Sampling Design: Population, Sampling (statistics), Statistics, Statistical Inference, Sample (statistics), Probability, Mathematics, Bernoulli Trial, Poisson Sampling, Bernoulli Distribution - Couverture souple

Synopsis

Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. In the theory of finite population sampling, a sampling design specifies for every possible sample its probability of being drawn. Mathematically, a sampling design is denoted by the function P(S) which gives the probability of drawing a sample S. Sampling is that part of statistical practice concerned with the selection of individual observations intended to yield some knowledge about a population of concern, especially for the purposes of statistical inference. In the theory of finite population sampling, Bernoulli sampling is a sampling process where each element of the population that is sampled is subjected to an independent Bernoulli trial which determines whether the element becomes part of the sample during the drawing of a single sample. An essential property of Bernoulli sampling is that all elements of the population have equal probability of being included in the sample during the drawing of a single sample.

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