Question 10.8: Determining Complex Gain The input voltage to a certain ampl...
Determining Complex Gain
The input voltage to a certain amplifier is
v_i(t) = 0.1 \cos(2000\pi t – 30^\circ)
and the output voltage is
v_o(t) = 10 \cos(2000\pi t + 15^\circ)
Find the complex voltage gain of the amplifier and express the magnitude of the gain in decibels.
Recall that the phasor for the input voltage is a complex number whose magnitude is the peak value of the sinusoidal signal and whose angle is the phase angle of the sinusoidal signal. Thus,
\pmb{\text{V}}_i=0.1 \underline{/-30}^\circ
Similarly,
\pmb{\text{V}}_o=10 \underline{/15}^\circ
Now, we can find the complex voltage gain as
|A_v|=\frac{\pmb{\text{V}}_o}{\pmb{\text{V}}_i} =\frac{10 \underline{/15}^\circ}{0.1 \underline{/-30}^\circ} \\ \quad =100 \underline{/45}^\circ
The meaning of this complex voltage gain is that the output signal is 100 times larger in amplitude than the input signal. Furthermore, the output signal is phase shifted by 45° relative to the input signal.
To express gain in decibels, we first find the magnitude of the gain by dropping the angle and then compute decibel gain:
|A_v|_{dB}=20 \log|A_v|=20 \log(100)=40 \text{ dB}