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If a vibrating string satisfying (4.4.1)–(4.4.3) is initially at rest, g(x) = 0, show th...

If a vibrating string satisfying (4.4.1)–(4.4.3) is initially at rest, g(x) = 0, show that

where F(x) is the odd-periodic extension of f(x). [Hints:

Comment: This result shows that the practical difficulty of summing an infinite number of terms of a Fourier series may be avoided for the one-dimensional wave equation.

Reference (4.4.1)–(4.4.3)

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Solutions For Problems in Chapter 4.4
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