Obtain the answers to (a) and (b) in Q .15, if the circuit is connected to 110 V, 12 kHz supply. Hence explain the statement that a capacitor is a conductor at very high frequencies. Compare this behaviour with that of a capacitor in d.c. after the steady state.

Obtain the answers to (a) and (b) in Q .15, if the circuit is connecte

1.	Obtain the answers to (a) and (b) in Q .15, if the circuit is connected to 110 V, 12 kHz supply. Hence explain the statement that a capacitor is a conductor at very high frequencies. Compare this behaviour with that of a capacitor in d.c. after the steady state.
Answer» Capacitance of the capacitor, `C=100muF=100xx10^(-6)F` Resistance of the resistor, R=40`Omega` Supply voltage, V=110V Frequency of the supply. V=12KHz=`12xx10^(3)Hz` `= omega=2nv=2xxnxx12xx10^(3)03` =24nxx `10^(3)` rad/s Peak voltage, `V_(@)=V sqrt(2)=110sqrt(2)V` `I_(@)=(V_(@))/ (sqrt(R^(2)+(1)/(omega^(2)C^(2)))` Maximum current. `=(110sqrt(2))/(sqrt((40)^(2)+(24pixx10^(3)xx1 00 xx10^(-6))^(2))` For an d RC circuit the voltage lags behind the current by a phase angle of `phi` given as: `tan phi=((1)/( omegaC))/(R)=(1)/(omegaCR)` `=(0.2pi)/(180)`rad `therefore` Time lag `=(phi)/(omega)` `=(0.2pi)/(180xx24pixx10^(3))=1.55x x10^(-3)s=0.04mus` Hence `phi` tends to become zero at high frequencies. At a high frequency capacitor C acts as a conductor. In a dc circuit, after the steady state is acheived `omega=0` . Hence, capacitor C amounts to an open circuit.

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Obtain the answers to (a) and (b) in Q .15, if the circuit is connected to 110 V, 12 kHz supply. Hence explain the statement that a capacitor is a conductor at very high frequencies. Compare this behaviour with that of a capacitor in d.c. after the steady state.

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