ECE 313/MATH 362

PROBABILITY WITH ENGINEERING APPLICATIONS

Spring 2019 - Sections B, C, D and F

ECE 313 (also cross-listed as MATH 362) is an undergraduate course on probability theory and statistics with applications to engineering problems primarily chosen from the areas of communications, control, signal processing, and computer engineering. Students taking ECE 313 might consider taking ECE 314, Probability Lab, at the same time.

EE and CompE students must complete one of the two courses ECE 313 or Stat 410.

Prerequisite : Math 286 or Math 415

Exam times : See Exam information.

Text : ECE 313 Course Notes (hardcopy sold through ECE Stores, pdf file available.) Corrections to notes.

Summary of office hours times and locations (Office hours start on January 23).

	MasterProbo questions and course notes
	Concept Matrix Certification

Hours	Monday	Tuesday	Wednesday	Thursday	Friday
3 - 3:30pm		4034 ECEB	4036 ECEB		2036 ECEB
3:30 - 4pm			4036 ECEB and 414 CSL
4 - 4:30pm	5034 ECEB		414 CSL
4:30 - 5pm	5034 ECEB
5 - 6pm	2036 ECEB			4036 ECEB	2036 ECEB (except 2/22, 4034 ECEB)

Section Meeting time and place Instructor

C 10 MWF
3017 ECE Building Professor Naresh Shanbhag
e-mail: shanbhag AT illinois dot edu
Office Hours: Wednesdays 3:30-4:30pm, 414 CSL

D 11 MWF
3017 ECE Building Professor Naresh Shanbhag
e-mail: shanbhag AT illinois dot edu
Office Hours: Wednesdays 3:30-4:30pm, 414 CSL

F 1 MWF
3017 ECE Building Professor Aiguo Han
e-mail: han51 AT illinois dot edu
Office Hours: Mondays 4-5pm, 5034 ECEB

B 2 MWF
3017 ECE Building Professor Yi Lu
e-mail: yilu4 AT illinois dot edu
Office Hours: Wednesdays 3-4pm, 4036 ECEB

Section	Meeting time and place	Instructor
C	10 MWF 3017 ECE Building	Professor Naresh Shanbhag e-mail: shanbhag AT illinois dot edu Office Hours: Wednesdays 3:30-4:30pm, 414 CSL
D	11 MWF 3017 ECE Building	Professor Naresh Shanbhag e-mail: shanbhag AT illinois dot edu Office Hours: Wednesdays 3:30-4:30pm, 414 CSL
F	1 MWF 3017 ECE Building	Professor Aiguo Han e-mail: han51 AT illinois dot edu Office Hours: Mondays 4-5pm, 5034 ECEB
B	2 MWF 3017 ECE Building	Professor Yi Lu e-mail: yilu4 AT illinois dot edu Office Hours: Wednesdays 3-4pm, 4036 ECEB

Graduate Teaching Assistants

Hieu Tri Huynh
hthuynh2 AT illinois dot edu Office Hours: Tuesdays and Thursdays, 5-6pm

Du Su
dusu3 AT illinois dot edu Office Hours: Fridays 3-5pm

Liming Wang
lwang114 AT illinois dot edu Office Hours: Tuesdays 5-6 pm

Lingda Wang
lingdaw2 AT illinois dot edu Office Hours: Mondays and Fridays, 5-6pm

Ali Yekkehkhany
yekkehk2 AT illinois dot edu Office Hours: Tuesdays 3-5pm

Concept constellation

Course schedule (subject to change)

Checkpoint #
Date Lecture
dates Concepts (Reading)[ Short videos]

1

Tue, 1/29 1/14-1/25 * How to specify a set of outcomes, events, and probabilities for a given experiment (Ch 1.2)
* set theory (e.g. de Morgan's law, Karnaugh maps for two sets) (Ch 1.2)
* using principles of counting and over counting; binomial coefficients (Ch 1.3-1.4) [ILLINI, SAQ 1.3, SAQ 1.4, PokerIntro, PokerFH2P]
* using Karnaugh maps for three sets (Ch 1.4) [Karnaughpuzzle, SAQ1.2]

