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In geometry, the two ears theorem states that every simple polygon with more than three vertices has at least two ears, vertices that can be removed from the polygon without introducing any crossings. The two ears theorem is equivalent to the existence of polygon triangulations. It is frequently attributed to Gary H. Meisters, but was proved earlier by Max Dehn.

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  • Two ears theorem (en)
  • Теорема про два вуха (uk)
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  • In geometry, the two ears theorem states that every simple polygon with more than three vertices has at least two ears, vertices that can be removed from the polygon without introducing any crossings. The two ears theorem is equivalent to the existence of polygon triangulations. It is frequently attributed to Gary H. Meisters, but was proved earlier by Max Dehn. (en)
  • В геометрії теорема про два вуха стверджує, що кожен простий багатокутник більш ніж з трьома вершинами має щонайменше два вуха, вершини, які можна вилучити з багатокутника без використання перетинів. Теорема про два вуха еквівалентна існуванню тріангуляції багатокутника. Її часто приписують Гері Х. Мейстерсу, але вона була доведена раніше Максом Деном. (uk)
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  • http://commons.wikimedia.org/wiki/Special:FilePath/Triangulation_3-coloring.svg
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  • Two-EarsTheorem (en)
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  • Two-Ears Theorem (en)
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  • In geometry, the two ears theorem states that every simple polygon with more than three vertices has at least two ears, vertices that can be removed from the polygon without introducing any crossings. The two ears theorem is equivalent to the existence of polygon triangulations. It is frequently attributed to Gary H. Meisters, but was proved earlier by Max Dehn. (en)
  • В геометрії теорема про два вуха стверджує, що кожен простий багатокутник більш ніж з трьома вершинами має щонайменше два вуха, вершини, які можна вилучити з багатокутника без використання перетинів. Теорема про два вуха еквівалентна існуванню тріангуляції багатокутника. Її часто приписують Гері Х. Мейстерсу, але вона була доведена раніше Максом Деном. (uk)
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