoine circle of triangle ABC. The Lemoine point K, the incenter I, the centroid G and the lines through K parallel to the sides are also shown. SecondLemoineCircle.png, Second Lemoine Circle of triangle ABC. The Lemoine point K, the incenter I, the centroid G and the lines through K antiparrallel to the sides are also shown. File:LemoineAxis.png, Lemoine axis of triangle ABC. The tangential triangle is also shown.

Early modern triangle geometry

A quick glance into the world of modern triangle geometry as it existed during the peak of interest in triangle geometry subsequent to the publication of Lemoine's paper is presented below. This presentation is largely based on the topics discussed in William Gallatly's book published in 1910 and Roger A Johnsons' book first published in 1929.

Poristic triangles

Two triangles are said to be poristic triangles if they have the same incircle and circumcircle. Given a circle with Center O and radius ''R'' and another circle with center I and radius ''r'', there are an infinite number of triangles ABC with Circle O(''R'') as circumcircle and I(''r'') as in circle if and only if . These triangles form a poristic system of triangles. The loci of certain special points like centroid as the reference triangle traces the different triangles poristic with it turn out to be circles and points.

The Simson line

For any point P on the circumcircle of triangle ABC, the feet of perpendiculars from P to the sides of triangle ABC are collinear and the line of collinearity is the well-known

Simson line In geometry, given a triangle and a point on its circumcircle, the three closest points to on lines , , and are collinear. The line through these points is the Simson line of , named for Robert Simson. The concept was first published, however ...

of P.

Pedal and antipedal triangles

Given a point P, let the feet of perpendiculars from P to the sides of the triangle ABC be D, E, F. The triangle DEF is called the

pedal triangle In geometry, a pedal triangle is obtained by projecting a point onto the sides of a triangle. More specifically, consider a triangle ''ABC'', and a point ''P'' that is not one of the vertices ''A, B, C''. Drop perpendiculars from ''P'' to the thr ...

of P. The antipedal triangle of P is the triangle formed by the lines through A, B, C perpendicular to PA, PB, PC respectively. Two points P and Q are called ''counter points'' if the pedal triangle of P is homothetic to the antipedal triangle of Q and the pedal triangle of Q is homothetic to the antipedal triangle of P.

The orthopole

Given any line ''l'', let P, Q, R be the feet of perpendiculars from the vertices A, B, C of triangle ABC to ''l''. The lines through P. Q, R perpendicular respectively to the sides BC, CA, AB are concurrent and the point of concurrence is the orthopole of the line ''l'' with respect to the triangle ABC. In modern triangle geometry, there is a large body of literature dealing with properties of orthopoles.

The Brocard points

Let of circles be described on the sides BC, CA, AB of triangle ABC whose external segments contain the two triads of angles C, A, B and B, C, A respectively. Each triad of circles determined by a triad of angles intersect at a common point thus yielding two such points. These points are called the

Brocard point In geometry, Brocard points are special points within a triangle. They are named after Henri Brocard (1845–1922), a French mathematician. Definition In a triangle ''ABC'' with sides ''a'', ''b'', and ''c'', where the vertices are labeled '' ...

s of triangle ABC and are usually denoted by

\Omega, \Omega^\prime

. If P is the first Brocard point (which is the Brocard point determined by the first triad of circles) then the angles PBC, PCA and PAB are equal to each other and the common angle is called the Brocard angle of triangle ABC and is commonly denoted by

\omega

The Brocard angle is given by :

\cot \omega=\cot A + \cot B +\cot C .

The Brocard points and the Brocard angles have several interesting properties.

Some images

PoristicTriangles.png, Two poristic triangles ABC and A'B'C' with respect to circles I(''r'') and O(''R'') SimpsonLine.png, Simson line of P PedalAntipedalTriangles.png, Pedal triangle (DEF) and antipedal triangle (LMN) of P Orthopole.svg, Orthopole of line ''l'' Brocard point.svg, First Brocard point of triangle ABC

Contemporary modern triangle geometry

Triangle center

One of the most significant ideas that has emerged during the revival of interest in triangle geometry during the closing years of twentieth century is the notion of ''

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 ...

