Nine-point circle

In geometry, the nine-point circle is a circle that can be constructed for any given triangle. It is so named because it passes through nine significant points defined from the triangle. These nine points are:

The midpoint of each side of the triangle
The foot of each altitude
The midpoint of the line segment from each vertex of the triangle to the orthocenter (where the three altitudes meet; these line segments lie on their respective altitudes).

The nine-point circle is also known as Feuerbach's circle, Euler's circle, Terquem's circle, the six-points circle, the twelve-points circle, the n-point circle, the medioscribed circle, the mid circle or the circum-midcircle.

1 Significant points
2 Discovery
3 Tangent circles
4 Other interesting facts
5 See also
6 References
7 External links

Significant points

The diagram above shows the nine significant points of the nine-point circle. Points D, E, and F are the midpoints of the three sides of the triangle. Points G, H, and I are the feet of the altitudes of the triangle. Points J, K, and L are the midpoints of the line segments between each altitude's vertex intersection (points A, B, and C) and the triangle's orthocenter (point S).

For an acute triangle, six of the points (the midpoints and altitude feet) lie on the triangle itself; for an obtuse triangle two of the altitudes have feet outside the triangle, but these feet still belong to the nine-point circle.

Discovery

Although he is credited for its discovery, Karl Wilhelm Feuerbach did not entirely discover the nine-point circle, but rather the six point circle, recognizing the significance of the midpoints of the three sides of the triangle and the feet of the altitudes of that triangle. (See Fig. 1, points D, E, F, G, H, and I.) (At a slightly earlier date, Charles Brianchon and Jean-Victor Poncelet had stated and proven the same theorem.) But soon after Feuerbach, mathematician Olry Terquem himself proved the existence of the circle. He was the first to recognize the added significance of the three midpoints between the triangle's vertices and the orthocenter. (See Fig. 1, points J, K, and L.) Thus, Terquem was the first to use the name nine-point circle.

Tangent circles

In 1822 Karl Feuerbach discovered that any triangle's nine-point circle is externally tangent to that triangle's three excircles and internally tangent to its incircle; this result is known as Feuerbach's theorem. He postulated that:

... the circle which passes through the feet of the altitudes of a triangle is tangent to all four circles which in turn are tangent to the three sides of the triangle... (Feuerbach 1822)

The point at which the incircle and the nine-point circle touch is often referred to as the Feuerbach point.

Other interesting facts

The radius of a triangle's circumcircle is twice the radius of that triangle's nine-point circle.

Figure 3

A nine-point circle bisects a line segment going from the corresponding triangle's orthocenter to any point on its circumcircle.

Figure 4

The center of any nine-point circle (the nine-point center) lies on the corresponding triangle's Euler line, at the midpoint between that triangle's orthocenter and circumcenter.

The nine-point center lies at the centroid of four points comprising the triangle's three vertices and its orthocenter.

Of the nine points, the three midpoints of line segments between the vertices and the orthocenter are reflections of the triangle's midpoints about its nine-point center.

The center of all rectangular hyperbolas that pass through the vertices of a triangle lies on its nine-point circle. Examples include the well-known rectangular hyperbolas of Keipert, Jeřábek and Feuerbach. This fact is known as the Feuerbach conic theorem.

If an orthocentric system of four points A, B, C and H is given, then the four triangles formed by any combination of three distinct points of that system all share the same nine-point circle. Consequently, these four triangles have circumcircles with identical radii. Let N represent the common nine-point center and P be an arbitrary point in the plane of the orthocentric system. Then NA²+NB²+NC²+NH² = 3R² where R is the common circumradius and if PA²+PB²+PC²+PH² = K², where K is kept constant, then the locus of P is a circle centered at N with a radius $\scriptstyle \frac{1}{2} \sqrt{K^2-3R^2}$ . As P approaches N the locus of P for the corresponding constant K, collapses onto N the nine-point center. Furthermore the nine-point circle is the locus of P such that PA²+PB²+PC²+PH² = 4R².

The centers of the incircle and excircles of a triangle form an orthocentric system. The nine-point circle created for that orthocentric system is the circumcircle of the original triangle. The feet of the altitudes in the orthocentric system are the vertices of the original triangle.

If four arbitrary points A, B, C, D are given that do not form an orthocentric system, then the nine-point circles of ABC, BCD, CDA and DAB concur at a point. The remaining six intersection points of these nine-point circles each concur with the midpoints of the four triangles. Remarkably, there exists a unique nine-point conic, centered at the centroid of these four arbitrary points, that passes through all seven points of intersection of these nine-point circles. Furthermore because of the Feuerbach conic theorem mentioned above, there exists a unique rectangular circumconic, centered at the common intersection point of the four nine-point circles, that passes through the four original arbitrary points as well as the orthocenters of the four triangles.

If four points A, B, C, D are given that form a cyclic quadrilateral, then the nine-point circles of ABC, BCD, CDA and DAB concur at the anticenter of the cyclic quadrilateral. The nine-point circles are all congruent with a radius of half that of the cyclic quadrilateral's circumcircle. The nine-point circles form a set of four Johnson circles. Consequently the four nine-point centers are cylic and lie on a circle congruent to the four nine-point circles that is centered at the anticenter of the cyclic quadrilateral. Furthermore the cyclic quadrilateral formed from the four nine-pont centers is homothetic to the reference cyclic quadrilateral ABCD by a factor of −¹/₂ and its homothetic center (N) lies on the line connecting the circumcenter (O) to the anticenter (M) where ON = 2NM.

The orthopole of lines passing through the circumcenter lie on the nine-point circle.

Trilinear coordinates for the nine-point center are cos (B − C) : cos (C − A) : cos (A − B)

Trilinear coordinates for the Feuerbach point are 1 − cos (B − C) : 1 − cos (C − A) : 1 − cos (A − B)

Trilinear coordinates for the center of the Kiepert hyperbola are (b² − c²)²/a : (c² − a²)²/b : (a² − b²)²/c

Trilinear coordinates for the center of the Jeřábek hyperbola are cos A sin²(B − C) : cos B sin²(C − A) : cos C sin²(A − B)

Letting x : y : z be a variable point in trilinear coordinates, an equation for the nine-point circle is

x²sin 2A + y²sin 2B + z²sin 2C − 2(yz sin A + zx sin B + xy sin C) = 0.

References

Feuerbach, Karl (1822), Eigenschaften einiger merkwürdigen Punkte des geradlinigen Dreiecks und mehrerer durch sie bestimmten Linien und Figuren .

External links

Encyclopedia of Triangles Centers by Clark Kimberling. The nine-point center is indexed as X(5), the Feuerbach point, as X(11), the center of the Kiepert hyperbola as X(115), and the center of the Jeřábek hyperbola as X(125).
History about the nine-point circle based on J.S. MacKay's article from 1892: History of the Nine Point Circle
Weisstein, Eric W., "Nine-Point Circle" from MathWorld.
Weisstein, Eric W., "Orthopole" from MathWorld.
Nine Point Circle in Java at cut-the-knot
Feuerbach's Theorem: a Proof at cut-the-knot
Special lines and circles in a triangle by Walter Fendt (requires Java)
An interactive Java applet showing several triangle centers that lies on the Nine Point Circle.
Interactive Nine Point Circle applet from the Wolfram Demonstrations Project
Nine-point conic and Euler line generalization at Dynamic Geometry Sketches Generalizes nine-point circle to a nine-point conic with an associated generalization of the Euler line.