- Steve Sigur, Where are the
conjugates? 1--15
- Kloa Lu Nguyen, A
synthetic proof of Goormaghtigh's generalization of Musselman's
theorem, 17--20
- Victor Oxman, On
the existence of triangles with given lengths of one Side,
the opposite and one adjacent angle bisectors, 21--22.
- Thierry
Gensanes and Philippe Ryckelynck, On the maximal inflation
of two squares, 23--31.
- Sadi Abu-Saymeh and Mowaffaq Hajja,
Triangle centers with linear intercepts and linear subangles,
33--36.
- Hiroshi
Okumura and Masayuki Watanabe, The arbelos in n-aliquot
parts, 37--45.
- Bart De Bruyn, On a problem regarding
the n-sectors of a triangle, 47--52.
- Eric Danneels, A simple construction
of a triangle from its centroid, incenter, and a vertex, 53--56.
- Aad
Goddijn and Floor van Lamoen, Triangle-conic porism, 57--61.
- Antreas
Varverakis, A maximal property of cyclic quadrilaterals, 63--64.
- Sadi
Abu-Saymeh and Mowaffaq Hajja,
Some Brocard-like points of a triangle, 65--74.
- Paul
Yiu, Elegant geometric constructions, 75--96.
- Peter
J. C. Moses, Circles and triangle centers associated with the Lucas
circles, 97--106.
- Jozsef
Sandor, On the geometry of equilateral triangles, 107--117.
- K. R. S.
Sastry, Construction of Brahmagupt n-gons, 119--126.
- Minh Ha Nguyen,
Another proof of van Lamoen's theorem and its converse, 127--132.
- Frank Power,
Some more Archimedean Circles in the Arbelos, 133--134.
- Kurt Hofstetter,
Division of a segment in the golden section with ruler and rusty compass,
135--136.
- Ricardo M. Torrejon,
On an Erdos inscribed triangle inequality, 137--141.
- Wladimir G. Boskoff
and Bogdan D. Suceava, Applications of homogeneous functions to geometric
inequalities and identities in the euclidean plane, 143--148.
- Khoa Lu Nguyen, On
the complement of the Schiffler point, 149--164.
- Victor Oxman, On the
existence of triangles with given circumcircle, incircle, and one
additional element, 165--171.
- Eric Danneels, The Eppstein centers and the Kenmotu points, 173--180.
- Geoff C. Smith, Statics
and the moduli space of triangles, 181--190.
- K. R. S. Sastry, A Gergonne
analogue of the Steiner - Lehmus theorem, 191--195.
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