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Transcript
AC Circuits V0 sin t VR IR • An AC circuit is made up with components. • • • • Power source Resistors Capacitor Inductors R VC IX C C X C 1 C VL IX L L X L L • Kirchhoff’s laws apply just like DC. • Special case for phase RLC Circuits • An RLC circuit (or LCR circuit or CRL circuit or RCL circuit) is an electrical circuit consisting of a resistor, an inductor, and a capacitor, connected in series or in parallel. • The RLC part of the name is due to those letters being the usual electrical symbols for resistance, inductance and capacitance respectively. • The circuit forms a harmonic oscillator for current and will resonate in a similar way as an LC circuit will. The main difference that the presence of the resistor makes is that any oscillation induced in the circuit will die away over time if it is not kept going by a source. • This effect of the resistor is called damping. The presence of the resistance also reduces the peak resonant frequency somewhat. Some resistance is unavoidable in real circuits, even if a resistor is not specifically included as a component. An ideal, pure LC circuit is an abstraction for the purpose of theory. IMPEDANCE AND THE PHASOR DIAGRAM Resistive Elements • For purely resistive circuit v and i were in phase, and the magnitude: • In phasor form, FIG. 15.1 Resistive ac circuit. IMPEDANCE AND THE PHASOR DIAGRAM Resistive Elements FIG. 15.5 Waveforms for Example 15.2. FIG. 15.4 Example 15.2. IMPEDANCE AND THE PHASOR DIAGRAM Inductive Reactance • for the pure inductor, the voltage leads the current by 90° and that the reactance of the coil XL is determined by ψL. FIG. 15.9 Waveforms for Example 15.3. FIG. 15.8 Example 15.3. IMPEDANCE AND THE PHASOR DIAGRAM Capacitive Reactance • for the pure capacitor, the current leads the voltage by 90° and that the reactance of the capacitor XC is determined by 1/ψC. FIG. 15.17 Waveforms for Example 15.6. FIG. 15.16 Example 15.6. Inductors - how do they work? R V0 L Start with no current in the circuit. When the battery is connected, the inductor is resistant to the flow of current. Gradually the current increases to the fixed value V0/R, meaning that the voltage across the inductor goes to zero. dI VL L dt In reality the inductor has a finite resistance since it is a long wire so it will then be more like a pair of series resistances. Inductors - time constant L/R VR V0 VL Again the behavior of an inductor is seen by analysis with Kirchoff’s laws. Suppose we start with no current. dI V0 VR VL IR L dt then I V0 Rt 1 exp R L and Rt Rt VL V0 exp VR V0 1 exp L L There is a fundamental time scale set by L/R, which has units of seconds (=Henry/Ohm) Mathematical analysis of a series LRC circuit - bandpass filter Vin L Z L iL 1 iC i C ZC C R First find the total impedance of the circuit 1 Z R i L C Using a voltage divider Vout Vin R 1 R i L C Vout The phase shift goes from 90°to 90°. tan 1 R 1 L C Mathematical analysis of a series LRC circuit - bandpass filter (2) The magnitude of the gain, Av, is Vin Av L C R Vout Vout Vin R 1 R 2 L C 2 Note that for high frequencies L is dominant and the gain is R/ L or small. At low frequencies the gain is RC because the impedance of the capacitor is dominant. At 2 = 1/LC the gain is one (assuming ideal components). Series RLC i v • A series RLC circuit can be made from each component. • One loop • Same current everywhere R L C • Reactances are used for the capacitors and inductors. • The combination of resistances and reactances in a circuit is called impedance. Vector Map • Phase shifts are present in AC circuits. • +90° for inductors • -90° for capacitors VL=IXL VR=IR VC=IXC • These can be treated as if on the y-axis. • 2 D vector • Phasor diagram Vector Sum • The current is the same in the loop. • Phasor diagram for impedance • A vector sum gives the total impedance. XL XC XL Z R R XC Vector Sum • The total impedance is the magnitude of Z. XC XL • The phase between the current and voltage is the angle between Z and the x-axis. Z R Z R2 X L X C 2 1 2 Z R L C 2 X L XC tan R 1 L C arctan R Phase Changes • The phase shift is different in each component. Power Factor • Power loss in an AC circuit depends on the instantaneous voltage and current. • Applies to impedance • The cosine of the phase angle is the power factor. p vi i 2 Z cos 2 Prms Vrms I rms I rms Z cos P I 0 Z cos 2 0 t
