Origin/OriginPro supports the following set of X-Functions for hypothesis testing:
| Name | Brief Description |
|---|---|
| rowttest2 (Pro Only) | Perform a two-sample t-test on rows. |
| ttest1 | Compare the sample mean to the hypothesized population mean. |
| ttest2 | Compare the sample means of two samples. |
| ttestpair | Determine whether two sample means are equal in the case that they are matched. |
| vartest1 (Pro Only) |
Determine whether the sample variance is equal to a specified value. |
| vartest2 (Pro Only) |
Determine whether two sample variances are equal. |
For a full description of these X-functions, including input and output arguments, please see the Hypothesis Testing.
If you need to know whether the mean value of a sample is consistent with a hypothetical value for a given confidence level, consider using the one-sample T-test. Note that this test assumes that the sample is a normally distributed population. Before we apply the one-sample T-test, we should verify this assumption.
//Import a sample data newbook; fname$ = system.path.program$ + "Samples\Statistics\diameter.dat"; impasc; //Normality test swtest irng:=col(a) prob:=p1; if (p1 < 0.05) { type "The sample is not likely to follow a normal distribution." } else { // Test whether the mean is 21 ttest1 irng:=col(1) mean:=21 tail:=two prob:=p2; if (p2 < 0.05) { type "At the 0.05 level, the population mean is"; type "significantly different from 21."; } else { type "At the 0.05 level, the population mean is NOT"; type "significantly different from 21."; } }
The ttest2 X-Function is provided for performing two-sample t-test. The example below shows how to use it and print the results.
// Import sample data newbook; string fpath$ = "Samples\Statistics\time_raw.dat"; string fname$ = system.path.program$ + fpath$; impAsc; // Perform two-sample t-test on two columns // Sample variance is not assumed to be equal ttest2 irng:=(col(1), col(2)) equal:=0; // Type some results type "Value of t-test statistic is $(ttest2.stat)"; type "Degree of freedom is $(ttest2.df)"; type "P-value is $(ttest2.prob)"; type "Conf. levels in 95% is ($(ttest2.lcl), $(ttest2.ucl))";
The rowttest2 X-Function can be used to perform a two-sample T-test on rows. The following example demonstrates how to compute the corresponding probability value for each row:
// Import sample data newbook; string fpath$ = "Samples\Statistics\ANOVA\Two-Way_ANOVA_raw.dat"; fname$ = system.path.program$ + fpath$; impasc; // Two-sample T-test on a row rowttest2 irng1:=(col(a):col(c)) irng2:=(col(d):col(f)) tail:=two prob:=<new>;
Origin provides the ttestpair X-Function for pair-sample t-test analysis, so to determine whether the means of two same-sized and dependent samples from a normal distribution are equal or not, and calculates the confidence interval for the difference between the means. The example below first imports a data file, and then perform pair-sample t-test, and then output the related results.
// Import sample data newbook; string fpath$ = "Samples\Statistics\abrasion_raw.dat"; string fname$ = system.path.program$ + fpath$; impasc; // Perform pair-sample t-test one two columns // Hypothetical means difference is 0.5 // And Tail is upper tailed ttestpair irng:=(col(1), col(2)) mdiff:=0.5 tail:=upper; // Type the results type "Value of paired-sample t-test statistic is $(ttestpair.stat)"; type "Degree of freedom for the paired-sample t-test is $(ttestpair.df)"; type "P-value is $(ttestpair.prob)"; type "Conf. levels in 95% is ($(ttestpair.lcl), $(ttestpair.ucl))";
X-Function vartest1 is used to perform a chi-squared variance test, so to determine whether the sample from a normal distribution could have a given hypothetical vaiance value. The following example will perform one-sample test for variance, and output the P-value.
// Import sample data newbook; string fpath$ = "Samples\Statistics\vartest1.dat"; string fname$ = system.path.program$ + fpath$; impasc; // Perform F-test // Tail is two tailed // Test variance is 2.0 // P-value stored in variable p vartest1 irng:=col(1) var:=2.0 tail:=two prob:=p; // Ouput P-value p = ;
F-test, also called two-sample test for variance, is performed by using vartest2 X-Function.
// Import sample data newbook; string fpath$ = "Samples\Statistics\time_raw.dat"; string fname$ = system.path.program$ + fpath$; impasc; // Perform F-test // And Tail is upper tailed vartest2 irng:=(col(1), col(2)) tail:=upper; // Output the result tree vartest2.=;