Signal sampling

Signals and systems Page 1 / 1

This module introduces sampling of a continuous time signal to produce a discrete time signal, including a computation of the spectrum of the sampled signal and a discussion of its implications for reconstruction.

Introduction

Digital computers can process discrete time signals using extremely flexible and powerful algorithms. However, most signals of interest are continuous time signals, which is how data almost always appears in nature. This module introduces the concepts behind converting continuous time signals into discrete time signals through a process called sampling.

Sampling

Sampling a continuous time signal produces a discrete time signal by selecting the values of the continuous time signal at evenly spaced points in time. Thus, sampling a continuous time signal $x$ with sampling period $T_{s}$ gives the discrete time signal $x_{s}$ defined by $x_{s} (n) = x (n T_{s}) .$ The sampling angular frequency is then given by $ω_{s} = 2 π / T_{s}$ .

It should be intuitively clear that multiple continuous time signals sampled at the same rate can produce the same discrete time signal since uncountably many continuous time functions could be constructed that connect the points on the graph of any discrete time function. Thus, sampling at a given rate does not result in an injective relationship. Hence, sampling is, in general, not invertible.

For instance, consider the signals $x, y$ defined by

x (t) = \frac{sin (t)}{t}

y (t) = \frac{sin (5 t)}{t}

and their sampled versions $x_{S}, y_{s}$ with sampling period $T_{s} = π / 2$

x_{s} (n) = \frac{sin (n π / 2)}{n π / 2}

y_{s} (n) = \frac{sin (n 5 π / 2)}{n π / 2} .

Notice that since

sin (n 5 π / 2) = sin (n 2 π + n π / 2) = sin (n π / 2)

it follows that

y_{s} (n) = \frac{sin (n π / 2)}{n π / 2} = x_{s} (n) .

Hence, $x$ and $y$ provide an example of distinct functions with the same sampled versions at a specific sampling rate.

Got questions? Get instant answers now!

It is also useful to consider the relationship between the frequency domain representations of the continuous time function and its sampled versions. Consider a signal $x$ sampled with sampling period $T_{s}$ to produce the discrete time signal $x_{s} (n) = x (n T_{s})$ . The spectrum $X_{s} (ω)$ for $ω \in [- π, π)$ of $x_{s}$ is given by

X_{s} (ω) = \sum_{n = - \infty}^{\infty} x (n T_{s}) e^{- j ω n} .

Using the continuous time Fourier transform, $x (t T_{s})$ can be represented as

x (t T_{s}) = \frac{1}{2 π T_{s}} \int_{- \infty}^{\infty} X (\frac{ω_{1}}{T_{s}}) e^{j ω_{1} t} d ω_{1} .

Thus, the unit sampling period version of $x (t T_{s})$ , which is $x (n T_{s})$ can be represented as

x (n T_{s}) = \frac{1}{2 π T_{s}} \int_{- \infty}^{\infty} X (\frac{ω_{1}}{T_{s}}) e^{j ω_{1} n} d ω_{1} .

This is algebraically equivalent to the representation

x (n T_{s}) = \frac{1}{T_{s}} \sum_{k = - \infty}^{\infty} \frac{1}{2 π} \int_{- π}^{π} X (\frac{ω_{1} - 2 π k}{T_{s}}) e^{j (ω_{1} - 2 π k) n} d ω_{1},

which reduces by periodicity of complex exponentials to

x (n T_{s}) = \frac{1}{T_{s}} \sum_{k = - \infty}^{\infty} \frac{1}{2 π} \int_{- π}^{π} X (\frac{ω_{1} - 2 π k}{T_{s}}) e^{j ω_{1} n} d ω_{1} .

Hence, it follows that

X_{s} (ω) = \frac{1}{T_{s}} \sum_{k = - \infty}^{\infty} \sum_{n = - \infty}^{\infty} (\int_{- π}^{π}, X, (\frac{ω_{1} - 2 π k}{T_{s}}), e^{j ω_{1} n}, d, ω_{1}) e^{- j ω n} .

Noting that the above expression contains a Fourier series and inverse Fourier series pair, it follows that

X_{s} (ω) = \frac{1}{T_{s}} \sum_{k = - \infty}^{\infty} X (\frac{ω - 2 π k}{T_{s}}) .

Hence, the spectrum of the sampled signal is, intuitively, the scaled sum of an infinite number of shifted and time scaled copies of original signal spectrum. Aliasing, which will be discussed in depth in later modules, occurs when these shifted spectrum copies overlap and sum together. Note that when the original signal $x$ is bandlimited to $(- π / T_{s}, π / T_{s})$ no overlap occurs, so each period of the sampled signal spectrum has the same form as the orignal signal spectrum. This suggest that if we sample a bandlimited signal at a sufficiently high sampling rate, we can recover it from its samples as will be further described in the modules on the Nyquist-Shannon sampling theorem and on perfect reconstruction.

