Triangle conic Source: en.wikipedia.org/wiki/Triangle_conic

In Euclidean 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 Steiner ellipse, which is an ellipse passing through the vertices and having its centre at the centroid of the reference triangle; the Kiepert hyperbola which is a conic passing through the vertices, the centroid and the orthocentre of the reference triangle; and the Artzt parabolas, which are parabolas touching two sidelines of the reference triangle at vertices of the triangle.

The terminology of triangle conic is widely used in the literature without a formal definition; that is, without precisely formulating the relations a conic should have with the reference triangle so as to qualify it to be called a triangle conic (see ^[1][2][3][4]). However, Greek mathematician Paris Pamfilos defines a triangle conic as a "conic circumscribing a triangle △ABC (that is, passing through its vertices) or inscribed in a triangle (that is, tangent to its side-lines)".^[5][6] The terminology triangle circle (respectively, ellipse, hyperbola, parabola) is used to denote a circle (respectively, ellipse, hyperbola, parabola) associated with the reference triangle is some way.

Even though several triangle conics have been studied individually, there is no comprehensive encyclopedia or catalogue of triangle conics similar to Clark Kimberling's Encyclopedia of Triangle Centres or Bernard Gibert's Catalogue of Triangle Cubics.^[7]

The equation of a general triangle conic in trilinear coordinates x : y : z has the form $${\displaystyle rx^{2}+sy^{2}+tz^{2}+2uyz+2vzx+2wxy=0.}$$ The equations of triangle circumconics and inconics have respectively the forms $${\displaystyle {\begin{aligned}&uyz+vzx+wxy=0\\[2pt]&l^{2}x^{2}+m^{2}y^{2}+n^{2}z^{2}-2mnyz-2nlzx-2lmxy=0\end{aligned}}}$$

The relationship between the circumcircle and incircle of an equilateral triangle can be generalized via projective transformations to pairs of circumconics and inconics of arbitrary triangles. Given a reference triangle, the perspectors of two dual conics (perspectors of the reference triangle and its polar triangles with respect to the conics) are isotomic conjugates. The perspector of an inconic is the same as its Brianchon point.

Pairs of triangle conics that are dual in this way include the Steiner ellipse and the Steiner inellipse, and the Kiepert hyperbola and the Kiepert parabola.^[8][9][10]

In the following, a few typical special triangle conics are discussed. In the descriptions, the standard notations are used: the reference triangle is always denoted by △ABC. The angles at the vertices A, B, C are denoted by A, B, C and the lengths of the sides opposite to the vertices A, B, C are respectively a, b, c. The equations of the conics are given in the trilinear coordinates x : y : z. The conics are selected as illustrative of the several different ways in which a conic could be associated with a triangle.

Some well known triangle circles^[11]

No.	Name	Definition	Equation	Figure
1	Circumcircle	Circle which passes through the vertices	${\displaystyle {\frac {a}{x}}+{\frac {b}{y}}+{\frac {c}{z}}=0}$
2	Incircle	Circle which touches the sidelines internally	${\displaystyle \pm {\sqrt {x}}\cos {\frac {A}{2}}\pm {\sqrt {y}}\cos {\frac {B}{2}}\pm {\sqrt {z}}\cos {\frac {C}{2}}=0}$
3	Excircles (or escribed circles)	A circle lying outside the triangle, tangent to one of its sides and tangent to the extensions of the other two. Every triangle has three distinct excircles.	${\displaystyle {\begin{aligned}\pm {\sqrt {-x}}\cos {\frac {A}{2}}\pm {\sqrt {y}}\cos {\frac {B}{2}}\pm {\sqrt {z}}\cos {\frac {C}{2}}&=0\\[2pt]\pm {\sqrt {x}}\cos {\frac {A}{2}}\pm {\sqrt {-y}}\cos {\frac {B}{2}}\pm {\sqrt {z}}\cos {\frac {C}{2}}&=0\\[2pt]\pm {\sqrt {x}}\cos {\frac {A}{2}}\pm {\sqrt {y}}\cos {\frac {B}{2}}\pm {\sqrt {-z}}\cos {\frac {C}{2}}&=0\end{aligned}}}$
4	Nine-point circle (or Feuerbach's circle, Euler's circle, Terquem's circle)	Circle passing through the midpoint of the sides, the foot of altitudes and the midpoints of the line segments from each vertex to the orthocenter	${\displaystyle {\begin{aligned}&x^{2}\sin 2A+y^{2}\sin 2B+z^{2}\sin 2C\ -\\&2(yz\sin A+zx\sin B+xy\sin C)=0\end{aligned}}}$
5	Lemoine circle	Draw lines through the Lemoine point (symmedian point) K and parallel to the sides of triangle △ABC. The points where the lines intersect the sides lie on a circle known as the Lemoine circle.

