Determine complex c() so that (10.2.11) is equivalent to (10.2.9) with real A() and B()
Chapter 10, Problem 10.2.1(choose chapter or problem)
Determine complex \(c(\omega)\) so that (10.2.11) is equivalent to (10.2.9) with real \(A(\omega)\) and \(B(\omega)\). Show that \(c(-\omega)=\bar{c}(\omega)\), where the overbar denotes the complex conjugate.
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