为了简化极限的运算过程,对一些不易求解的极限问题化繁为简。
To simplify the calculation of limit and resolve the complicated limit problems, three methods are deduced from the replace property of infinitesimal.
本文在泛灰函数的极限概念基础上,进一步讨论了泛灰函数极限的运算及运算性质,为讨论泛灰函数的连续性以及泛灰函数的导数奠定了基础。
Some definitions of four fundamental operations of grey number and grey function are given in this paper, also we have given the whiting method of grey function.
在高等数学的教学中发现很多学生在函数极限运算方面面临不少问题。
Found many students facing many troubles in higher math's study in the limit of function operation aspect.
由于电子计算机的存贮量小,运算速度慢,智能化低,特别是制造工艺趋于极限。
Due to small storage capacity, slow operational speed and low intelligentize of electronic computer, Particular, its manufacture technics go to limit.
我们从累次极限换序定理出发来综合讨论分析运算换序定理,以便对这类问题有较为深刻的认识。
In this paper, starting from order exchange theorem of repeated limits, we synthetically discuss the above problems in order to understand them deeply.
而且它关于商,归纳极限,与AF -代数做张量积等运算是封闭的。
It is closed under quotients, inductive limits and tensor products with AF-algebras.
求极限是高等数学中一种最基本、最重要的运算。
The limit theory plays an important role in Higher Mathematics, it is most basic and important operation.
分段函数是函数问题中难点,本文就分段函数在分界点的极限,导数、定积分的运算问题探讨一些新方法。
This text will talk about some new methods about the limit of disjunction function in the boundary and the operation of lead number and definite integral.
大多数函数的极限运算问题可用常规的算法及运算法则解决。
Most of the problems on functional limit operation can be solved through regular algorithms.
另一方面,给出了(h (X),h)中收敛网的极限通过并、交及闭包运算的表示。
On the other hand, a representation for limit of convergent net in (h (X), h) is given by means of operations of union, intersection and closure.
在技术的层次上,则将著重于演算法里特定的、多数为正式的、方法、和对运算进路的应用,及其有效性与极限。
At the technical level, the focus will be on the specific, mostly formal, techniques, methods, and applications of a computational approach, and the effectiveness and limitations of the approach.
在技术的层次上,则将著重于演算法里特定的、多数为正式的、方法、和对运算进路的应用,及其有效性与极限。
At the technical level, the focus will be on the specific, mostly formal, techniques, methods, and applications of a computational approach, and the effectiveness and limitations of the approach.
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