Testing for Normality - Shippensburg University of ...
Testing for Normality
For each mean and standard deviation combination a theoretical normal distribution can be determined. This distribution is based on the proportions shown below.
This theoretical normal distribution can then be compared to the actual distribution of the data.
The actual data distribution that has a mean of 66.51 and a standard deviation of 18.265.
Theoretical normal distribution calculated from a mean of 66.51 and a standard deviation of 18.265.
Are the actual data statistically different than the computed normal curve?
There are several methods of assessing whether data are normally distributed or not. They fall into two broad categories: graphical and statistical. The some common techniques are:
Graphical ? Q-Q probability plots ? Cumulative frequency (P-P) plots
Statistical ? W/S test ? Jarque-Bera test ? Shapiro-Wilks test ? Kolmogorov-Smirnov test ? D'Agostino test
Q-Q plots display the observed values against normally distributed data (represented by the line).
Normally distributed data fall along the line.
Graphical methods are typically not very useful when the sample size is small. This is a histogram of the last example. These data do not `look' normal, but they are not statistically different than normal.
Tests of Normality
Ko lmo goro v-Sm irno va
Sh apir o-Wi lk
Sta tisti c
Age
.110
df 1048
Sig.
Sta tisti c
.000
.931
df 1048
a. Lilliefors Significance Correction
Sig. .000
Tests of Normality
Ko lmo goro v-Sm irno va
Sh apir o-Wi lk
TOTAL_VALU
Sta tisti c .283
df 149
Sig.
Sta tisti c
.000
.463
df 149
a. Lilliefors Significance Correction
Sig. .000
Tests of Normality
Ko lmo goro v-Sm irno va
Sh apir o-Wi lk
Z100
Sta tisti c .071
df 100
Sig.
Sta tisti c
.200*
.985
df 100
*. This is a lower bound of the true s ignificance.
a. Lilliefors Significance Correction
Sig. .333
Statistical tests for normality are more precise since actual probabilities are calculated.
Tests for normality calculate the probability that the sample was drawn from a normal population.
The hypotheses used are:
Ho: The sample data are not significantly different than a normal population.
Ha: The sample data are significantly different than a normal population.
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