Question 11 4 pts A capacitor C-17.2 μF is charged to 8.50 V, removed from the power supply, and ...
A 17.0-μF capacitor is charged by a 130.0-V power supply, then disconnected from the power and connected in series with a 0.260-mH inductor. Calculate the oscillation frequency of the circuit. Calculate the energy stored in the capacitor at time t=0 ms (the moment of connection with the inductor). Calculate the energy stored in the inductor at t = 1.30 ms.
A 12.0-μF capacitor is charged by a 130.0-V power supply, then disconnected from the power and connected in series with a 0.280-mH inductor. Calculate the energy stored in the inductor at t = 1.30 ms.
A 15.0 μF capacitor is charged by a 120.0 V power supply, then disconnected from the power and connected in series with a 0.280 mH inductor. Calculate the energy stored in the inductor at t = 1.30 ms.
A 7.50-nF capacitor is charged up to 12.0 V. then disconnected from the power supply and connected in series through a coil. The period of oscillation of the circuit is then measured to be 8.60 X 10^-5 s. Calculate: (a) the inductance of the coil: (b) the maximum charge on the capacitor: (c) the total energy of the circuit; (d) the maximum current in the circuit.
A 7.90-nF capacitor is charged up to 14.0 V,then disconnected from the power supply and connected in series through a coil. The period of oscillation of the circuit is the measured to be 8.80*10-58 Part A Calculate the inductance of the coil. ANSWER: L= H Part B Calculate the maximum charge on the capacitor ANSWER Q с Part 6 Calculate the total energy of the circuit. ANSWER: J Part D Calculate the maximum current in the circuit ANSWER: 1 =
A 11.0-uF capacitor is charged by a 145.0-V power supply, then disconnected from the power and connected in series with a 0.280-mH inductor. Calculate the energy stored in the inductor at t = 1.30 ms. Express your answer with the appropriate units.
A 7.00-nF capacitor is charged up to 10.0 V , then disconnected from the power supply and connected in series through a coil. The period of oscillation of the circuit is then measured to be 8.00×10−5 s . Part A Calculate the inductance of the coil. Part B Calculate the maximum charge on the capacitor. Part C Calculate the total energy of the circuit. Part D Calculate the maximum current in the circuit.
A 25.0 ?F capacitor is charged by a 121.3 V power supply, then disconnected from the power and connected in series with a 0.228 mH inductor at time t=0 s. What is the energy stored in the inductor at t=1.88 ms in Joules?
30.32 . A 20.0-pF capacitor is charged by a 150.0-V power sup- ply, then disconnected from the power and connected in series with a 0.280-mH inductor. Calculate: (a) the oscillation frequency of the circuit; (b) the energy stored in the capacitor at time t = 0 ms (the moment of connection with the inductor); (c) the energy stored in the inductor at t = 1.30 ms.
A circuit is constructed with an AC power supply, with a peak voltage of 12 V and a frequency of 50 Hz, connected in series with a 200 Ω resistor, a 300 mH inductor and a 470 μF capacitor. Calculate the peak value of the voltage across the resistor, in V.