Some well known triangle ellipses

No.	Name	Definition	Equation	Figure
1	Steiner ellipse	Conic passing through the vertices of △ABC and having centre at the centroid of △ABC	${\displaystyle {\frac {1}{ax}}+{\frac {1}{by}}+{\frac {1}{cz}}=0}$
2	Steiner inellipse	Ellipse touching the sidelines at the midpoints of the sides	${\displaystyle {\begin{aligned}&a^{2}x^{2}+b^{2}y^{2}+c^{2}z^{2}-\\&2bcyz-2cazx-2abxy=0\end{aligned}}}$

Some well known triangle hyperbolas

No.	Name	Definition	Equation	Figure
1	Kiepert hyperbola	If the three triangles △XBC, △YCA, △ZAB, constructed on the sides of △ABC as bases, are similar, isosceles and similarly situated, then the lines AX, BY, CZ concur at a point N. The locus of N is the Kiepert hyperbola. The Kiepert hyperbola is rectangular and passes through the orthocenter and the centroid of △ABC. It is the isogonal conjugate of the Brocard axis. Its center is the orthopole of the Brocard axis and lies on the nine-point circle.	${\displaystyle {\frac {\sin(B-C)}{x}}+{\frac {\sin(C-A)}{y}}+{\frac {\sin(A-B)}{z}}=0}$
2	Jerabek hyperbola	Rectangular hyperbola passing through the vertices, the orthocenter and the circumcenter of △ABC. Isogonal conjugate of the Euler line. Its center is the orthopole of the Euler line and lies on the nine-point circle.	${\displaystyle {\begin{aligned}&{\frac {a(\sin 2B-\sin 2C)}{x}}+{\frac {b(\sin 2C-\sin 2A)}{y}}\\[2pt]&+{\frac {c(\sin 2A-\sin 2B)}{z}}=0\end{aligned}}}$
3	Feuerbach hyperbola	Rectangular hyperbola passing through the vertices, the orthocenter and the incenter of △ABC. Isogonal conjugate of ${\displaystyle OI}$, the line joining the circumcenter and the incenter. Its center is the orthopole of ${\displaystyle OI}$, the Feuerbach point.	${\displaystyle {\frac {\cos B-\cos C}{\alpha }}+{\frac {\cos C-\cos A}{\beta }}+{\frac {\cos A-\cos B}{\gamma }}=0,}$ where ${\displaystyle (\alpha ,\beta ,\gamma )}$ are barycentric coordinates.
4	Dual of the Yff parabola[12][10]	Hyperbola passing through the vertices, the centroid and the Gergonne point of △ABC. Isotomic conjugate of the Nagel line. It is not a rectangular hyperbola, thus it does not pass through the orthocenter and its centre does not lie on the nine-point circle.	${\displaystyle ab(a-b)\alpha \beta +bc(b-c)\beta \gamma +ca(c-a)\alpha \gamma =0}$

