Proposition: Prop. 12.17: Construction of Polyhedron in Outer of Concentric Spheres
There being two spheres about the same center, to inscribe a polyhedral solid in the greater sphere, not touching the lesser sphere on its surface.
* Let two spheres have been conceived about the same center, $A$.
* So, it is necessary to inscribe a polyhedral solid in the greater sphere, not touching the lesser sphere on its surface.
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Table of Contents
Proofs: 1 Corollaries: 1
Adapted from (subject to copyright, with kind permission)
- Fitzpatrick, Richard: Euclid's "Elements of Geometry"
Adapted from CC BY-SA 3.0 Sources:
- Prime.mover and others: "Pr∞fWiki", https://proofwiki.org/wiki/Main_Page, 2016