请问(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)等于多少?

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请问(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)等于多少?

请问(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)等于多少?
请问(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)等于多少?

请问(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)等于多少?
(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)
=(n-1)(n+1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)/(n-1)
=(n^2-1)(n^2+1)(n^3+1)(n^4+1)(n^5+1)/(n-1)
=(n^4-1)(n^4+1)(n^3+1)(n^5+1)/(n-1)
=(n^8-1)*(n^8+n^5+n^3+1)/(n-1)
你这个数字给的貌似不是太好,如果是1,2,4,8那样的将会简单得多……

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