1. Pertemuan 13
Transformasi - Z

2. Z-Transform Introduction Y(s)  y(t) U(s)  u(t) G(s) Linear system
Tools to analyse continuous systems : Laplace transform
It could be used for sampled or discrete systems t X T

3. Z-Transform t Apply Laplace transform of f’(t)
Factors like Exp(-sT) are involved
Unlike the majority of transfer functions of continuous systems
It will not lead to rational functions

4. Z-Transform
Definition

5. Summary The operation of taking the z-transform of a continuous-data
function, f(t), involves the following three steps:
1- f(t) is sampled by an ideal sampler to get f’(t)
2- Take the Laplace transform of f’(t)
3- Replace by z in F’(s) to get

6. Mapping between the s-plane and the z-plane
Primary strip
Imz
z-plane 1
Rez
The left half of the primary strip is mapped inside the unit circle

7. Mapping between the s-plane and the z-plane
Primary strip
Imz
Z-plane
Rez 1
The right half of the primary strip is mapped outside the unit circle

8. Mapping between the s-plane and the z-plane
Complementary strip
Imz
Z-plane
Rez 1
The right half of the complementary strip is also mapped inside the unit circle

9. s-plane properties of F’(s)
Complementary
strip
Complementary
strip
Primary strip
Complementary
strip
Complementary
strip

10. s-plane properties of F’(s)
Complementary
strip X
Complementary
strip X
Primary strip X
Complementary
strip X
Complementary
strip X
X Poles of F’(s) in primary strip

11. s-plane properties of F’(s)
Complementary
strip X
Folded back poles
Complementary
strip X
Primary strip X
Complementary
strip X
Complementary
strip X
X Poles of F’(s) in complementary strips

12. The constant damping loci
s-plane
z-plane

13. The constant frequency loci
s-plane
z-plane

14. The constant damping ratio loci
Imz
Rez
s-plane
z-plane

15. The constant damping ratio loci
Imz
Rez
s-plane
z-plane

16. Mapping between the s-plane and the z-plane
Conclusion:
All points in the left half of the s-plane are mapped into the
Region inside the unit circle in the z-plane.
The points in the right half of the s-plane are mapped into the
Region outside the unit circle in the z-plane

17. Example: discrete exponential functionk 1
Apply z-transform

18. Series
Reminder

19. Example: discrete Cosine function

20. Another approach

21. Dirac function

22. Sampled step function t
u(t) 1
NB: Equivalent to Exp(-k) as  0

23. Delayed pulse train T t t

24. Complete z-transform
Example:exponential function

34. Terima kasih
Terima kasih