Van Lamoen circle

The van Lamoen circle through six circumcenters

A_b

,

A_{c}

,

B_{c}

,

B_{a}

,

C_{a}

,

C_{b}

In Euclidean plane geometry, the van Lamoen circle is a special circle associated with any given triangle $T$ . It contains the circumcenters of the six triangles that are defined inside $T$ by its three medians.^[1]^[2]

Specifically, let $A$ , $B$ , $C$ be the vertices of $T$ , and let $G$ be its centroid (the intersection of its three medians). Let $M_a$ , $M_{b}$ , and $M_c$ be the midpoints of the sidelines $BC$ , $CA$ , and $AB$ , respectively. It turns out that the circumcenters of the six triangles $AGM_{c}$ , $BGM_{c}$ , $BGM_{a}$ , $CGM_{a}$ , $CGM_{b}$ , and $AGM_{b}$ lie on a common circle, which is the van Lamoen circle of $T$ .^[2]

History

The van Lamoen circle is named after the mathematician Floor van Lamoen who posed it as a problem in 2000.^[3]^[4] A proof was provided by Kin Y. Li in 2001,^[4] and the editors of the Amer. Math. Monthly in 2002.^[1]^[5]

Properties

The center of the van Lamoen circle is point $X(1153)$ in Clark Kimberling's comprehensive list of triangle centers.^[1]

In 2003, Alexey Myakishev and Peter Y. Woo proved that the converse of the theorem is nearly true, in the following sense: let $P$ be any point in the triangle's interior, and $AA'$ , $BB'$ , and $CC'$ be its cevians, that is, the line segments that connect each vertex to $P$ and are extended until each meets the opposite side. Then the circumcenters of the six triangles $APB'$ , $APC'$ , $BPC'$ , $BPA'$ , $CPA'$ , and $CPB'$ lie on the same circle if and only if $P$ is the centroid of $T$ or its orthocenter (the intersection of its three altitudes).^[6] A simpler proof of this result was given by Nguyen Minh Ha in 2005.^[7]

References

1 2 3 Clark Kimberling (), X(1153) = Center of the van Lemoen circle, in the Encyclopedia of Triangle Centers Accessed on 2014-10-10.
1 2 Eric W. Weisstein, van Lamoen circle at Mathworld. Accessed on 2014-10-10.
↑ Floor van Lamoen (2000), Problem 10830 American Mathematical Monthly, volume 107, page 893.
1 2 Kin Y. Li (2001), Concyclic problems. Mathematical Excalibur, volume 6, issue 1, pages 1-2.
↑ (2002), Solution to Problem 10830. American Mathematical Monthly, volume 109, pages 396-397.
↑ Alexey Myakishev and Peter Y. Woo (2003), [http://forumgeom.fau.edu/F*2003volume3/FG200305.pdf On the Circumcenters of Cevasix Configuration. Forum Geometricorum, volume 3, pages 57-63.
↑ N. M. Ha (2005), Another Proof of van Lamoen's Theorem and Its Converse. Forum Geometricorum, volume 5, pages 127-132.

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[kimberlingX1153-1] 1 2 3 Clark Kimberling (), X(1153) = Center of the van Lemoen circle, in the Encyclopedia of Triangle Centers Accessed on 2014-10-10.

[wolframVLC-2] 1 2 Eric W. Weisstein, van Lamoen circle at Mathworld. Accessed on 2014-10-10.

[lamoen2000-3] Floor van Lamoen (2000), Problem 10830 American Mathematical Monthly, volume 107, page 893.

[liVLC-4] 1 2 Kin Y. Li (2001), Concyclic problems. Mathematical Excalibur, volume 6, issue 1, pages 1-2.

[lamoen2002-5] (2002), Solution to Problem 10830. American Mathematical Monthly, volume 109, pages 396-397.

[makwooVLC-6] Alexey Myakishev and Peter Y. Woo (2003), [http://forumgeom.fau.edu/F*2003volume3/FG200305.pdf On the Circumcenters of Cevasix Configuration. Forum Geometricorum, volume 3, pages 57-63.

[haVLC-7] N. M. Ha (2005), Another Proof of van Lamoen's Theorem and Its Converse. Forum Geometricorum, volume 5, pages 127-132.

Van Lamoen circle

History

Properties

See also

References