在毕达哥拉斯定理中还有更复杂的例子。
理解欧几里得对毕德哥拉斯定理的证明。
他因以自己名字命名的毕达哥拉斯定理而最为知名。
He is best known for the Pythagorean theorem, which bears his name.
布置的作业是作一个可以用于证明毕达哥拉斯定理的图。
The assignment was to make a construction that could be used in proving the pythagorean theorem.
三角结合空间和号码,以及包括著名的毕达哥拉斯定理。
Trigonometry combines space and Numbers, and encompasses the well-known Pythagorean theorem.
从这种意义上说,科斯定理乃是标准价格理论的一个特例。
In this sense, Coase theorem is a variation of normal price theory.
基于科斯定理产生的排污权交易是对传统庇古理论的扬弃。
The emission trading based on Coase theorem is abandonment to traditional Pigou theory.
本文的要点在于区分对“科斯定理”的第一类和第二类解释。
The crux of this distinction between the "Coase Theorem" interpretation of the first and second category.
为了理解科斯定理,我们首先得介绍另一个概念,就是外部性。
To understand the Coase theorem, we first need to introduce another idea, the externality.
Devlin说,最复杂的部分便是我们熟知的毕达哥拉斯定理。
The most complicated part, Devlin says, is our good old friend the Pythagorean theorem.
泊松定理、隶莫佛-拉普拉斯定理给出了二项分布的近似计算公式。
Poisson theorem and De Moivre-Laplace theorem present the approximate calculation formula of binomial distribution.
科斯定理并没有对新古典微观经济学的基本结构产生影响,这非偶然。
It is not accidental that Coase Theorem did not bring about a complete change to the basic structure of neoclassical microeconomics.
因此本文对制度的定义并不仅仅局限于科斯定理以及诺斯对制度的定义。
Therefore, this article the definition of the system is not just limited to the Coase Theorem and the North against the system definition.
几何学有两大珍宝,其一是毕达哥拉斯定理,另一个是分一线段为中外比。
Geometry has two great treasures, one is the theorem of Pythagoras; the other, the division of a line into extreme and mean ratio .
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。
Context: Euclid's proof of the Pythagorean theorem made use of the previous proven theorem known as Proposition 41.
科斯定理强调在交易费用为零的时候,产权的初始配置不会影响制度的效率。
The Coase theorem emphasizes that the initial distribution of property right will not influence the efficiency of the system when there is no trade cost.
作为产权经济学和法经济学的基础性定理,科斯定理拥有着强大的阐释能力。
As a basic theorem of "property rights economics" and "law and economics", coase theorem possesses strong explanatory capacity.
“排污权交易案”严重违反了“科斯定理”的前提假定,是一种不正当的交易。
The "pollution right" deal case strictly against the assumption of "Coase Theory", so get the ludicrous deal.
比如,你一直弄不清楚为什么:刚读过毕达哥拉斯定理,马上又读约翰尼斯·开普勒。
For instance, you're never quite sure why, having just read about the Pythagorean theorem, you're now reading about Johannes Kepler.
另一方面,在众多的经济学文献中都以一个双头模型来解释或证明所谓的“科斯定理”。
On the other hand, multitudinous literatures explain or prove so-called Coase theorem with duopoly model.
根据科斯定理,在产权明晰,交易成本为零的社会状态下,资源才能得到最有效的配置。
The Coase Theorem stated that when the property is clarified and the transaction costs are zero, resources will be allocated most efficiently.
格林定理及其应用、三重积分、空间中的线积分和面积分、散度定理、斯托克斯定理应用。
Green's theorem and applications, triple integrals, line and surface integrals in space, Divergence theorem, Stokes' theorem; applications.
利用稳恒磁场边值问题解答的唯一性定理和维尔斯特拉斯定理讨论了镜象电流选择的唯一性。
Using the uniqueness theorem for boundary value problem of steady magnetic field and Weierstrass theorem, the unique choice of image electric current is discussed.
假设不吸烟的你和一个烟民同住一室,根据科斯定理,什么决定了你的室友是否在室内吸烟?
Imagine that you are a nonsmoker sharing a room with a smoker. According to the Coase theorem, what determines whether your roommate smokes in the room?
经济学家不理解科斯及其理论,因为他们不懂得科斯定理、相互性定理和科斯核心定理的内在联系。
Economists don't understand Coase and his theory because they cannot understand the internal links among Coase Theorem, Relativity Theorem and the Core Theorem of Coase.
但是科斯定理也有待威廉姆森先生去完善并澄清何种交易特征可以让内部交易比市场交易更为有效。
But it was left to Mr Williamson to refine Mr Coase's theory and clarify what features of certain transactions made carrying them out more efficient within a firm rather than in the market.
“合成谬误”的传统分析不仅与科斯的新的方法、新的视角相背离,也与科斯定理的基本内涵相矛盾。
The conventional analysis of fallacy of composition not only deviates from the new approach and perspective of Coase but also contradicts the connotation of Coase theorem.
为了将科斯定理与经济学的联系更好地凸显出来,有必要从传统的理性人-效率的视角出发对其加以重述。
It is necessary to restate the Coase Theorem from the traditional rationality-efficiency perspective, if one wishes to highlight its bearing on economics.
为了将科斯定理与经济学的联系更好地凸显出来,有必要从传统的理性人-效率的视角出发对其加以重述。
It is necessary to restate the Coase Theorem from the traditional rationality-efficiency perspective, if one wishes to highlight its bearing on economics.
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