For which greatest $n$ there exists a convex polyhedron with $n$ faces having the following property: for each face there exists a point outside the polyhedron such that the remaining $n - 1$ faces are seen from this point?
Source: 10.2 of XX Geometrical Olympiad in honour of I.F.Sharygin
Tags: geometry, geo, 3d
For which greatest $n$ there exists a convex polyhedron with $n$ faces having the following property: for each face there exists a point outside the polyhedron such that the remaining $n - 1$ faces are seen from this point?