euclid geometry 中文意思是什麼
euclid geometry
解釋
歐幾里得幾何-
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。 -
Euclid ' s axioms form the foundation of his system of geometry
歐幾里德原理構成了他的幾何系統的基礎。 -
Conclusion by presenting his disquisitions generales circa superficies curves in 1827, gauss presented in fact the essential idea of his earlier research on non - euclid geometry in his unique way as well
結論高斯於1827年發表的《關于曲面的一般研究》 ,一方面奠定了內蘊微分幾何的基礎,同時也以其獨特的「高斯風格」將自己的非歐幾何研究揭示于眾。 -
That is how euclid did things in alexandria two millennia ago, and his treatise on geometry is the classical model for mathematical exposition
這就是2000多年前歐基里得在亞歷山卓城的研究方式,他的幾何大作是數學著作的經典模? 。 -
Fractal and fractal geometry provide a more exact mathematical model to describe the external world, which broke though the situation limited to euclid geometry and have drawn much attention from chemists, mathematicians, physicists in various disciplines
分形概念的提出及分形幾何學的創立,為人們描述客觀世界提供了更準確的數學模型,引起了自然科學領域和社會科學領域的普遍關注,並在化學、生物學、天文學等諸多領域中得到了廣泛的應用。 -
Marketing is not the same as euclid ' s geometry, which has a set of fixed system with conceptions and theories
營銷並非像歐幾里得幾何學那樣,有著對概念與定理的一套固定體系。 -
The method for solving quadratic equation which combined arithmetic solution and geometry demonstration together by al - khw rizm probably is influenced by greek who praised highly geometry, but through analyzing carefully, his geometry seems different from " geometrical algebra " of euclid in essence, but is similar to chinese ancient mathematical method - out - in complementary - like principle
花拉子米討論一元二次方程時所採用的算術解法與幾何論證相結合的方法似乎是受希臘人推崇幾何學的觀念的影響,但經過仔細分析,認為他的幾何證明本質上區別于歐幾里得的「幾何代數」 ,而與中國古代的「出入相補原理」更相像。 -
Linear algebra is mainly a subject which studies the linear structure of finite dimensional linear space and its linear transformation while linear concept is in itself from the old euclid g eometry. the concept of " linear space " is a kind of algebraic abstract. in many fields of modern engineering project and technology, because of the influence of computer and graph showing, the algebraic disposal of geometric questions, the visual disposal of algebraic questions, algebra and geometry are tightly combined
線性代數主要是研究有限維線性空間及其線性變換這一代數結構的學科,而線性概念究其根源則是來自古老的euclid幾何,線性空間概念是幾何空間的一種代數抽象,在現代工程技術的許多領域里,由於計算機及圖形顯示的強大威力,幾何問題的代數化處理,代數問題的可視化處理,把代數與幾何更加緊密地結合在一起。
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