A series AC circuit contains an inductor...

A series AC circuit contains an inductor `(20 mH)`, a capacitor `(100 muF)`, a resistor `(50 Omega)` and an AC source of `12 V, 50 Hz`. Find the energy dissipated in the circuit in `1000 s`.

Text Solution

Verified by Experts

The time period of the source is
`T = 1/v = 20 ms`.
The given times 1000 s is much larger than the time period. Hence we can write the average power dissipated as
`P_(av) = V_(rms) i_(rms) cosvarphi`
where `cosvarphi = R/Z` is the power factor. Thus,
`P_(av) = V_(rms) V_(rms)/Z R/Z = (R V_(rms)^2/(z^2)`
`= ((50 Omega) (12 V)^2))/Z^2`
`= 7200/Z^2 OmegaV^2`. ... (i)
The capacitive reactance `1/(omegaC) = 1/(2pi xx 50 xx 100 xx 100^(-6)) Omega`
`= 100/(pi) Omega`.
The inductive reactance `= omegaL`
`= 2pi xx 50 xx 20 xx 10^(-3) Omega = 2pi Omega`.
The net reactance is ` X = 1/(omegaC) - omegaL`.
`= 100/(pi) Omega - 2pi Omega = 25.5 Omega`.
Thus `Z^2 = (50 Omega)^2 + (25. 5 Omega)^2 = 3150 Omega^2`.
From (i), average power `P_(av) = (7200 Omega-V^2)/(3150 Omega^2) = 2.286 W`.
The energy dissipated in `1000 s = P_(av) xx 1000 s`
`= 2.3 xx 10^3 J`

Topper's Solved these Questions

ALTERNATING CURRENT
HC VERMA|Exercise Short Answer|14 Videos
ALTERNATING CURRENT
HC VERMA|Exercise Objective 1|11 Videos
ALTERNATING CURRENT
HC VERMA|Exercise Exercises|19 Videos
BOHR'S MODEL AND PHYSICS OF THE ATOM
HC VERMA|Exercise Exercises|46 Videos

Similar Questions

Explore conceptually related problems

An inductor of reactance 1 Omega and a resistor of 2 Omega are connected in series to the terminals of a 6 V (rms) a.c. source. The power dissipated in the circuit is

An L-C-R series circuit with inductor of reactance is 25 Omega , reactance of capacitor is 50 Omega and resistance of 10 Omega is connected to an A.C. source. The impedance of the circuit will be …….

A resistor of 100 Omega and a capacitor of 250 muF are connected in series to a 220 V , 50 Hz ac source. Calculate the current in the circuit

An inductance of (200/pi) mH, a capacitance of (10^(-3)/pi)F and a resistance of 10 Omega are connected in series with an a.c. source 220 V, 50Hz. Then what is the phase angle of the circuit ?

In an L-C-R series circuit, R = 500 Omega L = 10 ml of an ideal inductor and C = 20 muF , thes components connected to A.C. source of 230 V 50Hz. The power in the circuit will be .....

An LC circuit contains a 20 mH inductor and a 50 muF capacitor with an initial charge of 10 mC. The resistance of the circuit is negligible. Let the instant the circuit is closed be t = 0. (a) What is the total energy stored initially? Is it conserved during LC oscillations? (b) What is the natural frequency of the circuit? (c) At what time is the energy stored (i) completely electrical (i.e., stored in the capacitor)? (ii) completely magnetic (i.e., stored in the inductor)? (d) At what times is the total energy shared equally between the inductor and the capacitor? (e) If a resistor is inserted in the circuit, how much energy is eventually dissipated as heat?

HC VERMA-ALTERNATING CURRENT-Worked Out Examples

A resistance of 20 Omega is connected to a source of alternating curre...
Text Solution
|
The current in a discharging LR circuit is given by I = i0 e^(-t/tau) ...
Text Solution
|
A coil having a resistance of 50.0 Omega and an inductance of 0.500 he...
Text Solution
|
A capacitor of capacitance 100 muF and a coil of resistance 50 Omega a...
Text Solution
|
A capacitor of capacitance 12.0 muF is joined to an AC source of frequ...
Text Solution
|
A series AC circuit contains an inductor (20 mH), a capacitor (100 muF...
Text Solution
|
An inductor of inductance 100 mH is connected in series with a resista...
Text Solution
|
An inductor coil joined to a 6 V battery draws a steady current of 12 ...
Text Solution
|