Hi @A_Random_Name,
Using a specific statistical test imply having met assumptions of this test.
For t-test, four main assumptions should be met :
- The data are continuous.
- The sample data have been randomly sampled from a population.
- There is homogeneity of variance (i.e., the variability of the data in each group is similar).
- The distribution is approximately normal.
(Source : The t-Test | Introduction to Statistics | JMP)
In your case, you may have several problems to use a t-test here, which may explain the differences you see :
- Because of the low sample size, it may be difficult to check normality, so a parametric test (a statistical test assuming normal distributions) may not be recommended. To check (approximate) normality, you can have a look at the Normal Quantile Plot.
- Homogeneity of variance may also not be respected (in your example, group B seems to have no variance, group C a very small variance and group A more variance). To check this, you can test "Unequal Variance" in the red triangle of the "Fit Y by X" platform. JMP will also provide you Welch's test, a modified t-test not assuming equal variances between your 2 groups, which may be informative for some of the comparisons you're doing.
- If you want to compare more than two groups, t-test shouldn't be used, but Tukey-Kramer (in case of parametric test, to limit type I error) or Steel-Dwass (non parametric version). There are a lot of statistical tests available, take time to see which one is the best fit to your problem, in terms of goals and assumptions met.
Also take a look at confidence interval, you'll see in your comparisons that you have overlap of your Confidence Intervals, which may indicate that you don't have a large effect size and/or a real statistical difference. Due to the low sample size and assumptions not met for a parametric test like t-test, the significant results may be only type I errors (mistaken rejections of an actually true null hypothesis, the true null hypothesis being here that the groups means are the same/equivalent).
Don't hesitate to check the JMP statistical portal or the JMP help in the Fit Y by X platform to get more details about statistical tests available.
I hope these first informations will help you
Victor GUILLER
"It is not unusual for a well-designed experiment to analyze itself" (Box, Hunter and Hunter)