Continuous-time Signals

ELEC 309

Prof. Siripong Potisuk

Signal Transformations

Operations Performed on the Independent and Dependent Variables1) Reflection or Time Reversal or Folding2) Time Shifting3) Time Scaling4) Amplitude Scaling5) Amplitude ShiftingNote: The independent variable is assumed to be t representing time.

Time reversal or Folding or Reflection about t = 0

)()( txty

For CT signals, replace t by –t

x(-t) is the reflected version of x(t) obtained from x(t) by a reflection about t =0

Time Shifting (Advance or Delay)

(Advance) by left the toshifted )( 0

(Delay) by right the toshifted )( 0

shift. ofamount theis ),()(

00

00

00

ttxt

ttxt

tttxty

Time Scaling

versionstretched a 10

versioncompressed a 1

)( )(

factor aby )( of version scaled- timea is )(

by Replace

a

a

atxty

atxatx

att

Amplitude Scaling

)()( tAxty

Multiply x(t) by A, where A is the scaling factor

If A is negative, the original signal x(t) is alsoreflected about the horizontal axis.

Amplitude Shifting

Atxty )()(

Add a constant A to x(t), where A is the amount of shift (upward or downward)

Signal Characteristics

Deterministic vs. Random

Finite-length vs. Infinite-length

Right-sided/ Left-sided/ Two-sided

Causal vs. Anti-causal

Periodic vs. Aperiodic (Non-periodic)

Real vs. Complex

Conjugate-symmetric vs. Conjugate-antisymmetric

Even vs. Odd

Even & Odd CT Signals

).()( if ricantisymmet Conjugate

),()( if symmetric Conjugate*

*

txtx

txtx

A complex-valued signal x(t) is said to be

A real-valued signal x(t) is said to be

).()( if odd

),()( ifeven

txtx

txtx

Even-Odd Signal Decomposition

A CT signal can be decomposed into its even and odd parts.

2)()(

(t)

2)()(

(t)

txtxx

txtxx

o

e

CT Periodic Signals

A CT periodic signal x(t) is a function of timethat satisfies the condition

IktkTtxTtxtx , ),()()( 0

T is a positive constant

T0 is the smallest value of T called the fundamental period of x(t)f0 = 1/T0 called the fundamental frequency0 = 2f0 called the angular frequency

A Sum of CT Periodic Signals

number rational a

i.e., , , and )( of

period theis where, if periodic be will

)()()( signal The ly.respective , and

periods with signals periodic be )( and )(Let

2

1

21

2121

21

m

n

T

T

Inmtx

TTnTmT

txtxtxTT

txtx

CT Aperiodic (nonperiodic) Signals

Does not satisfy the condition

IktkTtxTtxtx , ),()()( 0

Periodic extension accomplished by using summation and time-shifting operation

Signal Metrics

Energy

Power

Magnitude

Area

Energy

An infinite-length signal with finite amplitude may or may not have finite energy.

dttxEx2

)(

A finite-length signal with finite amplitude have finite energy.

Power

A finite energy signal with zero average power is called an ENERGY signal.

dttxT

PT

TT

x

2|)(|

2

1lim

An infinite energy signal with finite average power is called a POWER signal.

Average Power

Average over one period for periodic signal, e.g.,

Root-mean-square power:

02 any for |)(|

1 0

0

tdttxT

PTt

t

x

xrms PP

Magnitude & Area

x

tx

M

txM

if Bounded

)(max :Magnitude

)( :Area dttxAx