2

Tue, 2/5 1/28-2/1 * random variables, probability mass functions, and mean of a function of a random variable (LOTUS) (Ch 2.1, first two pages of Ch 2.2) [pmfmean]
* scaling of expectation, variance, and standard deviation (Ch 2.2) [SAQ 2.2]
* conditional probability (Ch 2.3) [team selection] [SAQ 2.3]
* independence of events and random variables (Ch 2.4.1-2.4.2) [SimdocIntro] [Simdoc-Minhash1]

3

Tue, 2/12 2/4-2/8 * binomial distribution (how it arises, mean, variance, mode) (Ch 2.4.3-2.4.4) [SAQ 2.4] [bestofseven]
* geometric distribution (how it arises, mean, variance, memoryless property) (Ch. 2.5) [SAQ 2.5]
* Bernoulli process (definition, connection to binomial and geometric distributions) (Ch 2.6) [SAQ 2.6]
* Poisson distribution (how it arises, mean, variance) (Ch 2.7) [SAQ 2.7]

4

Tue, 2/19 2/11-2/15 * Maximum likelihood parameter estimation (definition, how to calculate for continuous and discrete parameters) (Ch 2.8) [SAQ 2.8]
* Markov and Chebychev inequalities (Ch 2.9)
* confidence intervals (definitions, meaning of confidence level) (Ch 2.9) [SAQ 2.9,Simdoc-Minhash2]
* law of total probability (Ch 2.10) [deuce] [SAQ 2.10]
* Bayes formula (Ch. 2.10)

5

Tue, 2/26 2/18-2/22 * Hypothesis testing -- probability of false alarm and probability of miss (Ch. 2.11)
* ML decision rule and likelihood ratio tests (Ch 2.11) [SAQ 2.11]
* MAP decision rules (Ch 2.11)
* union bound and its application (Ch 2.12.1) [SAQ 2.12]
* network outage probability and distribution of capacity, and more applications of the union bound (Ch 2.12.2-2.12.4)

6

Tue, 3/5 2/25-3/1 * cumulative distribution functions (Ch 3.1) [SAQ 3.1]
* probability density functions (Ch 3.2) [SAQ 3.2] [simplepdf]
* uniform distribution (Ch 3.3) [SAQ 3.3]
* exponential distribution (Ch 3.4) [SAQ 3.4]

7

Tue, 3/12
No Lecture 3/8, EOH 3/4-3/6 * Poisson processes (Ch 3.5) [SAQ 3.5]
* Erlang distribution (Ch 3.5.3)
* scaling rule for pdfs (Ch. 3.6.1) [SAQ 3.6]
* Gaussian (normal) distribution (e.g. using Q and Phi functions) (Ch. 3.6.2) [SAQ 3.6] [matlab help including Qfunction.m]

8

Tue, 3/26 3/11-3/15 * the central limit theorem and Gaussian approximation (Ch. 3.6.3) [SAQ 3.6]
* ML parameter estimation for continuous type random variables (Ch. 3.7) [SAQ 3.7]
* the distribution of a function of a random variable (Ch 3.8.1) [SAQ 3.8]
* generating random variables with a specified distribution (Ch 3.8.2)
* failure rate functions (Ch 3.9) [SAQ 3.9]
* binary hypothesis testing for continuous type random variables (Ch 3.10) [SAQ 3.10]

3/18-3/22 Spring vacation

9

Tue, 4/2 3/25-3/39
* joint CDFs (Ch 4.1) [SAQ 4.1]
* joint pmfs (Ch 4.2) [SAQ 4.2]
* joint pdfs (Ch 4.3) [SAQ 4.3]

