2. An ideal inductor with inductance L and an ideal capacitor with capacitance C are connected...
4) An ideal LC circuit comprises an ideal inductor having inductance L, a capacitor having capacitance C, and a switch. The circuit does not include a battery nor does it include any resistance The switch is initially open and the initial charge on the capacitor is Qo. At time t o the switch is closed. Determine expressions (L, C, Qo) for the i) charge on the capacitor, and ii) the current flowing through the circuit at the following times: a)...
3) An ideal LC circuit comprises an ideal inductor having inductance L, a capacitor having capacitance C, and a switch. The circuit does not include a battery nor does it include any resistance. The switch is initially open and the initial charge on the capacitor is Qo. The switch is closed at time 1-0. Show that the charge, 4, on the capacitor is given by the time dependent function 9(t) = Qocos(at) where o is given by W= Hint: Apply...
Incorrect Question 7 0/1 pts An inductor inductance L) and a capacitor (capacitance C) are connected as shown. +9 || -9 Travel llll 2012 Inc The value of the capacitor charge q oscillates between positive and negative values. At any instant, the potential difference between the capacitor plates is proportional to dq/dt. proportional to q. both A and B Incorrect Question 3 0/1 pts A current i flows through an inductor Lin the direction from point b toward point a....
In an LC circuit, at time zero, there is a non-zero charge in the capacitor and a non-zero current. As the circuit oscillates, the energy in the circuit can be found with: The inductance of the inductor Starting current att=0 The starting voltage at t-0 The capacitance of the capacitor
Consider an RLC circuit with inductance L = 1 H, capacitance C = 0.01 F, and resistance R= 12 12. The switch is closed at time t=0 and a voltage of 1 V is applied for 2 seconds. Then, the switch is opened and is kept open. Find the equation for the charge g(t), if both the initial current and the initial charge are zero. (15 Point)
A battery with emf Eemf, switch, inductor L and capacitor C are connected in series. Initially the switch is open and capacitor is not charged. Find the maximum current in the circuit after the switch has been closed.
An L-C circuit containing an 82.0-mH inductor and a 1.60-nF capacitor oscillates with a maximum current of 0.800 A . Assuming the capacitor had its maximum charge at time t= 0, calculate the energy stored in the inductor after 2.40 ms of oscillation.
Problem 4:Consider a circuit with two switches, one ideal battery, one resistor, one capacitor and one inductor. The circuit is drawn below with both switches open: R-14.00 C ; 6.20 uF, and L 54.0 mH, and the ideal battery has emf ξ . 34.0 V. At t-o, both switches are open and the charge on the capacitor is qlt-0) (a) The switch is put at position "a". Compute the charge, oft-S us), on the capacitor after 5.00 microseconds (5x10 sec)...
a charged capacitor is connected to an ideal inductur LC circuit with a frequency of oscillation t=1.6HZ at time t=0 the capacitor fully charged at a given instant later charge on the capacitor is measured to be 5.0uC and the current in the circuit is equal to 75uA. what is the maximum charge of the capacitor?
A capacitor and an inductor connected in series have a period of oscillation given by T. At the time t=0 the capacitor has its maximum charge. In terms of T, what is the first time after t=0 that the current in the circuit has its maximum value? In terms of T, what is the first time after t=0 that the energy stored in the electric field is a maximum?