Difference between revisions of "Manuals/calci/MOODSMEDIANTEST"

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==Feature==
+
<div style="font-size:25px">'''MOODSMEDIANTEST (XRange1,XRange2,ConfidenceLevel,NewTableFlag)'''</div><br/>
 +
*<math>XRange1</math> is the array of values.
 +
*<math>XRange2</math> is the array of values.
 +
*<math>ConfidenceLevel</math> is the value between 0 and 1.
 +
*<math>NewTableFlag</math> is either TRUE or FALSE.
 +
 
 +
==Description==
 +
*This function gives the test statistic of the Mood's median test.
 +
*It is one of the Non parametric test.
 +
*This function is used to test the equality of medians from two or more populations.
 +
*So it provides a nonparametric alternative to the one way ANOVA.
 +
*It is a special case of Pearson's chi-squared test.
 +
*This function works when the Y variable is continuous,discrete-ordinal or discrete -count,and the X variable is discrete with two or more attributes.
 +
*This test does not require normally distributed data,which is does not mean that it is assumption free.
 +
*The following assumptions are required to test this function:
 +
*1.Sample data drawn from the populations of interest are unbiased and representative.
 +
*2.Data of k populations are continuous or ordinal when the spacing between adjacent values is not constant.
 +
*3.k populations are independent from each other.
 +
*4.The distributions of the populations the samples were drawn from all have the same shape.
 +
*The test interpretation is:
 +
*Null hypothesis<math>(H_0)</math>:The population medians all are equal.Alternative hypothesis<math>(H_a)</math>:Atleast one of the medians is different from another.
 +
*If the null hypothesis is true, any given observation will have probability 0.5 of being greater than the shared median.
 +
*For each sample,the number of observations greater than the shared median would have a binomial distribution with p=0.5
 +
*'''The procedure of the test is''':
 +
*1. Determine the overall median.
 +
*The combined data from all groups are sorted and the median is calculated:
 +
:<math>md=\frac{(x_{(\frac{n}{2})}+x_{(\frac{n}{2}+1)})}{2}</math>,if n is even.
 +
:<math>md=x_{(\frac{(n+1)}{2})}</math>,if n is odd.
 +
*where <math>n=\sum_{i=1}^k n_i</math>.
 +
*<math>x_{(1)},x_{(2)}....x_{(n)}</math>,is the ordered data of all observations from small to large.
 +
*2. For each sample, count how many observations are greater than the overall median, and how many are equal to or less than it.
 +
*3. Put the counts from step 2 into a 2xk contingency table:
 +
*4. Perform a chi-square test on this table, testing the hypothesis that the probability of an observation being greater than the overall median is the same for all populations.
 +
 
 +
==Example==
 +
{| class="wikitable"
 +
|+Spreadsheet
 +
|-
 +
! !! A !! B 
 +
|-
 +
! 1
 +
| 30 || 32 
 +
|-
 +
! 2
 +
| 10 || 13
 +
|-
 +
! 3
 +
| 22 || 33 
 +
|-
 +
! 4
 +
| 20 || 26
 +
|-
 +
!5
 +
| 43 || 34
 +
|}
 +
*=MOODSMEDIANTEST(A1:A5,B1:B5,0.05,TRUE)
 +
'''MOODSMEDIANTEST STATISTICS'''
 +
{| class="wikitable"
 +
|-
 +
|MEAN1 ||25
 +
|-
 +
|MEDIAN1 ||22
 +
|-
 +
|MEAN2 ||27.6
 +
|-
 +
|MEDIAN2 ||32
 +
|-
 +
|OVERALLMEDIAN ||28
 +
|-
 +
|GREATERMEDIAN1 ||2
 +
|-
 +
|GREATERMEDIAN2 || 3
 +
|-
 +
|LESSEQUALMEDIAN1 ||3
 +
|-
 +
|LESSEQUALMEDIAN2 ||2
 +
|-
 +
|OBSERVED FREQUENCY ||
 +
    2 3
 +
    3 2
 +
|-
 +
|EXPECTED FREQUENCY ||
 +
  2.5 2.5
 +
  2.5 2.5
 +
|-
 +
|PVALUE ||0.5270892568655381
 +
|}
 +
RESULT AS PVALUE > 0.05, MEDIANS OF THE POPULATIONS FROM WHICH THE TWO SAMPLES ARE DERIVED ARE EQUAL
 +
 
