Complex Numbers and Phasors Chapter Objectives: Ø Understand the concepts of sinusoids and phasors. Ø Apply phasors to circuit elements. Ø Introduce the concepts of impedance and admittance. Ø Learn about impedance combinations. Ø Apply what is learnt to phase-shifters and AC bridges.
Complex Numbers Ø A complex number may be written in RECTANGULAR FORM as: Ø A second way of representing the complex number is by specifying the MAGNITUDE and r and the ANGLE θ in POLAR form. Ø The third way of representing the complex number is the EXPONENTIAL form. • x is the REAL part. • y is the IMAGINARY part. • r is the MAGNITUDE. • φ is the ANGLE.
Complex Numbers Ø A complex number may be written in RECTANGULAR FORM as: forms.
Complex Number Conversions Ø We need to convert COMPLEX numbers from one form to the other form.
Mathematical Operations of Complex Numbers Ø Mathematical operations on complex numbers may require conversions from one form to other form.
Phasors Ø A phasor is a complex number that represents the amplitude and phase of a sinusoid. Ø Phasor is the mathematical equivalent of a sinusoid with time variable dropped. Ø Phasor representation is based on Euler’s identity. Ø Given a sinusoid v(t)=Vmcos(ωt+φ).
Phasors Ø Given the sinusoids i(t)=Imcos(ωt+φI) and v(t)=Vmcos(ωt+ φV) we can obtain the phasor forms as:
Phasors Ø Amplitude and phase difference are two principal concerns in the study of voltage and current sinusoids. Ø Phasor will be defined from the cosine function in all our proceeding study. If a voltage or current expression is in the form of a sine, it will be changed to a cosine by subtracting from the phase. • Example • Transform the following sinusoids to phasors: – – i = 6 cos(50 t – 40 o) A v = – 4 sin(30 t + 50 o) V Solution: a. I A b. Since –sin(A) = cos(A+90 o); v(t) = 4 cos (30 t+50 o+90 o) = 4 cos(30 t+140 o) V Transform to phasor => V V
Phasors • Example 5: • Transform the sinusoids corresponding to phasors: a) b) Solution: a) v(t) = 10 cos(wt + 210 o) V b) Since i(t) = 13 cos(wt + 22. 62 o) A
Phasor as Rotating Vectors
Phasor Diagrams Ø The SINOR Rotates on a circle of radius Vm at an angular velocity of ω in the counterclockwise direction
Phasor Diagrams
Time Domain Versus Phasor Domain
Differentiation and Integration in Phasor Domain Ø Differentiating a sinusoid is equivalent to multiplying its corresponding phasor by jω. Ø Integrating a sinusoid is equivalent to dividing its corresponding phasor by jω.
Adding Phasors Graphically Ø Adding sinusoids of the same frequency is equivalent to adding their corresponding phasors. V=V 1+V 2
Solving AC Circuits Ø We can derive the differential equations for the following circuit in order to solve for vo(t) in phase domain Vo. Ø However, the derivation may sometimes be very tedious. Is there any quicker and more systematic methods to do it? Ø Instead of first deriving the differential equation and then transforming it into phasor to solve for Vo, we can transform all the RLC components into phasor first, then apply the KCL laws and other theorems to set up a phasor equation involving Vo directly.
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PPT-2-Sinusoids+and+Phasor.ppt