1 / 11

Electrical Circuits

Understand transients in circuits and analyze them using Laplace transformation for first and second order circuits. Learn inverse Laplace transformation and partial fraction decomposition for circuit analysis.

christinagraham
Download Presentation

Electrical Circuits

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. ElectricalCircuits Dr inż. Agnieszka Wardzińska Room: 105 Polanka agnieszka.wardzinska@put.poznan.pl cygnus.et.put.poznan.pl/~award Advisor hours: Monday: 9.30-10.15 Wednesday: 10.15-11.00

  2. Transient analysis The transients in electrical circuits occur when: • switching on/of power • changing the values of elements in the circuit The first order circuitsare the circuits where only one of the reactance element is unbalanced (only capacitance or inductance). When there are two elements unbalanced we talk about second order circuits. There can be more than two reactance elements in the circuits. For the lecture we will discuss only one method of analysing the transient circuit using Laplace transformation.

  3. Laplace theorem • The Laplace transform is an integral transform, a linear operator that transforms time function (t > 0) f(t) to a function F(s) with complex argument s, given by: • The most common transforms for common function we can find derived and presented in tables in circuit theory books. In circuit theory we often need to calculate the inverse Laplace Transform • .

  4. Inverse Laplace Transform • In practice we can calculate the function f(t) with ressidue method: where skmean all poles of F(s) • we can also use Laplace Transform Table to find the function f(t) • Often requires partial fractions or other manipulation to find a form that is easy to apply the inverse

  5. Partial fraction decomposition Notice that the first and third cases are really special cases of the second and fourth cases respectively.

  6. Laplace Transform Table

  7. Common Transform Properties f(t) F(s)

  8. Restrictions There are two governing factors that determine whether Laplace transforms can be used: f(t) must be at least piecewise continuous for t ≥ 0 If f(t) were very nasty, the integral would not be computable. |f(t)| ≤ Meγt where M and γ are constants If f(t) is not bounded by Meγt then the integral will not converge.

  9. Example – calculatin Laplace Transform from definition

  10. Laplace Transform for ODEs • Equation with initial conditions • Laplace transform • Apply derivative formula • Rearrange • Take the inverse

  11. Examples See: http://tutorial.math.lamar.edu/Classes/DE/InverseTransforms.aspx#Laplace_InvTrans_Ex1a for some more examples

More Related