 +
==Related Videos==
 +
 
 +
{{#ev:youtube|9FZUS5QKGAU|280|center|Moods Median Test}}
 +
 
 +
==See Also==
 +
*[[Manuals/calci/LEVENESTEST| LEVENESTEST]]
 +
*[[Manuals/calci/FRIEDMANTEST| FRIEDMANTEST]]
 +
*[[Manuals/calci/RIEMANNZETA| RIEMANNZETA]]
 +
*[[Manuals/calci/MANNWHITNEYUTEST| MANNWHITNEYUTEST]]
 +
 
 +
==References==
 +
*[http://www2.hawaii.edu/~taylor/z631/moods.pdf Mood's Median Test]
 +
 
 +
 
 +
 
 +
*[[Z_API_Functions | List of Main Z Functions]]
 +
 
 +
*[[ Z3 |  Z3 home ]]

Latest revision as of 16:42, 14 June 2018

MOODSMEDIANTEST (XRange1,XRange2,ConfidenceLevel,NewTableFlag)


  • is the array of values.
  • is the array of values.
  • is the value between 0 and 1.
  • is either TRUE or FALSE.

Description

  • This function gives the test statistic of the Mood's median test.
  • It is one of the Non parametric test.
  • This function is used to test the equality of medians from two or more populations.
  • So it provides a nonparametric alternative to the one way ANOVA.
  • It is a special case of Pearson's chi-squared test.
  • This function works when the Y variable is continuous,discrete-ordinal or discrete -count,and the X variable is discrete with two or more attributes.
  • This test does not require normally distributed data,which is does not mean that it is assumption free.
  • The following assumptions are required to test this function:
  • 1.Sample data drawn from the populations of interest are unbiased and representative.
  • 2.Data of k populations are continuous or ordinal when the spacing between adjacent values is not constant.
  • 3.k populations are independent from each other.
  • 4.The distributions of the populations the samples were drawn from all have the same shape.
  • The test interpretation is:
  • Null hypothesis:The population medians all are equal.Alternative hypothesis:Atleast one of the medians is different from another.
  • If the null hypothesis is true, any given observation will have probability 0.5 of being greater than the shared median.
  • For each sample,the number of observations greater than the shared median would have a binomial distribution with p=0.5
  • The procedure of the test is:
  • 1. Determine the overall median.
  • The combined data from all groups are sorted and the median is calculated:
,if n is even.
,if n is odd.
  • where .
  • ,is the ordered data of all observations from small to large.
  • 2. For each sample, count how many observations are greater than the overall median, and how many are equal to or less than it.
  • 3. Put the counts from step 2 into a 2xk contingency table:
  • 4. Perform a chi-square test on this table, testing the hypothesis that the probability of an observation being greater than the overall median is the same for all populations.

Example

Spreadsheet
A B
1 30 32
2 10 13
3 22 33
4 20 26
5 43 34
  • =MOODSMEDIANTEST(A1:A5,B1:B5,0.05,TRUE)

MOODSMEDIANTEST STATISTICS

MEAN1 25
MEDIAN1 22
MEAN2 27.6
MEDIAN2 32
OVERALLMEDIAN 28
GREATERMEDIAN1 2
GREATERMEDIAN2 3
LESSEQUALMEDIAN1 3
LESSEQUALMEDIAN2 2
OBSERVED FREQUENCY
   2	3
   3	2
EXPECTED FREQUENCY
 2.5	2.5
 2.5	2.5
PVALUE 0.5270892568655381

RESULT AS PVALUE > 0.05, MEDIANS OF THE POPULATIONS FROM WHICH THE TWO SAMPLES ARE DERIVED ARE EQUAL

Related Videos

Moods Median Test

See Also

References