※ 引述《kobe761021 (奮戰)》之銘言： : http://ppt.cc/RBsL : 考卷的最後一題 (辛) : 剛好喵到的~ : 想請問該如何解這題阿(連開頭都不知道怎麼下手) : 感謝大家~ 以直線 ABCD 為 x 軸, BC (或 AD) 中點為原點建立座標軸 令 AD = 2a, BC = 2c 不難看出 2a 是橢圓的長軸, 雙曲線的焦距 2c 是橢圓的焦距, 雙曲線的實軸 所以橢圓方程為 x^2 / a^2 + y^2 / (a^2-c^2) = 1 雙曲線方程為 x^2 / c^2 - y^2 / (a^2-c^2) = 1 聯立解之可得 x^2 = (2a^2c^2)/(a^2+c^2), y^2 = (a^2-c^2)^2/(a^2+c^2) 正方形條件表示 x^2 = y^2 故有 2a^2c^2 = (a^2-c^2)^2, 化簡為 a^4 - 4a^2c^2 + c^4 = 0 題目要求的是 c/a, 所以上式同除 a^4 得 (c/a)^4 - 4(c/a)^2 + 1 = 0 解之得 (c/a)^2 = 2±√3, 由題意 c/a < 1 故 2+√3 不合 最後就是 c/a = √(2-√3) = √((4-2√3)/2) = (√3 - 1)/√2 = (√6 - √2)/2 -- '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 -- ※ 發信站: 批踢踢實業坊(ptt.cc), 來自: 123.195.39.85 ※ 文章網址: https://www.ptt.cc/bbs/Math/M.1421158272.A.A95.html