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 ...
when n=2~(r+1)-1,it can be expressed bygeometric 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 ...
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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 ...
etc are in arithmetic or geometric progression. Gives formulae for it. Summation theorem is the world's first theorem that understand importance of this process. It is useful in number of field such as algebra , computer science, number theory. Same expansion can be obtained by using 'Golden...
Computation for the Summation of Integers and Geometric Progression of Powers of Two If someone asks me how to verify the equality nX k=1 k 2 = n(n + 1)(2n +1) 6 immediately I would say it is easy by the Principle of Mathematical Induction, and that is true. If I am further ask...
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...