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Plaited Polyhedra

Published online by Cambridge University Press:  03 November 2016

Extract

In Cundy and Rollett’s invaluable book on Mathematical Models, the authors begin their Chapter on Polyhedra by remarking that “The most suitable, and in many ways the most attractive, subject for an experiment in the construction of mathematical models is a set of polyhedra.” Various methods are in general use to produce finished models of polyhedra for the showcase, and similar methods form the basis of those considered suitable for constructing the simpler polyhedra in the classroom. That most commonly adopted is to draw the net of the required solid on a sheet of cardboard, allow for tabs as necessary, cut it out, score the creases half-through, fold up, and stick the tabs with some suitable quick-drying cement. For class-room use the major drawback to model making on these lines is the time-consuming and potentially messy process of sticking; and it is the object of this article to develop a method which dispenses with the use of paste or cement altogether. In fact I shall show how, using paper and scissors only, firm, neat models can be made, which in the case of the simpler solids could easily be produced in the classroom, and which in the case of the more complex polyhedra reveal by their construction in a striking manner some of the geometrical relationships of these solids.

Type
Research Article
Copyright
Copyright © Mathematical Association 1959

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Footnotes

A lecture delivered at the Annual Meeting of the Mathematical Association in April 1959.

References

1. Cundy, H. M. and Rollett, A. P. Mathematical Models, Oxford, 1952.Google Scholar
2. Multi-Sensory Aids in the Teaching of Mathematics (18th Yearbook of the National Council of Teachers of Mathematics), Columbia University, New York, 1945.Google Scholar
3. John Gorham, M.R.C.S., A System for the Construction of Plaited Crystal Models on the Type of an Ordinary Plait; Exemplified by the Forms Belonging to the Six Axial Systems in Crystallography, E. and F. N. Spon, London, 1888.Google Scholar
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