Electrical Signals and Trigonometry

1. Electrical Signals and Trigonometry Alan Murray

2. VL IL Agenda • Trigonometry and waves • i.e. any old waves! • Amplitude, phase and frequency • Representing electrical signals • Voltage, current • Lead, lag, phase shift • i.e. not any old waves • “CIVIL” mnemonic to remember which way around Alan Murray – University of Edinburgh

3. 3 1 1 2 4 2 Sines and CosinesFrequency/Wavelength y x y = cos(x) y x y = cos(2x) y x y = cos(4x) Alan Murray – University of Edinburgh

4. y0 -π/2 = -90° y0 2y0 Sines and CosinesAmplitude and Phase y = y0cos(x) y = y0sin(x) or y = y0cos(x-90°) or y = y0cos(x-π/2) y = 2y0sin(x) or y = 2y0cos(x-90°) or y = 2y0cos(x-π/2) Alan Murray – University of Edinburgh

5. y = y0cos(x) Ф 180° = π y = y0cos(x+Ф) Ф y = y0cos(x+180°) or y = y0cos(x+π) or y = -y0cos(x) 180° =π Sines and CosinesAmplitude and Phase Clickertime Sinusoids simulation Alan Murray – University of Edinburgh

6. T=1/f V0 And in Circuits … • V = V0 sin (ωt + Ф) • a sinusoidal variation of voltage with time • Amplitude = V0 • Volts • Time = t • seconds • Frequency = f • cycles/second or Hz • Angular freq. = ω (= 2πf) • radians/second • Phase = Ф • radians or ° • Ф=0 in this example • So [ωt] = [radians/second * seconds] = [radians] • [ωt + Ф] = [radians + radians] • and thus sin(ωt + Ф) makes sense and works! V t Alan Murray – University of Edinburgh

7. IR VR VR IR Resistors are trivial (!) .. • VR = V0sin(ωt) • IR = I0 sin(ωt) • V & I are in phase • VR = RIR • Ohm’s Law • R is the “impedance”of a resistor • V0 sin(ωt) = RI0sin(ωt) • Ohm’s Law • V0 = RI0 • Ohm’s Law, amplitudes only Alan Murray – University of Edinburgh

8. V = V0 sin(ωt) π/2 I = I0cos(wt) = I0sin(ωt+90°) ... but Voltage and Current (AC) in a Capacitor I Vs V Animate this slide! Alan Murray – University of Edinburgh

9. IC VC 90° IC time t Capacitors are not trivial .. • VC = V0sin(ωt) • IC = I0cos(ωt) = I0sin(ωt+90°) • ICleads VC by 90° • VC = ZCIC • This is Ohm’s Law • ZC replaces R • Or XC replaces R – see later! • ZC = Capacitor “impedance” • V0sin(ωt) = ?I0sin(ωt+90°) • Ohm’s Law, amplitudes only • V0= ?I0 • What is the capacitor’sequivalent of resistance … • What is “ZC “? • And how does ZC describe the +90° phase shift? VC Alan Murray – University of Edinburgh

10. VL 90° IL Inductors are equally awkward IL • VL = V0sin(ωt) • IL = I0sin(ωt-90°) • ILlags VL by 90° • VL = ZLIL • This is Ohm’s Law • ZL replaces R • Or XL replaces R – see later! • ZL = Inductor “impedance” • V0sin(ωt) = ?I0sin(ωt-90°) • Ohm’s Law amplitudes only • V0= ?I0 • What is the inductor’sequivalent of resistance … • What is “ZL “? • And how does ZL describe the -90° phase shift? VL Alan Murray – University of Edinburgh

11. A moment of pedantry … • VR = RIR • R is clearly a resistance • VC = ZCIC • ZC is officially an impedance • IC leads VC by 90° • VC = VC0sin(ωt) • IC =ICOsin(ωt+90°) • ZC describes the magnitude relationship between V and I • ZCmust also describe the 90° phase shift in some magical way • more anon … • However, if we work with amplitudes only • VCO = XCICO • Then XC is the capacitor’s reactance • XC describes the relationship between the magnitudes of V and I • XC does not describe the phase shift Ф • That is described by the sin(ωt), sin(ωt+Ф) • This will make more sense later … Alan Murray – University of Edinburgh

12. CIVIL in a Capacitor, current I leads Voltage (by 90°) CIVIL Voltage leads current I (by 90°) in an Inductor L mnemonic ... "CIVIL" Alan Murray – University of Edinburgh

13. here's the phase lag Capacitor Reactance, XC(remember,ω = 2πf ) DC AC • A capacitor blocks DC signals • f = 0, ω = 2πf = 0 • A capacitor passes AC signals • f > 0, ω = 2πf > 0 • Ohm's Law for amplitudes is V0 = XCI0 • It turns out that • VO = 1 IO for a capacitor (blocks DC, passes AC) ωC • so XC = 1 ωC • DC … f=0 ω=0 • XC = ∞ … block • AC … f>0 w<∞ • XC < ∞ … pass • If I = I0 sin(ωt), then • V = 1 x I0sin(ωt-90°) ωC Alan Murray – University of Edinburgh

14. here's the phase lead Inductor Reactance, XL(remember,ω = 2πf ) • An inductor passes DC signals • f = 0, ω = 2πf = 0 • An inductor blocks AC signals • f > 0, ω = 2πf > 0 • Ohm's Law for amplitudes is VL0 = XLILO • It turns out that • VO = ωL IO for an inductor (blocks AC, passes DC) • so XL = ωL • DC … f=0 ω=0 • XC = 0 … pass • AC … f→∞ w →∞ • XC → ∞ … block • If I = I0sin(ωt), then • V = ωL x I0sin(ωt+90°) Clickertime Alan Murray – University of Edinburgh

15. Fill in the blanks … Alan Murray – University of Edinburgh

16. Starting too sound messy, isn’t it? Summary so far,if I =I0 sin(ωt) • VR= R xIO sin(ωt) • VC= 1 xIO sin(ωt - 90°)ωC • VL= ωL xIO sin(ωt + 90°) • All obey Ohm’s Law • with different constants between V and I • R, 1/ ωC and ωL • in capacitors, I leads VC by 90° • in inductors, VL leads I by 90° Alan Murray – University of Edinburgh