1. Set L = 5 mH, C = 8 µF, R = 0 Ω, and Q...

An inductor (L = 400 mH), a capacitor (C = 4.43 µF), and a resistor (R...

An inductor (L = 400 mH), a capacitor (C = 4.43 µF), and a resistor (R = 500 Ω) are connected in series. A 46.0-Hz AC generator connected in series to these elements produces a maximum current of 335 mA in the circuit. a.) Calculate the required maximum voltage ΔVmax. b.) Determine the phase angle by which the current leads or lags the applied voltage. The current ______ the voltage by a magnitude of ______.

An ideal L-C circuit (zero resistance) includes an inductor with inductance L and a capacitor with...

An ideal L-C circuit (zero resistance) includes an inductor with inductance L and a capacitor with capacitance C, maximum charge on the capacitor Q, and a oscillation period T. If we change out the inductor for one with an inductance 4L, and we reduce the maximum charge on the capacitor to Q/2, what is the new period of the L-C circuit?

In a series L-R-C circuit connected to an alternating current generator whose maximum voltage is 205...

In a series L-R-C circuit connected to an alternating current generator whose maximum voltage is 205 V, the resistance is 51.0 Ω and the capacitance is 6.22 μF . The inductance L can be varied from 2.0 mH to 40.0 mH by adjusting an iron core in the solenoid of the inductor. The angular frequency ω of the generator is 3550 rad/s. If the capacitor voltage is not to exceed 145 V, find the maximum and minimum inductance, Lmax and...

A series circuit consisted of R= 150 Ω, L= 120 mH , C= 4700 µF is...

A series circuit consisted of R= 150 Ω, L= 120 mH , C= 4700 µF is connected to an alternative voltage of V rms = 12 V and frequency of 60 Hz. Find the following quantities in questions a thorough I. You are required to show the formula with the correct symbols - substitute- calculate- answer and the unit for each question. HINT: The first one has been done as an example of how you need to do the problem...

In an oscillating LC circuit, L = 29.0 mH and C = 7.30 µF. At time...

In an oscillating LC circuit, L = 29.0 mH and C = 7.30 µF. At time t = 0 the current is 9.20 mA, the charge on the capacitor is 3.00 µC, and the capacitor is charging. (a) What is the total energy in the circuit?   J (b) What is the maximum charge on the capacitor?   C (c) What is the maximum current?   A (d) If the charge on the capacitor is given by q = Q cos(?t + ?),...

In an oscillating LC circuit, L = 20.0 mH and C = 8.00 µF. At time...

In an oscillating LC circuit, L = 20.0 mH and C = 8.00 µF. At time t = 0 the current is 9.10 mA, the charge on the capacitor is 3.30 µC, and the capacitor is charging. (a) What is the total energy in the circuit? J (b) What is the maximum charge on the capacitor? C (c) What is the maximum current? A (d) If the charge on the capacitor is given by q = Q cos(ωt + ϕ),...

An L-C circuit containing an 88.0-mH inductor and a 1.70-nF capacitor oscillates with a maximum current...

An L-C circuit containing an 88.0-mH inductor and a 1.70-nF capacitor oscillates with a maximum current of 0.800 A Calculate the maximum charge on the capacitor. Calculate the oscillation frequency of the circuit Assuming the capacitor had its maximum charge at time t= 0, calculate the energy stored in the inductor after 2.60 ms of oscillation.

A series LCR circuit with L=25 mH, C = 12 µF, and R = 50 Ω...

A series LCR circuit with L=25 mH, C = 12 µF, and R = 50 Ω is driven by a generator with a maximum emf of 25 V. a) What is the resonance frequency? b) What is the current at resonance? c) What are the reactances χC and χL at double the resonance frequency? d) Draw the voltage phasor diagram at double the resonance frequency?

In an L-R-C series circuit, the resistance is 600 ?, the inductance is 440 mH and...

In an L-R-C series circuit, the resistance is 600 ?, the inductance is 440 mH and the capacitance is 4.00 ?F. At resonance, the rms current through the circuit is 0.120 A. (A) Find the resonance frequency f0 of the circuit. [4] (B) Find the rms voltage of the source. [4] (C) Find the rms voltage across the capacitor at resonance. [6] (D) Find the rms voltage across the inductor at resonance.

An L-C circuit consists of a 69.5-mH inductor and a 240-µF capacitor. The initial charge on...

An L-C circuit consists of a 69.5-mH inductor and a 240-µF capacitor. The initial charge on the capacitor is 5.95 µC, and the initial current in the inductor is zero. (a) What is the maximum voltage across the capacitor? __________ V (b) What is the maximum current in the inductor? __________ A (c) What is the maximum energy stored in the inductor? __________ J (d) When the current in the inductor has half its maximum value, what is the charge...