| 求sum from i=1 to n i~k的简便递推公式 |
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| 引用本文: | 潘晓东.求sum from i=1 to n i~k的简便递推公式[J].台州学院学报,1995(3). |
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| 作者姓名: | 潘晓东 |
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| 作者单位: | 台州师专数学系 |
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| 摘 要: | 寻找求sum from i=1 to n i~k值的方法,研究得不浅1-9]都有介绍。这里仅用微积分的最基本知识推出较简便的自然数幂之和的求值递推公式:S_n~(k 1)=(k 1)integral from n=0 to n(S~k(x)dx)-n integral from n=-1 to 0 (S~k(x)ds)。其中S~k(x)是S_n~k=sum from i=1 to i~k的派生函数。
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| 关 键 词: | 自然数幂 常数列 派生函数 |
A Simple Deductive Formula to Solve sum from i=1 to n(i~k) |
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| Pan Xiaodong.A Simple Deductive Formula to Solve sum from i=1 to n(i~k)[J].Journal of Taizhou University,1995(3). |
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| Authors: | Pan Xiaodong |
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| Institution: | Pan Xiaodong Department of Mathematics |
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| Abstract: | Much has been said alrealy about the ways to seek the value of sum from i=1 to n(i~k). Here we offer a smple deductiveformula to seek the sum of nature and power by using rudimentary differential and integral equation: S_n~(k 1)=(k 1)integral from n=0 to n(S~k(x)dx)-n(integral from n=-1 to 0(S~k(x)dx)]of which S~k(x) is the derivative function S_n~k=sum from i=1 to n(i~k). |
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| Keywords: | power of natural sum constant series derivative function |
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