The ellipsoid in orthogonal axonometric: homology application
DOI:
https://doi.org/10.6092/issn.1828-5961/3183Keywords:
ellissoide, omologia, assonometrica ortogonale, architettura moderna, cybertectureAbstract
You’ve long heard about ellipsoid, both from a mathematical analysis that under the geometric representative profile. However, so far no one has ever affronted the problem from the point of the application of descriptive geometry with homology. The use of homology, in fact, can make it extremely simplified and actual use of geometric tools giving the user a graphical mastery of the outcome that would otherwise be dismissed even with the use of innovative technologies of representation.
Through the analysis of the proposed methodology, you can use to identify the strengths, the corresponding approvals now required between reality and projection.
In modern architecture there are a lot of new application of the ellipsoid and we will discover it trough the world travel.
References
Yajun, Jiang. Lei, Jin (2011), Contemporary Architecture in China: discovering China, Shangai Press, Shangai
Inzerillo, Laura (2012), Assonometria Diretta, in Carnevalis, Laura-De Carlo, Laura- Migliari, Riccardo (a cura di) “Attualità della geometria descrittiva”, Cangemi Editore, Roma pp. p. 249-264
Dusenbery, David (2009), Living at Micro Scale, Harvard University Press, Cambridge.
Childe, George Federick (2010), Singular Properties of the Ellipsoid, and associated of the Nth Degree, Harvard University Press, Cambridge.
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Copyright (c) 2012 Laura Inzerillo
