1、

To ensure stability of the NNA, the convergence theorem of the NNA is presented and proved.

为保证该算法的稳定性,提出并证明了该算法的收敛定理。

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2、

The LBL system includes position theorem and analysis of error.

在长基线系统中,介绍了定位原理和对系统误差作了分析。

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3、

A theorem about subnormality of product space

关于乘积空间次正规性的一个定理

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4、

Discusses the dynamic theorem of mass system relative to centre of mass moving in a plane.

论述了质点系相对于随质心一起作平动的座标系的动力学规律.

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5、

Secondly, a strict definition is given to polyhedra, and the conditions are given for applying Euler ′ s formula and Gauss Bonnet Theorem to polyhedra.

对多面体进行严格的定义,给出欧拉公式及Gauss-Bonnet定理对多面体的应用条件。

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6、

Finally, the generalized Euler eigenvalue and the generalized Gauss Bonnet Theorem and the generalized Euler ′ s formula are given to polyhedra.

最后给出多面体的广义欧拉特征值、广义Gauss-Bonnet定理及广义欧拉公式.这些理论和方法,共同构成实体模型边界表示的拓扑与几何一致性检验的有效工具。

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7、

The Transformation and General Pythagoras' Theorem on the Linear Manifold

线性流型上的变换函数Φ及广义的勾股定理

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8、

One New Study for First Proving of the "Pythagorean Theorem"

勾股定理最早证明新考

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9、

Generalized Pythagorean Theorem in n-dimensional Euclidean Space

关于n维欧氏空间上的广义勾股定理

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10、

And we learned how to prove the Pythagorean Theorem in Euclidean geometry, starting with the various axioms in Euclidean geometry, ba, ba-ba, ba-ba, ba-ba, ba bum.

我们都学习过,欧几里得几何中对勾股定理的证明方法,从繁杂的欧氏几何的公理开始,邦,邦邦,邦邦,邦邦。

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11、

In all my years I have never once attended a cocktail party where the conversation turned to the Pythagorean theorem.

活了这些年,我还从来没有介入过一场谈判勾股定理的鸡尾酒会。

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12、

The Pythagorean Theorem tells us that a3-4-5 triangle is a right triangle, so we can simply test for sides of3,4, and5.

勾股定理(Pythagorean Theorem)告诉我们边长为3、4和5的三角形是直角三角形,因此可以使用边长3、4和5来简单地测试。

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13、

This article introduces the whole course of the demonstrating device of the Pythagorean theorem with the glass plate.

介绍了用玻璃板制作勾股定理演示器的全过程。

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14、

Even if admit this view, in the western countries the time of first proof of the Pythagoras theorem is not probably early than epoch ago 585 year.

即使承认这一看法,西方最早给出勾股定理证明的时间也不会早于公元前585年,即相传毕达哥拉斯出生的那一年。

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15、

It is generally considered that the Greece mathematician, Pythagoras, first proved the Pythagorean theorem, but this is not reliable.

在西方,一般都认为:希腊数学家半达哥拉斯(Pythagoras)最早证明了勾股定理,因而都习惯地称这个定理为毕达哥拉斯定理。但这一看法历史上并没有可靠的依据。

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16、

In this paper, firstly we assure that Ancient China and Ancient Greece found out the theorem simultaneously, according to investigating its origin and history, the principle and Ancient Found Priority judging criteria.

本文通过研究勾股定理的的起源和历史,根据古代发现优先权的确立原则与判定标准确定了古希腊和古代中国同时发现了勾股定理这一结论。

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17、

A proof on the Pythagorean theorem in n-dimension vector space

n维空间中勾股定理的一个证明

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18、

The general expressions in integer of the Pythagorean Theorem have infinite equivalent forms.

勾股定理(即毕达格拉斯定理)的全部整数解表达式有无穷多种,目前常用的勾股定理全部整数解表达式,不过是其中最简通解式而已。

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19、

Area and Proof of Pythagorean Theorem~ α

面积与勾股定理的证明

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20、

The primary aim of this paper is to describe the transformation function [ 1], to extend the conclusion of Pythagoras'theorem for "squared length" of any triangle and to study some geometrical significance of its application.

本文目的在于论述变换函数中φ,外延勾股定理用于运算任意三角形边的平方长并研究其几何特征的实际应用问题。

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