Standardized scores
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In statistics, a standard score (also z-score or normal score) is a dimensionless quantity derived by subtracting the population mean from an individual (raw) score and then dividing the difference by the population standard deviation:
The standard score, which is also commonly known as the z-score, is not the same as, but is sometimes confused with, the Z-Factor used in the analysis of high-throughput screening data.
Knowing the true σ of a population is often unrealistic except in cases such as standardized testing in which the entire population is known. In cases where it is impossible to measure every member of a population, the standard deviation may be estimated using a random sample.
The z score calculation requires the following to be known:
- σ (the standard deviation of the population)
- μ (the mean of the population)
- X (a raw score)
The standard score is
The quantity z represents the distance between the raw score and the population mean in units of the standard deviation. z is negative when the raw score is below the mean, positive when above.
Another name for a standard score is a z-score. The conversion process itself is sometimes called standardizing.
The key point to remember for the z score is that it is calculated using the population mean and the population standard deviation and not the sample mean or sample deviation. Calculation of the z score requires knowledge of the population statistics as opposed to the statistics of a sample drawn from the population of interest.
Population statistics are rarely known in the real world except for circumstances such as standardized testing. The population of people taking a standardized test is known and the population statistics can be calculated because all of the scores of the test takers are available. On the other hand, a population such as people who smoke cigarettes is not fully described so the population statistics are approximated using samples of the population.
When a population is normally distributed, the percentile rank may be determined from the standard score and ubiquitous tables.
[edit] Standardizing in mathematical statistics
In mathematical statistics, a random variable X is standardized using the theoretical (population) mean and standard deviation:
where μ = E(X) is the mean and σ² = Var(X) the variance of the probability distribution of X.
If the random variable under consideration is the sample mean:
then the standardized version is
[edit] See also
- ja:偏差値
- nl:Z-score
| This page uses content from the English-language version of Wikipedia. The original article was at Standard_score. The list of authors can be seen in the page history. As with Psychology Wiki, the text of Wikipedia is available under the GNU Free Documentation License. |