10

Tue, 4/16
(skip 4/9) 4/1-4/12 * joint pdfs of independent random variables (Ch 4.4) [SAQ 4.4]
* distribution of sums of random variables (Ch 4.5) [SAQ 4.5]
* more problems involving joint densities (Ch 4.6) [SAQ 4.6]
* joint pdfs of functions of random variables (Ch 4.7) [SAQ 4.7] (Section 4.7.2 and 4.7.3 will not be tested in the exams)

11

Tue, 4/23 4/15-4/19 * correlation and covariance: scaling properties and covariances of sums (Ch 4.8) [SAQ 4.8]
* sample mean and variance of a data set, unbiased estimators (Ch 4.8, Example 4.8.7)
* minimum mean square error unconstrained estimators (Ch 4.9.2)
* minimum mean square error linear estimator (Ch 4.9.3) [SAQ 4.9]

12

Tue, 4/30 4/22-4/26 * law of large numbers (Ch 4.10.1)
* central limit theorem (Ch 4.10.2) [SAQ 4.10]
* joint Gaussian distribution (Ch 4.11) (e.g. five dimensional characterizations) [SAQ 4.11]

- 4/29-5/1 wrap up and review

Optional Reading:

D. V. Sarwate, Probability with Engineering Applications, Powerpoint Slides for ECE 313, Fall 2000

Course schedule (subject to change)
Checkpoint # Date	Lecture dates	Concepts (Reading)[ Short videos]
1 Tue, 1/29	1/14-1/25	* How to specify a set of outcomes, events, and probabilities for a given experiment (Ch 1.2) * set theory (e.g. de Morgan's law, Karnaugh maps for two sets) (Ch 1.2) * using principles of counting and over counting; binomial coefficients (Ch 1.3-1.4) [ILLINI, SAQ 1.3, SAQ 1.4, PokerIntro, PokerFH2P] * using Karnaugh maps for three sets (Ch 1.4) [Karnaughpuzzle, SAQ1.2]
2 Tue, 2/5	1/28-2/1	* random variables, probability mass functions, and mean of a function of a random variable (LOTUS) (Ch 2.1, first two pages of Ch 2.2) [pmfmean] * scaling of expectation, variance, and standard deviation (Ch 2.2) [SAQ 2.2] * conditional probability (Ch 2.3) [team selection] [SAQ 2.3] * independence of events and random variables (Ch 2.4.1-2.4.2) [SimdocIntro] [Simdoc-Minhash1]
3 Tue, 2/12	2/4-2/8	* binomial distribution (how it arises, mean, variance, mode) (Ch 2.4.3-2.4.4) [SAQ 2.4] [bestofseven] * geometric distribution (how it arises, mean, variance, memoryless property) (Ch. 2.5) [SAQ 2.5] * Bernoulli process (definition, connection to binomial and geometric distributions) (Ch 2.6) [SAQ 2.6] * Poisson distribution (how it arises, mean, variance) (Ch 2.7) [SAQ 2.7]
4 Tue, 2/19	2/11-2/15	* Maximum likelihood parameter estimation (definition, how to calculate for continuous and discrete parameters) (Ch 2.8) [SAQ 2.8] * Markov and Chebychev inequalities (Ch 2.9) * confidence intervals (definitions, meaning of confidence level) (Ch 2.9) [SAQ 2.9,Simdoc-Minhash2] * law of total probability (Ch 2.10) [deuce] [SAQ 2.10] * Bayes formula (Ch. 2.10)
5 Tue, 2/26	2/18-2/22	* Hypothesis testing -- probability of false alarm and probability of miss (Ch. 2.11) * ML decision rule and likelihood ratio tests (Ch 2.11) [SAQ 2.11] * MAP decision rules (Ch 2.11) * union bound and its application (Ch 2.12.1) [SAQ 2.12] * network outage probability and distribution of capacity, and more applications of the union bound (Ch 2.12.2-2.12.4)
6 Tue, 3/5	2/25-3/1	* cumulative distribution functions (Ch 3.1) [SAQ 3.1] * probability density functions (Ch 3.2) [SAQ 3.2] [simplepdf] * uniform distribution (Ch 3.3) [SAQ 3.3] * exponential distribution (Ch 3.4) [SAQ 3.4]
7 Tue, 3/12 No Lecture 3/8, EOH	3/4-3/6	* Poisson processes (Ch 3.5) [SAQ 3.5] * Erlang distribution (Ch 3.5.3) * scaling rule for pdfs (Ch. 3.6.1) [SAQ 3.6] * Gaussian (normal) distribution (e.g. using Q and Phi functions) (Ch. 3.6.2) [SAQ 3.6] [matlab help including Qfunction.m]
8 Tue, 3/26	3/11-3/15	* the central limit theorem and Gaussian approximation (Ch. 3.6.3) [SAQ 3.6] * ML parameter estimation for continuous type random variables (Ch. 3.7) [SAQ 3.7] * the distribution of a function of a random variable (Ch 3.8.1) [SAQ 3.8] * generating random variables with a specified distribution (Ch 3.8.2) * failure rate functions (Ch 3.9) [SAQ 3.9] * binary hypothesis testing for continuous type random variables (Ch 3.10) [SAQ 3.10]
	3/18-3/22	Spring vacation
9 Tue, 4/2	3/25-3/39	* joint CDFs (Ch 4.1) [SAQ 4.1] * joint pmfs (Ch 4.2) [SAQ 4.2] * joint pdfs (Ch 4.3) [SAQ 4.3]
10 Tue, 4/16 (skip 4/9)	4/1-4/12	* joint pdfs of independent random variables (Ch 4.4) [SAQ 4.4] * distribution of sums of random variables (Ch 4.5) [SAQ 4.5] * more problems involving joint densities (Ch 4.6) [SAQ 4.6] * joint pdfs of functions of random variables (Ch 4.7) [SAQ 4.7] (Section 4.7.2 and 4.7.3 will not be tested in the exams)
11 Tue, 4/23	4/15-4/19	* correlation and covariance: scaling properties and covariances of sums (Ch 4.8) [SAQ 4.8] * sample mean and variance of a data set, unbiased estimators (Ch 4.8, Example 4.8.7) * minimum mean square error unconstrained estimators (Ch 4.9.2) * minimum mean square error linear estimator (Ch 4.9.3) [SAQ 4.9]
12 Tue, 4/30	4/22-4/26	* law of large numbers (Ch 4.10.1) * central limit theorem (Ch 4.10.2) [SAQ 4.10] * joint Gaussian distribution (Ch 4.11) (e.g. five dimensional characterizations) [SAQ 4.11]
-	4/29-5/1	wrap up and review

