lecture22

# lecture22 - EE 205 Coifman Rules for the test are the same...

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EE 205 Coifman 22-1 Rules for the test are the same as outlined in Lecture 12, please review them. The test will cover material through this lecture. Given Re Re Ae e Be e jj t j jt θω φ ω {} = Prove Ae Be j j θ = 1) Re Re Ae Be t t φω + + = since they are exponentials 2) At Bt t cos cos , ωθ ωφ + () =+ via Euler’s equation and the "real" operator but (2) can only be true if AB = and θφ = , thus, Ae Be j j =

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EE 205 Coifman 22-2 Have we met somewhere before? + - Rest of the circuit Z 1 V IV 1 + - V 2 + - Z 2 Z N V N + -
EE 205 Coifman 22-3 Now this is what a proper lecture is all about, + - 50 10 µ F 25 mH i(t) v S (t) If this circuit is in sinusoidal steady state with v s (t)=35cos(1000t)V, solve for the phasor current and the phasor voltage across each element, then convert back to the time domain.

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EE 205 Coifman 22-4 Now something is resonating here. .. + - 5 j5

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lecture22 - EE 205 Coifman Rules for the test are the same...

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