Please detail it as much as you can 'cause I'm having a hard time with method of separation of variables Given the heat conduction problem of a metallic bar, 4u = u, for o < x < 1,with uz(0, t) = ux(1, t) = 0, with t > 0.Use the method of separation of variables to find the solution of this problem,being that the temperature distribution of the bar if the initial heat distributionis given by:3πχu(x, 0) = 3 cos+ 2 cos2

we know if ut=αuxx,0<x<l.t>0 with boundary conditions ux(0,t)=ux(l,t)=0 & initial…

Given the heat conduction problem of a metallic bar, 4u = u, for o < x < 1, with ux(0, t) = uz(1, t) = 0, with t > 0. Use the method of separation of variables to find the solution of this problem, being that the temperature distribution of the bar if the initial heat distribution is given by: 7ux\ 3 πχν () + 2 cos 2 u(x, 0) = 3 cos 2

Given the heat conduction problem of a metallic bar, 4u = u, for o < x < 1, with ux(0, t) = uz(1, t) = 0, with t > 0. Use the method of separation of variables to find the solution of this problem, being that the temperature distribution of the bar if the initial heat distribution is given by: 7ux\ 3 πχν () + 2 cos 2 u(x, 0) = 3 cos 2

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Please detail it as much as you can 'cause I'm having a hard time with method of separation of variables

Given the heat conduction problem of a metallic bar, 4u = u, for o < x < 1,
with uz(0, t) = ux(1, t) = 0, with t > 0.
Use the method of separation of variables to find the solution of this problem,
being that the temperature distribution of the bar if the initial heat distribution
is given by:
3πχ
u(x, 0) = 3 cos
+ 2 cos
2

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