※ 引述《liu2007 (薯)》之铭言： : 现在工数学到拉式转换 : Solve y''+ 4y' + 6y = 1+e^(-t) , y(0) = y'(0) = 0 : 我现在求到 : 2s + 1 : Y(s) = ________________________ : s(s+1)(s^2 + 4s + 6) : 跟课本答案一样 : 然後课本突然就分解了=.= : 1/6 1/3 s/2 + 5/3 : Y(s) = _____+ _____ - _____________ : s s+1 s^2 + 4s + 6 : 课本的意思好像是前面有方法可以快速分解 : 可是我怎麽翻都找不到 : 想请教一下高手们这是怎麽样快速分解的? : 谢谢 <(_._)> A B Cs + D 令 Y(s) = --- + --- + -------- s s+1 s^2+4s+6 使用Heaviside cover-up method求A, B, C, D 求A就是把Y(s)分母的s盖掉再带s=0 其余类推 | 1 A = sY(s)| = --- |s=0 6 | -1 1 B = (s+1)Y(s)| = ------- = --- |s=-1 (-1)(3) 3 | 2s+1 (2s+1)(s+2) Cs+d = (s^2+4s+6)Y(s)| = ------- = ----------- |s^2=-4s-6 -4s-6+s -3(s+2)^2 2s^2+5s+2 | = ------------| -3(s^2+4s+4)| s^2=-4s-6 or s^2+4s=-6 -8s-12+5s+2 -3s-10 = ----------- = ------ (-3)(-2) 6 => C = -1/2, D=-5/3 --

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