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- Euclid approachdegree 欧氏贴近度
- Of or relating to Euclid's geometric principles. 欧几里德几何原理的欧几里德几何原理的,与之有关的
- Euclid requires no prior study of mathematics. 阅读欧几里得几何学无须先学习数学,
- Some of these are mistakes made by Euclid that can be remedied. 有些错误是欧几里德搞错的,可以纠正。
- Archimedes and Euclid writings are still relevant today. 阿基米德和欧几里得的著作今天仍有意义。
- Understand Euclid's proof of the Pythagorean Theorem. 理解欧几里得对毕德哥拉斯定理的证明。
- The algorithm is based on a modification of Euclid's algorithm. 给出了该算法的硬件结构图。
- Euclid's axioms form the foundation of his system of geometry. 欧几里德原理构成了他的几何系统的基础。
- Where Euclid unconsciously assumed the infinitude of straight lines. 欧几里得不自觉地假定了直线的无限性。
- Cochran theorem is extened over the non commutative Euclid ring with 1. 在有1的非交换Euckld环上拓广了Cochran定理
- The concept of the cross product of vectors in Euclid space is introduced. 在欧式空间中引进了向量叉积的概念.
- Euclid's axiom that things equal to the same thing are equal to each other. 欧几里得关于等同于同一事物之物互相之间相等的公理说
- His book is, therefore, not readily intelligible, even to scientists, unless Euclid has been read before. 因此,如果事先没读过欧几里得几何学,牛顿的书是不易理解的,即使科学家也是如此。
- The logical basis for the theory of the integers that Euclid presented in Books VII to IX of the "Elements" was woefully deficient. 欧几里德在《原本》的第七到第九册中提出的整数理论的逻辑基础是十分令人遗憾地有缺陷的。
- Context: Euclid's proof of the Pythagorean Theorem made use of the previous proven theorem known as Proposition 41. 上下文:欧几里得关于毕德哥拉斯定理的证明利用了前已证明的命题41。
- His style shows how deeply he was influenced by Euclid's treatment of ration and proportions. 牛顿书中的写法表明,他深受欧几里得对量和比例分析的影响。
- If Euclid failed to kindle your youthful enthusiasm, then you were not born to be a scientific thinker. 如果欧几里得几何未能激起你少年时代的热情,那么,你就不是一个天生的科学思想家。
- Geometry based on Euclid's axioms: e. G., Only one line can be drawn through a point parallel to another line. 基于欧几里得公理的几何学:例如从一点只可以劃一直线平行与另一直线。
- Valve CAD System (CAVDS), which is developed in EUCLID by prarametric design and surface modelling methods is presented in this paper. 应用参数化和复杂曲面造型设计方法,在大型CAD软件EUCLID上用二次开发语言研制了阀门产品CAD系统CAVDS。
- Depending only on formal thinking, Euclid formed system through figure proof, firstly applied the fifth postulate in the 29th proposition. 欧几里德仅仅依靠形式思维,通过图形佐证形成体系,在第29个命题中首先运用第五公设。
