GATE Control Systems Book

8/10/2019 GATE Control Systems Book

1/12


2/12

CONTROL SYSTEMS

for

EC / EE / IN

By

wwwthegateacademy com
http://www.thegateacademy.com/http://www.thegateacademy.com/http://www.thegateacademy.com/http://www.thegateacademy.com/http://www.thegateacademy.com/http://www.thegateacademy.com/http://www.thegateacademy.com/


3/12

Syllabus Control Systems

THE GATE ACADEMY PVT.LTD. H.O.: #74, KeshavaKrupa (third Floor), 30th

Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11

080 65700750 info@thegateacademy com C i ht d Web www thegateacademy com

Syllabus for Control Systems

Basic control system components; block diagrammatic description, reduction of block diagrams.

Open loop and closed loop (feedback) systems and stability analysis of these systems. Signal

flow graphs and their use in determining transfer functions of systems; transient and steady

state analysis of LTI control systems and frequency response. Tools and techniques for LTI

control system analysis: root loci, Routh-Hurwitz criterion, Bode and Nyquist plots. Control

system compensators: elements of lead and lag compensation, elements of Proportional-

Integral-Derivative (PID) control. State variable representation and solution of state equation of

LTI control systems.

Analysis of GATE Papers

(Control Systems)

Year ECE EE IN

2013

11.00 10.00 10.00

2012 9.00 9.00 13.00

2011

8.00

8.00 12.00

2010

11.00

9.00 7.00

Over All

Percentage

9.75 9.00 10.5


4/12

Contents Control Systems


Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11

080 65700750 i f @th t d C i ht d W b th t d Page I

C O N T E N T S

Chapter Page No.

1. Basics of Control System 1 - 30

Classification of Control Systems 1- 4

Effect of Feedback 4 - 5

Transfer Functions 5 - 8

Signal Flow Graphs 8 - 10

Solved Examples 11 - 17

Assignment 1 18 - 22

Assignment 2 22 - 24 Answer Keys 25

Explanations 25 - 30

#2. Time Domain Analysis 31 - 58 Introduction 31 - 32

Standard Test Signals 32 - 33

Time Response of First Order Control System 33 - 35

Time Response of Second Order Control System 35 - 39

Time Response of the Higher Order Control System &

Error Constants 39 - 41 Solved Examples 42 - 46



Answer Keys 54


3. Stability &Routh Hurwitz Criterion 59 - 79

Introduction 59 - 61

Relative Stability Analysis 61 - 62

Routh

Hurwitz Criterion 62 - 63 Solved Examples 64 - 67



Answer Keys 73


#4. Root Locus Technique 80 - 99 Introduction 80

Rules for the Construction of Root Locus 80 - 81

Complementary Root Locus 81 - 83 Solved Examples 84 - 88


5/12



Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11

080 65700750 i f @th t d C i ht d W b th t d Page II



Answer Keys 95 Explanations 95 - 99

#5. Frequency Response Analysis Using Nyquist Plot 100 -131 Frequency Domain Specifications 100 - 101

Polar Plot 101 - 103

Nyquist Plot and Nyquist Stability Criteria 103 - 107

Gain Margin 107 - 108




Explanations 126-131

6. Frequency Response Analysis Using Bode Plot

132 -156

Bode Plots 132 - 134

Bode Magnitude Plots for Typical Transfer Function 134 - 137

M & N Circles 137 - 140





7. Compensators & Controllers

157 - 175

Introduction 157

Phase Lag Compensator 157 - 158

Phase Lead Compensator 159 - 160

Phase Lag Lead Compensator 161 - 163

Controllers 163 - 164

Solved Examples 165 - 168 Assignment 1 169 - 170


Answer Keys 173


8. State Variable Analysis 176 - 198

Introduction 176

State Space Representation 176 - 179

State Transition Matrix 179 - 180

Characteristic Equation & Eigen Values 180 - 181 Solved Examples 182 - 186


6/12



Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11

080 65700750 i f @th t d C i ht d W b th t d Page III



Answer Keys 193 Explanations 193 - 198

Module Test 199 - 216

Test Questions 199 - 210

Answer Keys 211


Reference Books 217


7/12

Chapter 1 Control Systems


Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11

080 65700750 i f @th t d C i ht d W b th t d P 1

CHAPTER 1

Basics of Control System

Introduction

It is a system by means of which any quantity of interest in a machine or mechanism iscontrolled (maintained or altered) in accordance with the desired manner. Following diagram

depicts the block diagram representation of a control system.

Fig. 1.1 Block diagram of a control system

Any system can be characterized mathematically by Transfer function or State model.

Transfer function is defined as the ratio of Laplace Transform (L.T) of output to that of input

assuming initial conditions to be zero. Transfer function is also obtained as Laplace transform ofthe impulse response of the system.

Transfer Function = |initial conditions = 0

T(s) = , - , -= |initial conditions = 0For any arbitrary input r(t), output c(t) of control system can be obtained as below,

r(t) = L(R (s)) = L(T (s) . R (s)) L(T(s)) * r(t)Where L and L are forward and inverse Laplace transform operators and * is convolutionoperator.

Classification of Control Systems

Control systems can be classified based on presence of feedback as below,

1.

Open loop control systems

2.

Closed loop control systems.

Open-loop Control System

Fig 1.2. Block diagram of open-loop control system

Figure 1.2 depicts block diagram of a open loop control system. Also following are salient pointsas referred to an open-loop control system.

The reference input controls the output through a control action process. Here output hasno effect on the control action, as the output is not fed-back for comparison with the input.

Accuracy of an open-loop control system depends on the accuracy of input calibration.

