Trending: Anna University 8th Sem Results April 2014 May/June 2014 Time Table/ Internal Marks Calculate CGPA Online SSLC Results 2014 12th Result 2014

Test Footer 1

Thursday, September 13, 2012

MA2261 PROBABILITY AND RANDOM PROCESSES SYLLABUS | ANNA UNIVERSITY BE ECE ENGINEERING 4TH SEM SYLLABUS REGULATION 2008 2011 2012-2013

Latest: TNEA 2014 Engineering Application Status, Counselling Date, Rank List
MA2261 PROBABILITY AND RANDOM PROCESSES SYLLABUS | ANNA UNIVERSITY BE ECE ENGINEERING 4TH SEM SYLLABUS REGULATION 2008 2011 2012-2013 BELOW IS THE ANNA UNIVERSITY FOURTH SEMESTER BE ELECTRONICS AND COMMUNICATION ENGINEERING DEPARTMENT SYLLABUS, TEXTBOOKS, REFERENCE BOOKS,EXAM PORTIONS,QUESTION BANK,CLASS NOTES, IMPORTANT 2 MARKS, 8 MARKS, 16 MARKS TOPICS. IT IS APPLICABLE FOR ALL STUDENTS ADMITTED IN THE YEAR 2011 2012-2013 (ANNA UNIVERSITY CHENNAI,TRICHY,MADURAI,TIRUNELVELI,COIMBATORE), 2008 REGULATION OF ANNA UNIVERSITY CHENNAI AND STUDENTS ADMITTED IN ANNA UNIVERSITY CHENNAI DURING 2009

MA2261 PROBABILITY AND RANDOM PROCESSES L T P C
(Common to ECE & Bio Medical Engineering) 3 1 0 4
AIM
This course aims at providing the necessary basic concepts in random processes.
Knowledge of fundamentals and applications of random phenomena will greatly help in
the understanding of topics such as signals & systems, pattern recognition, voice and
image processing and filtering theory.
OBJECTIVES
 At the end of the course, the students would
 Have a fundamental knowledge of the basic probability concepts.
 Have a well-founded knowledge of standard distributions which can describe real
life phenomena.
 Acquire skills in handling situations involving more than one random variable and
functions of random variables.
 Understand and characterize phenomena which evolve with respect to time in
probabilistic manner.
 Be able to analyze the response of random inputs to linear time invariant
systems.
UNIT I RANDOM VARIABLES 9 + 3
Discrete and continuous random variables – Moments - Moment generating functions
and their properties. Binomial, Poisson ,Geometric, Uniform, Exponential, Gamma and
normal distributions – Function of Random Variable.
UNIT II TWO DIMENSIONAL RANDOM VARIBLES 9 + 3
Joint distributions - Marginal and conditional distributions – Covariance - Correlation and
Regression - Transformation of random variables - Central limit theorem (for iid random
variables)
UNIT III CLASSIFICATION OF RANDOM PROCESSES 9 + 3
Definition and examples - first order, second order, strictly stationary, wide-sense
stationary and ergodic processes - Markov process - Binomial, Poisson and Normal
processes - Sine wave process – Random telegraph process.
UNIT IV CORRELATION AND SPECTRAL DENSITIES 9 + 3
Auto correlation - Cross correlation - Properties – Power spectral density – Cross
spectral density - Properties – Wiener-Khintchine relation – Relationship between cross
power spectrum and cross correlation function
UNIT V LINEAR SYSTEMS WITH RANDOM INPUTS 9 + 3
Linear time invariant system - System transfer function – Linear systems with random
inputs – Auto correlation and cross correlation functions of input and output – white
noise.
LECTURES : 45 TUTORIAL : 15 TOTAL : 60 PERIODS
TEXT BOOKS
36
1. Oliver C. Ibe, “Fundamentals of Applied probability and Random processes”,
Elsevier, First Indian Reprint ( 2007) (For units 1 and 2)
2. Peebles Jr. P.Z., “Probability Random Variables and Random Signal Principles”, Tata
McGraw-Hill Publishers, Fourth Edition, New Delhi, 2002.(For units 3, 4 and 5).
REFERENCES
1. Miller,S.L and Childers, S.L, “Probability and Random Processes with applications to
Signal Processing and Communications”, Elsevier Inc., First Indian Reprint 2007.
2. H. Stark and J.W. Woods, “Probability and Random Processes with Applications
to Signal Processing”, Pearson Education (Asia), 3rd Edition, 2002.
3. Hwei Hsu, “Schaum’s Outline of Theory and Problems of Probability, Random
Variables and Random Processes”, Tata McGraw-Hill edition, New Delhi, 2004.
4. Leon-Garcia,A, “Probability and Random Processes for Electrical Engineering”,
Pearson Education Asia, Second Edition, 2007
5. Yates and D.J. Goodman, “Probability and Stochastic Processes”, John Wiley and
Sons, Second edition, 2005.

No comments:

Post a Comment

Any doubt ??? Just throw it Here...