Calculates the z-score as (value − mean) ÷ standard deviation, expressing how many standard deviations the value lies from the mean.
A z-score tells you how many standard deviations a value lies away from the mean.
Here is the value, the mean and the standard deviation.
After the transformation the z-scores have a mean of 0 and a standard deviation of 1. This is called standardising the data.
With a value of 80, a mean of 60 and a standard deviation of 10:
The value sits two standard deviations above the mean.
Because it puts quantities with different units, means and spreads onto a single ruler.
Suppose you score 80 in maths (mean 60, standard deviation 10) and 80 in English (mean 70, standard deviation 5). Both raw scores are 80, and both z-scores happen to be 2.0. Had the English mean been 75, its z-score would be 1.0, and the maths result would clearly be the stronger one.
Once you have a z-score, the normal distribution turns it into a probability: puts a value in roughly the top 2.3%.