※ 引述《liang6159 (liang6159)》之铭言： : 若a^101=1,a不等於1, : 求：（a^2/a-1)+(a^4/a^2-1)+(a^6/a^3-1)+....+(a^200/a^100-1)=? : 这是JHMC题目，手机排版稍乱请见谅！ : → algebraic : 请问减一是在分母吗 03/08 01:37 假设题目是这样 首尾配对, 对首末两项有 a^2/(a-1) + a^200/(a^100-1) = (a + 1 + 1/(a-1)) + (a^100 + 1 + 1/(a^100-1)) = a + a^100 + 2 + 1/(a-1) + 1/(a^100-1) (x^2/(x-1) = x + 1 + 1/(x-1) 长除法) = a + a^100 + 2 + (a-1+a^100-1)/[(a-1)(a^100-1)] (通分) = a + a^100 + 2 + (a + a^100 - 2)/(a^101 - a - a^100 + 1) = a + a^100 + 2 + (a + a^100 - 2)/(2 - a - a^100) = a + a^100 + 2 - 1 = a + a^100 + 1 其他项类推, 由此原式 = a + a^2 + a^3 + ... + a^100 + 50 再由 a^101 = 1 得 a^101 - 1 = 0, 即 (a-1)(a^100+a^99+...+a+1) = 0 a 不为 1 故後一乘数为 0, 即 a^100+a^99+...+a+1 = 0, 於是原式 = 49 # -- 'You've sort of made up for it tonight,' said Harry. 'Getting the sword. Finishing the Horcrux. Saving my life.' 'That makes me sound a lot cooler then I was,' Ron mumbled. 'Stuff like that always sounds cooler then it really was,' said Harry. 'I've been trying to tell you that for years.' -- Harry Potter and the Deathly Hollows, P.308 --

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