Statistical Inference

Testing of significance for attributes and variables, tests of significance for single mean, standard deviation and proportions, tests of significance for difference between two means, standard deviations and proportions.

Problems of point estimation, properties of a good point estimator- unbiasedness, consistency, efficiency & sufficiency.-factorization theorem (without proof)and its applications.

Concept of mean square error, Minimum Variance Unbiased Estimation, Cramer Rao Inequality,  Rao-Blackwell Theorem (Without proof).Lehman Scheffe theorem(without proof), idea of most powerful test, uniformly most powerful test, randomised and non randomised test.

Method of Maximum Likelihood and its properties of MLEs (without proof). Methods of Moments: Least Squares method, interval estimation: Concept, confidence interval, confidence coefficient, construction of confidence interval for population mean, variance, difference of population mean when standard deviation are known and unknown of Normal Distribution.

Neyman pearson lemma and its application for finding BCR, BCR in case of binomial, poisson, normal,and exponential populations. non parametric tests: Definition, merits and limitations, Sign Test for univariate and bivariate distributions, run test and median testfor small and large samples.