Generalized Dandelin's Theorem
[摘要] The paper gives a geometric proof of the theorem which states that in case of the plane section of a second-order surface of rotation (quadrics of rotation, QR), such conics as an ellipse, a hyperbola or a parabola (types of conic sections) are formed. The theorem supplements the well-known Dandelin's theorem which gives the geometric proof only for a circular cone and applies the proof to all QR, namely an ellipsoid, a hyperboloid, a paraboloid and a cylinder. That's why the considered theorem is known as the generalized Dandelin's theorem (GDT). The GDT proof is based on a relatively unknown generalized directrix definition (GDD) of conics. The work outlines the GDD proof for all types of conics as their necessary and sufficient condition. Based on the GDD, the author proves the GDT for all QR in case of a random position of the cutting plane. The graphical stereometric structures necessary for the proof are given. The implementation of the structures by 3d computer methods is considered. The article shows the examples of the builds made in the AutoCAD package. The theorem is intended for the training course of theoretical training of elite student groups of architectural and construction specialties.
[发布日期] [发布机构] Department of Engineering and Computer Graphics, South Ural State University, Lenin Avenue, 76, Chelyabinsk; 454080, Russia^1
[效力级别] [学科分类] 土木及结构工程学
[关键词] Circular cones;Computer methods;Conic sections;Cutting planes;Random position;Student groups;Theoretical training;Training course [时效性]