hypergeometric 中文意思是什麼
hypergeometric
解釋
超比-
Confluent hypergeometric function
合流超線幾何函數 -
In this paper, the folio wings are introduced briefly : holonomic theory ; the basic idea that d. zeilberger used to prove identities using holonomic theory. and wu method is generalized to the non - commutative weyl algebra. furthermore, dialytic method of elimination is replaced by wu method, so the prove can be extended from the single - variable hypergeometric identities to multi - variable ones
本文簡要介紹了完整性理論, d . zeilberger利用完整性理論證明恆等式的基本思想,將吳方法推廣到不可交換的weyl代數上,用吳方法取代了d . zeilberg在證明完整性函數恆等式的理論框架中的析配消元法,從而將這種證明理論由單變量超幾何恆等式的證明擴展到多變量超幾何恆等式的證明。 -
The number concentration of the activated cloud condensation nuclei ( ccn ) is described with the hypergeometric function
對降水物粒子引入分佈譜函數,採用了與之相適應的微物理過程計算公式。 -
The six sigma black belt should be familiar with the commonly used probability, including : hypergeometric, binomial, poisson, normal, exponential, chi - square, student ' s t, and f
譯文:六西格瑪黑帶應該熟悉常用的概率分佈,包括超幾何分佈、二項式分佈、泊松分佈、下態分佈、指數分佈、卡方分佈、學者t分佈和f分佈。 -
The six sigma black belt should be familiar with the commonly used probability distributions, including : hypergeometric, binomial, poisson, normal, exponential, chi - square, student ' s t, and f
6西格瑪黑帶應熟悉常用的概率分佈,包括超幾何分佈、二項式分佈、泊松分佈、正態分佈、指數分佈、卡方分佈、學者t分佈和f分佈。 -
Relationship between the apostol - bernoulli polynomials and gaussian hypergeometric functions
超幾何函數之間的關系
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