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math guide - 34.99

34.9 z-TRANSFORMS

• For a discrete-time signal x[ n], the two-sided z-transform is defined by

∞ ∞

X( z) = ∑ x[ n]z–n . The one-sided z-transform is defined by X( z) =	∑ x[ n]z–n . In
n = –∞	n = 0
both cases, the z-transform is a polynomial in the complex variable z .

• The inverse z-transform is obtained by contour integration in the complex plane

x[ n] =	1	n – 1	dz . This is usually avoided by partial fraction inversion tech-
x[ n] =	--------∫X( z) z
	j2π °

niques, similar to the Laplace transform.

• Along with a z-transform we associate its region of convergence (or ROC). These are the values of z for which X( z) is bounded (i.e., of finite magnitude).

math guide - 34.100

• Some common z-transforms are shown below.

Table 1: Common z-transforms

Signal

z-Transform

ROC

x[ n]

X( z)

δ [ n]

All z

u[ n]

---------------

1 – z–1

nu[ n]

z–1

----------------------

( 1 – z

–1

)

z–1( 1 + z–1)

u[ n]

----------------------------

( 1

– z

–1

)

u[ n]

------------------

1 – az–1

az–1

u[ n]

--------------------------

(

1 – az

–1

)

------------------

(

–a ) u[ – n – 1]

1 – az–1

az–1

--------------------------

( –na ) u[ – n – 1]

(

1 – az

–1

)

cos ( ω

0n) u[ n]

1 – z–1 cos ω

1------------------------------------------------– 2z–1 cos ω

0 + z–2

sin ( ω

0n) u[ n]

z–1 sin ω

------------------------------------------------1 – 2z–1 cos ω

0 + z–2

1 – az–1 cos ω

cos ( ω

0n) u[ n]

---------------------------------------------------------

1 –

2az

–1

cos ω

0 + a

–2

math guide - 34.101

Table 1: Common z-transforms

Signal

z-Transform

ROC

x[ n]

X( z)

az–1 sin ω 0

a sin ( ω 0n)

u[ n]

---------------------------------------------------------

– 2az

–1

cos ω 0 + a

–2

z–k

k----------------------!( n – k) !u[ n]

-----------------------------

> 1

–1 k + 1

( 1 – z

)

• The z-transform also has various properties that are useful. The table below lists properties for the two-sided z-transform. The one-sided z-transform properties can be derived from the ones below by considering the signal x[ n]u[ n] instead of simply x[ n].

Table 2: Two-sided z-Transform Properties

Property

Time Domain

z-Domain

ROC

Notation

x[ n]

X( z)

r2 <

x1[ n]

X1( z)

ROC

x2[ n]

X2( z)

ROC

Linearity

α x1[ n] + βx2[ n]

X1( z) + β X2( z)

At least the intersec-

tion of ROC1 and

ROC2

Time Shifting

x[ n – k]

–k

X( z)

That of X( z) , except

= 0 if k >

0 and

∞

if k <

z-Domain Scaling

anx[ n]

X( a–1z)

r2 <

Time Reversal

x[ –n]

–1

X( z

)

----

z-Domain

nx[ n]

dX( z)

Differentiation

–z-------------

math guide - 34.102

Table 2: Two-sided z-Transform Properties

Property

Time Domain

z-Domain

ROC

Convolution

x1[ n]*x2[ n]

X1( z) X2( z)

At least the intersec-

tion of ROC1 and

ROC2

Multiplication

x1[ n]x2[ n]

∫

–1

At least

-------

( v) X2

j2π

r1lr2l <

< r1ur2u

Initial value theo-

x[ n] causal

x[ 0] =

lim X( z)

rem

z → ∞

34.10FOURIER SERIES

•These series describe functions by their frequency spectrum content. For example a square wave can be approximated with a sum of a series of sine waves with varying magnitudes.

•The basic definition of the Fourier series is given below.

∞

nπ x

f( x)

∑

an cos

+ bn sin

----

--------

n = 1

nπ

nπ x

∫–L

f( x)

cos

bn =

∫–L

f( x) sin

--------

---------

34.11TOPICS NOT COVERED (YET)

•To ensure that the omissions are obvious, I provide a list of topics not covered below. Some of these may be added later if their need becomes obvious.

•Frequency domain - Fourier, Bessel

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