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Congruent triangles in arrangements of lines
Abstract: We study the maximum number of congruent triangles in finite arrangements of lines in the Euclidean plane. Denote this number by f ( ). We show that f (5) = 5 and that the construction realizing this maximum is unique, f (6) = 8, and f (7) = 14. We also discuss for which integers c there exist arrangements on lines with exactly c congruent triangles. In parallel, we treat the case when the triangles are faces of the plane graph associated to the arrangement (i.e. the interior of the triangle has empty intersec…
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2020
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