Consider a half wave rectified sine wave given by: g(t) = sin (2 π f0 t) for 0 < t < T0/2 and g(t) = 0 for T0/2 < t < T0
Posted: Tue Sep 07, 2021 7:49 am
Consider a half wave rectified sine wave given by:
g(t) = sin (2 π f0 t) for 0
< t < T0/2
and g(t) = 0 for T0/2 < t < T0
Where f0 = 60 Hz and T0 = 1 /
f0
1. Obtain trigonometric Fourier series.
2. Also obtain exponential Fourier series coefficient, call it
Gn.
3. Plot the original signal over one period using Matlab.
4. Plot the magnitude and phase spectra from the analytical
formulas over −600 < f < 600Hz.
N Grexp(jk27 fot) KEN
g(t) = sin (2 π f0 t) for 0
< t < T0/2
and g(t) = 0 for T0/2 < t < T0
Where f0 = 60 Hz and T0 = 1 /
f0
1. Obtain trigonometric Fourier series.
2. Also obtain exponential Fourier series coefficient, call it
Gn.
3. Plot the original signal over one period using Matlab.
4. Plot the magnitude and phase spectra from the analytical
formulas over −600 < f < 600Hz.
N Grexp(jk27 fot) KEN