(20 points) For the following problem use separation of variables to identify the Sturm-Liouville Problem and its eigenvalues and eigenfunctions. DO NOT solve it. This is a steady state temper- a...
II. 1. Find the eigenvalues and the eigenfunctions for the following Sturm-Liouville problem X"+AX=0, x(0)=0, X'(TT) = 0
#2 ONLY PLEASE 1. Consider the non-Sturm-Liouville differential equation Multiply this equation by H(x). Determine H(x) such that the equation may be reduced to the standard Sturm-Liouville form: do Given a(z), 3(2), and 7(2), what are p(x), σ(x), and q(x) 2. Consider the eigenvalue problem (a) Use the result from the previous problem to put this in Sturm-Liouville form (b) Using the Rayleigh quotient, show that λ > 0. (c) Solve this equation subject to the boundary conditions and determine...
4. Consider the following Sturm-Liouville problem with u(0)u'(0)-0 and u(1) u 0 ISTANBUL TECHNICAL UNIVERSITY, UZB218E, Return date: Before 16 (a) Find the eigenvalues. (b) Solve the problem. 4. Consider the following Sturm-Liouville problem with u(0)u'(0)-0 and u(1) u 0 ISTANBUL TECHNICAL UNIVERSITY, UZB218E, Return date: Before 16 (a) Find the eigenvalues. (b) Solve the problem.
Compute the steady-state temperature distribution in an infinitely long cylindri cal wedge of radius a and angle B, whose cross-section is illustrated below. The two straight sides of the wedge are held at zero temperature, while the curved edge is at uniform temperature uo uo Here are a few points to consider in r solution to this problem (a) In polar coordinates, the steady-state temperature satisfies You are required to use the usual approach of separation of variables and to...
1. (5 points) Solve the following eigenvalue problem, i.e. find all eigenvalues and eigenfunctions of the problem y" + (1 - 5)y=0, 0<<<1, 7(0) = y(1) = 0.
This is the question: 42 CHAPTER 2. BASICS Example 2.15 We consider the one-dimensional Sturm-Liouville eigenvalue problem (2.24) - u"(x) = \u()0<<<, (0) = u(T) = 0, that models the vibration of a homogeneous string of length that is fired at both ends. The eigenvalues and eigenvectors or eigenfunctions of (2.24) are x = k?, ux() = sin ka, KEN Let u" denote the approximation of an (eigen)function u at the grid point Ii, uiuti), Di=ih, 0<i<n +1, h =...
3. (20 points) Denote u(ar, y) the steady-state temperature in a rectangle area 0 z 10, 0yS 1. Find the temperature in the rectangle if the temperature on the up side is kept at 0°, the lower side at 10° while the temperature on the left side is S0)= sin(y) and the right side is insulated. Answer the following questions. (a) (10 points) Write the Dirichlet problem including the Laplace's equation in two dimensions and the boundary conditions. (b) (10...
please solve all 3 Differential Equation problems 3.8.7 Question Help Consider the following eigenvalue problem for which all of its eigenvalues are nonnegative y',thy-0; y(0)-0, y(1) + y'(1)-0 (a) Show that λ =0 is not an eigenvalue (b) Show that the eigenfunctions are the functions {sin α11,o, where αη įs the nth positive root of the equation tan z -z (c) Draw a sketch indicating the roots as the points of intersection of the curves y tan z and y...
Problem 3: Solve the following initial value / Neumann problem by separation of variables: (8 points) U4 - 9uzz = 0, (t, x) € Rx (0,2), u(0, 2) = cos? (17), 4(0, 1) = [1 $("))", uz(t,0) = un(t, 2) = 0. - COS
Problem 3: Solve the following initial value / Neumann problem by separation of variables: (8 points) Utt – 9uze = 0, (t, x) ER [0, 2], u(0,2) = cos? (*), u(0, 2) = [1 - COS s()], uz(t,0) = uz(t, 2) = 0.