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Characterisations of the parabola

Published online by Cambridge University Press:  21 October 2019

Steven J. Kilner
Affiliation:
Department of Mathematics, 1000 East Henrietta Road, Monroe Community College, Rochester, NY, 14623, USA e-mail: [email protected]
David L. Farnsworth
Affiliation:
School of Mathematical Sciences, 84 Lomb Memorial Drive, Rochester Institute of Technology, Rochester, NY 14623, USA e-mail: [email protected]

Extract

Three familiar properties of a parabola are that it is the locus of points that are equidistant from the focus and the directrix, that it can be created by an intersection of a plane and a cone, and that incoming rays parallel to the axis are reflected to a single point. The first two are often used as definitions, and the third may be used as an alternative definition or characterisation.

Type
Articles
Copyright
© Mathematical Association 2019 

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References

Sisam, C. H., Analytic geometry, Henry Holt (1936).Google Scholar
Demana, F., Waits, B. K., Foley, G. D. and Kennedy, D., Precalculus: Functions and graphs (5th edn.), Pearson/Addison-Wesley (2004).Google Scholar
Ogilvy, C. S., Excursions in geometry, Dover (1990).Google Scholar
Stewart, J., Calculus: Early transcendentals (7th edn.), Brooks/Cole Cengage (2012).Google Scholar
Briggs, W., Cochran, L. and Gillett, B., Calculus: Early transcendentals (2nd edn.) Pearson (2015).Google Scholar
Brueggemann, H. P., Conic mirrors, Focal (1968).Google Scholar
Birkhoff, G. and Rota, G.-C., Ordinary differential equations (2nd edn.), Blaisdell (1969).Google Scholar
Zill, D. G. and Wright, W. S., Differential equations with boundary value problems (8th edn.), Brooks/Cole (2013).Google Scholar
Burington, R. S., Handbook of mathematical tables and formulas (5th edn.), McGraw-Hill (1973).Google Scholar
Coolidge, J. L., A history of the conic sections and quadratic surfaces, Dover (1968).Google Scholar
Tanner, J. H. and Allen, J., Analytic geometry, American Book Company (1898).Google Scholar
Tsukerman, E., Solution of Sondow’s problem: A synthetic proof of the tangency property of the parbelos, The American Mathematical Monthly 121 (2014) pp. 438443.CrossRefGoogle Scholar
Hilbert, D. and Cohn-Vossen, S., Geometry and the imagination, Chelsea (1999).Google Scholar
Rainville, E. D., Elementary differential equations (3rd edn.), Macmillan (1964).Google Scholar
Courant, R., Differential and integral calculus, Volume II, Interscience (1961).Google Scholar
Jacobs, H. R., Geometry, W. H. Freeman (1974).Google Scholar
Coxeter, H. S. M., Introduction to geometry (2nd edn.), Wiley (1969).Google Scholar
Anton, H. and Busby, R. C., Contemporary linear algebra, Wiley (2003).Google Scholar