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85.21 New light on some very familiar formulae

Published online by Cambridge University Press:  01 August 2016

Michael A. B. Deakin
Michael A. B. Deakin*
Affiliation:
Department of Mathematics and Statistics, Monash University, Clayton, Vic 3168, Australia. e-mail: michael.deakin@sci.monash.edu.au
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Type
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Information
The Mathematical Gazette , Volume 85 , Issue 502 , March 2001 , pp. 122 - 124
Copyright
Copyright © The Mathematical Association 2001

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References

1. Deakin, M. A. B., Functions of a dual or duo variable, Math. Mag. 39 (1966) pp. 215219.Google Scholar
2. Deakin, M. A. B., Are there parabolic functions?, Aust. Math. Teacher 27 (1971) pp. 136138.Google Scholar
3. Deakin, M. A. B., Pseudo-trigonometric and pseudo-harmonic functions, Int. J. Math. Ed. Sei. Tech. 11 (1980) pp. 7580.CrossRefGoogle Scholar
4. Glaister, P., Second order differential equations-a unified approach, Math. Gaz. 80 (1996) pp. 392394.CrossRefGoogle Scholar
5. Study, E., Geometrie der Dynamen, Teubner (1903) p. 205.Google Scholar
6. Brand, L., Vector and tensor analysis, Wiley (1947) pp. 6465.Google Scholar