Sampling summary

Sampling a continuous time signal produces a discrete time signal by selecting the values of the continuous time signal at equally spaced points in time. However, we have shown that this relationship is not injective as multiple continuous time signals can be sampled at the same rate to produce the same discrete time signal. This is related to a phenomenon called aliasing which will be discussed in later modules. Consequently, the sampling process is not, in general, invertible. Nevertheless, as will be shown in the module concerning reconstruction, the continuous time signal can be recovered from its sampled version if some additional assumptions hold.

Questions & Answers

Discuss the differences between taste and flavor, including how other sensory inputs contribute to our perception of flavor.

John Reply

taste refers to your understanding of the flavor . while flavor one The other hand is refers to sort of just a blend things.

Faith

While taste primarily relies on our taste buds, flavor involves a complex interplay between taste and aroma

Kamara

which drugs can we use for ulcers

Ummi Reply

omeprazole

Kamara

what

Renee

what is this

Renee

is a drug

Kamara

of anti-ulcer

Kamara

Omeprazole Cimetidine / Tagament For the complicated once ulcer - kit

Patrick

what is the function of lymphatic system

Nency Reply

Not really sure

Eli

to drain extracellular fluid all over the body.

asegid

The lymphatic system plays several crucial roles in the human body, functioning as a key component of the immune system and contributing to the maintenance of fluid balance. Its main functions include: 1. Immune Response: The lymphatic system produces and transports lymphocytes, which are a type of

asegid

to transport fluids fats proteins and lymphocytes to the blood stream as lymph

Adama

what is anatomy

Oyindarmola Reply

Anatomy is the identification and description of the structures of living things

Kamara

what's the difference between anatomy and physiology

Oyerinde Reply

Anatomy is the study of the structure of the body, while physiology is the study of the function of the body. Anatomy looks at the body's organs and systems, while physiology looks at how those organs and systems work together to keep the body functioning.

AI-Robot

what is enzymes all about?

Mohammed Reply

Enzymes are proteins that help speed up chemical reactions in our bodies. Enzymes are essential for digestion, liver function and much more. Too much or too little of a certain enzyme can cause health problems

Kamara

yes

Prince

how does the stomach protect itself from the damaging effects of HCl

Wulku Reply

little girl okay how does the stomach protect itself from the damaging effect of HCL

Wulku

it is because of the enzyme that the stomach produce that help the stomach from the damaging effect of HCL

Kamara

function of digestive system

Ali Reply

function of digestive

Ali

the diagram of the lungs

Adaeze Reply

what is the normal body temperature

Diya Reply

37 degrees selcius

Xolo

37°c

Stephanie

please why 37 degree selcius normal temperature

Mark

36.5

Simon

37°c

Iyogho

the normal temperature is 37°c or 98.6 °Fahrenheit is important for maintaining the homeostasis in the body the body regular this temperature through the process called thermoregulation which involves brain skin muscle and other organ working together to maintain stable internal temperature

Stephanie

37A c

Wulku

what is anaemia

Diya Reply

anaemia is the decrease in RBC count hemoglobin count and PVC count

Eniola

what is the pH of the vagina

Diya Reply

how does Lysin attack pathogens

Diya

acid

Mary

I information on anatomy position and digestive system and there enzyme

Elisha Reply

anatomy of the female external genitalia

Muhammad Reply

Organ Systems Of The Human Body (Continued) Organ Systems Of The Human Body (Continued)

Theophilus Reply

what's lochia albra

Kizito

Got questions? Join the online conversation and get instant answers!

Jobilize.com Reply

<< Chapter < Page Page > Chapter >>

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Signals and systems. OpenStax CNX. Aug 14, 2014 Download for free at http://legacy.cnx.org/content/col10064/1.15

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Signals and systems' conversation and receive update notifications?

Ask

	PE Power Enigeering Safety By Gerr Zen Start Quiz
	18 Sociology 18 Work and the Economy MCQ By OpenStax Start Quiz
©flickr: Abraham	Biology Exam 3 By Vanessa Soledad Start Exam
	Worldport Outside By Rachel Carlisle Start Quiz
	8 Arts Society: Theater 8 By Jonathan Long Start Quiz
©flickr: Jonathan	Power By Megan Earhart Start Quiz
	7 AP 07 Axial Skeleton Essay By OpenStax Start Flashcards
	Evolutionary Biology Ecology By Olivia D'Ambrogio Start Quiz
	22 AP 22 Respiratory System Essay By OpenStax Start Flashcards
	Immunology Practice Test By Sandhills MLT Start Test