Let $P \subset \Bbb{R}^3$ be a convex polytope such that of the planes spanned by the faces, every $3$ intersect at a point, but no $4$ intersect. Prove that there exist $4$ such planes which form a tetrahedron containing $P$.
2026-04-06 02:40:14.1775443214
Prove that there exist 4 such planes which form a tetrahedron containing P.
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