''. This concept introduced by

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 ...

in 1994 unified in one notion the very many special and remarkable points associated with a triangle. Since the introduction of this idea, nearly no discussion on any result associated with a triangle is complete without a discussion on how the result connects with the triangle centers.

Definition of triangle center

real-valued function In mathematics, a real-valued function is a function whose values are real numbers. In other words, it is a function that assigns a real number to each member of its domain. Real-valued functions of a real variable (commonly called ''real fun ...

''f'' of three real variables ''a'', ''b'', ''c'' may have the following properties: *Homogeneity: ''f''(''ta'',''tb'',''tc'') = ''t''^''n'' ''f''(''a'',''b'',''c'') for some constant ''n'' and for all ''t'' > 0. *Bisymmetry in the second and third variables: ''f''(''a'',''b'',''c'') = ''f''(''a'',''c'',''b''). If a non-zero ''f'' has both these properties it is called a triangle center function. If ''f'' is a triangle center function and ''a'', ''b'', ''c'' are the side-lengths of a reference triangle then the point whose

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 ...

are ''f''(''a'',''b'',''c'') : ''f''(''b'',''c'',''a'') : ''f''(''c'',''a'',''b'') is called a triangle center. Clark Kimberling is maintaining a website devoted to a compendium of triangle centers. The website named ''

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 ...

'' has definitions and descriptions of nearly 50,000 triangle centers.

Central line

Another unifying notion of contemporary modern triangle geometry is that of a central line. This concept unifies the several special straight lines associated with a triangle. The notion of a central line is also related to the notion of a triangle center.

Definition of central line

Let ''ABC'' be a plane triangle and let ( ''x'' : ''y'' : ''z'' ) be the

of an arbitrary point in the plane of triangle ''ABC''. A straight line in the plane of triangle ''ABC'' whose equation in trilinear coordinates has the form : ''f'' ( ''a'', ''b'', ''c'' ) ''x'' + ''g'' ( ''a'', ''b'', ''c'' ) ''y'' + ''h'' ( ''a'', ''b'', ''c'' ) ''z'' = 0 where the point with trilinear coordinates ( ''f'' ( ''a'', ''b'', ''c'' ) : ''g'' ( ''a'', ''b'', ''c'' ) : ''h'' ( ''a'', ''b'', ''c'' ) ) is a triangle center, is a central line in the plane of triangle ''ABC'' relative to the triangle ''ABC''.

Geometrical construction of central line

Let ''X'' be any triangle center of the triangle ''ABC''. *Draw the lines ''AX'', ''BX'' and ''CX'' and their reflections in the internal bisectors of the angles at the vertices ''A'', ''B'', ''C'' respectively. *The reflected lines are concurrent and the point of concurrence is the isogonal conjugate ''Y'' of ''X''. *Let the cevians ''AY'', ''BY'', ''CY'' meet the opposite sidelines of triangle ''ABC'' at ''A' '', ''B' '', ''C' '' respectively. The triangle ''A'''''B'''''C''' is the cevian triangle of ''Y''. *The triangle ''ABC'' and the cevian triangle ''A'''''B'''''C''' are in perspective and let ''DEF'' be the axis of perspectivity of the two triangles. The line ''DEF'' is the trilinear polar of the point ''Y''. The line ''DEF'' is the central line associated with the triangle center ''X''.

Triangle conics

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 ...

is a

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 ...

in the plane of the reference triangle and associated with it in some way. For example, the

circumcircle In geometry, the circumscribed circle or circumcircle of a polygon is a circle that passes through all the vertices of the polygon. The center of this circle is called the circumcenter and its radius is called the circumradius. Not every polyg ...

and the

incircle In geometry, the incircle or inscribed circle of a triangle is the largest circle that can be contained in the triangle; it touches (is tangent to) the three sides. The center of the incircle is a triangle center called the triangle's incenter. ...

of the reference triangle are triangle conics. Other examples are the Steiner ellipse which is an

ellipse In mathematics, an ellipse is a plane curve surrounding two focus (geometry), focal points, such that for all points on the curve, the sum of the two distances to the focal points is a constant. It generalizes a circle, which is the special ty ...

passing through the vertices and having its centre at the

of the reference triangle, the

Kiepert hyperbola *Friedrich Wilhelm August Ludwig Kiepert Friedrich Wilhelm August Ludwig Kiepert (6 October 1846 – 5 September 1934) was a German mathematician A mathematician is someone who uses an extensive knowledge of mathematics in their work, typic ...

