Statistics 1

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6. Exact sampling distributions related to the Normal distribution

Aims

Knowing the exact distribution of an estimator helps us to understand how its behaviour depends, for example, on the sample size or the unknown population parameter values. It also enables us to incorporate our theoretical results into other aspects of our statistical analysis.

In this section we derive the exact distribution of some sample statistics associated with random samples from a range of distributions, particularly focussing on the mean and variance of a random sample from the Normal distribution.

Objectives

The following objectives will help you to assess how well you have mastered the relevant material. By the end of this section you should be able to:

Identify the distribution of a sum of independent random variables, each with the same Exponential distribution, and use statistical tables or an appropriate statistical package to compute relevant probabilities associated with its distribution.

chi-square

Apply the results above to find the mean and variance of an estimator of a parameter or other population quantity of interest, and hence find its bias and mean square error.

Handouts and Problem Sheets

Copies of Handouts, Problem Sheets and Solution Sheets for the unit will be made available each week here.

Handout for Section 6 | Problem sheet 7 | Solution sheet 7 | Problem sheet 8 | Solution sheet 8

Copyright notice

All material in these pages is copyright of the University unless explicitly stated otherwise. It is provided exclusively for educational purposes at the University and is to be downloaded or copied for your private study only, and not for distribution to anyone else.

Please also note that material from previous years' delivery of this unit is not necessarily a reliable indicator of what will be covered or examined this year.

Questions - set in week 7

PROBLEM SHEET 7 -- Questions 1, 2, 4

Interesting links

Statistical Java
The Statistical Java site is supported by the Department of Statistics at Virginia Tech, with the aim of providing an interactive environment for teaching statistics. From the drop down menus on the home page you can access a variety of illustrative applets with accompanying information pages.

Particularly relevant for this week are the applet and page on the t-distribution (select Statistical Theory | T Probabilities | Main Page or Applet or Applet Instructions). The applet aims to allows you to see how the t-distribution is related to the standard normal distribution by calculating relevant probabilities.

There are also applets and pages specifically related to individual distributions, including the t and Chi-square distributions (select Statistical Theory | Probability Distributions | Main Page and then select the relevant distribution and applet from the explanatory text).

Finally, pages and applets relevant to last week's section on the Central Limit Theorem can be found by selecting Statistical Theory | Central Limit Theorem

Note that I have no control over the content or availability of these external web pages. The links may be slow to load, or may sometimes fail altogether - please email me to report if a link goes down. Similarly applets may be slow to load or run, but beware that you may experience problems if you try to exit them before they have finished loading.

Professor Peter Green, School of Mathematics, University of Bristol, Bristol, BS8 1TW, UK.
Email link Telephone: +44 (0)117 928 7967; Fax: +44 (0)117 928 7999