Solve the following heat equation using Fourier Series uxx = ut, 0 < x < 1,...

Solve the following heat equation using Fourier Series

u_xx = u_t, 0 < x < 1, t > 0, u(0,t) = 0 = u(1,t), u(x,0) = x/2

Expert Solution

Colby Messinger answered 2 years ago

Solve the following heat equation using Fourier Series uxx = ut, 0 < x < 1,...

Solve the following heat equation using Fourier Series uxx = ut, 0 < x < 1, t > 0, ux(0,t) = 0 = ux(1,t), u(x,0) = 1 - x2

Solve the following heat equation using Fourier Series uxx = ut, 0 < x < pi,...

Solve the following heat equation using Fourier Series uxx = ut, 0 < x < pi, t > 0, u(0,t) = 0 = u(pi,t), u(x,0) = sinx - sin3x

Solve the following wave equation using Fourier Series a2uxx = utt, 0 < x < 1,...

Solve the following wave equation using Fourier Series a2uxx = utt, 0 < x < 1, t > 0, u(0,t) = 0 = u(1,t), u(x,0) = x2, ut(x,0) = 0

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

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

Find the finite-difference solution of the heat-conduction problem PDE: ut = uxx 0 < x <...

Find the finite-difference solution of the heat-conduction problem PDE: ut = uxx 0 < x < 1, 0 < t < 1 BCs: ⇢ u(0, t) = 0 ux(1, t) = 0 0 < t < 1 IC: u(x, 0) = sin(pi x) 0 x  1 for t = 0.005, 0.010, 0.015 by the explicit method. Assume

Please solve the following: ut=uxx, 0<x<1, t>0 u(0,t)=0, u(1,t)=A, t>0 u(x,0)=cosx, 0<x<1

Consider the backward heat equation ∂tu + uxx = 0 with u(0, x) = g(x) in...

Consider the backward heat equation ∂tu + uxx = 0 with u(0, x) = g(x) in the periodic domain x ∈ T (Peridoc) . Use separation of variables to solve this equation and prove that as long as g is not a constant, the solution does not decay whent → ∞.

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Consider the nonhomogenous heat equation with time dependent sources ut = uxx + xt, an initial...

Consider the nonhomogenous heat equation with time dependent sources ut = uxx + xt, an initial condition u(x, 0) = x2 and inhomogenous boundary conditions ux(0, t) = 2t and ux(1, t) = 4. Use eigen function expansion to find the solution u(x, t).

Kindly request to solve the Poisson's equation of Uxx+Uyy = -81xy ; 0<x<1, 0<y<1; given that...

Kindly request to solve the Poisson's equation of Uxx+Uyy = -81xy ; 0<x<1, 0<y<1; given that u(0,y)=0, u(x,0)=0; u(1,y)=100, u(x,1)=100 and h=1/3

Question

Solve the following heat equation using Fourier Series uxx = ut, 0 < x < 1,...

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Expert Solution

Related Solutions

Solve the following heat equation using Fourier Series uxx = ut, 0 < x < 1,...

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