This general topic has been discussed before here but I am unsatisfied. The JMP expert posted a formula that perhaps explains what's going on. But I have a conceptual question. I would think that weighting is useful to adjust estimates if one wants to weight, say, some subsamples more than others. Like if one had 100 men and 1,000 women, and one wanted to estimate the mean and SD of a sample that had equal numbers of men and women, one could weight observations by 1100/100 and 1100/1000, respectively.
Here's the thing: If I start with any distribution of observations in JMP and change the weight from "1," the mean stays the same (as it should–it shouldn't matter if I weight all observations by 1, 2, 3, or 6,000), that shouldn't change the distribution mean, but the standard deviation DOES change. Why does this make any sense? JMP experts, please don't just provide the formula showing, if it does, that this happens. Why would it make sense conceptually? It seems to me that neither the mean nor SD should change if you weight by 2 (which effectively just doubles your sample size) or 3 (which triples it). Sure it increases sums of squares, but SD is a function of the AVERAGE sum of squares.
Thank you.
Mike Bailey
p.s. I attach a file "Weightsdata" you can use to verify if you want. The variable "Weight" has a value of 1, so weighting with it shouldn't change things; "Weight 2" has a value of 2, and "Weight 3" has a value of 3.
