Difference between revisions of "Manuals/calci/MANNWHITNEYUTEST"
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| + | ==See Also== | ||
| + | *[[Manuals/calci/LEVENESTEST| LEVENESTEST]] | ||
| + | *[[Manuals/calci/MOODSMEDIANTEST| MOODSMEDIANTEST]] | ||
| + | *[[Manuals/calci/RIEMANNZETA| RIEMANNZETA]] | ||
| + | |||
==References== | ==References== | ||
*[http://en.wikipedia.org/wiki/Mann%E2%80%93Whitney_U_test Mann-Whitney U test documentation on Wikipedia] | *[http://en.wikipedia.org/wiki/Mann%E2%80%93Whitney_U_test Mann-Whitney U test documentation on Wikipedia] | ||
*[http://www.qimacros.com/hypothesis-testing/mann-whitney-test-excel/ Mann-Whitney test for independent samples in Excel] | *[http://www.qimacros.com/hypothesis-testing/mann-whitney-test-excel/ Mann-Whitney test for independent samples in Excel] | ||
Revision as of 09:59, 12 May 2015
MANNWHITNEYUTEST(xRange,yRange,Confidencelevel,Logicalvalue,Testtype)
- is the array of x values.
- is the array of y values.
- is the value between 0 and 1.
- is either TRUE or FALSE.
- is the type of the test.
is the array of x values.
is the array of y values.
is the value between 0 and 1.
is either TRUE or FALSE.
is the type of the test.Description
- This function gives the test statistic value of the Mann Whitey U test.
- It is one type of Non parametric test.It is also called Mann–Whitney–Wilcoxon,Wilcoxon rank-sum test or Wilcoxon–Mann–Whitney test.
- Using this test we can analyze rank-ordered data.
- This test is alternative to the independent-sample, Student t test, and yields results identical to those obtained from the Wilcoxon Two Independent Samples Test.
- This test is used to compare differences between two independent groups when the dependent variable is either ordinal or continuous, but not normally distributed.
- Mann whitey u test is having the following properties:
- 1.Data points should be independent from each other.
- 2.Data do not have to be normal and variances do not have to be equal.
- 3.All individuals must be selected at random from the population.
- 4.All individuals must have equal chance of being selected.
- 5.Sample sizes should be as equal as possible but for some differences are allowed.
- Suppose the two groups of the populations have distributions with the same shape it can be viewed as a comparison of two medians.With out the assumption the Mann-Whitney test does not compare medians.
- To find statistic value of this test the steps are required:
- 1.For the two observations of values, find the rank all together.
- 2.Add up all the ranks in a first observation.
- 3.Add up all the ranks in a second group.
- 4.Select the larger rank.
- 5.Calculate the number of participants,number of people in each group.
- 6.Calculate the test statistic:
- where and are number of participants and number of people.
- is the larger rank total. is the similar value of .
- 7.State Result: In this step we have to take a decision of null hypothesis either accept or reject depending on the z value using critical value table.
- 8.State Conclusion: To be significant, our obtained U has to be equal to or LESS than this critical value.
and 
are number of participants and number of people.
is the larger rank total.
is the similar value of 
.
Example
| X | Y |
| 87 | 71 |
| 72 | 42 |
| 94 | 69 |
| 49 | 97 |
| 56 | 78 |
| 88 | 84 |
| 74 | 57 |
| 61 | 64 |
| 80 | 78 |
| 52 | 73 |
| 75 | 85 |
| 0 | 91 |
- =MANNWHITNEYUTEST(A1:A12,B1:B13,0.05,true)
| X | Y |
| 19 | 9 |
| 10 | 1 |
| 22 | 8 |
| 2 | 23 |
| 4 | 14.5 |
| 20 | 17 |
| 12 | 5 |
| 6 | 7 |
| 16 | 14.5 |
| 3 | 11 |
| 13 | 18 |
| 0 | 21 |
| Ranks | 127 | 149 |
| Median | 74 | 75.5 |
| n | 11 | 12 |
| U1 | 71 |
| U2 | 61 |
| U | 61 |
| E(U1) | 132 |
| E(U2) | 144 |
| E(U) | 66 |
| StdDev | 16.24807680927192 |
| a | 0.05 |
| z | -0.3077287274483318 |
| p | 0.7582891742833224 |