BY:VIDEO.EDHOLE.COM

Video Lectures for MBA

DR. HOLBERTFEBRUARY 27, 2008

Lect11EEE 202

2

Inverse Laplace Transformations

Video.edhole.com

Inverse Laplace Transform

Lect11EEE 202

3

Consider that F(s) is a ratio of polynomial expressions

The n roots of the denominator, D(s) are called the poles Poles really determine the response and stability of

the system

The m roots of the numerator, N(s), are called the zeros

)(

)()(

s

ss

DN

F

Video.edhole.com

Inverse Laplace Transform

Lect11EEE 202

4

We will use partial fractions expansion with the method of residues to determine the inverse Laplace transform

Three possible cases (need proper rational, i.e., n>m)1. simple poles (real and unequal)2. simple complex roots (conjugate pair)3. repeated roots of same value

Video.edhole.com

1. Simple Poles

Lect11EEE 202

5

Simple poles are placed in a partial fractions expansion

The constants, Ki, can be found from (use method of residues)

Finally, tabulated Laplace transform pairs are used to invert expression, but this is a nice form since the solution is

n

n

n

m

ps

K

ps

K

ps

K

pspsps

zszsKs

2

2

1

1

21

10)(F

ipsii spsK

)()( F

tpn

tptp neKeKeKtf 2121)(

Video.edhole.com

2. Complex Conjugate Poles

Lect11EEE 202

6

Complex poles result in a Laplace transform of the form

The K1 can be found using the same method as for simple poles

WARNING: the "positive" pole of the form –+j MUST be the one that is used

The corresponding time domain function is

)()()()(

)( 11*11

js

K

js

K

js

K

js

Ks F

jssjsK

)()(1 F

teKtf t cos2)( 1Video.edhole.com

3. Repeated Poles

Lect11EEE 202

7

When F(s) has a pole of multiplicity r, then F(s) is written as

Where the time domain function is then

That is, we obtain the usual exponential but multiplied by t's

rr

r ps

K

ps

K

ps

K

pss

ss

1

12

1

12

1

11

11

1

)(

)()(

Q

PF

tpr

rtptp e

r

tKetKeKtf 111

!1)(

1

11211

Video.edhole.com

3. Repeated Poles (cont’d.)

Lect11EEE 202

8

The K1j terms are evaluated from

This actually simplifies nicely until you reach s³ terms, that is for a double root (s+p1)²

Thus K12 is found just like for simple rootsNote this reverse order of solving for the K values

1

)(!

111

ps

r

jr

jr

j spsds

d

jrK

F

1

1

)()( 2111

2112

psps

spsds

dKspsK

FF

Video.edhole.com

The “Finger” Method

Let’s suppose we want to find the inverse Laplace transform of

We’ll use the “finger” method which is an easy way of visualizing the method of residues for the case of simple roots (non-repeated)

We note immediately that the poles ares1 = 0 ; s2 = –2 ; s3 = –3

)3)(2(

)1(5)(

sss

ssF

Lect11 EEE 202 9

Video.edhole.com

The Finger Method (cont’d)

For each pole (root), we will write down the function F(s) and put our finger over the term that caused that particular root, and then substitute that pole (root) value into every other occurrence of ‘s’ in F(s); let’s start with s1=0

This result gives us the constant coefficient for the inverse transform of that pole; here: e–0·t

Lect11 EEE 202 10

6

5

)3)(2(

)1(5

)30)(20)((

)10(5

)3)(2(

)1(5)(

ssss

ssF

Video.edhole.com

The Finger Method (cont’d)

Let’s ‘finger’ the 2nd and 3rd poles (s2 & s3)

They have inverses of e–2·t and e–3·t

The final answer is then

tt eetf 32

3

10

2

5

6

5)(

Lect11 EEE 202 11

3

10

)1)(3(

)2(5

)3)(23)(3(

)13(5

)3)(2(

)1(5)(

2

5

)1)(2(

)1(5

)32)(2)(2(

)12(5

)3)(2(

)1(5)(

ssss

ss

ssss

ss

F

F

Video.edhole.com

Initial Value Theorem

Lect11EEE 202

12

The initial value theorem states

Oftentimes we must use L'Hopital's Rule: If g(x)/h(x) has the indeterminate form 0/0 or / at x=c, then

)(lim)(lim0

s s tfst

F

)('

)('lim

)(

)(lim

xh

xg

xh

xg

cxcx

Video.edhole.com

Final Value Theorem

Lect11EEE 202

13

The final value theorem states

The initial and final value theorems are useful for determining initial and steady-state conditions, respectively, for transient circuit solutions when we don’t need the entire time domain answer and we don’t want to perform the inverse Laplace transform

)(lim)(lim s s tf 0stF

Video.edhole.com

Initial and Final Value Theorems

The initial and final value theorems also provide quick ways to somewhat check our answers

Example: the ‘finger’ method solution gave

Substituting t=0 and t=∞ yields

tt eetf 32

3

10

2

5

6

5)(

6

5

2

1510

6

5)(

06

20155

3

10

2

5

6

5)0( 00

eetf

eetf

Lect11 EEE 202 14

Video.edhole.com

Initial and Final Value TheoremsWhat would initial and final value theorems

find?First, try the initial value theorem

(L'Hopital's too)

Next, employ final value theorem

This gives us confidence with our earlier answer

05

52

5lim

65

)1(5lim)0(

)3)(2(

)1(5lim)(lim)0(

2

sss

sf

ss

ss s f

sdsd

dsd

s

ssF

6

5

)3)(2(

)1(5

)3)(2(

)1(5lim)(lim)(

00

ss

ss s f

ssF

Lect11 EEE 202 15

Video.edhole.com

Solving Differential Equations

Lect11EEE 202

16

Laplace transform approach automatically includes initial conditions in the solution

Example: For zero initial conditions, solve)0(')0()(

)(

)0()()(

22

2

yysssdt

tyd

xssdt

txd

Y

X

L

L

)(4)(30)(

11)(

2

2

tutydt

tyd

dt

tyd

Video.edhole.com

Class Examples

Find inverse Laplace transforms of

Drill Problems P5-3, P5-5 (if time permits)

84)(

)1()(

2

2

ss

ss

s

ss

Z

Y

Lect11 EEE 202 17

Video.edhole.com