What is the energy density spectrum Sxx(ω) of the signal x(n)=a^nu(n)

1.	What is the energy density spectrum Sxx(ω) of the signal x(n)=a^nu(n), \|a\|
Answer» Correct answer is (d) \(\frac{1}{1-2acosω+a^2}\) Explanation: Since \|a\|<1, the sequence x(n) is ABSOLUTELY SUMMABLE, as can be verified by applying the geometric summation FORMULA. \(\sum_{n=-∞}^∞\|x(n)\| = \sum_{n=-∞}^∞ \|a\|^n = \frac{1}{1-\|a\|} \LT ∞\) Hence the Fourier transform of x(n) exists and is obtained as X(ω) = \(\sum_{n=-∞}^∞ a^n e^{-jωn}=\sum_{n=-∞}^∞ (ae^{-jω})^n\) Since \|ae^-jω\|=\|a\|<1, use of the geometric summation formula again yields X(ω)=\(\frac{1}{1-ae^{-jω}}\) The energy density spectrum is given by Sxx(ω)=\|X(ω)\|^2= X(ω).X*(ω)=\(\frac{1}{(1-ae^{-jω})(1-ae^{jω})} = \frac{1}{1-2acosω+a^2}\).

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What is the energy density spectrum Sxx(ω) of the signal x(n)=a^nu(n), |a|

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