signal & linear system
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Signal & Linear system. Chapter 5 D T System Analysis : Z Transform Basil Hamed. Introduction. Z-Transform does for DT systems what the Laplace Transform does for CT systems In this chapter we will: -Define the ZT -See its properties -Use the ZT and its properties to analyze D-T systems. - PowerPoint PPT PresentationTRANSCRIPT
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Signal & Linear system
Chapter 5 DT System Analysis : Z Transform
Basil Hamed
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IntroductionZ-Transform does for DT systems what the Laplace Transform does for CT systems
In this chapter we will:
-Define the ZT
-See its properties
-Use the ZT and its properties to analyze D-T systems
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Solve difference equations with initial conditions
Solve zero-state systems using the transfer function
Z-T is used to
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5.1 The Z-transformWe define X(z),the direct Z-transform of x[n],as Where z is the complex variable.
The unilateral z-Transform
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Z-Transform of Elementary Functions:
Example 5.2 P 499 find the Z-transform of
a) U[n]
Solution
b) x[n]= ={ =1 Z 1
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Z-Transform of Elementary Functions:
b) x[n]=u[n] ={
We have from power series from Book P 48+……..=
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Z-Transform of Elementary Functions:
c)
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Z-Transform of Elementary Functions:
d) x(t)= { t nT
X[n]=
X[z]=
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Z-Transform of Elementary Functions:
Example given yFind X(z) & Y(z)
Solution
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Region of Convergence
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Region of Convergence
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Z-Transform of Elementary Functions:
Y - Let n=-mY - -
As seen in the example above, X(z) & Y(z) are identical, the only different is ROC
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Relationship between ZT & LT
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Relationship between ZT & LT
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ROC
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ROCExample given Find X(z)Solution ROC
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5.2 Some Properties of The Z-Transform
As seen in the Fourier & Laplace transform there are many properties of the Z-transform will be quite useful in system analysis and design.
If Then a
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5.2 Some Properties of The Z-Transform
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Right Shift of x[n] (delay) Then …Note that if x[n]=0 for n=-1,-2,-3,…, then Z{x[n]}=
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5.2 Some Properties of The Z-Transform
Left Shift in Time (Advanced) : :
Example given Find y[n]
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5.2 Some Properties of The Z-Transform
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5.2 Some Properties of The Z-Transform
Example Given For y[n], n x[n]=u[n], y[1]=1, y[0]=1Solve the difference equation Solution take inverse z and find y[n]
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5.2 Some Properties of The Z-Transform
Then Example given Find Y[z] Solution From Z-Table (
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Frequency Scaling (Multiplication by )
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5.2 Some Properties of The Z-Transform
Then
Example; given y[n]=n[n+1]u[n], find Y[z]Solution y[n]= Z[n u[n]]= And
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Differentiation with Respect to Z
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5.2 Some Properties of The Z-Transform
Then Example find x(0)Solution
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Initial Value Theorem
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5.2 Some Properties of The Z-Transform
The initial value theorem is a convenient tool for checking if the Z-transform of a given signal is in error.Using Matlab software we can have x[n]; The initial value is x(0)=1, which agrees with the result we have.
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Final value Theorem
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5.2 Some Properties of The Z-Transform
As in the continuous-time case, care must be exercised in using the final value thm. For the existence of the limit; all poles of the system must be inside the unit circle. (system must be stable)Example given Find xSolution Example given x[n]= Find xSolution The system is unstable because we have one pole outside the unit circle so the system does not have final value,
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Stability of DT Systems
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5.2 Some Properties of The Z-Transform
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Convolution
Y(z)= X(z)H(z) Example: given h[n]={1,2,0,-1,1} and x[n]={1,3,-1,-2}Find y[n]Solution y[n]= x[n] * h[n] Y(z)=X(z)H(z) H
Y[n]={1,5,5,-5,-6,4,1,-2}
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5.2 Some Properties of The Z-Transform
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Example: given
Find the T. F of the System
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5.2 Some Properties of The Z-Transform
Solution:
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∴𝐻 (𝑧 )= 2𝑍3+𝑍2+𝑍−1
𝑍 (𝑍−12)(𝑍−1)
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The Inverse of Z-Transform
There are many methods for finding the inverse of Z-transform; Three methods will be discussed in this class.
1. Direct Division Method (Power Series Method)2. Inversion by Partial fraction Expansion3. Inversion Integral Method
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The Inverse of Z-Transform1. Direct Division Method (Power Series Method): The power series can be obtained by arranging the numerator and denominator of X(z) in descending power of Z then divide.Example determine the inverse Z- transform :
Solution Z-0.1 Z
Z-0.1 0.1X(z)=
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The Inverse of Z-TransformExample find x[n]Solution X(0)=1, x(1)=1/4, x(2)=13/16,…….In this example, it is not easy to determine the general expression for x[n]. As seen, the direct division method may be carried out by hand calculations if only the first several terms of the sequence are desired. In general the method does not yield a closed form for x[n].
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The Inverse of Z-Transform2. Inversion by Partial-fraction ExpansionT.F has to be rational function, to obtain the inverse Z transform. The use of partial fractions here is almost exactly the same as for Laplace transforms……the only difference is that you first divide by z before performing the partial fraction expansion…then after expanding you multiply by z to get the final expansion
Example find x[n]
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The Inverse of Z-Transform
Solution:
Using same method used in Laplace transform To find A,B,C,D A=1, B=5/2, C=-9, D=9
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The Inverse of Z-TransformExample 5.3 P 501 given Find the inverse Z-Transform.Solution:
From Table 5-1 (12-b)
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The Inverse of Z-Transform 0.5r=1.6 r=3.2, =-2.246 rad =3+j4=5 Example find y[n]
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The Inverse of Z-Transform3. Inversion integral Method:
If the function X(z) has a simple pole at Z=a then the residue is evaluated as
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The Inverse of Z-TransformFor a pole of order m at Z=a the residue is calculated using the following expression:
Example Find x[n] for Solution: The only method to solve above function is by integral method. has multiple poles at Z= 1
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The Inverse of Z-Transform
Example Obtain the inverse Z transform of
Solution:
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The Inverse of Z-Transform has a triple pole at Z=1 at triple pole Z=1]
Example Obtain the inverse Z transform of
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The Inverse of Z-TransformBy Partial Fraction:
By Inversion Integral Method: , has double poles at Z=1 at double poles at Z=1]
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Transfer Function
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Transfer Function
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Transfer Function
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Zero State ResponseZero Input Response
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ZT For Difference Eqs.
Given a difference equation that models a D-T system we may want to solve it:
-with IC’s
-with IC’s of zero
Note…the ideas here are very much like what we did with the Laplace Transform for CT systems.
We’ll consider the ZT/Difference Eq. approach first…
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Solving a First-order Difference Equation using the ZT
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Solving a First-order Difference Equation using the ZT
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First Order System w/ Step Input
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Solving a Second-order Difference Equation using the ZT
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Solving a Nth-order Difference Equation using the ZT
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Discrete-Time System Relationships
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Example System Relationships
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Example System Relationships
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