summation of geometric progression几何级数求和 geometric progressionn.[数]等比级数 in progression连续, 相继 hypergeometric progression超几何级数 backward progression【医】 后退 progression jet起动喷嘴 finite progression有限级数 double summation二重求和法 ...
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国际基础科学大会-Geometry of nilpotent orbits of classical groups-Hiraku Nakajima 1:03:28 国际基础科学大会-Recent progress in geometric Langlands-Sam Raskin 1:02:09 国际基础科学大会-Eisenstein series-Erez Moshe Lapid 47:45 国际基础科学大会-(1,1) forms with specified Lagrangian phase-Tristan C. ...
2. What is the meaning of Geometric Progression? A geometric progression (GP), also known as the geometric sequence is a sequence of numbers that varies from each other by a common ratio. We can calculate the common ratio of the given geometric sequence by finding the ratio between any two...
Prehistory of the Zeta-Function - ScienceDirect This chapter discusses the prehistory of the zeta-function. For an infinite geometric progression, the "last number" is "nothing or a point"; it can be sai... ANDR WEIL - 《Number Theory Trace Formulas & Discrete Groups》 被引量: 30发表: ...
Eulerian procedures are based upon the notion of geometric quantity. A function is actually conceived as the expression of a quantity and, for this reason, it intrinsically possesses properties we can term continuity, differentiability, Taylor expansion. These correspond to the usual properties of a ...
11.On basis of the results of reference, in this paper, the author got the summation formula of several basic bypergeometric series.在文献[][][]得结论基础上,又得到了几个基本超几何级数的求和公式。 12.Calculating Formulas of the Summation Involving the Laguerre Polynomials;一类包含Laguerre多项式求...
when n=2~(r+1)-1,it can be expressed by geometric progression∑ni=0x~i=∏rj=0(1+x~(2~j)). 当n=2r+1 -1时,几何级数可以表示为:∑ni=0xi=∏rj=0(1+x2j)。 更多例句>> 3) geometric series 几何级数 例句>> 4) the product of geometric series 几何加权级数的乘积和 1. Consi...
Thinking of these relations from a geometric viewpoint one is immediately taken into three dimensional space and if one places balls forming a tetrahedron with TnTn balls on the base and then T(n−1)T(n−1) on the top until we get to the apex with just 11.These numbers are called ...