If the Fourier series is (x(t)=sum_{n=-infty}^{infty} X_{n} e^{j 2 pi n t / T}), define (y(t)=xleft(t-t_{0}ight)). Compute
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If the Fourier series is \(x(t)=\sum_{n=-\infty}^{\infty} X_{n} e^{j 2 \pi n t / T}\), define \(y(t)=x\left(t-t_{0}ight)\). Compute an expression for the complex exponential Fourier series expansion of \(y(t)\).
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Related Book For 
Radar Systems Analysis And Design Using MATLAB
ISBN: 9780367507930
4th Edition
Authors: Bassem R. Mahafza
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