Refer to Figure P5.34 and assume R1=300 Ω, R2=R3=500 Ω, L=4 H, C1= 40 μ F, C2=160 μ F. a. Determ

Refer to Figure P5.34 and assume R1=300 Ω, R2=R3=500 Ω, L=4...

Refer to Figure P5.34 and assume $R_1=300 \Omega, R_2=R_3=500 \Omega, L=4 \mathrm{H}, C_1= 40 \mu \mathrm{~F}, C_2=160 \mu \mathrm{~F}$. a. Determine the frequency response: $$G_v(j \omega)=\frac{V_{e s u}(j \omega)}{V_{i n}(j \omega v)}$$ b. Sketch, by hand, the associated Bode magnitude and phase plots. List all the steps in constructing the plot. Clearly show the break frequencies on the frequency axis. c. Use the MatLab command "Bode" to generate the same plots. Verify your sketch.

Refer to Figure P5.34 and assume $R_1=300 \Omega, R_2=R_3=500 \Omega, L=4 \mathrm{H}, C_1= 40 \mu \mathrm{~F}, C_2=160 \mu \mathrm{~F}$.
a. Determine the frequency response:
$$G_v(j \omega)=\frac{V_{e s u}(j \omega)}{V_{i n}(j \omega v)}$$
b. Sketch, by hand, the associated Bode magnitude and phase plots. List all the steps in constructing the plot. Clearly show the break frequencies on the frequency axis.
c. Use the MatLab command "Bode" to generate the same plots. Verify your sketch.

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