我们要在微积分学中考虑这些因素。
你们将会发现在多元的微积分学里。
方法利用微积分学中求极小值的方法。
Methods Method of deducing minimum value in differential and integral calculus was applied.
我正专攻微分学和积分学。
这本书假装一种不同和积分学的基础知识。
This book assumes a basic knowledge of differential and integral calculus.
综上所述就导出了微积分学中的最基本的定理。
All this leads up to the most fundamental of theorems of calculus.
1686年,莱布尼茨发表了第一篇积分学的文献。
本书发现了标准微积分学的新模型-欧弥伽连续统模型。
The second discovery is to find a new model of standard calculus - Omega continuum model.
另一方面,也为微积分学基本定理的教学,提供了简明的材料。
On the other hand, they also supply a brief material for the teaching of the fundamental theorem of calculus.
求极限问题是微积分学中的一个常见问题,同时又是一个难点问题。
The limit problem of power exponent function is common but difficult in differential and integral calculus.
一元函数微积分学是高等数学的基础,直接影响学生数学素养的培养。
As the base of high mathematics, differential and integral calculus for function of one variable has the direct influence on the training of students mathematics attainment.
使用MATLAB的一些基本功能来观察得出微积分学的几个基本结论。
Observed and come to several fundamental conclusions of calculus by means of some basic functions of MATLAB.
变上限积分是积分学的一个重要理论,其运算结果仍以函数的形式体现。
Integral that upper limit of integral is variable is a important theory, results of operation is function forma after all.
微积分学中有关积分与它在微分方程和测定面积,体积等的应用的部分。
What fraction of the area of ABC is the area of the shaded part?
幂指函数求极限问题是微积分学中的一个常见问题,同时又是一个难点问题。
The limit problem of power exponent function is common but difficult in differential and integral calculus.
无穷限积分是微积分学中广义积分的一种类型,是积分知识的一个难点内容。
Infinite integral is a type of improper integral in calculi, and it is also a difficult point in integral.
讨论了解常微分方程的积分因子法在极限理论、微分学、积分学中的一些应用。
Some simple application of method of integrating factor that solve ordinary differential equation is discussed on the limit theory, differential and integral.
但对于求幂指函数极限,可重使用等价代换定理,微积分学教程中却没有论及。
In calculus, it has not been proved whether or not the equivalent substitution theorem can be applied to the limit calculation of power-exp ential factions.
在数学上,牛顿创立了“牛顿二项式定理”,并和莱布尼兹几乎同时创立了微积分学。
In mathematics, Newton established "the Newton binomial theorem", and nearly simultaneously established the calculus study with Leibniz.
在数学上,牛顿创建了“牛顿二项式定理”,并和莱布尼兹简直同时创建了微积分学。
In mathematics, Newton established "the Newton binomial theorem", and nearly simultaneously established the calculus study with Leibniz.
以教学过程中积累的多个例子作简单的讨论,展示了微积分学在解决初等问题中的各类应用。
With the help of the examples accumulates in the teaching process, this paper reveals all the USES of calculus in solving some primary problems.
其中很多内容无疑是非常前沿——整合语言学,还有整合积分学,这是一种取代变量的数学视角。
Part of it does seem definitely new — an integral semiotics, as well as an integral calculus, a form of mathematics that replaces variables with perspectives.
本文在此意义下证明几个有关引理,并利用它证明微积分学中关于极限的乘法公式也同样成立。
Under meaning, this paper proves several relative lemmas and proves that the multiplication form about the limit in classical calculus is also valid for the grey limit with the help of th lemmas.
课程内容包括函数、极限与连续、一元函数微分学、一元函数积分学和常微分方程等几大板块。
This course consists of several major parts, such as Functions, Limits and Continuity, The Derivative, Integration and Ordinary Differential Equation.
课程内容包括空间解析几何与向量代数、多元函数微分学、多元函数积分学和无穷级数等几大板块。
This course consists of several major parts such as vectors and analytic geometry derivatives integration and series.
牛顿在万有引力和行星运动领域有很大贡献,是微积分学的创始人之一,对颜色和光的定律做出了解释。
Newton helped define the laws of gravity and planetary motion, co-founded the field of calculus, and explained laws of light and color, among many other discoveries.
昨天,我在我们微积分学老师的白板上看到这样的一句有意义的话:苦难经历或使我们成功或使我们失败。
Yesterday, I found something meaningful on my calculus teacher's white board. Our response to suffering will either break us or make us.
掌握常见的曲面方程的识记规律,不仅能轻松建立空间图形,而且为多元函数积分学的学习打下坚实的基础。
To master the law of common surface equation, not only can easily establish a space graphics, but can lay a solid basis for learning multi-function.
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。
In this paper, second mean value theorem for integrals is studied, and some results of the inverse problem of the theorem are obtained.
摘要:极限是微积分中至为重要的基础概念,也是建立及应用微积分学中各种计算方法、相关概念的基础之一。
Abstract: : the limit is Paramount basic concept in calculus, but also is one of the foundations to establish and apply all kinds of calculation methods and related concept in calculus.
应用推荐