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Z Scores and the Normal Distribution

Z Scores and the Normal Distribution

The z score of a random variable X that is normally distributed with parameters m and s is computed as follows:

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The random variable zX is a standard normal random variable, i.e., the z score of a normal random variable with parameters m and s is a random variable that is also normally distributed, but with parameters m = 0 and s = 1. Since every normal random variable can be converted (using z scores) into a standard normal random variable, probabilities associated with a normal random variable assuming values within an interval (a, b) can be easily calculated using the probability values in a Standard Distribution Table. That is, for X ~ N(0,1),

P(a < X < b) = P(X < b) - P(X < a) for a < b

Thus, the z score is a very convenient way of standardizing the computations of probabilities involving normal random variables with different values for m and s, without involving tables for each combination of m and s or tedious integrations of complex functions.

The following table shows the value of P(X < z), where X is a standard normal random variable, for selected values of z:

z p(X < z)
-3.0 0.0013
-2.0 0.0228
-1.0 0.1587
0 0.5000
1.0 0.8413
2.0 0.9772
3.0 0.9987

EX. A random variable Y is normally distributed with m = 20 and s = 2. Y has a z score that is calculated as

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Using a Standard Distribution Table, the probability that Y takes on a value greater than 23 is

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The probability that Y takes on a value between 19 and 22 is

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