Some well known triangle parabolas

No.	Name	Definition	Equation	Figure
1	Artzt parabolas[13][14]	A parabola which is tangent at B, C to the sides AB, AC and two other similar parabolas. The focus of the Artzt parabola tangent to B, C is the projection of the circumcenter onto the symmedian through A and the inversion of the circumcenter in the circle of Apollonius through A.	${\displaystyle {\begin{aligned}{\frac {x^{2}}{a^{2}}}-{\frac {4yz}{bc}}&=0\\[2pt]{\frac {y^{2}}{b^{2}}}-{\frac {4zx}{ca}}&=0\\[2pt]{\frac {z^{2}}{c^{2}}}-{\frac {4xy}{ab}}&=0\end{aligned}}}$
2	Kiepert parabola[15]	Let three similar isosceles triangles △A'BC, △AB'C, △ABC' be constructed on the sides of △ABC. Then the envelope of the axis of perspectivity the triangles △ABC and △A'B'C' is Kiepert's parabola. Its directrix is the Euler line. Its focus is the trilinear pole of the Brocard axis, the orthocorrespondent of the center of the Kiepert hyperbola, the center of the Jerabek hyperbola of the anticomplementary triangle and, if △ABC is acute, the Feuerbach point of the tangential triangle.	${\displaystyle {\begin{aligned}&f^{2}x^{2}+g^{2}y^{2}+h^{2}z^{2}-\\[2pt]&2fgxy-2ghyz-2hfzx=0,\\[8pt]&{\text{where }}f=b^{2}-c^{2},\\&g=c^{2}-a^{2},\ h=a^{2}-b^{2}.\end{aligned}}}$
3	Yff parabola[12][16]	Parabola tangent to the sides of △ABC with directrix passing through the orthocenter, mittenpunkt, Spieker center, Clawson point and Bevan point. The directrix is the Brocard axis of the excentral triangle.	${\displaystyle {\begin{aligned}&a^{2}(b-c)^{2}\alpha ^{2}+\\[2pt]&b^{2}(c-a)^{2}\beta ^{2}+\\[2pt]&c^{2}(a-b)^{2}\gamma ^{2}-\\[2pt]&2[ab(b-c)(c-a)\alpha \beta +\\[2pt]&ac(a-b)(b-c)\alpha \gamma +\\[2pt]&bc(a-b)(c-a)\beta \gamma ]=0\end{aligned}}}$

An Hofstadter ellipse^[17] is a member of a one-parameter family of ellipses in the plane of △ABC defined by the following equation in trilinear coordinates: $${\displaystyle x^{2}+y^{2}+z^{2}+yz\left[D(t)+{\frac {1}{D(t)}}\right]+zx\left[E(t)+{\frac {1}{E(t)}}\right]+xy\left[F(t)+{\frac {1}{F(t)}}\right]=0}$$ where t is a parameter and $${\displaystyle {\begin{aligned}D(t)&=\cos A-\sin A\cot tA\\E(t)&=\cos B-\sin B\cot tB\\F(t)&=\sin C-\cos C\cot tC\end{aligned}}}$$ The ellipses corresponding to t and 1 − t are identical. When t = 1/2 we have the inellipse $${\displaystyle x^{2}+y^{2}+z^{2}-2yz-2zx-2xy=0}$$ and when t → 0 we have the circumellipse $${\displaystyle {\frac {a}{Ax}}+{\frac {b}{By}}+{\frac {c}{Cz}}=0.}$$

The family of Thomson conics consists of those conics inscribed in the reference triangle △ABC having the property that the normals at the points of contact with the sidelines are concurrent. The family of Darboux conics contains as members those circumscribed conics of the reference △ABC such that the normals at the vertices of △ABC are concurrent. In both cases the points of concurrency lie on the Darboux cubic.^[18][19]

Given an arbitrary point in the plane of the reference triangle △ABC, if lines are drawn through P parallel to the sidelines BC, CA, AB intersecting the other sides at X_b, X_c, Y_c, Y_a, Z_a, Z_b then these six points of intersection lie on a conic. If P is chosen as the symmedian point, the resulting conic is a circle called the Lemoine circle. If the trilinear coordinates of P are u : v : w the equation of the six-point conic is^[20] $${\displaystyle -(au+bv+cw)^{2}(uyz+vzx+wxy)+(ax+by+cz)(vw(bv+cw)x+wu(cw+au)y+uv(au+bv)z)=0}$$

The members of the one-parameter family of conics defined by the equation $${\displaystyle x^{2}+y^{2}+z^{2}-2\lambda (yz+zx+xy)=0,}$$ where ${\displaystyle \lambda }$ is a parameter, are the Yff conics associated with the reference triangle △ABC.^[21] A member of the family is associated with every point P(u : v : w) in the plane by setting $${\displaystyle \lambda ={\frac {u^{2}+v^{2}+w^{2}}{2(vw+wu+uv)}}.}$$ The Yff conic is a parabola if $${\displaystyle \lambda ={\frac {a^{2}+b^{2}+c^{2}}{a^{2}+b^{2}+c^{2}-2(bc+ca+ab)}}=\lambda _{0}}$$ (say). It is an ellipse if ${\displaystyle \lambda <\lambda _{0}}$ and ${\displaystyle \lambda _{0}>{\frac {1}{2}}}$ and it is a hyperbola if ${\displaystyle \lambda _{0}<\lambda <-1}$. For ${\displaystyle -1<\lambda <{\frac {1}{2}}}$, the conics are imaginary.

• Triangle center
• Central line
• Triangle cubic
• Modern triangle geometry