6.6: Vocabulary (Chapter 6)

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Vocabulary: Sampling Distributions and Central Limit Theorem

Population: The entire group we are interested in studying or making conclusions about.
Sample: A subset of individuals taken from the population, used to estimate population characteristics.
Statistic: A number calculated from a sample (such as a sample mean or proportion) used to estimate a population parameter.
Sampling Distribution: The distribution of a sample statistic (such as a mean or proportion) based on repeated random samples of the same size. It shows how the statistic would vary across repeated samples.
Sample Mean (\( \bar{x} \)): The average value of all data points in a sample. Used to estimate the population mean.
Sample Proportion (\( \hat{p} \)): The proportion of observations in a sample that meet a certain condition. Used to estimate the population proportion.
Standard Error (SE): The standard deviation of a sampling distribution. It measures how much a sample statistic typically varies from sample to sample.
Standard Error of the Mean: The standard deviation of the sampling distribution of the sample mean. Given by \( \sigma_{\bar{x}} = \frac{\sigma}{\sqrt{n}} \).
Standard Error of the Proportion: The standard deviation of the sampling distribution of a sample proportion. Given by \( \sqrt{\frac{p(1 - p)}{n}} \).
Central Limit Theorem (CLT): A theorem stating that the sampling distribution of the sample mean (or proportion) becomes approximately normal as the sample size increases, regardless of population distribution shape.
Normal Approximation to the Binomial: A method of using the normal distribution to approximate binomial probabilities when sample size is large and both \( np \) and \( n(1 - p) \) are at least 10.
Continuity Correction: An adjustment used when approximating a discrete binomial distribution with a continuous normal distribution. We add or subtract 0.5 to better align with the binomial probability being approximated.

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