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Quasilogarithms: an approach to the logarithm function

Published online by Cambridge University Press:  01 August 2016

Neil Bibby
Neil Bibby*
Affiliation:
Centre for Educational Studies, King’s College London (KQC), Chelsea Campus, 552 King’s Road, London SW10 0UA
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Extract

The decision by the GCE boards to ensure that all A-level Mathematics syllabuses contain a common core of pure mathematics is currently in course of implementation and near completion. In the wake of the syllabus changes a crop of new and revised A-level text books has appeared: many of these have a very familiar style and content, and have on the whole avoided any serious reappraisal of their subject matter. In particular most fail to exploit the calculator or microcomputer to any significant extent in the development of new concepts.

Type
Research Article
Information
The Mathematical Gazette , Volume 70 , Issue 452 , June 1986 , pp. 114 - 123
Copyright
Copyright © Mathematical Association 1986

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References

1. Turner, L. K. et al., Advanced mathematics. Longman (1975).Google Scholar
2. Tranter, C. J., Advanced level pure mathematics, 3rd ed. English Universities Press (1970).Google Scholar
3. Brissenden, T. H. F., Two ideas in the teaching of logarithms, in Readings in mathematical education: sixthform mathematics. Association of Teachers of Mathematics (1984).Google Scholar
4. Küchemann, D., Children’s understanding of numerical variables, Mathematics in School, 7 (1978) pp. 2326.Google Scholar
5. Gardiner, A., Infinite processes: background to analysis. Springer-Verlag (1982).CrossRefGoogle Scholar
6. Tall, D., Graphic calculus (Microcomputer Software) Glentop Publications (1984).Google Scholar
7. Hardy, G. H., A course of pure mathematics, 10th ed. Cambridge (1952).Google Scholar
8. Matthews, G., Calculus, in Teaching school mathematics. Penguin Books-Unesco (1971).Google Scholar
9. Fletcher, T. J. et al., Calculator topics for sixth-formers. Keele Mathematical Education Publications (1983).Google Scholar