The charge on the capacitor in an LC circuit is 30% of the maximum stored charge.
1) Calculate the ratio of the energy stored in the capacitor compared to the total energy in both the inductor and the capacitor.
The charge on the capacitor in an LC circuit is 30% of the maximum stored charge....
At some moment an LC circuit has 1/4 of it's max charge stored on the capacitor. A) How much of the total energy is in the inductor? B) What happens to the total energy if we add a non-negligible resistor to this circuit?
31 5 WA.035 Tutorial My Att-O, the current and charge in an oscilating LC circuit are 6.20 ma and 470ǐc, respetiven, and the tap-ctor s maximum charge in the capacitor if L-22.0 mH and C-7.70 are 6.20 mA and 4,70 uC, respectively, and the capacitor is charging. Determine the maximum current in the inductor and 1.51 I what is the energy stored in the capacitor? What is the energy stored in the inductor? How is energy stored in the capacitor...
In an LC circuit at one time the charge stored by the capacitor is 10 mC and the current is 3.0 A. If the frequency of the circuit is (1/(4.0)) kHz, when the charge stored is 6.0 mC, what is thecurrent? A. 10 A B. 6.6 A C. 5.0 A D. 3.6 A E. 4.0 A Why is the answer C?
In an oscillating LC circuit, when some fraction f of the total energy is stored in the inductor's magnetic field, (a) what multiple of the maximum charge is on the capacitor and (b) what multiple of the maximum current is in the inductor? State your answers in terms of f. (a)g/Q = Click here to enter or edit your answer q Vi- f Click here to enter or edit your answer (b)i/I - f
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
1. (a) Consider the LC circuit discussed in class, comprised of one inductor and one capacitor in a loop. There are no external sources, and the circuit is driven by its initial conditions. Prove that the energy stored in the circuit is a constant. (b) Now add a resistor in series with the inductor and capacitor. Prove that the energy in the circuit goes to 0 at t -+ oo. 1. (a) Consider the LC circuit discussed in class, comprised...
What is the capacitance of an oscillating LC circuit in nanofarads if the maximum charge on the capacitor is 2.21 μC and the total energy is 139 μJ
An LC circuit like that in the figure below consists of a 3.30-H inductor and an 836-pF capacitor that initially carries a 111-C charge. The switch is open for <0 and is then thrown closed at t = 0. Compute the following quantities at t = 5.00 ms. L8 (a) the energy stored in the capacitor (b) the total energy in the circuit (c) the energy stored in the inductor
An LC circuit like that in the figure below consists of a 3.10-H inductor and an 890-pF capacitor that initially carries a 105-µC charge. The switch is open for t < 0 and is then thrown closed at t = 0. Compute the following quantities at t = 2.00 ms. (a) the energy stored in the capacitor (b) the energy stored in the inductor (c) the total energy in the circuit
4. This problem explores the transfer of energy in an LC circuit. The capacitor in the circuit shown below is initially charged with a charge Qo. Write down the equations for energy stored in a capacitor and energy stored in an inductor. What is the total energy in this system in terms of charge and current? a. 00000 b. Rewrite your answer in part a, but plug in i = Because there is no resistor in this circuit, the system...