※ 引述《stu2005131 (自由幻夢)》之銘言： : 1. 設x.y.z為3個不全為零的實數 : 求(xy+2yz)/(x^2+y^2+z^2)的最大值 y = r cosθ, x = r sinθ cosφ, z = r sinθ sinφ (xy+2yz)/(x^2+y^2+z^2)=(cosφ+2sinφ)sinθcosθ =(√5 / 2)sin(φ+ω)sin2θ max = √5 / 2 : 2. 設x=[(11^(1/2)+7^(1/2)]^12且y表示x的小數部分 求x(1-y)之值為? Let (√11 + √7) = a (√11 - √7) = b a^2 = 18 + 2√77 b^2 = 18 - 2√77 a^2 + b^2 (Integer) a^2 b^2 (Integer) a^4 + b^4 = (a^2 + b^2)^2 - 2a^2 b^2 (Integer) a^{12} + b^{12} = (a^4 + b^4)(a^8 - a^4 b^4 + b^8) = (a^4 + b^4)[(a^4+b^4)^2-3a^4b^4] = K, (K is Integer) but ab=4, and a>3+1=4, hence, b<1 hence, x=a^{12}=(K-1)+(1-b^{12})=(K-1)+y y=x-K+1 x(1-y) = x (K-x) = a^{12}*b^{12}=4^{12} -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 27.147.57.77 ※ 編輯: JohnMash 來自: 27.147.57.77 (07/29 12:52)