Offsets of a regular trifolium
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Thierry Dana-Picard [1] ; Zoltán Kovács [2]
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[1] Jerusalem College of Technology
Jerusalem College of Technology
Israel
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[2] Private Padagogische Hochschule der Diozese Linz
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- Localización: Boletín de la Sociedad Puig Adam de profesores de matemáticas, ISSN 1135-0261, Nº. 112, 2021, págs. 63-81
- Idioma: inglés
- Títulos paralelos:
- Curvas paralelas a un trifolium regular
- Texto completo no disponible (Saber más ...)
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Resumen
The non-uniqueness of a rational parametrization of a rational plane curve may infiuence the process of computing envelopes of 1-parameter families of plane curves. We study envelopes of family of circles cen-tred on a regular trifolium and its offsets, paying attention to different parametrizations. We use implicitization both to show that two rational parametrizations of a curve are equivalent, and to determine an implicit equation far the envelope under study. The derivation of an implicit equation of an offset follows another path, leading to new developments o/ the package GeoGebra Discovery. As an immediate symbolic result, we obtain that in the general case the offset curve of a regular trifolium is an algebraic curve o/ deg ree 14. We illustrate this fact by providing a GeoGebra a computes such curves automatically and visualizes them in a web browser
