circuit theoremssvbitec.wordpress.com1 circuit theorems vishal jethava

Circuit Theorems svbitec.wordpress.com 1

Circuit Theorems

VISHAL JETHAVA

Chap. 4 Circuit TheoremsChap. 4 Circuit TheoremsIntroductionLinearity propertySuperpositionSource transformationsThevenin’s theoremNorton’s theoremMaximum power transfer

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4.1 Introduction4.1 Introduction

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A largecomplex circuitsA largecomplex circuits

Simplifycircuit analysisSimplifycircuit analysis

Circuit TheoremsCircuit Theorems

‧Thevenin’s theorem ‧ Norton theorem‧Circuit linearity ‧ Superposition‧source transformation ‧ max. power transfer

‧Thevenin’s theorem ‧ Norton theorem‧Circuit linearity ‧ Superposition‧source transformation ‧ max. power transfer

4.2 Linearity 4.2 Linearity PPropertyroperty

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Homogeneity property (Scaling)

iRvi kiRkvki

Additivity property

Rivi 222 Rivi 111

21212121 )( vvRiRiRiiii

A linear circuit is one whose output is linearly related (or directly proportional) to its input

Fig. 4.1

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vV0

I0

i

Linear circuit consist of ◦linear elements ◦linear dependent sources◦independent sources

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mA1mV5

A2.0V1

A2V10

iv

iv

iv

s

s

s

nonlinearRv

Rip :2

2

Example 4.1Example 4.1For the circuit in fig 4.2 find I0

when vs=12V and vs=24V.

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Example 4.1Example 4.1KVL

Eqs(4.1.1) and (4.1.3) we get

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0412 21 svii

03164 21 sx vvii

12ivx becomes)2.1.4(

01610 21 svii

(4.1.1)(4.1.2)

(4.1.3)

2121 60122 iiii

Example 4.1Example 4.1Eq(4.1.1), we get

When

When

Showing that when the source value is doubled, I0 doubles.

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76 076 22

ss

vivi

A7612

20 iI

V12sv

A7624

20 iIV24sv

Example 4.2Example 4.2Assume I0 = 1 A and use linearity

to find the actual value of I0 in the circuit in fig 4.4.

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Example 4.2Example 4.2

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A,24/

V8)53(thenA,1If

11

010

vI

IvI

A3012 III

A27

,V14682 23212 VIIVV

A5234 III A5SI

A510 SIAI

A15A30 SII

4.3 Superposition4.3 Superposition

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How to turn off independent How to turn off independent sourcessourcesTurn off voltages sources = short

voltage sources; make it equal to zero voltage

Turn off current sources = open current sources; make it equal to zero current

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Superposition involves more work but simpler circuits.

Superposition is not applicable to the effect on power.

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Example 4.3Example 4.3Use the superposition theorem to

find in the circuit in Fig.4.6.

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Example 4.3Example 4.3

Since there are two sources, letVoltage division to get

Current division, to get

Hence

And we findCircuit Theorems svbitec.wordpress.com 17

21 VVV

V2)6(84

41

V

A2)3(84

83

i

V84 32 iv

V108221 vvv

Example 4.4Example 4.4Find I0 in the circuit in Fig.4.9

using superposition.

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Example 4.4Example 4.4

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Fig. 4.10

Example 4.4Example 4.4

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Fig. 4.10

4.5 Source Transformation4.5 Source TransformationA source transformation is the

process of replacing a voltage source vs in series with a resistor R by a current source is in parallel with a resistor R, or vice versa

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Fig. 4.15 & 4.16Fig. 4.15 & 4.16

Rv

iRiv ssss or

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Equivalent CircuitsEquivalent Circuits

R

v

R

vi

viRv

s

s

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i i

++

--

vv

v

i

vs-is

Arrow of the current source positive terminal of voltage source

Impossible source Transformation◦ideal voltage source (R = 0)◦ideal current source (R=)

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Example 4.6Example 4.6Use source transformation to find

vo in the circuit in Fig 4.17.

