Explanation Given information: ψ ( x ) = ∫ − ∞ ∞ A ( k ) e i k x d k . Calculation: ∵ A ( k ) = C π sin ( k ω 2 ) k , e i k x = cos ( k x ) + i sin ( k x ) ∴ ψ ( x ) = ∫ − ∞ ∞ C π sin ( k ω 2 ) k cos ( k x ) + i sin ( k x ) d k Note that A(k) is an even function of k. ∴ ψ ( x ) = ∫ − ∞ ∞ C π sin ( k ω 2 ) k cos ( k x ) d k From symmetry sine term cancels out and cosine term doubles

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ISBN: 9780805303087

Author: Randy Harris

Publisher: Addison Wesley

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Chapter 4, Problem 64E

To determine

To Calculate:The final expression for ψ(x) for given conditions.

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Chapter 4, Problem 63E

Chapter 4, Problem 65E

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