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Data for Decisions Chapter 7. Austin Cole February 16, 2010. Outline. I. Sampling a. Bad Sampling Methods b. Random Sampling II. Experiments III. Applying Sample to a Population IV. Simulations V. Confidence Intervals VI. Discussion.
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Data for DecisionsChapter 7 Austin Cole February 16, 2010
Outline I. Sampling a. Bad Sampling Methods b. Random Sampling II. Experiments III. Applying Sample to a Population IV. Simulations V. Confidence Intervals VI. Discussion
Population- entire group of individuals about which we want information Sample- part of population from which information is collected Sampling
Monthly unemployment rate based on survey of 60,000 households Define population Define unemployed Final percentage Unemployment
Convenience sample-sample of easiest to reach members of population Bias-systematically favoring a certain outcome Voluntary Response Sample-people choose to respond to a general appeal Bad Sampling Methods
Every individual in population has equal chance to be sampled Table of random digits Simple Random Sampling
Undercoverage-group of the population is left out when choosing sample Nonresponse-individual chosen doesn’t participate Wording of questions Cautions about Sample Surveys
Observational Study Experiment-imposes some treatment on individuals to observe their responses Confounding variables-variable whose effects cannot be distinguished Control group Experiments
Online vs. classroom courses Randomized Comparative Experiment
1.Starting on line x, read 2-digit groups until you have chosen 6 restaurants. 2.Ignore groups not in the range and ignore any repeated labels. Random Sampling Exercise • Starting at line 105: 07, 19, 14, 17, 13, 15
Placebo effect Double-blind experiment Prospective studies Thinking about Experiments
Statistical inference-using fact of a sample to estimate about whole population Parameter-fixed number that describes population Statistic-number that describes a sample Sampling Distribution-distribution of values taken by the statistic in all possible samples of the same size from the same population From Sample to Population
Shape Center-mean of sampling distribution (g) Spread-standard deviation of sampling distribution Assessing simulations g(1- g) n
Percent of all samples will produce an interval containing the true population parameter 68-95-99.7 Rule Margin of error for 95% confidence interval: Confidence Intervals ĝ(1- ĝ) 2 n
A Gallup poll asked a random sample of 1785 adults if they attended church or synagogue in the last 7 days. Of the respondents, 750 said yes. Find the 95% confidence interval. Exercise ĝ(1- ĝ) ĝ=.42 =.023 n 95% Confidence Interval: .376 to .466
Discussion • In real world examples, what are some uses of knowing the spread/standard deviation? • Other uses/applications for this information? 9,38,44a (7th edition) Homework Problems: