mean value theorem 中文意思是什麼
mean value theorem
解釋
第一中值定理-
On the converse proposition of higher order differential mean value theorem
關于高階微分中值定理的逆命題 -
Give a set of mean - value theorem in open - interval with non - differentiable points
摘要給出了開區間內有不可導點的微分中值定理。 -
Focused on the asymptotic behaviour of mediant for fourth order lagrange ' s mean value theorem and obtained the main results as followed ( the equation is abbreviated )
摘要對四階拉格朗日中值定理中間點的漸近性質進行了研究,得到的主要結果是(方程式略) 。 -
By using the limit theorem, the authors discuss and prove conclusions of asymptotic property of mean point in second mean value theorem for integrals in concessional terms believing that they will take an important effect in integral
摘要利用極限理論,給出並證明了減弱條件的積分第二中值定理「中值點」的漸近性的幾個結論,相信在積分學中有著很重要的作用。 -
Creep analysis methods of high - rise buildings and large span buildings can only refer to creep coefficient method in bridge engineering or the method of degree of creep in hydraulic construction engineering under the present experiment conditions. in this paper, the incremental expressions of concrete creep and shrinkage strain when the initial computational age is not the same as the loading age are derived and corrected from the concept of concrete creep coefficient and the mean value theorem of integral and the principle of superposition. the differences of efficiency and accuracy of creep analysis between the finite element method with creep coefficient and the initial stress method with degree of creep are presented. this paper suggests that engineers should use the initial stress method with degree of creep to estimate the influences of creep on high - rise buildings and large span buildings on the basis of conceptual design
基於現有的試驗資料,高層及大跨度民用建築的徐變分析只能參照橋梁結構中的徐變系數方法或水工結構中的徐變度方法進行.從徐變系數的定義出發,利用積分中值定理和疊加原理,推導並修正了加載齡期與起算齡期不同時徐變收縮應變增量的表達式,對比了應用徐變系數分析徐變的有限元法和應用徐變度分析徐變的初應變法在效率和精度上的差別,並建議應從概念設計的角度出發,採用徐變度的初應變法來估算徐變對高層及大跨度民用建築的影響 -
Abstract : creep analysis methods of high - rise buildings and large span buildings can only refer to creep coefficient method in bridge engineering or the method of degree of creep in hydraulic construction engineering under the present experiment conditions. in this paper, the incremental expressions of concrete creep and shrinkage strain when the initial computational age is not the same as the loading age are derived and corrected from the concept of concrete creep coefficient and the mean value theorem of integral and the principle of superposition. the differences of efficiency and accuracy of creep analysis between the finite element method with creep coefficient and the initial stress method with degree of creep are presented. this paper suggests that engineers should use the initial stress method with degree of creep to estimate the influences of creep on high - rise buildings and large span buildings on the basis of conceptual design
文摘:基於現有的試驗資料,高層及大跨度民用建築的徐變分析只能參照橋梁結構中的徐變系數方法或水工結構中的徐變度方法進行.從徐變系數的定義出發,利用積分中值定理和疊加原理,推導並修正了加載齡期與起算齡期不同時徐變收縮應變增量的表達式,對比了應用徐變系數分析徐變的有限元法和應用徐變度分析徐變的初應變法在效率和精度上的差別,並建議應從概念設計的角度出發,採用徐變度的初應變法來估算徐變對高層及大跨度民用建築的影響 -
High order mean value theorem based on lagrange interpolation
插值的高階微分中值定理 -
The proof of the generalized cauchy mean - value theorem with method of interpolation
利用插值法證明推廣的柯西中值定理 -
Lagrange and cauchy differential mean value theorem on open interval are obtained based on generalized roll ' s theorem, which make it more expedient to study general character of function defined on open interval by means of derivative
摘要基於推廣的羅爾中值定理,得到有限開區間上的拉格朗日中值定理及柯西中值定理,使得利用導數研究開區間上函數的整體性態更為方便。 -
Inverse problem of the mean value theorem of differential with its asymptotic property
微分中值定理的逆問題及其漸近性 -
Rolle's theorem is a special case of the mean value theorem.
羅爾定理是中值定理的一種特殊形式。 -
Application of function construction method in mean - value - theorem proof
函數構造法在微分中值定理證題中的應用 -
A simple structural method of auxiliary function in proving differential mean value theorem
微分中值定理證明中輔助函數的一種簡明構造法 -
By using modulus of functional continuity, two estimates of the asymptotic rate of convergence for " intermediate point " of the mean value theorem are given
摘要利用函數連續模給出了中值定理「中間點」收斂速度的兩個估計。 -
A note on asymptotic in second mean value theorem for integrals
關于第二積分中值定理漸近性的一個注記 -
Some new proofs of the lagrange mean value theorem
中值定理證明方法的討論 -
These methods are lagrange mean - value theorem, monotone function, extreme value of function, taylor formula, concave and convex function
提出六種常用的方法,並指出每一種方法的適用類型、解決問題的關鍵和證明問題的具體步驟,最後結合實例說明方法的可用性。 -
The proof about the first integral mean value theorem
關于積分第一中值定理的證明和推廣 -
A generalization of rolle mean - value theorem
中值定理的推廣 -
On two points about the first mean value theorem for definite integral
對積分中值定理的兩點討論
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