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The Cissoid of Diocles

Published online by Cambridge University Press:  03 November 2016

J. P McCarthy
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Extract

The construction, presumably used by Diocles, who flourished in the second century B.C., for the cissoid is as follows.

Let AB, CD be perpendicular diameters of a circle. Let E, F be points on the quadrants BD, BC such that the arcs BE, BF are equal. Draw EG, FH perpendicular to CD. Join CE and let P be the point of intersection of CE and FH The cissoid is the locus of P corresponding to points E, F on the quadrants BD, BC such that the arcs BE, BF are equal.

Type
Research Article
Information
The Mathematical Gazette , Volume 25 , Issue 263 , February 1941 , pp. 12 - 15
Copyright
Copyright © Mathematical Association 1941

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References

page no 12 note * Heath, , Greek Mathematics, 1, p. 264 (Oxford)Google Scholar.

page no 15 note * Heath, loc. cit.