两个曲线和一个矩形直纹曲面方程的综合

Я. Кокарева, Y. Kokareva
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引用次数: 7

摘要

直纹表面早已为人所知,并广泛应用于建筑、建筑、设计和工程中。如果从技术角度来看,可显影表面更有吸引力,那么建筑和设计在不可显影表面上的实验就会成功。本文考虑了具有三个发生器的不可展开直纹曲面,其中两个是曲线发生器。根据分类,这样的曲面称为二次斜柱面。本文提出了一种将曲线浸入双曲型直线同余中求两次斜柱面的方法。这样同余的实准线是一条直线和一条曲线。有人建议使用螺旋线(圆柱线和圆锥线)作为曲线准线,螺旋线的轴线作为直线。那么同余线的直线线将同时与螺旋线及其轴相交。同余参数是直线的节距和导向圆柱或圆锥的半径。螺旋线在工程和建筑中有着广泛的应用,因此选择曲线准线是合理的。因此,螺旋线为基础的表面可以有很大的潜力。本文给出了所考虑的同余的参数方程。从引入一种新的曲线坐标系的角度考虑了同余方程。本文还对得到的系统的坐标曲面和坐标线进行了研究。为了提取曲面,必须将曲线浸入同余中。采用构造参数法将沉线的参数方程根据一种特殊的算法代入同余方程。本文给出了二次斜柱面等直纹曲面方程的综合及其可视化的5个实例。该方法具有通用性和算法性,易于适用于具有同余线和浸入线可变参数的曲面的自动构造。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Synthesis of Equations For Ruled Surfaces With Two Curvilinear And One Rectangular Directrixes
Ruled surfaces have long been known and are widely used in construction, architecture, design and engineering. And if from the technical point of view the developable surfaces are more attractive, then architecture and design successfully experiment with non-developable ones. In this paper are considered non-developable ruled surfaces with three generators, two of which are curvilinear ones. According to classification, such surfaces are called twice oblique cylindroids. In this paper has been proposed an approach for obtaining of twice oblique cylindroids by immersing a curve in a line congruence of hyperbolic type. Real directrixes of such congruence are a straight line and a curve. It has been proposed to use helical lines (cylindrical and conical ones) as a curvilinear directrix, and a helical line’s axis as the straight one. Then the congruence’s rectilinear ray will simultaneously intersect the helical line and its axis. Congruence parameters are the line’s pitch and the guide cylinder or cone’s radius. The choice of the curvilinear directrix is justified by the fact that the helical lines have found a wide application in engineering and architecture. Accordingly, the helical lines based surfaces can have a great potential. In this paper have been presented parametric equations of the considered congruences. The congruence equations have been considered from the point of view related to introducing a new curvilinear coordinate system. The obtained system’s coordinate surfaces and coordinate lines have been also studied in the paper. To extract the surface, it is necessary to immerse the curve in the congruence. To synthesize the equations has been used a constructive-parametric method based on the substitution of the immersed line’s parametric equations in the congruence equations according to a special algorithm. In the paper have been presented 5 examples for the synthesis of ruled surfaces equations such as the twice oblique cylindroid and their visualization. The method is universal and algorithmic, and therefore easily adaptable for the automated construction of surfaces with variable parameters of both the congruence and the immersed line.
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