Difference between revisions of "Manuals/calci/CHITEST"
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==Description== | ==Description== | ||
− | *This function gives the | + | *This function gives the the value from the chi-squared distribution. i.e it calculates <math>\chi^2</math> statistic and degrees of freedom, then calls CHIDIST. |
− | + | The conditions of <math>\chi^2</math> test is | |
− | + | The table should be 2x2 or more than 2x2 | |
− | * | + | Each observations should not be dependent |
− | * | + | All expected values should be 10 or greater. |
− | * | + | Each cell has an expected frequency of at least five. |
− | * | + | *The <math>\chi^2</math> test first calculates a <math>\chi^2</math> statistic using the formula: |
− | + | X^2= summation(i=1 to columns)summation(j=1 to rows)(observed ij-expected ij)^2/grand total | |
− | + | *observed ij is the array of the observed values in a given set of values | |
− | + | *expected ij = column i total*row j total/grand total | |
− | + | *observed and expected must have the same number of rows and columns and there must be atleast 2 values in each. | |
− | + | *A low result of <math>\chi^2</math> is an indicator of independence. | |
− | + | *From the formula of <math>\chi^2</math> we will get <math>\chi^2</math> is always positive or 0. | |
− | + | *0 only if observed ij=expected ij for each i and j. | |
− | + | *CHITEST uses the <math>\chi^2</math> distribution with the number of Degrees of Freedom df. | |
− | + | where df=(r-1)(c-1),r>1 and c>1. | |
+ | If r=1 and c>1, then df = c-1 or if r>1 and c=1, then df=r-1. | ||
+ | If r=c=1 then this function will give the error result | ||
Revision as of 00:27, 25 November 2013
CHITEST(ar,er)
- is the array of observed values
- is the array of expected values
Description
- This function gives the the value from the chi-squared distribution. i.e it calculates statistic and degrees of freedom, then calls CHIDIST.
The conditions of test is
The table should be 2x2 or more than 2x2 Each observations should not be dependent All expected values should be 10 or greater. Each cell has an expected frequency of at least five.
- The test first calculates a statistic using the formula:
X^2= summation(i=1 to columns)summation(j=1 to rows)(observed ij-expected ij)^2/grand total
- observed ij is the array of the observed values in a given set of values
- expected ij = column i total*row j total/grand total
- observed and expected must have the same number of rows and columns and there must be atleast 2 values in each.
- A low result of is an indicator of independence.
- From the formula of we will get is always positive or 0.
- 0 only if observed ij=expected ij for each i and j.
- CHITEST uses the distribution with the number of Degrees of Freedom df.
where df=(r-1)(c-1),r>1 and c>1. If r=1 and c>1, then df = c-1 or if r>1 and c=1, then df=r-1. If r=c=1 then this function will give the error result
Column1 | Column2 | Column3 | Column4 | |
Row1 | 45 | 38 | 0.000313 | |
Row2 | 10 | 23 | ||
Row3 | 12 | 26 | ||
Row4 | 40.5 | 49.36 | ||
Row5 | 19.56 | 16.44 | ||
Row6 | 17.05 | 17.41 |
Let’s see an example
B C
45 38
10 23
12 26
40.5 49.36
19.56 16.44
17.05 17.41
CHITEST (a, b)
i.e. =CHITEST (B2; C4, B5:C7) is 0.003