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标题: 外国"古董" 数学竞赛题 [:D)] [打印本页]

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作者: 野 菜 花    时间: 2005-10-27 23:34
标题: 外国"古董" 数学竞赛题 [:D)]

 

(1901年匈牙利数学竞赛题)www.ddhw.com

证明:   1^n+2^n+3^n+4^n

能被5整除的充分必要条件是 n 不能被4整除

www.ddhw.com

 

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作者: QL    时间: 2005-10-28 05:19
标题: 回复：外国"古董" 数学竞赛题 [:D)]

Let n = 4k+i, where i = 0, 1, 2 or 3 1^(4k+i)  mod 5 = 1 2^(4k+i) mod 5 = 16^k * 2^i mod 5 = 2^i 3^(4k+i) mod 5 = 81^k * 3^i mod 5 = 3^i 4^(4k+i) mod 5 = 256^k * 4^i mod 5 = 4^iwww.ddhw.com   i = 0, the sum mod 5 = 4 for all other 3 cases, sum mod 5 = 0www.ddhw.com     www.ddhw.com

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作者: 野 菜 花    时间: 2005-10-28 17:08
标题: Very good![@};-][@};-]

  Very good!

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