Presume that while observing a periodic phenomena, you obtain complex value Fourier series coefficients. The number of significant coefficients are 18 and the insignificant coefficients are 28. Both (
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Presume that while observing a periodic phenomena, you obtain complex value Fourier series
coefficients. The number of significant coefficients are 18 and the insignificant coefficients are 28.
Both (significant as well as insignificant) components decreases with an increase in the harmonic
order. Using Parseval’s theorem estimate the power that resides in significant coefficients,
insignificant coefficients as well as in the acquired periodic signal. Hint: You can refer Google
search to obtain periodic data associated with any arbitary scenario (cite the source), which can be
truncated to size it according to 18 and 28 or using the random number generation, you can
synthesize the data.
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