which is a conic passing through the vertices, the centroid and the

orthocentre In geometry, an altitude of a triangle is a line segment through a vertex and perpendicular to (i.e., forming a right angle with) a line containing the base (the side opposite the vertex). This line containing the opposite side is called the '' ...

of the reference triangle and the Artzt parabolas which are

parabola In mathematics, a parabola is a plane curve which is mirror-symmetrical and is approximately U-shaped. It fits several superficially different mathematical descriptions, which can all be proved to define exactly the same curves. One descript ...

s touching two sidelines of the reference triangle at vertices of the triangle. Some recently studied triangle conics include Hofstadter ellipses and yff conics. However, there is no formal definition of the terminology of ''triangle conic'' in the literature; that is, the relations a conic should have with the reference triangle so as to qualify it to be called a triangle conic have not been precisely formulated. WolframMathWorld has a page titled "Triangle conics" which gives a list of 42 items (not all of them are conics) without giving a definition of triangle conic. SteinerCircleOfTriangleABC.png, Steiner ellipse ArtztParabolas.png, Artz parabolas Kiepert Hyperbola.svg, Kiepert hyperbola

Triangle cubics

Cubic curves arise naturally in the study of triangles. For example, the locus of a point P in the plane of the reference triangle ABC such that, if the reflections of P in the sidelines of triangle ABC are P_a, P_b, P_c, then the lines AP_a, BP_b and CP_c are concurrent is a cubic curve named

Neuberg cubic In Euclidean geometry, the Neuberg cubic is a special cubic plane curve associated with a reference triangle with several remarkable properties. It is named after Joseph Jean Baptiste Neuberg (30 October 1840 – 22 March 1926), a Luxembourger mat ...

. It is the first cubic listed in Bernard Gilbert's

Catalogue of Triangle Cubics The Catalogue of Triangle Cubics is an online resource containing detailed information about more than 1200 cubic curves in the plane of a reference triangle. The resource is maintained by Bernard Gilbert. Each cubic in the resource is assigned a ...

. This Catalogue lists more than 1200 triangle cubics with information on each curve such as the barycentric equation of the curve, triangle centers which lie on the curve, locus properties of the curve and references to literature on the curve. NeubergCurve.png,

K001
McCayStelloid.png, McCay cubic with its three concurring asymptotes

TuckerCubic.png, Tucker cubic

Computers in triangle geometry

The entry of computers had a deciding influence on the course of development in the interest in triangle geometry witnessed during the closing years of the twentieth century and the early years of the current century. Some of the ways in which the computers had influenced this course have been delineated by Philip Davis. Computers have been used to generate new results in triangle geometry. A survey article published in 2015 gives an account of some of the important new results discovered by the computer programme "Dircoverer". The following sample of theorems gives a flavor of the new results discovered by Discoverer. *''Theorem 6.1'' Let P and Q are points, neither lying on a sideline of triangle ABC. If P and Q are isogonal conjugates with respect to ABC, then the Ceva product of their complements lies on the Kiepert hyperbola. *''Theorem 9.1.'' The Yff center of congruence is the internal center of similitude of the incircle and the circumcircle with respect to the pedal triangle of the incenter. *The

Lester circle In Euclidean plane geometry, Lester's theorem states that in any scalene triangle, the two Fermat points, the nine-point center, and the circumcenter lie on the same circle. The result is named after June Lester, who published it in 1997, and t ...

is the circle which passes through the circumcenter, the nine-point center and the outer and inner Fermat points. A generalised Lester circle is a circle which passes through at least four triangle centers. Discoverer has discovered several generalized Lester circles. Sava Grozdev, Hiroshi Okumura, Deko Dekov are maintaining a web portal dedicated to computer discovered encyclopedia of Euclidean geometry.

References

Additional reading

* * * * * * * * *{{cite book , last1=Scott, Charlotte Angas , title=An introductory account of certain modern ideas and methods in plane analytical geometry , date=1894 , publisher=Macmillan and Co , location=London , url=https://archive.org/details/anintroductorya04scotgoog/page/n6/mode/2up , access-date=10 January 2022 Triangle geometry History of geometry