Difference between revisions of "Manuals/calci/KSTESTCORE"

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<div style="font-size:25px">'''KSTESTCORE (XRange,ObservedFrequency,Test,someconfidence,NewTableFlag)'''</div><br/>
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<div style="font-size:25px">'''KSTESTCORE (XRange,ObservedFrequency,Confidence,NewTableFlag,Test,DoMidPointOfIntervals)'''</div><br/>
*<math>n_1,n_2,n_3...</math> are any real numbers.
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*<math>XRange</math> is the set of values.
  
 
==Description==
 
==Description==
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==Examples==
 
==Examples==
  
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==Related Videos==
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{{#ev:youtube|v=cltWQsmBg0k&t=108s|280|center|Kolmogorov-Smirnov Test }}
  
 
==See Also==
 
==See Also==

Latest revision as of 14:04, 6 December 2018

KSTESTCORE (XRange,ObservedFrequency,Confidence,NewTableFlag,Test,DoMidPointOfIntervals)


  • is the set of values.

Description

  • This function gives the test statistic of the K-S test.
  • K-S test is indicating the Kolmogorov-Smirnov test.
  • It is one of the non parametric test.
  • This test is the equality of continuous one dimensional probability distribution.
  • It can be used to compare sample with a reference probability distribution or to compare two samples.
  • This test statistic measures a distance between the empirical distribution function of the sample and the cumulative distribution function of the reference distribution, or between the empirical distribution functions of two samples.
  • The two-sample KS test is one of the most useful and general nonparametric methods for comparing two samples.
  • It is sensitive to differences in both location and shape of the empirical cumulative distribution functions of the two samples.
  • This test can be modified to serve as a goodness of fit test.
  • The assumption of the KS test is:
  • Null Hypothesis(H0):The sampled population is normally distributed.
  • Alternative hypothesis(Ha):The sampled population is not normally distributed.
  • The Kolmogorov-Smirnov test to compare a data set to a given theoretical distribution is as follows:
  • 1.Data set sorted into increasing order and denoted as , where i=1,...,n.
  • 2.Smallest empirical estimate of fraction of points falling below , and computed as for i=1,...,n.
  • 3.Largest empirical estimate of fraction of points falling below and computed as for i=1,...,n.
  • 4.Theoretical estimate of fraction of points falling below and computed as , where F(x) is the theoretical distribution function being tested.
  • 5.Find the absolute value of difference of Smallest and largest empirical value with the theoretical estimation of points.
  • This is a measure of "error" for this data point.
  • 6.From the largest error, we can compute the test statistic.
  • The Kolmogorov-Smirnov test statistic for the cumulative distribution F(x) is:where is the supremum of the set of distances.
  • is the empirical distribution function for n,with the observations is defined as:where is the indicator function, equal to 1 if and equal to 0 otherwise.
  • Using this function we can identify the following deatils:
Are the data from the Normal distribution or Weibull distribution or Exponential distribution or a logistic distribution.

Examples

Related Videos

Kolmogorov-Smirnov Test

See Also

References

KS Test