Dual Problems with Conics

A. Girsh
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引用次数: 4

Abstract

The problem for construction of straight lines, which are tangent to conics, is among the dual problems for constructing the common elements of two conics. For example, the problem for construction of a chordal straight line (a common chord for two conics) ~ the problem for construction of an intersection point for two conics’ common tangents. In this paper a new property of polar lines has been presented, constructive connection between polar lines and chordal straight lines has been indicated, and a new way for construction of two conics’ common chords has been given, taking into account the computer graphics possibilities. The construction of imaginary tangent lines to conic, traced from conic’s interior point, as well as the construction of common imaginary tangent lines to two conics, of which one lies inside another partially or thoroughly is considered. As you know, dual problems with two conics can be solved by converting them into two circles, followed by a reverse transition from the circles to the original conics. This method of solution provided some clarity in understanding the solution result. The procedure for transition from two conics to two circles then became itself the subject of research. As and when the methods for solving geometric problems is improved, the problems themselves are become more complex. When assuming the participation of imaginary images in complex geometry, it is necessary to abstract more and more. In this case, the perception of the obtained result’s geometric picture is exposed to difficulties. In this regard, the solution methods’ correctness and imaginary images’ visualization are becoming relevant. The paper’s main results have been illustrated by the example of the same pair of conics: a parabola and a circle. Other pairs of affine different conics (ellipse and hyperbola) have been considered in the paper as well in order to demonstrate the general properties of conics, appearing in investigated operations. Has been used a model of complex figures, incorporating two superimposed planes: the Euclidean plane for real figures, and the pseudo-Euclidean plane for imaginary algebraic figures and their imaginary complements.
圆锥经济学的对偶问题
构造与二次曲线相切的直线问题是构造两个二次曲线的公元的对偶问题之一。例如,构造弦直线(两个圆锥曲线的共同弦)的问题,构造两个圆锥曲线的共同切线的交点的问题。本文给出了极线的一个新性质,指出了极线与弦直线之间的构造联系,并在考虑计算机图形学可能性的情况下,给出了构造两个二次曲线共弦的一种新方法。考虑了以圆锥曲线的内点为起点的圆锥曲线的虚切线的构造,以及两个部分或完全重合的圆锥曲线的共虚切线的构造。如你所知,两个二次曲线的对偶问题可以通过将它们转换成两个圆来解决,然后从圆到原来的二次曲线进行反向转换。这种解法在理解解法结果时提供了一些清晰度。于是,从两个圆锥曲线到两个圆的过渡过程本身就成了研究的主题。随着求解几何问题的方法的改进,问题本身也变得更加复杂。在复杂几何中假设虚像的参与时,有必要进行越来越多的抽象。在这种情况下,获得的结果的几何图像的感知暴露在困难。在这方面,解决方法的正确性和虚像的可视化变得相关。本文的主要结果已通过同一对二次曲线:抛物线和圆的例子加以说明。本文还考虑了其他仿射不同的二次曲线对(椭圆和双曲线),以证明二次曲线在研究运算中出现的一般性质。使用了一个复图形的模型,包含两个重叠的平面:实数的欧几里得平面和虚代数图形及其虚补的伪欧几里得平面。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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