Find the general solution in terms of real functions. Then, from the roots of the characteristic equation, determine whether each critical point of the corresponding dynamical system is asymptotically stable, stable, or unstable, and classify it as to type. Finally, draw a phase portrait.

y^''-4y^'+4y=0

Find the general solution for each of the given system of equations. Draw a phase portrait. Describe the behavior of the solutions as t rightarrow infinite. x' = [ ]x x' = [ ]x x' = [ ]x x' = [ ]x In each of the next four problems, the eigenvalues and eigenvectors of a matrix A are given. Consider the corresponding system x' = Ax. Without using a computer, draw each of the following graphs. Sketch a phase portrait of the system. Sketch the solution curve passing through the initial point (2,3). For the curve in part (ii), sketch the component plots of x1 versus t and x2 versus t on the same set of axes. lambda1 = -1, v1 = [-1 2]; lambda2 = -4, v2 = [1 2]. lambda1 = 1, v1 = [-1 2]; lambda2 = -4, v2 = [1 2]. lambda1 = -1, v1 = [-1 2]; lambda2 = 4, v2 = [1 2]. lambda1 = 1, v1 = [1 2]; lambda2 = 4, v2 = [1 -2]. In each of the next four problems, the eigenvalues and eigenvectors of a matrix A are given. Consider the corresponding system x' = Ax. Without using a computer, draw each of the following graphs. Sketch a phase portrait of the system. Sketch the trajectory passing through the initial point (2,3). lambda1 = -4, v1 = [-1 2]; lambda2 = -1, v2 = [1 2]. lambda1 = 4, v1 = [-1 2]; lambda2 = -1, v2 = [1 2]. lambda1 = -4, v1 = [-1 2]; lambda2 = 1, v2 = [1 2]. lambda1 = 4, v1 = [1 2]; lambda2 = 1, v2 = [1 -2]. Find the general solution for each of the given systems in terms of real-valued functions, and draw a phase portrait. Describe the behavior of the solutions as t rightarrow infinity. x' = [ ]x x' = [ ]x x' = [ ]x

Further Explorations 9. Explain why or why not Determine whether the following statements are true and give an explanation or counterexample. a. To solve the equation y? + ty? + 4y = 0 you should use the trial solution y = e^rt. b. The equation y? + ty? + 4t^2y = 0 is a Cauchy-Euler equation. c. A second-order differential equation with constant real coefficients has a characteristic polynomial with roots 2 + 3i And-2 + 3i. d. The general solution of a second-order homogeneous differential equation with constant real coefficients could be y = c1 cos 2t + c2 sin r cos t. e. The general solution of a second-order homogeneous differential equation with constant real coefficients could be y = C1 cos 2t + c2 sin 3t.

Solve the equation xy" + y' + xy = 0 by means of a power series about the point x0 = 0. more 5.2: 2, 5, 7(a) Find eigenvalues and eigenfunctions of the boundary value problem: y" - lamda y = 0, y(0) = 0. more 10.1: 14-16 Determine the equilibrium points and classify each one as asymptotically stable, unstable, or semistable. Draw the plase line and sketch several typical graphs of solutions in the ty-plane, dy/dt = y2( 1 - y2) more 2.5: 7-13 Find the Fourier series for the function: f(x) = f(x + 4) = f(x). And sketch the graph of the function to which the series converges for three periods, more 10.2: 13-23 Solve the boundary value problem by the method of separation of variables: alpha2uxx = ut, 0 0, u(0, t) = 0, u(L, t) = 0, t > 0 more 10.5: 1-5; 7, 8.