Solve the wave equation on the whole line (no boundary conditions) with initial conditions: u(x,0) =...

Solve ut=uxx, 0 < x < 3, given the following initial and boundary conditions: - u(0,t)...

Solve ut=uxx, 0 < x < 3, given the following initial and boundary conditions: - u(0,t) = u(3,t) = 1 - u(x,0) = 0 Please write clearly and explain your reasoning.

Solve the wave equation Utt - C^2 Uxx = 0 with initial condtions : 1) u(x,0)...

Solve the wave equation Utt - C^2 Uxx = 0 with initial condtions : 1) u(x,0) = log (1+x^2), Ut(x,0) = 4+x 2) U(x,0) = x^3 , Ut(x,0) =sinx (PDE)

uxx = ut - u (0<x<1, t>0), boundary conditions: u(1,t)=cost, u(0,t)= 0 initial conditions: u(x,0)= x...

uxx = ut - u (0<x<1, t>0), boundary conditions: u(1,t)=cost, u(0,t)= 0 initial conditions: u(x,0)= x i) solve this problem by using the method of separation of variables. (Please, share the solution step by step) ii) graphically present two terms(binomial) solutions for u(x,1).

(PDE) WRITE down the solutions to the ff initial boundary problem for wave equation in the...

(PDE) WRITE down the solutions to the ff initial boundary problem for wave equation in the form of Fourier series : 1. Utt = Uxx ; u( t,0) = u(t,phi) = 0 ; u(0,x)=1 , Ut( (0,x) = 0 2. Utt = 4Uxx ; u( t,0) = u(t,1) = 0 ; u(0,x)=x , Ut( (0,x) = -x

Find the solution of the wave equation on the interval [0, 1] with Dirichlet boundary conditions...

Find the solution of the wave equation on the interval [0, 1] with Dirichlet boundary conditions and initial conditions u0 = 0 and v0 = { x if 0 <= x <= 1/2, 1 - x if 1/2 <= x <= 1

Solve the wave equation: utt = c2uxx, 0<x<pi, t>0 u(0,t)=0, u(pi,t)=0, t>0 u(x,0) = sinx, ut(x,0)...

Solve the wave equation: utt = c2uxx, 0<x<pi, t>0 u(0,t)=0, u(pi,t)=0, t>0 u(x,0) = sinx, ut(x,0) = sin2x, 0<x<pi

Solve the non homogenous wave equation , Utt - c^2Uxx =1 , u(x,0) = sin (x)...

Solve the non homogenous wave equation , Utt - c^2Uxx =1 , u(x,0) = sin (x) , Ut(x,0) = 1+x (PDE)

Solve the below boundary value equation 1. Ut=2uxx o<x<pi 0<t 2. u(0,t) = ux(pi,t) 0<t 3....

Solve the below boundary value equation 1. Ut=2uxx o<x<pi 0<t 2. u(0,t) = ux(pi,t) 0<t 3. u(x,0) = 1-2x 0<x<pi

Solve the BVP for the wave equation ∂^2u/∂t^2(x,t)=∂^2u/∂x^2(x,t),  0 < x < pi, t > 0 u(0,t)=0,...

Solve the BVP for the wave equation ∂^2u/∂t^2(x,t)=∂^2u/∂x^2(x,t),  0 < x < pi, t > 0 u(0,t)=0, u(pi,t)=0,  ? > 0, u(0,t)=0,  u(pi,t)=0,  t>0, u(x,0)= sin(x)cos(x), ut(x,0)=sin(x), 0 < x < pi

Solve the following wave equation using Fourier Series a2uxx = utt, 0 < x < L,...

Solve the following wave equation using Fourier Series a2uxx = utt, 0 < x < L, t > 0, u(0,t) = 0 = u(L,t), u(x,0) = x(L - x)2, ut(x,0) = 0