Question 15 Marks
A circuit containing a $80 mH$ inductor and a $60 \mu F$ capacitor in series is connected to a $230 V, 50 Hz$ supply. The resistance of the circuit is negligible.
$a$. Obtain the current amplitude and rms values.
$b.$ Obtain the rms values of potential drops across each element.
$c$. What is the average power transferred to the inductor?
$d. $ What is the average power transferred to the capacitor?
$e$. What is the total average power absorbed by the circuit? $[$‘Average’ implies ‘averaged over one cycle’.$]$
$a$. Obtain the current amplitude and rms values.
$b.$ Obtain the rms values of potential drops across each element.
$c$. What is the average power transferred to the inductor?
$d. $ What is the average power transferred to the capacitor?
$e$. What is the total average power absorbed by the circuit? $[$‘Average’ implies ‘averaged over one cycle’.$]$
Answer
View full question & answer→Inductance, $L =80 mH =80 \times 10^{-3} H$
Capacitance, $C =60 \mu F=60 \times 10^{-6} F$
Supply voltage $, V = 230 V$
Frequency, $\nu=50 Hz$
Angular frequency, $\omega=2 \pi \nu=100 \pi \text{ rad / s}$
Peak voltage, $V_0=V \sqrt{2}=230 \sqrt{2} V$
$a$. Maximum current is given as:
$I_0=\frac{V_0}{\left(\omega L-\frac{1}{\omega C}\right)}$
$=\frac{230 \sqrt{2}}{\left(100 \pi \times 80 \times 10^{-3}-\frac{1}{100 \pi \times 60 \times 10^{-6}}\right)}$
$=\frac{230 \sqrt{2}}{\left(8 \pi-\frac{1000}{6 \pi}\right)}=-11.63 A$
The negative sign appears because $\omega L<\frac{1}{\omega C}$
Amplitude of maximum current, $\left|I_0\right|=11.63 A$
Hence, rms value of current. $I=\frac{I_0}{\sqrt{2}}=\frac{-11.63}{\sqrt{2}}=-8.22 A$
$b$. Potential difference across the inductor.
$ v _{ L }=I \times \omega L$
$=8.22 \times 100 \pi \times 80 \times 10^{-3}$
$=206.61 V$
Potential difference across the capacitor,
$V_c=I \times \frac{1}{\omega C}$
$=8.22 \times \frac{1}{100 \pi \times 60 \times 10^{-6}}=436.84 V$
$c$. Average power consumed over a complete cycle by the source to the inductor is zero as actual voltage leads the current by $\frac{\pi}{2}$
$d$. Average power consumed over a complete cycle by the source to the capacitor is zero as voltage lags current by $\frac{\pi}{2}$.
$e$. The total power absorbed $($averaged over one cycle$)$ is zero.
Capacitance, $C =60 \mu F=60 \times 10^{-6} F$
Supply voltage $, V = 230 V$
Frequency, $\nu=50 Hz$
Angular frequency, $\omega=2 \pi \nu=100 \pi \text{ rad / s}$
Peak voltage, $V_0=V \sqrt{2}=230 \sqrt{2} V$
$a$. Maximum current is given as:
$I_0=\frac{V_0}{\left(\omega L-\frac{1}{\omega C}\right)}$
$=\frac{230 \sqrt{2}}{\left(100 \pi \times 80 \times 10^{-3}-\frac{1}{100 \pi \times 60 \times 10^{-6}}\right)}$
$=\frac{230 \sqrt{2}}{\left(8 \pi-\frac{1000}{6 \pi}\right)}=-11.63 A$
The negative sign appears because $\omega L<\frac{1}{\omega C}$
Amplitude of maximum current, $\left|I_0\right|=11.63 A$
Hence, rms value of current. $I=\frac{I_0}{\sqrt{2}}=\frac{-11.63}{\sqrt{2}}=-8.22 A$
$b$. Potential difference across the inductor.
$ v _{ L }=I \times \omega L$
$=8.22 \times 100 \pi \times 80 \times 10^{-3}$
$=206.61 V$
Potential difference across the capacitor,
$V_c=I \times \frac{1}{\omega C}$
$=8.22 \times \frac{1}{100 \pi \times 60 \times 10^{-6}}=436.84 V$
$c$. Average power consumed over a complete cycle by the source to the inductor is zero as actual voltage leads the current by $\frac{\pi}{2}$
$d$. Average power consumed over a complete cycle by the source to the capacitor is zero as voltage lags current by $\frac{\pi}{2}$.
$e$. The total power absorbed $($averaged over one cycle$)$ is zero.
