Consider the heat equation ди %3D Əx2 subject to the boundary conditions u(0, t) = 0 and u(L, t) = 0. Solve the initial value problem if the temperature is initially (b) u(x,0) = 3 sin – sin 372 - 1 (а) и(х,0) %3D 0 < x < L/2 2 L/2 < x < L

Consider the heat equation ди %3D Əx2 subject to the boundary conditions u(0, t) = 0 and u(L, t) = 0. Solve the initial value problem if the temperature is initially (b) u(x,0) = 3 sin – sin 372 - 1 (а) и(х,0) %3D 0 < x < L/2 2 L/2 < x < L

Name: Could you explain how to do (b) in detail? 2.3.3. Consider the heat eq
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Description: Could you explain how to do (b) in detail? 2.3.3. Consider the heat equationdu= k-Ətsubject to the boundary conditionsu(0, t) = 0andu(L, t) = 0.Solve the initial value problem if the temperature is initially(b) u(x,0) =3 sin " – sin 3TT%3D1(а) и(х,0)

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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Could you explain how to do (b) in detail?

2.3.3. Consider the heat equation
du
= k-
Ət
subject to the boundary conditions
u(0, t) = 0
and
u(L, t) = 0.
Solve the initial value problem if the temperature is initially
(b) u(x,0) =3 sin " – sin 3TT
%3D
1
(а) и(х,0) -
{
0 < x < L/2
L/2 < x < L
2

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