Rational System Functions | Signals and Systems - Electrical Engineering (EE) PDF Download

Introduction


In theory one can find the Inverse Laplace and the Inverse z - Transform using the integral formula given previously but this procedure will generally involve integration of complex functions which may become very difficult at times so we normally find the inverse transform using our 'experience' or observation. That is, we try to split the given function (whose transform we have to calculate) into those functions whose Inverse Transform we know beforehand; just as we do while integrating a function of real variables.


We will proceed in a step by step manner towards our goal of finding the Inverse Laplace and z - Transform of a given function We shall focus in depth on the class of those systems only which have a rational system function. Let us first define what a rational system function is.


Rational System Function and Rational System

Recall that the system function of a continuous variable (respectively discrete variable) system is the Laplace Transform (respectively z -Transform) of the impulse response of the system.

Rational System Functions | Signals and Systems - Electrical Engineering (EE)


A rational system function is a system function which is a rational function, i.e. a rational system function corresponding to a system can be expressed as a ratio of two polynomials in s ( respectively z ).


A continuous variable (respectively discrete variable) LSI system with rational system function H(s) (respectively H(z) ) is called a RATIONAL SYSTEM.


Rational systems are the most studied and used. Also, these are the best known realizable systems (whether in continuous or discrete variable), that is, various techniques have been developed to implement rational systems in practical situations, but this is not the case with other systems, i.e. those which don't have a rational system function. This is the main reason why we focus on systems having rational system functions only.


Now we proceed to define the terms 'poles' and 'zeroes' of a rational system function.


Poles and Zeros of a Rational System Function

If we think of H(s) as  

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
the solutions of N(s) = 0 are called the zeroes of H(s) ,and the solutions of D(s) = 0 are called the poles of H(s).

 

Example:

 Over here, s = 2 is called the pole of H(s). 

(If we plot |H(s)| 3 -dimensionally, that is, if we consider the plane formed by the x-axis and the y-axis to be the s-plane and plot |H(s)| along the z- axis, then the plot of |H(s)| can be thought of as a tent on the plane of s, held by an infinite pole at s = 2, since at s = 2, |H(s)| tends to infinity, hence the term 'pole' .

Quite obviously, the solutions of N(s) = 0 make H(s) also equal to zero. Hence the term 'zero'.

Now we show one of the important properties of the Transforms, namely differentiation of Laplace and z - Transform with respect to s and z respectively.This property comes in very useful while calculating the inverse Laplace and inverse z - Transform of a given function.

Differentiation of Laplace Transform 

Taking the continuous variable case first; as we know, the Laplace Transform of x(t) is given by

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
On differentiating both sides wrt s and multiplying both sides by -1 , we get

 

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
provided it exists. This can be thought of as taking the Laplace Transform of tx(t).
Hence we observe that, if

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
Similarly we have

Rational System Functions | Signals and Systems - Electrical Engineering (EE)


Differentiation of z - Transform

Now for the discrete variable case, the z - Transform of x[n] is given by

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
On differentiating both sides w.r.t z and then multiplying both sides by -z, we get

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
provided it exists. This can be thought of as taking the z Transform of nx[n].
Hence we observe that, if

Rational System Functions | Signals and Systems - Electrical Engineering (EE)
Similarly we can proceed further, by differentiating again and again.

 

Example:

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

In the first case x(t) is a right sided signal, and the Region of Convergence lies to the right side of a vertical line in the s - plane and in the second case, x(t) is a left sided signal and the Region of Convergence lies to the left side of a vertical line in the s - plane.


As a general rule, we can say that for a right sided continuous variable signal, the ROC will be on the right side of a vertical line in the s plane and similarly on the left side of a vertical line in the s plane for a left sided continuous variable signal.

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 

In the first case, x[n] is a right sided signal and the Region of Convergence is the region in the z plane outside a circle and extending upto infinity. In the second case, x[n] is a left sided signal and the Region of Convergence is the region lying inside a circle and including z = 0.


As a general rule, we can say that for a right sided discrete variable signal, the ROC will be to the exterior of some circle in the z plane and for a left sided discrete variable signal, it will be to the interior of some circle in the z plane.


