1) insert number of n grade infinite number
n级无穷数的插入数
1.
In the paper,by dint of geometrical meaning for infinite integral we bourgeon thought of adding new number:first we introduce n(n∈N)grade infinite number;then we also define insert number of n grade infinite number between n grade infinite number and n+1 grade infinite number.
借助于无穷积分的几何意义,萌发了增添新数的思想:首先引入了n(n∈N)级无穷数的概念;然后在n级与n+1级无穷数间又定义了n级无穷数的插入数。
2) n grade infinite number
n级无穷数
1.
In the paper,by dint of geometrical meaning for infinite integral we bourgeon thought of adding new number:first we introduce n(n∈N)grade infinite number;then we also define insert number of n grade infinite number between n grade infinite number and n+1 grade infinite number.
借助于无穷积分的几何意义,萌发了增添新数的思想:首先引入了n(n∈N)级无穷数的概念;然后在n级与n+1级无穷数间又定义了n级无穷数的插入数。
3) infinite series
无穷级数
1.
Application of Monte Carlo method to infinite series;
蒙特卡罗方法在无穷级数中的应用
2.
A quantum mechanics method of the sum of infinite series;
无穷级数求和的一种量子力学解法
3.
A note on convergence of infinite series in a Banach space;
关于Banach空间中无穷级数收敛性的注记
4) infinity series
无穷级数
1.
The main purpose of this paper is using the elementary method and Euler product formula to study the properties of the infinity series involving the Smarandache-Type function,and obtain its two interesting identities.
研究了一类包含Smarandache-Type可乘函数Fk(n)与Gk(n)的无穷级数及其算术性质,并利用初等方法及欧拉积公式得到了该级数的两个有趣的恒等式,从而推广了关于Smarandache-Type可乘函数的算术性质。
5) remainder of an infinite series
无穷级数的余项
6) sum of infinite series
无穷级数的和
补充资料:夏数
1.指夏历。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条