A Mann Whitney test compares two independent samples to test the null hypothesis that two populations have the same distribution function against the alternative hypothesis that the two distribution functions are different.
The STATS_MW_TEST
does not assume that the differences between the samples are normally distributed, as do the STATS_T_TEST_
* functions. This function takes three arguments and a return value of type VARCHAR2
. expr1
classifies the data into groups. expr2
contains the values for each of the groups. The function returns one value, determined by the third argument. If you omit the third argument, the default is TWO_SIDED_SIG
. The meaning of the return values is shown in the table that follows.
The significance of the observed value of Z or U is the probability that the variances are different just by chancea number between 0 and 1. A small value for the significance indicates that the variances are significantly different. The degree of freedom for each of the variances is the number of observations in the sample minus 1.
Table 57 STATS_MW_TEST Return Values
Return Value  Meaning 


The observed value of Z 

The observed value of U 

Onetailed significance of Z 

Twotailed significance of Z 
The onetailed significance is always in relation to the upper tail. The final argument, expr3
, indicates which of the two groups specified by expr1 is the high value (the value whose rejection region is the upper tail).
STATS_MW_TEST
computes the probability that the samples are from the same distribution by checking the differences in the sums of the ranks of the values. If the samples come from the same distribution, then the sums should be close in value.
STATS_MW_TEST Example Using the Mann Whitney test, the following example determines whether the distribution of sales between men and women is due to chance:
SELECT STATS_MW_TEST (cust_gender, amount_sold, 'STATISTIC') z_statistic, STATS_MW_TEST (cust_gender, amount_sold, 'ONE_SIDED_SIG', 'F') one_sided_p_value FROM sh.customers c, sh.sales s WHERE c.cust_id = s.cust_id; Z_STATISTIC ONE_SIDED_P_VALUE   1.4011509 .080584471