A capacitor of capacitance 2 mF and resistor of resistance 12 Ω are connected in series with voltage source `V = (195 sqrt 2 (V))[sin(100 (rad)/s)t]` - The average power dissipated in the circuit will be

An inductor of reactance X_L = 4 Ω and resistor of resistance R = 3 Ω are connected in series with a voltage source of emf ε = (20 V)[sin (100pi ((rad)/s))t] . The current in the circuit at any time t will be

A 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

A 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

A 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

If electric bulbs having resistances in the ratio 2 : 3 are connected in parallel to a voltage sources of 220 V. The ratio of the power dissipated in them is

An inductor 20xx10^(-3) a capacitor 100(mu)F and a resistor 50 Omega are connected in series across a source of emf V=10 sin 314 t . Then the energy dissipated in the circuit in 20 mim is

A choke coil is connected to an AC source. Some power is dissipated in coil. Now a capacitor is connected in series with the coil and source is same, then average power dissipated in the circuit does not changes. If ratio of inductive reactance of coil and capacitive reactance of capacitor is 1/x then find x

A resistor of resistance 100 Omega is connected to an AC source epsilon = (12 V) sin (250 pi s^(-1))t . Find the energy dissipated as heat during t = 0 to t = 1.0 ms .

A coil of resistance R and inductance L is connected across an a.c power supply of r.m.s. voltage V. The average power dissipated in the coil is,

In an AC circuit V and I are given by V = 100 sin 100t V and I = 100 sin (100t + pi//3) mA. The power dissipated in the circuit is