Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download Section 5.1 LRC Series Circuit
Document related concepts
Surge protector wikipedia , lookup
Valve RF amplifier wikipedia , lookup
Television standards conversion wikipedia , lookup
Electronic engineering wikipedia , lookup
Opto-isolator wikipedia , lookup
Lumped element model wikipedia , lookup
Immunity-aware programming wikipedia , lookup
Flexible electronics wikipedia , lookup
Zobel network wikipedia , lookup
Regenerative circuit wikipedia , lookup
Integrated circuit wikipedia , lookup
Index of electronics articles wikipedia , lookup
Transcript
Section 5.1 LRC Series Circuit Damped Motion March 28, 2011 Driven Motion Resonance MTH 225 Differential Equations Notes 5.1 Linear Models: InitialValue Problems Part III P. Seeburger Part III: Spring/Mass Systems: Driven Motion Suppose an external force f (t) acts on the springmass system. For example, the object to which the spring is attached could be made to move up and down in an oscillating motion. Adding this force into the DE for the motion of the mass on the spring, we obtain the DE of _____________________ or ____________________ motion. That DE is: Dividing by m, gives us the DE: Ex. 1: Interpret and solve the IVP: x(0) = ½, x′(0) = 0. , 1 Section 5.1 LRC Series Circuit March 28, 2011 Transient & SteadyState Terms When F is a periodic function, the general solution of the DE for driven motion will be the sum of a nonperiodic function _________ and a periodic function _________. Note that as t → ∞, xc(t) → ________. In this case, xc(t) is said to be a _________________________ term, and xp(t) is called a __________________________________ term. This means that the effect of the initial conditions on a driven springmass system is transient. If there is no damping, there will be no transient term (that is, for undamped forced motion). 2 Section 5.1 LRC Series Circuit March 28, 2011 LRC Series Circuit Analogue Remember that Kirchoff’s 2nd Law states that the sum of the voltages drops across the inductor, the resistor, and the capacitor is equal to the impressed voltage on the circuit, E(t). That is: But since i(t) = , we can write this DE as a 2ndorder DE in q: The terminology used for series circuits is similar to that used to describe spring/mass systems. If E(t) = 0, the electrical vibrations of the circuit are said to be _________________. The characteristic equation for this DE is: 3 Section 5.1 LRC Series Circuit The circuit is said to be: March 28, 2011 Overdamped if ___________________________________. Critically damped if _______________________________. Underdamped if __________________________________. In each case, as t → ∞, q(t) → ________. In the underdamped case, the charge on the capacitor ____________________as it decays, that is it is charging and discharging as as t → ∞. If E(t) = 0 and R = 0, the circuit is said to be undamped. The response of the circuit is simple harmonic and the electrical vibrations will never decay to 0. Ex. 2: Find the charge q(t) on the capacitor in an LRC series circuit when L = 0.25 henry, R = 10 ohms, C = 0.001 farad, E(t) = 0, q(0) = q0 coulombs, and i(0) = 0 amperes. 4 Section 5.1 LRC Series Circuit March 28, 2011 When there is an impressed voltage E(t) on the circuit, the electrical vibrations are said to be _______________. In the case when R ≠ 0, the complementary function qc(t) is said to be a transient solution and if E(t) is periodic or constant, then the particular solution qp(t) is a ________________ _____________________ solution. 5
