In an `LC` circuit the capacitor has maximum charge `q_0`. The value of `((dI)/(dt))_(max)` is

An LCR curcuit is equivalent to a damped pendulum. In an LCR circuit the capacitor is charged to (Q_0) and then connected to the L ans R as shown below. If a student plaots graphs of the square of maximum charge (Q_(max)^(2)) on the capacitor with time (t) for two different values L_(1) and L_(2) (L_(1)gtL_(2)) of L then which of the following represents this graph correclty? (plots are schematic and not drawn to scale).

An LCR curcuit is equivalent to a damped pendulum. In an LCR circuit the capacitor is charged to (Q_0) and then connected to the L ans R as shown below. If a student plaots graphs of the square of maximum charge (Q_(max)^(2)) on the capacitor with time (t) for two different values L_(1) and L_(2) (L_(1)gtL_(2)) of L then which of the following represents this graph correclty? (plots are schematic and not drawn to scale).

In LC circuit the maximum charge in capacitor is q_0 . Then maximum value of rate of change of current is

The figure shows an RC circuit with a parallel plate capacitor. Before switching on the circuit, plate A of the capacitor has a charge. -Q_(0) while plate B has no net charge. If at t = 0 , the switch is closed then after how much time (in seconds) will the net charge on plate A becomes zero? [Given : C = 1 mu F, Q_(0) = 1 mC, epsilon = 1000 V and R = (2 xx 10^(6))/(ln 3) Omega]

In the circuit shown, the capacitor C_1 is initially charged with charge q_0 . The switch S is closed at time t = 0 . The charge on C_2 after time t is

In the given LC circuit,if initially capacitor C has charge Q on it and 2C has charge 2Q. The polar ar as shown in figure. Then after closing switch S and t=0

In an oscillating LC circuit the maximum charge on the capacitor is Q. The charges on the capacitor when the energy is stored equally between the electric and magnetic field is

In an oscillating LC circuit the maximum charge on the capacitor is Q. The charges on the capacitor when the energy is stored equally between the electric and magnetic field is

In oscillating Lc circuit, the total stored energy is U and maximum charge upon capacitor is (Q)/(2) , the energy stored in the inductor is

An an ideal parallel LC circuit, the capacitor is charged by connecting it to a DC source which is then disconnected. The current in the circuit