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Simson lines and deltoids

Published online by Cambridge University Press:  01 August 2016

J. K. R. Barnett
J. K. R. Barnett*
Affiliation:
27 Highcroft Lane, Horndean, Waterlooville P08 9NX, e-mail:jkrb@verlan.demon.co.uk
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Extract

For any triangle, and any point on its circumcircle, the feet of the perpendiculars from the point to the sides of the triangle are collinear. The line through them is the Simson (pedal, Wallace, or Wallace-Simson) line. If two circles have radii in ratio 1:3, and the smaller rolls within the larger, a fixed point on the circumference of the smaller describes a deltoid (or tricuspid hypocycloid) curve (Euler, 1745). The envelope of the Simson lines of any triangle is a deltoid.

Type
Articles
Information
The Mathematical Gazette , Volume 85 , Issue 504 , November 2001 , pp. 446 - 457
Copyright
Copyright © The Mathematical Association 2001

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References

1. Wells, D., The Penguin dictionary of curious and interesting geometry, Penguin Books (1991).Google Scholar
2. Honsberger, R., Episodes in nineteenth and twentieth century Euclidean geometry, The Mathematical Association of America (1995).Google Scholar
3. Bradley, C. J. and Bradley, J. T., Countless Simson line configurations, Math. Gaz. 80 (July 1996) pp. 314321.Google Scholar
4. Weisstein, E. W., The CRC concise encyclopedia of mathematics, CRC Press (1999).Google Scholar
5. Lee, X., Deltoid, http://xahlee.org/SpecialPlaneCurves_dir/Deltoid_dir/deltoid.html. Google Scholar
6. Cundy, H. M. and Parry, C. F., Some cubic curves associated with a triangle, Journal of Geometry, Vol. 53, Birkhäuser (1995) pp. 4166.Google Scholar
7. Macbeath, A. M., The deltoid, II, III, Eureka 10 (1948) pp. 2023, 11 (1949) pp. 26–29,12 (1950) pp. 5–6.Google Scholar