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Example 4.6Example 4.6

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Fig 4.18

Example 4.6Example 4.6

we use current division in Fig.4.18(c) to get

and

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A4.0)2(82

2

i

V2.3)4.0(88 ivo

Example 4.7Example 4.7Find vx in Fig.4.20 using source

transformation

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Example 4.7Example 4.7

Applying KVL around the loop in Fig 4.21(b) gives (4.7.1)Appling KVL to the loop containing only the 3V voltage source, the resistor, and vx yields (4.7.2)

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01853 xvi

1

ivvi xx 3013

Example 4.7Example 4.7

Substituting this into Eq.(4.7.1), we obtain

Alternatively thus

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A5.403515 ii

A5.40184 iviv xx

V5.73 ivx

4.5 Thevenin’s Theorem4.5 Thevenin’s TheoremThevenin’s theorem states that a

linear two-terminal circuit can be replaced by an equivalent circuit consisting of a voltage source VTh in series with a resistor RTh where VTh is the open circuit voltage at the terminals and RTh is the input or equivalent resistance at the terminals when the independent source are turn off.

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Property of Linear CircuitsProperty of Linear Circuits

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i

v

v

i

Any two-terminalLinear Circuits

+

-Vth

Isc

Slope=1/Rth

Fig. 4.23Fig. 4.23

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How to Find Thevenin’s Voltage How to Find Thevenin’s Voltage

Equivalent circuit: same voltage-current relation at the terminals.

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:Th ocvV ba atltagecircuit voopen

How to Find Thevenin’s How to Find Thevenin’s ResistanceResistance

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:inTh RR b.a atcircuitdeadtheofresistanceinput

circuitedopenba sourcestindependenalloffTurn

CASE 1 If the network has no dependent

sources:◦Turn off all independent source.◦RTH: can be obtained via

simplification of either parallel or series connection seen from a-b

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Fig. 4.25Fig. 4.25CASE 2If the network has

dependent sources◦Turn off all independent

sources.◦Apply a voltage source vo at

a-b

◦Alternatively, apply a current source io at a-b

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o

o

iv

R Th

o

oTh i

vR

The Thevenin’s resistance may be negative, indicating that the circuit has ability providing power

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Fig. 4.26Fig. 4.26Simplified circuit

Voltage divider

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LL RR

VI

Th

Th

ThTh

VRR

RIRV

L

LLLL

Example 4.8Example 4.8Find the Thevenin’s equivalent

circuit of the circuit shown in Fig 4.27, to the left of the terminals a-b. Then find the current through RL = 6,16,and 36 .

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Find RFind Rthth

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shortsourcevoltageV32:Th R

opensourcecurrentA2

4116

124112||4ThR

Find VFind Vthth

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analysisMesh)1(

:ThV

A2,0)(12432 2211 iiiiA5.01 i

V30)0.25.0(12)(12 21Th iiV

AnalysisNodal ely,Alternativ)2(12/24/)32( ThTh VV

V30Th V

Example 4.8Example 4.8

Circuit Theorems svbitec.wordpress.com 43Fig. 4.29

transformsource ely,Alternativ)3(

V302439612

24

32

THTHTH

THTH

VVV

VV

Example 4.8Example 4.8

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:getTo Li

LLL RRR

Vi

430

Th

Th

6LR A310/30 LI16LR A5.120/30 LI

A75.040/30 LI36LR

Example 4.9Example 4.9Find the Thevenin’s equivalent of

the circuit in Fig. 4.31 at terminals a-b.

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Example 4.9Example 4.9(independent + dependent

source case)

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Fig(a) :findTo ThR

0sourcetindependen intactsourcedependent

,V1ovoo

o

iiv

R1

Th

Example 4.9Example 4.9For loop 1,

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2121 or0)(22 iiviiv xx

214But iivi x

21 3ii

Example 4.9Example 4.9

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:3and2Loop

0)(6)(24 32122 iiiii

012)(6 323 iii

gives equations theseSolving

.A6/13 i

A61

But 3 iio

61

ThoiV

R

Example 4.9Example 4.9

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0)(22 23 iivx

51 i

Fig(b):getTo ThV

23 iivx

analysisMesh

06)(2)(4 21212 iiiii 02412 312 iii

.3/102 i

V206 2Th ivV oc

xvii )(4But 21

Example 4.10Example 4.10Determine the Thevenin’s

equivalent circuit in Fig.4.35(a).

