Mathematics III
MA2004E MATHEMATICS III
| L | T | P | O | C |
|---|---|---|---|---|
| 3 | 1* | 0 | 5 | 3 |
Total Lecture Sessions: 39
Course Outcomes
- CO1: Introduce the fundamentals of probability and random variables in continuous/discrete settings.
- CO2: Identify the distribution and transformation of random variables.
- CO3: Apply the concepts of correlation and stationarity in analysis of stochastic processes.
Probability distributions of a single random variable
- Basics of probability, Axioms of Probability, Conditional probability, Independence
- Random variables: Discrete and Continuous random variables, Probability Distribution functions, Cumulative Distribution function, Expectation, Variance, Moment Generating Function, Higher Order Moments
- Special Distributions:
* Binomial distribution * Geometric distribution * Poisson distribution * Hypergeometric distribution * Uniform distribution * Gamma distribution * Exponential distribution * Normal distribution
- Markov and Chebyshev inequalities
- Law of large numbers
- Central limit theorem and its significance.
Probability distributions of several random variables
- Joint probability distribution function
- Joint probability mass and density function
- Marginal and Conditional distributions
- Transformation of random variables
- Joint probability distribution of functions of random variables
- Independent random variables
- Covariance
- Correlation coefficient
- Bivariate normal distribution
Random processes
- Introduction and Specification
- Mean and Auto-Correlation Function
- Auto-Covariance Function
- Cross-Correlation and Cross-Covariance Functions
- Stationary processes:
* Strict-Sense Stationarity * Wide-Sense Stationarity (WSS) * Stationarity * Auto-Correlation Function * Cross-Correlation Function * Power Spectral Density of a WSS Random process * Wiener-Khinchine theorem * Low-pass and Band-pass processes * Power and Bandwidth calculations
- Time averaging and Ergodicity:
* Time averages - interpretation, Mean and Variance * Ergodicity: general definition, Ergodicity of the mean, Ergodicity of the auto-correlation function.
References
- Ross, S. M. (2014). *Introduction to Probability and Statistics for Engineers and Scientists* (5th ed.). Academic Press (Elsevier).
- Johnson, Richard A. (2011). *Miller & Freund’s - Probability and Statistics for Engineers* (8th ed.). Prentice Hall India.
- Krishnan, V. (2006). *Probability and Random Processes* (2nd ed.). John Wiley & Sons.
- Ross, S. (2014). *A First Course in Probability* (9th ed.). Pearson.
- Yates, Roy D., & Goodman, David J. (2021). *Probability and Stochastic Processes* (3rd ed.). Wiley.
- Miller, Scott, & Childers, Donald. (2007). *Probability and Random Processes* (2nd ed.). Elsevier.