Standard normal table


A standard normal table, also called the unit normal table or Z table, is a mathematical table for the values of Φ, which are the values of the cumulative distribution function of the normal distribution. It is used to find the probability that a statistic is observed below, above, or between values on the standard normal distribution, and by extension, any normal distribution. Since probability tables cannot be printed for every normal distribution, as there are an infinite variety of normal distributions, it is common practice to convert a normal to a standard normal and then use the standard normal table to find probabilities.

Normal and standard normal distribution

are symmetrical, bell-shaped distributions that are useful in describing real-world data. The standard normal distribution, represented by the letter Z, is the normal distribution having a mean of 0 and a standard deviation of 1.

Conversion

If X is a random variable from a normal distribution with mean μ and standard deviation σ, its Z-score may be calculated from X by subtracting μ and dividing by the standard deviation:
For the average of a sample of size n from some population in which the mean is μ and the standard deviation is σ, the standard error is σ/√n:

Reading a Z table

Formatting / layout

Z tables are typically composed as follows:
Example: To find 0.69, one would look down the rows to find 0.6 and then across the columns to 0.09 which would yield a probability of 0.25490 for a cumulative from mean table or 0.75490 from a cumulative table.
Because the normal distribution curve is symmetrical, probabilities for only positive values of Z are typically given. The user has to use a complementary operation on the absolute value of Z, as in the example below.

Types of tables

Z tables use at least three different conventions:
;Cumulative from mean: gives a probability that a statistic is between 0 and Z. Example: Prob = 0.2549
;Cumulative: gives a probability that a statistic is less than Z. This equates to the area of the distribution below Z. Example: Prob = 0.7549.
;Complementary cumulative: gives a probability that a statistic is greater than Z. This equates to the area of the distribution above Z.

Table examples

Cumulative from mean (0 to Z)

This table gives a probability that a statistic is between 0 and Z.
Note that for z = 1, 2, 3, one obtains the results f = 0.6827, 0.9545, 0.9974,
characteristic of the 68–95–99.7 rule.

Cumulative

This table gives a probability that a statistic is less than Z.
The values are calculated using the cumulative distribution function of a standard normal distribution with mean of zero and standard deviation of one, usually denoted with the capital Greek letter , is the integral
is related to the error function, or erf.

Complementary cumulative

This table gives a probability that a statistic is greater than Z.
This table gives a probability that a statistic is greater than Z, for large integer Z values.
z+0+1+2+3+4+5+6+7+8+9
05.00000 E -11.58655 E -12.27501 E -21.34990 E -33.16712 E -52.86652 E -79.86588 E -101.27981 E -126.22096 E -161.12859 E -19
107.61985 E -241.91066 E -281.77648 E -336.11716 E -397.79354 E -453.67097 E -516.38875 E -584.10600 E -659.74095 E -738.52722 E -81
202.75362 E -893.27928 E -981.43989 E -1072.33064 E -1171.39039 E -1273.05670 E -1382.47606 E -1497.38948 E -1618.12387 E -1733.28979 E -185
304.90671 E -1982.69525 E -2115.45208 E -2254.06119 E -2391.11390 E -2531.12491 E -2684.18262 E -2845.72557 E -3002.88543 E -3165.35312 E -333
403.65589 E -3509.19086 E -3688.50515 E -3862.89707 E -4043.63224 E -4231.67618 E -4422.84699 E -4621.77976 E -4824.09484 E -5033.46743 E -524
501.08060 E -5451.23937 E -5675.23127 E -5908.12606 E -6134.64529 E -6369.77237 E -6607.56547 E -6842.15534 E -7082.25962 E -7338.71741 E -759
601.23757 E -7846.46517 E -8111.24283 E -8378.79146 E -8652.28836 E -8922.19180 E -9207.72476 E -9491.00178 E -9774.78041 E -10078.39374 E -1037
705.42304 E -10671.28921 E -10971.12771 E -11283.62960 E -11604.29841 E -11921.87302 E -12243.00302 E -12571.77155 E -12903.84530 E -13243.07102 E -1358
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Examples of use

A professor's exam scores are approximately distributed normally with mean 80 and standard deviation 5. Only a cumulative from mean table is available.