Prostorna interpretacija Hugelschaffer-ove konstrukcije jajaste krive
Конференцијски прилог (Објављена верзија)
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Faculty of Architecture and Civil Engineering in Niš; Serbian Society for Geometry and Graphics (SUGIG)
Метаподаци
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Konstrukcija jajaste kubne krive Hügelschäffer-ovom metodom, zasniva se na konstrukciji elipse metodom koncentričnih krugova različitih radijusa, a i b, koji odgovaraju parametrima elipse. Načinjen je pokušaj da se prostornom interpretacijom ovih krugova u bazise konusa I cilindra, objasni vrsta pravoizvodne površi koja bi kao ravan presek imala upravo ovako nastalu zatvorenu jajastu krivu. U pitanju je konoid koji kao jednu vodilju ima pravu, a kao drugu vodilju prostornu presečnu krivu ovih kvadrika.
The construction of the ovoid cubic curve by the Hügelschäffer method is based on the construction of the ellipse by the method of concentric circles of different radii, a and b, which correspond to the parameters of the ellipse. An attempt was made to explain the type of rectilinear surface by the spatial interpretation of these circles into the bases of a cone and a cylinder, which, as a plane section, will have a closed egg curve formed in this way. the rectlinear surface is a conoid that has a straight line as a directrix, and a spatial cross-sectional curve of the above quadrics as the other directrix.
Кључне речи:
konoid / jajasta kriva / cilindar / konus / pravoizvodna površ / conoid / ovoid curve / cylinder / cone / rectlinear surfaceИзвор:
Proccedings | Zbornik radova (24th national and 1st international scientific conference moNGeometrija 2008), 2008, 222-232Издавач:
- Niš: Faculty of Architecture and Civil Engineering in Niš; Serbian Society for Geometry and Graphics (SUGIG)
Финансирање / пројекти:
- Примена резултата напредног развоја просторних структура у области 3D трансформација, конструисања, нових материјала - Симпролита и технологија (RS-MESTD-MPN2006-2010-16009)
Напомена:
- http://mongeometrija.com/zbornici/2008/259-marija-obradovi-maja-petroviprostorna-interpretacija-hgelschffer-ove-konstrukcije-jajaste-krive
Колекције
Институција/група
GraFarTY - CONF AU - Obradović, Marija AU - Petrović, Maja PY - 2008 UR - https://grafar.grf.bg.ac.rs/handle/123456789/2042 AB - Konstrukcija jajaste kubne krive Hügelschäffer-ovom metodom, zasniva se na konstrukciji elipse metodom koncentričnih krugova različitih radijusa, a i b, koji odgovaraju parametrima elipse. Načinjen je pokušaj da se prostornom interpretacijom ovih krugova u bazise konusa I cilindra, objasni vrsta pravoizvodne površi koja bi kao ravan presek imala upravo ovako nastalu zatvorenu jajastu krivu. U pitanju je konoid koji kao jednu vodilju ima pravu, a kao drugu vodilju prostornu presečnu krivu ovih kvadrika. AB - The construction of the ovoid cubic curve by the Hügelschäffer method is based on the construction of the ellipse by the method of concentric circles of different radii, a and b, which correspond to the parameters of the ellipse. An attempt was made to explain the type of rectilinear surface by the spatial interpretation of these circles into the bases of a cone and a cylinder, which, as a plane section, will have a closed egg curve formed in this way. the rectlinear surface is a conoid that has a straight line as a directrix, and a spatial cross-sectional curve of the above quadrics as the other directrix. PB - Niš: Faculty of Architecture and Civil Engineering in Niš; Serbian Society for Geometry and Graphics (SUGIG) C3 - Proccedings | Zbornik radova (24th national and 1st international scientific conference moNGeometrija 2008) T1 - Prostorna interpretacija Hugelschaffer-ove konstrukcije jajaste krive EP - 232 SP - 222 UR - https://hdl.handle.net/21.15107/rcub_grafar_2042 ER -
@conference{ author = "Obradović, Marija and Petrović, Maja", year = "2008", abstract = "Konstrukcija jajaste kubne krive Hügelschäffer-ovom metodom, zasniva se na konstrukciji elipse metodom koncentričnih krugova različitih radijusa, a i b, koji odgovaraju parametrima elipse. Načinjen je pokušaj da se prostornom interpretacijom ovih krugova u bazise konusa I cilindra, objasni vrsta pravoizvodne površi koja bi kao ravan presek imala upravo ovako nastalu zatvorenu jajastu krivu. U pitanju je konoid koji kao jednu vodilju ima pravu, a kao drugu vodilju prostornu presečnu krivu ovih kvadrika., The construction of the ovoid cubic curve by the Hügelschäffer method is based on the construction of the ellipse by the method of concentric circles of different radii, a and b, which correspond to the parameters of the ellipse. An attempt was made to explain the type of rectilinear surface by the spatial interpretation of these circles into the bases of a cone and a cylinder, which, as a plane section, will have a closed egg curve formed in this way. the rectlinear surface is a conoid that has a straight line as a directrix, and a spatial cross-sectional curve of the above quadrics as the other directrix.", publisher = "Niš: Faculty of Architecture and Civil Engineering in Niš; Serbian Society for Geometry and Graphics (SUGIG)", journal = "Proccedings | Zbornik radova (24th national and 1st international scientific conference moNGeometrija 2008)", title = "Prostorna interpretacija Hugelschaffer-ove konstrukcije jajaste krive", pages = "232-222", url = "https://hdl.handle.net/21.15107/rcub_grafar_2042" }
Obradović, M.,& Petrović, M.. (2008). Prostorna interpretacija Hugelschaffer-ove konstrukcije jajaste krive. in Proccedings | Zbornik radova (24th national and 1st international scientific conference moNGeometrija 2008) Niš: Faculty of Architecture and Civil Engineering in Niš; Serbian Society for Geometry and Graphics (SUGIG)., 222-232. https://hdl.handle.net/21.15107/rcub_grafar_2042
Obradović M, Petrović M. Prostorna interpretacija Hugelschaffer-ove konstrukcije jajaste krive. in Proccedings | Zbornik radova (24th national and 1st international scientific conference moNGeometrija 2008). 2008;:222-232. https://hdl.handle.net/21.15107/rcub_grafar_2042 .
Obradović, Marija, Petrović, Maja, "Prostorna interpretacija Hugelschaffer-ove konstrukcije jajaste krive" in Proccedings | Zbornik radova (24th national and 1st international scientific conference moNGeometrija 2008) (2008):222-232, https://hdl.handle.net/21.15107/rcub_grafar_2042 .