Solution

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)caseonlysourcedependent(

o

o

iv

R Th0Th V

:anaysisNodal4/2 oxxo viii

Example 4.10Example 4.10

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220 oo

x

vvi But

4424oooo

xo

vvvvii

oo iv 4or

:4Thus Th o

o

iv

R powerSupplying

Example 4.10Example 4.10

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Example 4.10Example 4.10

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4.6 4.6 Norton’s TheoremNorton’s TheoremNorton’s theorem states that a

linear two-terminal circuit can be replaced by equivalent circuit consisting of a current source IN in parallel with a resistor RN where IN is the short-circuit current through the terminals and RN is the input or equivalent resistance at the terminals when the independent source are turn off.

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Fig. 4.37Fig. 4.37

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v

i

Vth

-IN

Slope=1/RN

How to Find Norton How to Find Norton CurrentCurrent

Thevenin and Norton resistances are equal:

Short circuit current from a to b :

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ThRRN

Th

Th

RV

iI scN

Thevenin or Norton equivalent Thevenin or Norton equivalent circuit :circuit :

The open circuit voltage voc across terminals a and b

The short circuit current isc at terminals a and b

The equivalent or input resistance Rin at terminals a and b when all independent source are turn off.

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ocTh vV

NI

ThTh N

Th

VR R

R

sci

Example 4.11Example 4.11Find the Norton equivalent circuit

of the circuit in Fig 4.39.

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Example 4.11Example 4.11

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:)(40.4Fig a

425

52020||5

)848(||5NRNRfindTo

Example 4.11Example 4.11

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NifindTo

.andterminalscircuitshort ba

))(40.4.Fig( b

:Mesh 0420,A2 2121 iiii

Nsc Iii A12

Example 4.11Example 4.11

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NIformethodeAlternativ

Th

ThN

R

VI

voltagecircuitopen: ThV ba and

:))(40.4( cFig

:analysisMesh

012425,2 343 iiAi

A8.04 i

terminalsacross

V45 4 iVv Thoc

Example 4.11Example 4.11

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,HenceA14/4

Th

ThN

R

VI

Example 4.12Example 4.12Using Norton’s theorem, find RN

and IN of the circuit in Fig 4.43 at terminals a-b.

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Example 4.12Example 4.12

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NRfindTo )(44.4. aFig

shortedresistor4Parallel:2||||5 xo iv

Hence, 2.05/15/ ox vi

52.0

1

o

oN

iv

R

Example 4.12Example 4.12

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NIfindTo )(44.4. bFig

xiv 2||5||10||4 Parallel:

.5A,24

010 xi

A72(2.5)5

102 xxsc iii

7A NI

4.8 Maximum Power 4.8 Maximum Power TrandferTrandfer

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LL RRR

VRip

2

LTH

TH2

Fig 4.48

Fig. 4.49Fig. 4.49Maximum power is transferred to

the load when the load resistance equals the Thevenin resistance as seen the load (RL = RTH).

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Circuit Theorems svbitec.wordpress.com 68

TH

TH

THL

LTHLLTH

LTH

LLTHTH

LTH

LTHLLTHTH

L

RV

p

RR

RRRRR

RRRRR

V

RRRRRRR

VdRdp

4

)()2(0

0)(

)2(

)()(2)(

2

max

32

4

22

Example 4.13Example 4.13Find the value of RL for maximum

power transfer in the circuit of Fig. 4.50. Find the maximum power.

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Example 4.13Example 4.13

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918

126512632THR

Example 4.13Example 4.13

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WRV

p

RR

VVVii

Aiii

L

TH

THL

THTHi

44.1394

224

9

220)0(231612

2 ,121812

22

max

2

221