1) summation of arithmetic progression
算术级数求和
2) summation of arithmetic progression
算术极数求和
3) summation of series
级数求和
1.
In this paper, a method of difference in summation of series is presented.
提出了一种级数求和的差分方法,讨论了差分的相关概念与性质,并应用差分法求某一类数项级数的部分和。
2.
new method of calculating summation of series is constructed by using a set of suitable wave functions in an infinite square potential well of one dimension.
利用一维无限深方势阱中一套适当的波函数,建立了一种新的级数求和方法。
4) summation of series
级数求和法
5) arithmetic progression
算术级数
1.
They also remarked that Heath-Brown gave explicitly infinitely many 4-term arithmetic progressions,where each term can be written as sums of two squares.
Heath-Brown具体构造出无穷多组4项算术级数,其中每项均能表示为两个正整数的平方和。
2.
It has been proved that the primes contain arbitrarily long arithmetic progressions.
已有结论表明:素数集中存在任意长的算术级数。
3.
In this article, we prove that the ternary Goladbach problem in arithmetic progression can be solved for almost all large positive moduli, where the moduli can be as large as AT1/6-ε.
本文考察了几乎所有模的算术级数中的奇数Goldbach问题。
6) Arithmetic progressions
算术级数
1.
Every large odd integer can be represeted as the sum of three primes which take from arithmetic progressions.
解决了三素数定理推广到素数取自算术级数的问题。
补充资料:算术级数
又称“等差级数”。形如a+(a+d)+…+(a+nd)+…的级数。其中d称为公差。
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