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In statistics, a standard score (z) is a
dimensionless quantity derived by subtracting the mean score of a probability distribution from an individual score and then
dividing the difference by the standard deviation:
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The quantity z is the number of standard deviations between the score and the mean; it is negative when the raw score
is below the mean. The conversion allows the comparison and combination of measures made on different scales. If data are being
combined or scaled the conversion eliminates accidental weighting due to differences in means or standard deviations. Standard
scores are chiefly appropriate for data that are normally
distributed, although that is not to say that they can never provide useful information about skewed data. The standard score also provides an estimate of the percentile rank of scores in a normal distribution.
A standard score is a way of placing a raw score in context. It is often used
to compare test results within and between groups, and especially with reference to a norm group.
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