1)  sequence{D(u,v)=u3+v3}
数列{D(u,v)=u3+v3}
2)  sequence
数列
1.
The General Expression of the sequence Defined by U_( n+1) =a+b/U_ n and Its Application;
数列{D(u,v)=u3+v3}
2.
Study of the Methods in Solving General Terms Through the Sequence Given by Recursion Relations;
数列{D(u,v)=u3+v3}
3.
Super and Inferior Limits of the Sequences;
数列{D(u,v)=u3+v3}
3)  sequence of number
数列
1.
The L Hospitcl rule in sequence of number;
数列{D(u,v)=u3+v3}
2.
Sometimes,the problem of sequence of number summation is a little troublesome,even there is no way to deal with it.
数列{D(u,v)=u3+v3}
3.
The essay puts forward a few methods to figure the limit of sequence of number by giving examples.
数列{D(u,v)=u3+v3}
4)  number sequence
数列
1.
In this paper,the weight of a subsequence for a number sequence is defined,then a theorem,that is,an arithmetic mean sequence for a sequence with finite partition corre spond to convergent subsequence convergence to a li near combination of subsequence limit and the coefficient are the weight of a subsequence,is given.
数列{D(u,v)=u3+v3}
2.
The thesis firstly gives an introduction to Stolz theorem which in style and style,then popularizes it from the situation of number sequence to the situation of function.
数列{D(u,v)=u3+v3}
3.
According to the research of the sides and the integer in a right triangle, this thesis puts forward the subject on the numbers of triangles on condition that the hypotenuse is the odd prime number and the right-angle side is the integer, and then makes a demonstration for it by means of the formula 2n+1=p, and number sequence.
数列{D(u,v)=u3+v3}
5)  series
数列
1.
On the Nature of Fibonacci Series;
数列{D(u,v)=u3+v3}
2.
Several Substitution Method in the Series Calculation;
数列{D(u,v)=u3+v3}
3.
This paper discusses one new kind of algebraic operation on series and its character.
数列{D(u,v)=u3+v3}
6)  sequences
数列
1.
Some interesting sequences and their combinatorial identities;
数列{D(u,v)=u3+v3}
2.
This article discusses the contents and the relations and conversion of series, sequences and integrals.
数列{D(u,v)=u3+v3}
参考词条
补充资料:R阶差数列

相邻两项相减,得到一个新数列,一直如此操作直到得到常数列,减了几次,就称为几阶差数列

说明:补充资料仅用于学习参考,请勿用于其它任何用途。