Sinusoidal Source/ Phasor

Sinusoidal Source/Phasor Section 9.1-9.3

Outline • RMS Voltage (Section 9.1) • Sinusoidal Response (Section 9.2) • Phasor Notation (Section 9.3)

Sinusoidal Voltage (Phase angle)

Phase Angle (Phase angle) A positive phase angle shifts the cosine to the left. A negative phase angle shifts the cosine to the right.

Root Mean Square(RMS) Voltage (RMS value of a sine wave)

RMS Value of a Triangular Wave (Triangular wave)

Sinusoidal Response Trasient component steady-state component (Phasor analysis deals only with the steady-state component) Advantage: avoid solving diffEQ

Phasor Transform • A phasor is a complex representation of a phse-shifted sine wave. If f(t) is equal to Vmcos(ωt+Φ) then the phasor transform of f(t) is VmejΦ • Another way to write the phasor of f(t) is Vmcos(Φ)+jVmsin(ωt+Φ) • The phasor transform is useful in circuit analysis because it reduces the task of finding the maximum amplitude and phase angle of the steady state sinusoidal response to algebra of complex number.

Big Idea • If a circuit is driven with a source f(t)=Acos(ωt+Φ), the frequency will be the same for all components in the circuit. Phasor transform allows us to focus on the phase shift and magnitude at a given ω

Example

Properties • f(t) ↔F • df(t)/dt↔jωF (see notes) • Integration of f(t) ↔F/(jω) (see notes)

Applications • Voltage across an inductor • v=Ldi/dt • Phasor notation: V=L(jω)I • Impedance of an inductor • Z=V/I=jωL • Current of a Capacitor • i=Cdv/dt • Phasor notation: I=C(jω)V • Impedance of a capacitor • Z=V/I=1/(jωC)

Application of Phasor Transform Assumption: in a linear circuit driven by sinusoidal sources, the steady-state response is also sinusoidal. The frequency of the sinusoidal response is the same as the frequency of the sinusoidal source.

Derivation of the Steady State Response (Assumption)

Cont.

Sinusoidal Source/ Phasor