In sampling theory, the sampling fraction is the ratio of sample size to population size or, in the context of stratified sampling, the ratio of the sample size to the size of the stratum.[1] The formula for the sampling fraction is
where n is the sample size and N is the population size. A sampling fraction value close to 1 will occur if the sample size is relatively close to the population size. When sampling from a finite population without replacement, this may cause dependence between individual samples. To correct for this dependence when calculating the sample variance, a finite population correction (or finite population multiplier) of (N-n)/(N-1) may be used. If the sampling fraction is small, less than 0.05, then the sample variance is not appreciably affected by dependence, and the finite population correction may be ignored. [2][3]
References
^Dodge, Yadolah (2003). The Oxford Dictionary of Statistical Terms. Oxford: Oxford University Press. ISBN0-19-920613-9.
^Bain, Lee J.; Engelhardt, Max (1992). Introduction to probability and mathematical statistics (2nd ed.). Boston: PWS-KENT Pub. ISBN0534929303. OCLC 24142279.
^Scheaffer, Richard L.; Mendenhall, William; Ott, Lyman (2006). Elementary survey sampling (6th ed.). Southbank, Vic.: Thomson Brooks/Cole. ISBN0495018627. OCLC 58425200.
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sampling, fraction, sampling, theory, sampling, fraction, ratio, sample, size, population, size, context, stratified, sampling, ratio, sample, size, size, stratum, formula, sampling, fraction, displaystyle, frac, where, sample, size, population, size, sampling. In sampling theory the sampling fraction is the ratio of sample size to population size or in the context of stratified sampling the ratio of the sample size to the size of the stratum 1 The formula for the sampling fraction is f n N displaystyle f frac n N where n is the sample size and N is the population size A sampling fraction value close to 1 will occur if the sample size is relatively close to the population size When sampling from a finite population without replacement this may cause dependence between individual samples To correct for this dependence when calculating the sample variance a finite population correction or finite population multiplier of N n N 1 may be used If the sampling fraction is small less than 0 05 then the sample variance is not appreciably affected by dependence and the finite population correction may be ignored 2 3 References Edit Dodge Yadolah 2003 The Oxford Dictionary of Statistical Terms Oxford Oxford University Press ISBN 0 19 920613 9 Bain Lee J Engelhardt Max 1992 Introduction to probability and mathematical statistics 2nd ed Boston PWS KENT Pub ISBN 0534929303 OCLC 24142279 Scheaffer Richard L Mendenhall William Ott Lyman 2006 Elementary survey sampling 6th ed Southbank Vic Thomson Brooks Cole ISBN 0495018627 OCLC 58425200 This statistics related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Sampling fraction amp oldid 1062183352, wikipedia, wiki, book, books, library,
