Harrogath wrote:
Rasec wrote:
Semantics! LOL Thanks for clearing it up!
It is not semantics lol, what you saying is not totally accurate. Look at the alpha as a benchmark or a
threshold, if you pass it, you reject the null, if not you fail to reject the null.
Do not confuse alpha with the p-values, they always shown at the regression table, so you must compare them with the alpha (“the benchmark”).
I agree with your idea; alpha is a threshold (benchmark) probability.
Also, I think many people confuse alpha and the p-value because of the way certain sources choose to define a p-value. Yes, it’s true, the p-value is the smallest level that you could set alpha to and still reject the null (I doubt this phrase increases most readers’ intuitions about a p-value, though). Following this idea can be bad practice and can cause cherry picking results (adjusting alpha up or down after seeing p-values just to find a “result” that fits your objective or only “conducting” tests that you know will give you significant results). Again, this definition (in my mind) isn’t very good.
A better definition (again, my opinion) for a p-value: Given that the null hypothesis is true, a p-value is the probability of seeing a result that is
at least as contradictory to the null hypothesis.
This is part of the reason why we reject the null for (relatively) small p-values. For example, given a level of alpha (0.05), this p-value (0.01) is small (in fact, it is below our threshold for making a Type I error). So, if the null hypothesis
is true, then there is only a 1% chance that we will observe something
at least as contradictory to the null. Therefore, it is (very) unlikely that the null hypothesis is true (reject Ho).
I know this was a little bit off topic, but maybe it’ll be useful to someone.
Edit: I changed a few words to make it a little more precise.
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