Reference input OutputController ProcessActuating

Signal

Control

System Controlled outputReferenceinputr(t) c(t)


8/12



Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11


The open loop system is simple and cheap to construct. Due to the absence of feedback path, the systems are generally stable

Examples of open loop control systems include Traffic lights, Fans, Washing machines etc,which do not have a sensor.

If R(s) is LT of input and C(s) is LT of output of a control system of transfer function G(s),then= G (s) C (s) = G (s) R (s)

Closed-loop Control System Feedback Control Systems)

Figure shown below depicts the block diagram of a closed-loop control system. Closed-loop

control systems can be classified as positive and negative feedback (f/b) control systems. Alsofollowing are the salient points related to closed-loop control systems.

In a close-loop control system, the output has an effect on control action through afeedback.

The control action is actuated by an error signal e t which is the difference between theinput signal rtand the feedback signal f(t).

The control systems can be manual or automatic control systems.

Servomechanism is example of a close-loop (feedback) control system using a power

amplifying device prior to controller and the output of such a system is mechanical i.e.position, velocity or acceleration.

Fig 1.3.Block diagram of closed loop control system

For Positive feedback, error signal e(t) = r(t) + f(t)

For Negative feedback, error signal e(t) = r(t) f(t)

Fig. 1.4 Transfer function representation of a closed loop control system.

Generally, the purpose of feedback is to reduce the error between the reference input and thesystem output.

Let G(s) be the forward path transfer function, H(s) be the feedback path transfer function andT(s) be the overall transfer function of the closed-loop control system, then

T(s) =

()

Here negative sign in denominator is considered for positive feedback and vice versa.

G(s)

H(s)

e(t)r(t)

f(t)

c(t)

Controller Process

Feedback Network

Feedbacksignal (t)

Reference inputOutput c(t)


9/12



Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11


Positive feedback Control Systems

Unity F/B (H(s) = 1) : T(s) =

Non Unity F/B (H(s) 1) : T(s) =

Negative feedback Control Systems

Unity F/B : T(s) =

Non Unity F/B : T(s) =

Here, G(s) is T.F. without feedback (or) T. F of the forward path and H(s) is T.F. of the feedback

path.Block diagram shown below corresponds to closed loop control system.

Fig. 1.5 Block diagram of a closed loop control system

The overall transfer function can be derived as below,

L{r(t)} = Rs Reference I/PL{c(t)}= C(s Output Controlled variable)L*ft+ F s Feedback signalL{e(t)} = Es Error or actuating signalGHOpen loop transfer functionE/R Error transfer functionGs Forward path transfer functionHs Feedback path transfer functionE(s) = R(s) F(s) ; F(s) = H(s) C(s)C(s) = E(s) GsC(s) = { R(s) HsCs+ Gs

Also,

Here negative sign is used for positive feedback and positive sign is used for negative feedback.

The transfer function of a system depends upon its elements assuming initial conditions as zeroand it is independent of input function

Comparison of Open-loop and Close-loop Control Systems

Table below summarizes the comparison between open and closed loop control systems.

S.No Open-loop C.S. Closed-loop C.S.

1.

The accuracy of an open loop systemdepends on the calibration of the input.

Any departure from pre determinedcalibration affects the output.

As the error between the referenceinput and the output is continuously

measured through feedback, the close-loop system works more accurately.

G(s)

H(s)

R(s)F(s)

C(S)


10/12



Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11


2.

The open-loop system is simple to

construct.

The close-loop system is complicated to

construct

3. Cheaper Costly.

4. The open-loop systems are generally

stable.

The close-loop systems can become

unstable under certain conditions.

5.

The operation of open loop system isaffected due to presence of non-linearities in its elements.

In terms of the performance, the close-

loop systems adjusts to the effects ofnon - linearities present in its elements.

Effect of Feedback

The feedback has effects on system performance characteristics such as stability, bandwidth,

overall gain, impedance and sensitivity.

1. Effect of feedback on Stability Stability is a notion that describes whether the system will be able to follow the

input command.

A system is said to be unstable, if its output is out of control or increases without

bound.

Negative feedback in a control system improves stability and vice versa.

2. Effect of feedback on overall gain Negative feedback decreases the gain of the system and Positive feedback increase

the gain of the system.

3. Effect of feedback on SensitivityConsider G as a parameter that can vary. The sensitivity of the gain of the overall system Tto the variation in G is defined as

=//=

Where denotes the incremental change in T due to the incremental change in G;/and/denote the percentage change in T and G, respectively.=

=

Similarly, = //=

-1Negative feedback makes the system less sensitive to the parameter variation.

4.

Negative feedback improves the dynamic response of the system

5. Negative feedback reduces the effect of disturbance signal or noise.

6. Negative feedback improves the Bandwidth of the system.

Let A variable that changes its value A parameter that changes the value of

change in change in


11/12



Cross, 10th

Main, Jayanagar 4th

Block, Bangalore-11


Open Loop Control System

Ms,open loop control system- Gs

x , -

Closed Loop control system

Ms,closed loop control system-

Gs

1

GsHs

0

1

,-

,-

From equation 1

, GsHs-x ,-

1 + G(s) H(s) = Noise Reduction factor

= Return Difference

Sensitivity of closed loop system is reduced by factor [1 + G(s) H(s)]

Open Loop control systems are more sensitive to any external or interval disturbance.

Complementary sensitivity function =

Ts s Ts= 1

Transfer Functions

Transfer function of a generic control system can be found using block diagram approach orsignal flow graphs as described in the following sections.

G(s)

H (s)

R(s)

+ C(s)

R(s) G(s) C(s)


12/12

Documents

GATE Control Systems Book