euclidean geometry 中文意思是什麼

euclidean geometry 解釋
歐幾里得幾何,歐氏幾何。

  • euclidean : adj. 【數學】歐幾里得的。
  • geometry : n. 1. 幾何學。2. 幾何形狀。3. 幾何學著作。
  1. In the case of non-euclidean geometry he published no definitive work.

    至於非歐幾里德幾何,他沒有發表過權威性的著作。
  2. As we all known, with the founding of euclidean geometry in ancient greece, with the development of analytic geometry and other kinds of geometries, with f. kline " s erlanger program in 1872 and the new developments of geometry in 20th century such as topology and so on, man has developed their understand of geometry. on the other hand, euclid formed geometry as a deductive system by using axiomatic theory for the first time. the content and method of geometry have dramatically changed, but the geometry curriculum has not changed correspondingly until the first strike from kline and perry " s appealing

    縱觀幾何學發展的歷史,可以稱得上波瀾壯闊:一方面,從古希臘時代的歐氏綜合幾何,到近代解析幾何等多種幾何的發展,以及用變換的方法處理幾何的埃爾朗根綱領,到20世紀拓撲學、高維空間理論等幾何學的新發展,這一切都在不斷豐富人們對幾何學的認識;另一方面,從歐幾里得第一次使用公理化方法把幾何學組織成一個邏輯演繹體系,到羅巴切夫斯基非歐幾何的發現,以及希爾伯特形式公理體系的建立,極大地發展了公理化思想方法,不管是幾何學的內容還是方法都發生了質的飛躍。
  3. This cumulative development of mathematics applies especially to non - euclidean geometry

    這種數學積累的發展特別適用於非euclid幾何。
  4. The common conclusion was the uniqueness and necessity of euclidean geometry.

    歐幾里德幾何的唯一性與必要性已被公認。
  5. The non-euclidena geometries were in effect subordinated to euclidean geometry.

    非歐幾里德幾何實際上是從屬于歐幾里德幾何的。
  6. Science should always try to use euclidean geometry and vary the laws of physics where necessary.

    科學應該永遠試用歐幾里德幾何學,並在必要處改變物理定律。
  7. Gaussian intrinsic differential geometry and non - euclidean geometry

    高斯的內蘊微分幾何與非歐幾何
  8. Economics is not a straightforward discipline like newtonian mechanics or euclidean geometry

    經濟學不像牛頓力學或者歐幾里德幾何,它不是門直觀的學科。
  9. Each innovation destined to dwarf the one extensive accomplishment of the greeks - euclidean geometry

    每一個創新都註定希臘人的巨大成就- -歐幾里德幾何相形見絀。
  10. It was this concept that riemann generalized, thereby opening up new vistas in non - euclidean geometry

    這個概念嗣後為riemann所推廣,從而在非歐幾里德幾何學中開辟了新前景。
  11. 5 fortune s. voronoi diagrams and delaunay triangulations. computing in euclidean geometry, f k hwang, d z du eds.,

    第1步:對于起點s和終點t ,首先為它們分別選擇最近的傳感器結點和
  12. Solving geometry constraints problems of point - plane configuration in euclidean space

    實空間中點面構型幾何約束問題求解新方法
  13. It was this concept that riemann generalized, thereby opening up new vistas in non-euclidean geometry.

    這個概念嗣後為Riemann所推廣,從而在非歐幾里德幾何學中開辟了新前景。
  14. The advent of the theory of relativity forced a drastic change in the attitude toward non-euclidean geometry.

    相對論的發現迫使對待非歐幾里德幾何的態度有激烈的變化。
  15. In three dimensions, the basis of spatial objects is euclidean geometry, it obeys euclidean axioms. this leads directly to the question how geometric constructions, as defined by the euclidean axioms, can be represented with the finite approximations available in computer systems

    在三維空間中,空間對象的定義基礎是歐幾里得幾何,服從歐幾里得公理,但利用計算機系統處理嚴格服從歐幾里得公理的空間對象必定會帶來一些問題。
  16. Each innovation destined to dwarf the one extensive accomplishment of the greeks-euclidean geometry.

    每一個創新都註定希臘人的巨大成就--歐幾里德幾何相形見絀。
  17. Aim to study the relations between the thought of gaussian intrinsic differential geometry and gauss ' s earlier research on non - euclidean geometry

    摘要目的分析與研究高斯關于非歐幾何的研究和內蘊微分幾何思想之間的聯系。
  18. Results a view of better understanding origins of gaussian intrinsic differential geometry is presented, and the intrinsic relation between gauss ' s thought of intrinsic differential geometry and of his non - euclidean geometry is brought to light and discussed

    結果總結分析了高斯建立的內蘊微分幾何的思想和淵源,揭示了其與非歐幾何學的內在聯系。
  19. According this technology, first we shot the scene from different angles use digital camera, then utilize the relation of epipolar geometry to estimate the exterior parameters ( the position and direction ) of cameras and to recover the scene in projective space, after this we use the technology of self - calibration to estimate the interior parameters of cameras and to recover the scene in euclidean geometry

    它利用攝像機拍攝場景或物體不同角度的圖象,根據不同圖象之間的幾何關系估計攝像機的外部參數(即攝像機的位置和方向)恢復場景在射影空間的幾何模型,再利用自定標技術估計攝像機的內部參數並進而完成場景在歐氏空間的重建。
  20. Although its independence and development were late more relative to some other antique mathematical course such as analytics, algebra, euclidean geometry and number theory, through over one hundred years, especially the vivid development from the 1940s to the 1970s, general topology are getting increasingly mature and perfect

    雖然它的獨立與發展相對于其他一些古老的數學學科如分析學,代數學,歐氏幾何學和數論要晚了許多,但經過一百多年,特別是20世紀40年代到70年代的蓬勃發展,一般拓撲學日趨成熟與完善。
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