Calculate the inductance of an LC circuit that oscillates at 120 Hz when the capacitance is 8.00 UF.
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- Shown in the figure below is an "RLC" circuit driven by an AC power source. The AC power source has an RMS voltage of Vps(RMS) = 10.16 Volts and is running at a frequency of f = 169000 Hz. The resistor has a resistance of R = 3380 ohm, the capacitor has a capacitance of C = 4.89e-10 Farads, and the inductor has an inductance of L = 4.14e-03 Henries.Write the FORMULA for the total impedance of the circuit Ztot = Write the FORMULA for the phase of the total impedance of the circuit Ztot = Determine the numerical value of Ztot = ohmDetermine the numerical value of Ztot = degreesDetermine the current through the circuit: I(PEAK) = Amps I(RMS) = Amps Determine the voltage across the inductor: VL(PEAK) = Volts VL(RMS) = Volts Determine the voltage across the capacitor: VC(PEAK) = Volts VC(RMS) = Volts If a second circuit were connected in parallel with the resistor, this circuit would be considered as: a phase conjugate deflector a high-pass filter a radio tuner a…The charge on the capacitor of an LC circuit with inductance L and capacitance C obeys the following expression. Find the maximum current in the circuit. q=Q cos [t/(LC)0.5] zero Q(LC) ⁰.5 Olmax/(LC)0.5 Imax QLC Q/(LC) 0.5Shown in the figure below is an "RLC" circuit driven by an AC power source. The AC power source has an RMS voltage of Vps(RMS) = 8.76 Volts and is running at a frequency of f = 143000 Hz. The resistor has a resistance of R = 3460 , the capacitor has a capacitance of C = 4.53e-10 Farads, and the inductor has an inductance of L = 5.24e-03 Henries. Vps Write the FORMULA for the total impedance of the circuit Ztot = R ww Write the FORMULA for the phase of the total impedance of the circuit ztot Determine the numerical value of Ztot = Determine the numerical value of OZ tot = Determine the current through the circuit: I(PEAK) = I(RMS) = . Amps Amps Determine the voltage across the inductor: VL (PEAK) = VL(RMS) = Volts Volts Determine the voltage across the capacitor: Vc(PEAK) = Vc(RMS) = Volts Volts 22 degrees C If a second circuit were connected in parallel with the resistor, this circuit would be considered as: O a flux capacitor O a phase conjugate deflector O a low-pass filter O a…
- Please give a detailed solution Thank youA series RLC circuit has resistance R = 14.0 2, inductive reactance X, = 28.0 N, and capacitive reactance X, = 16.0 Q. If the maximum voltage across the resistor is AV, = 135 V, find the maximum voltage across the inductor and the capacitor. (Due to the nature of this problem, do not use rounded intermediate values in your calculations-including answers submitted in WebAssign.) HINT (a) the maximum voltage across the inductor (in V) V (b) the maximum voltage across the capacitor (in V) V (c) What is the maximum current in the circuit (in A)? A (d) What is the circuit's impedance (in 2)?An LC circuit has an inductor of inductance 8.4 mH and a capacitor with a capacitance of 963.7 µF. At what frequency, in radians per second, will the circuit oscillate?
- The charge on the capacitor of an LC circuit with capacitance C and inductance L obeys the following equation. Find the maximum current in the circuit. q= Q cos [t/(LC)0.5] Q Q/(LC) 0.5 zero QQ²/(LC) 0.5 imax 1/(LC) 0.5An LC circuit has an inductance of L mH and a capacitance of (5.905x10^-3) mF. At one instant the charge on the capacitor is (8.1403x10^-3) mC. What is the voltage in this circuit, at that time? Express your result in V. Provide your answer with four significant figures.