Q2) Solve the following partial differential equation: де a²0 =h². Ət Əx² Given the following boundary conditions: 0(0, t) = 60°C, 8 (20,t) = 60°C, 0(x,0) = 130 °C Prove that the temperature at the center of the wall and for the value of h²=0.04 cm²/s can be calculated by the following equation: ∞ 0 (t) = 60 + 280 (-1)k π2k +1° -e-((2k+1)²), 1014 k=0

Q2) Solve the following partial differential equation: де a²0 =h². Ət Əx² Given the following boundary conditions: 0(0, t) = 60°C, 8 (20,t) = 60°C, 0(x,0) = 130 °C Prove that the temperature at the center of the wall and for the value of h²=0.04 cm²/s can be calculated by the following equation: ∞ 0 (t) = 60 + 280 (-1)k π2k +1° -e-((2k+1)²), 1014 k=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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Question

Q2) Solve the following partial differential equation:
20
=h².
a²0
əx²
at
Given the following boundary conditions:
0(0, t) = 60°C,
0 (20, t) = 60°C,
0(x,0) = 130 °C
Prove that the temperature at the center of the wall and for the value of h²=0.04 cm²/s can be calculated by
the following equation:
∞
280
0 (t) = 60 +
Σ (−1)k -((2k+1)²)
e
1014
TT
2k + 1
k=0

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