42.3) Write down the solutions to the follig inboundary value problems for the wave equation in t...
I need help with this PDE problem, part A and D 4.2.3. Write down the solutions to the following initial-boundary value problems for the wave equation in the form of a Fourier series: a) utt = uzz , u(t, 0) = u(t, π) = 0, u(0,x) = 1, ut(0,z) = 0; (b) utt = 2uxx, a(t, 0) = u(t, π) = 0, a(0,x) = 0, ut(0,x) = 1; c) utt = 3uzz , ti(t, 0)=u(t, π)=0, u(0,x) = sin3 x,...
#6-#8 III condition tl (0,2)-Sill utO, (2e) (6) Write down the solutions to the following initial-boundary value problem for the wave equation in the form of a Fourier series: utt = uzz, u(t, 0) = u(t,r) = 0, u(0,x) = sni, ut (0,z) = 0. (7) Solve the following boundary value problem for Laplace's equation on the square u(z,0) = 0, u(z,r) = sin3 x, u(0,y) = 0, u(my) = 0. (8) Solve the following boundary value problem ,u= III...
(4) (a) Compute the Fourier series for the function f(x) interval [-π, π]. 1-z on the (b) Compute the solution u(t, z) for the partial differential equation on the interval [0, T): 16ut = uzz with u(t, 0)-u(t, 1) 0 for t>0 (boundary conditions) (0,) 3 sin(2a) 5 sin(5x) +sin(6x). for 0 K <1 (initial conditions) (20 points) Remember to show your work. Good luck. (4) (a) Compute the Fourier series for the function f(x) interval [-π, π]. 1-z on...
PDE question Consider the one dimensional wave equation on the half line: Ut(x,0) = g(x) Utt - Uzx= 0 0 < < u(0,t) = 0 u(x,0) = f(x) (a) What is the solution? (b) For the particular initial conditions 12 - 2 25254 f(x) = { 6- 4<r<6 otherwise g(x) = 0 sketch the solution u(x, t) for t = 0, 2, 4, 6.
Problem 2. Solve the following wave equation. Utt = Ucx + x for t > 0 and 0 < x < 1 Boundary Conditions: u(0,t) = 0 AND u(1,t) = 1 Inital Condition: u(x,0) = $(x) AND u1(x,0) = 0
22: Solve the follwing boundary value problem Ugex - 2 = Utt: 0 < x < 1, t> 0, u(0, 1) = 0, u(1,t) = 0, 0 < x < 1, u(x,0) = x2 - x, ut(x,0) = 1, t > 0. Solve the follwing boundary value problem Uxx + e-3t = ut, 0 < x < t, t > 0, ux(0,t) = 0, unt,t) = 0, t>0, u(x,0) = 1, 0 < x <.
Solve the initial-boundary value problem. Theorem 11.3.5 (b) will simplify the computa- tion of the coefficients in the Fourier sine series. 64uz 0<x<3, t>0, u(0,t) = 0, u(3, t) = 0, t > 0, u(x,0) = (22 – 9), ut(2,0) = 0, 0<x<3. Utt
Solve the wave equation on the domain 0 < x < , t > 0 ? uxx Utt = with the boundary condition u (0, t) = 0 and the initial conditions u (x,0) = x2 u (x,0) = x
1. (Review of initial/boundary value problems for ordinary differential equations) Determine u(x), a the solutions, if any, to each of the following boundary value problems. Here, u function of only one variable. u', _ 411, + 1311 = 0, 11(0) = 0 u(π) = 0 u', + 511,-14u = 0 11(0) = 5 11,(0) = 1 0<x<π 11" + 411, + 811 = 0, (0)0 11(x) = 0 0 < x < π 11(0)=0 11(2n) = 1 11" +" u-0,...
Problem 1: Solve the initial value / Dirichlet problem on the half-line and find the value u(1, 2): (8 points) Utt(t, 2) – Uzz(t, x) = x+t, (t, x) ER [0, +co), u(0,x) = = cos(2), ut(0, 2) = e", u(t,0) = 1+t.