Introduction to Statistical Inference Chapter 11 Announcement Read

Introduction to Statistical Inference Chapter 11 Announcement: Read chapter 12 to page 299

Populations vs. Samples • Population – The complete set of individuals • Characteristics are called parameters • Sample – A subset of the population • Characteristics are called statistics. – In most cases we cannot study all the members of a population

Inferential Statistics • Statistical Inference – A series of procedures in which the data obtained from samples are used to make statements about some broader set of circumstances.

Two different types of procedures • Estimating population parameters – Point estimation • Using a sample statistic to estimate a population parameter – Interval estimation • Estimation of the amount of variability in a sample statistic when many samples are repeatedly taken from a population. • Hypothesis testing – The comparison of sample results with a known or hypothesized population parameter

These procedures share a fundamental concept • Sampling distribution – A theoretical distribution of the possible values of samples statistics if an infinite number of same-sized samples were taken from a population.

Example of the sampling distribution of a discrete variable

Continuous Distributions • Interval or ratio level data – Weight, height, achievement, etc. • Jelly. Blubbers!!!

Histogram of the Jellyblubber population

Repeated sampling of the Jellyblubber population (n = 3)

Repeated sampling of the Jellyblubber population (n = 5)

Repeated sampling of the Jellyblubber population (n = 10)

Repeated sampling of the Jellyblubber population (n = 40)

For more on this concept • Visit – http: //www. ruf. rice. edu/~lane/stat_sim/sampling_dist/index. html

Central Limit Theorem • Proposition 1: – The mean of the sampling distribution will equal the mean of the population. • Proposition 2: – The sampling distribution of means will be approximately normal regardless of the shape of the population. • Proposition 3: – The standard deviation (standard error) equals the standard deviation of the population divided by the square root of the sample size. (see 11. 5 in text)

Application of the sampling distribution • Sampling error – The difference between the sample mean and the population mean. • Assumed to be due to random error. • From the jellyblubber experience we know that a sampling distribution of means will be randomly distributed with

Standard Error of the Mean and Confidence Intervals • We can estimate how much variability there is among potential sample means by calculating the standard error of the mean.

Confidence Intervals • With our Jellyblubbers – One random sample (n = 3) • Mean = 9 – Therefore; • 68% CI = 9 + or – 1(3. 54) • 95% CI = 9 + or – 1. 96(3. 54) • 99% CI = 9 + or – 2. 58(3. 54)

Confidence Intervals • With our Jellyblubbers – One random sample (n = 30) • Mean = 8. 90 – Therefore; • 68% CI = 8. 90 + or – 1(1. 11) • 95% CI = 8. 90 + or – 1. 96(1. 11) • 99% CI = 8. 90 + or – 2. 58(1. 11)

Hypothesis Testing (see handout) 1. 2. 3. 4. 5. 6. State the research question. State the statistical hypothesis. Set decision rule. Calculate the test statistic. Decide if result is significant. Interpret result as it relates to your research question.