If a configuration of m triangles in the plane has only n points as vertices, then there must be a set ofmax { [m/(2n - 5)] Ω(m^3 /(n^6 log^2 n))triangles having a common intersection. As a consequence the number of halving planes for a three-dimensional point set is O(n^8/3 log^2/3 n). For all m and n there exist configurations of triangles in which the largest common intersection involvesmax{ [m/(2n - 5)] O(m^2 /n^3)triangles; the upper and lower bounds match for m= O(n^2). The best previous bounds were Ω(m^3 /n^ 6 log^5 n)) for intersecting triangles, and O(n^8/3 log^5/3 n) for halving planes
