Axioms of probability - Conditional probability - Total probability - Baye’s theorem- Discrete and continuous random variables – Moments – Moment generating functions and their properties.
Binomial – Poisson – Uniform – Exponential – Normal distributions and their properties.
Joint distributions – Marginal and conditional distributions – Covariance – Correlation and linear regression.
Sampling distributions – Statistical hypothesis – Tests for single mean, proportion, Difference of means (large and small samples) – Tests for single variance and equality of variances – Chi square test for goodness of fit-Independence of attributes.
Completely randomized design – Randomized block design – Latin square design.
Reference Book:
1. Allen, A.O., “Probability, Statistics and Queueing Theory with Computer Applications”, Elsevier, 2nd edition, 2011 2. Trivedi, K.S., “Probability and Statistics with Reliability, Queuing and Computer Science Applications”, PHI Learning Private limited , New Delhi ,2011 3. Ross, S.M., “Introduction to Probability and Statistics for Engineers and Scientists”, 3rd Edition, Elsevier, 2004. 4. Spiegel, M.R., Schiller, J and Srinivasan, R.A., “Schaum’s Outline of Theory and Problems of Probability and Statistics", Tata McGraw Hill Edition, 2004. 5. Johnson, R.A., Miller, I and Freund, J., “Miller and Freund’s Probability and Statistics for Engineers”, Pearson Education, Asia, 8th Edition, 2015.
Text Book:
1. Ibe, O.C., “Fundamentals of Applied Probability and Random Processes”, Elsevier, 1st Indian Reprint, 2016 2. Papoulis, A and Unnikrishnapillai, S., “Probability, Random Variables and Stochastic Processes” McGraw Hill Education India, 4th Edition, New Delhi, 2010