More Information

Grading Policies

Homework

Exams

Piazza

COMPASS (for grades)

Previous Web Pages

Previous Exams

The ECE 313 FAQ

Reserve Books

Syllabus

Hieu Tri Huynh hthuynh2 AT illinois dot edu	Office Hours: Tuesdays and Thursdays, 5-6pm
Du Su dusu3 AT illinois dot edu	Office Hours: Fridays 3-5pm
Liming Wang lwang114 AT illinois dot edu	Office Hours: Tuesdays 5-6 pm
Lingda Wang lingdaw2 AT illinois dot edu	Office Hours: Mondays and Fridays, 5-6pm
Ali Yekkehkhany yekkehk2 AT illinois dot edu	Office Hours: Tuesdays 3-5pm

ECE 313/MATH 362 PROBABILITY WITH ENGINEERING APPLICATIONS Spring 2019 - Sections B, C, D and F

More Information Grading Policies Homework Exams Piazza COMPASS (for grades) Previous Web Pages Previous Exams The ECE 313 FAQ Reserve Books Syllabus

ECE 313/MATH 362

PROBABILITY WITH ENGINEERING APPLICATIONS

Spring 2019 - Sections B, C, D and F

More Information

Grading Policies

Homework

Exams

Piazza

COMPASS (for grades)

Previous Web Pages

Previous Exams

The ECE 313 FAQ

Reserve Books

Syllabus