SOCR EduMaterials Activities GeneralCentralLimitTheorem

(Difference between revisions)

Revision as of 20:45, 22 January 2007

Goals: The aims of this activity are to
- provide intuitive notion of sampling from any process with a well-defined distribution
- motivate and facilitate learning of the central limit theorem
- emperically validate that sample-averages of random observations (most processes) follow approximately normal distribution
- emperacally demonstrate that the sample-average is special and other sample statistics (e.g., median, variance, range, etc.) generally do not have distributions that are normal
- illustrate that the expectation of the sample-average equals the population mean (and the sample-average is typically a good measure of centrality for a population/process)
- show that the variation of the sample average rapidly decreases as the sample size increases ( $~1\over{\sqrt(n)}$ ).

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@@ Line 10: / Line 10: @@
 ** emperacally demonstrate that the ''sample-average'' is special and other sample statistics (e.g., median, variance, range, etc.) generally do not have distributions that are normal
 ** illustrate that the expectation of the sample-average equals the population mean (and the sample-average is typically a good measure of centrality for a population/process)
-** show that the variation of the sample average rapidly decreases as the sample size increases <math> ~1\over{\sqrt(n)}</math>.
+** show that the variation of the sample average rapidly decreases as the sample size increases (<math> ~1\over{\sqrt(n)}</math>).
 <center>[[Image:SOCR_Activities_CardCoinSampling_Dinov_092206_Fig1.jpg|300px]]</center>