課程名稱︰常微分方程導論 課程性質︰必修 課程教師︰夏俊雄 開課學院：理學院 開課系所︰數學系 考試日期（年月日）︰2012/11/30 考試時限（分鐘）：100分鐘 試題 : ODE Midterm Exam 11/30/2012 1. (10 points) Solve the differential equation: dy 6x^5 - 2x + 1 ── = ─────── (0.1) dx cosy + e^y near (x,y)=(0,0).(For the solution,an implicit function of x and y is expected) 2. (20 points) Find the solution to 1 dy 2y ── - ── = xcosx, x>0, (0.2) x dx x^2 with the initial condition y(π) = π^2. 3. (20 points) Find a time periodic solution for the system of differential equations: ╭ dx ｜── = x + 3y + sint, ╱ dt (0.3) ╲ dy ｜── = 3x + y - cost. ╰ dt 4. (30 points) Find the general solutions of the following differential equations and classify the maximal intervals of existence (which might depend on the choices of initial conditions). (a) x'' - 2x' + x = (t^2 + t)e^t + 2t + 1, (b) x' = 3(3 - x)(x + 1). 5. (20 points) Calculate the inverse Laplace tranbsforms of the following functions. s - 1 3 F(s) = ──────, F(s) = ──────. s^2 - 2s + 5 (s^2 + 9)^2 6. (10 points) Suppose F(x) is a continuous and bounded function defined on R and the differential equation x'(t) = F(x), (0.4) always has a unique solution. We denote the solution to the above equation with initial condition x = a by x(t) = ψ(t,a). Prove that lim ψ(t,y) → ψ(t,a). (0.5) y→a -- ※ 發信站: 批踢踢實業坊(ptt.cc), 來自: 118.166.208.171 ※ 文章網址: https://www.ptt.cc/bbs/NTU-Exam/M.1423709978.A.B8F.html ※ 編輯: Malzahar (118.166.208.171), 02/12/2015 11:02:29