1) second mean value theorem for integrals
第二积分中值定理
1.
A note on asymptotic in second mean value theorem for integrals;
关于第二积分中值定理渐近性的一个注记
2) the second mean value theorem for integrals
积分第二中值定理
1.
The paper studies the asymptotic behavior of "interior point" on the second mean value theorem for integrals when the length of integral interval tends to be infinite,and the asymptotic estimation formulas under very weak conditions are given.
讨论当积分区间长度趋于无穷大时,积分第二中值定理的“中间点”的渐近性态,在较弱的条件下,获得积分第二中值定理的“中间点”当积分区间长度趋于无穷大时的渐近估计式。
2.
So far, there are NO any articles about the second mean value theorem for integrals.
给出了在各种情况下积分第二中值定理“中间点”的渐近性的几个结论 ,相信在积分学中有着很重要的作用 。
3.
In this paper, the asymptotic properties of ξ in the second mean value theorem for integralshas been considered, and the main result we have obtained is
本文研究了积分第二中值定理中ξ的渐近性质,得到主要结果
3) Second mean value theorem for integrals
积分第二中值定理
1.
In this paper,second mean value theorem for integrals is studied,and some results of the inverse problem of the theorem are obtained.
对积分第二中值定理作了进一步的研究,得到了积分第二中值定理的逆问题及其逆问题的渐进性。
2.
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.
利用极限理论,给出并证明了减弱条件的积分第二中值定理“中值点”的渐近性的几个结论,相信在积分学中有着很重要的作用。
4) second mean value theorem for integral
积分第二中值定理
1.
This paper intends to discuss and prove the asymptotic behaviour of mean point in second mean value theorem for integrals in concessional terms.
给出并证明了减弱条件的积分第二中值定理"中值点"的渐近性。
2.
When 1) D αf(a)≠0;2) f (i) +(a)=0 (i=1,2,…,n-1), D αf (n-1) (a)≠0, the asymptotic state of mean value of second mean value theorem for integral are respectively studied,their varying trend has been studied,these results are then applied to approximate integration.
分别在Dαf(a)≠0和f(i)+(a)=0(i=1,2,…,n-1),Dαf(n-1)(a)≠0的情况下,研究了积分第二中值定理中ξ的变化趋势,并把所得结果应用于近似求积。
5) Second mean oalue theorem for intergrals
第二积分值定理
6) the first mean value theorem for definite integrals
定积分第一中值定理
1.
In this paper,we prove the first mean value theorem for definite integrals newly,introduce some betterment with its applications of the first mean value theorem for definite integrals.
本文重新表述了定积分第一中值定理的证明,并改进了该定理,对于改进了的定积分第一中值定理还给出了证明及一些应用实例。
补充资料:柯西中值定理
如果函数f(x)及f(x)满足:
(1)在闭区间[a,b]上连续;
(2)在开区间(a,b)内可导;
(3)对任一x∈(a,b),f'(x)≠0,
那么在(a,b)内至少有一点ζ,使等式
[f(b)-f(a)]/[f(b)-f(a)]=f'(ζ)/f'(ζ)成立。
柯西简洁而严格地证明了微积分学基本定理即牛顿-莱布尼茨公式。他利用定积分严格证明了带余项的泰勒公式,还用微分与积分中值定理表示曲边梯形的面积,推导了平面曲线之间图形的面积、曲面面积和立体体积的公式。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
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