1. Consider the following signal: V(t) T The signal is a square wave of period T with a duty cycle of 2a (The square wave is at a high voltage for a fraction 2a of its period). 2πη =a₂ + Σ(ancos(² -t) + bn sin(: T a. Find the coefficients a, a, and b in the fourier expansion: 2πη T V(t) = n+1 aT T Vm Vm b. What are av, an and bn if we shift V(t) down by a voltage 2 ? V(t) -t)) T t c. Find the coefficients av, An and On in the expansion: Σπη V(t) = ) = av + Σ Ancos (² n=1 (Use the down-shifted version of V(t).) -t - On) Vm/2 t -Vm/2

Transcribed Image Text:

1. Consider the following signal: V(t) at T The signal is a square wave of period T with a duty cycle of 2a (The square wave is at a high voltage for a fraction 2a of its period). 2πη =a₂ + Σ(ancos(² -t) + bn sin(: T a. Find the coefficients a, a, and b in the fourier expansion: 2πη T V(t) = n+1 V(t) = aT Vm b. What are av, an and bn if we shift V(t) down by a voltage 2 ? V(t) T Vm -t)) c. Find the coefficients av, An and On in the expansion: Σπη ) = av + Σ Ancos (² -t - On) T n=1 (Use the down-shifted version of V(t).) d. Find the coefficients Cn in the expansion: V(t) = ₂³(²) t 7= ∞ (Use the down-shifted version of V(t).) Vm/2 t -Vm/2