The above example will be very useful while finding the inverse transform ( Laplace or z ) of a given rational function.

 

Z-Transform : Simple Pole case with no Zeros

Example:

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 Using the property derived above by differentiation of z transform, we get

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Hence , we get

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Now we proceed on solving inverse Laplace and Z - transforms with multiple poles, after looking at simple pole cases of Laplace and z transform. We shall make use of the differentiation properties of Laplace and z transform extensively for solving multiple pole cases. We start by deriving the following relations.

 

Inverse Laplace transform : multiple poles, no zeros

Problem: 

 Derive and prove using induction :-

 Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 Solution 

Proof:

( By Mathematical Induction )

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Part i) Consider M=1

 Rational System Functions | Signals and Systems - Electrical Engineering (EE) 

Part ii) Consider that the above result holds true for M = K;

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

To prove that it holds for M = K+1 

We know the property that.

Rational System Functions | Signals and Systems - Electrical Engineering (EE) 

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 

Thus, the result holds true for M = K+1.

Hence, by principle of Mathematical Induction the above result holds true.

We can now use the above relation for finding inverse Laplace tranforms of various rational functions.

 

Problem: 

Derive and prove using Induction.

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Solution: 

Proof ( By Mathematical Induction )

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Proof ( By Mathematical Induction )

Part i) Consider M =1

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 

Part ii) Consider that the above result holds true for M = k;

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 

To prove that it holds for M = k+1: We know the property that,

 Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Now,

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Taking z - inverse on both the sides, and using the above stated property we get

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

Substituting n=n+1 we get,

Rational System Functions | Signals and Systems - Electrical Engineering (EE)

(at n= -1 , n+1 =0)
Thus, the result holds true for M = k+1. Hence, by principle of Mathematical Induction the above result holds true.

We can now use the above relation for finding inverse z transforms of various rational functions.
 

Conclusion:

In this lecture you have learnt:

A rational system function is a system function which can be expressed as a ratio of two polynomials in s ( respectively ) A continuous variable (respectively discrete variable) LSI system with rational system function H(s) (respectively H(z) ) is called a RATIONAL SYSTEM. 

  • If we think of H(s) as   Rational System Functions | Signals and Systems - Electrical Engineering (EE)


the solutions of N(s) = 0 are called the zeroes of H(s) ,and the solutions of D(s) = 0 are called the poles of H(s). 

 

  • Rational System Functions | Signals and Systems - Electrical Engineering (EE)

 

  • Rational System Functions | Signals and Systems - Electrical Engineering (EE)
The document Rational System Functions | Signals and Systems - Electrical Engineering (EE) is a part of the Electrical Engineering (EE) Course Signals and Systems.
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FAQs on Rational System Functions - Signals and Systems - Electrical Engineering (EE)

1. What is a rational system function?
Ans. A rational system function is a mathematical function that can be expressed as the ratio of two polynomials, where the numerator and denominator are both polynomials. It represents the transfer function of a linear time-invariant (LTI) system in control theory.
2. How are rational system functions different from other functions?
Ans. Rational system functions differ from other functions because they are specifically used to model and analyze the behavior of LTI systems. Unlike general functions, rational system functions can provide insights into stability, frequency response, and other important characteristics of the system.
3. How can rational system functions be used in practical applications?
Ans. Rational system functions have various practical applications in fields such as control systems, signal processing, and communication systems. They can be used to design controllers, analyze the stability of systems, predict system response to different input signals, and optimize system performance.
4. What is the significance of poles and zeros in rational system functions?
Ans. Poles and zeros are important concepts in rational system functions. Poles are the values of the complex variable where the denominator polynomial becomes zero, while zeros are the values where the numerator polynomial becomes zero. The locations of poles and zeros determine the stability and frequency response characteristics of the system.
5. How can one determine the stability of a system using rational system functions?
Ans. The stability of a system can be determined by analyzing the poles of the rational system function. If all the poles have negative real parts, the system is stable. If any pole has a positive real part or lies on the imaginary axis, the system is unstable. The stability analysis is crucial in ensuring the reliable and safe operation of control systems and other applications.
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