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A dual for Descartes’ theorem on polyhedra

Published online by Cambridge University Press:  01 August 2016

Branko Grünbaum  and
G. C. Shephard
Branko Grünbaum
Affiliation:
University of Washington, Seattle, WA 98195, USA
G. C. Shephard
Affiliation:
University of East Anglia, Norwich NR4 7TJ
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Extract

The theory of duality is well known as a useful tool in the study of convex three-dimensional polyhedra. For example, if we know the types of polyhedra that can be circumscribed about a sphere, duality provides an immediate answer to the question as to what types can be inscribed in a sphere. Theorems like Euler’s Theorem (VE + F = 2 where V, E and F are the numbers of vertices, edges and faces of a convex polyhedron) are self-dual in the sense that duality simply interchanges the values of V and F.

Type
Research Article
Information
The Mathematical Gazette , Volume 71 , Issue 457 , October 1987 , pp. 214 - 216
Copyright
Copyright © The Mathematical Association 1987

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References

1. Federico, P.J., Descartes on Polyhedra. Springer-Verlag, New York, Heidelberg, Berlin 1982.Google Scholar
2. Guggenheimer, H., Polar reciprocal convex bodies, Israel Journal of Mathematics 14, 309316 (1973) and 29. 312 (1978)CrossRefGoogle Scholar
3. Hilton, P. and Pedersen, J. Discovering modifyhing and solving problems: a case study from the contemplation of polyhedra. (To appear in Teaching and learning: a focus on problem solving, soon to be published by the National Council of Teachers of Mathematics.)Google Scholar