The problem of polygons with hidden vertices

Joseph M. Ling

Abstract: G. Ewald proved that it is possible for a polygon(al path) in \bf{R}$^{3}$ to hide all its vertices behind its edges from the sight of a point $M$ not on the polygon. Ewald also stated that it takes at least 8 vertices to do the job and constructed an example with 14 vertices. It was then suggested that the least number of vertices $n_{\min }$ for such a configuration is closer to 14 than to 8. In this paper, we shall prove that $11\leq n_{\min }\leq 12$.

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