pgwenthold said:
Although true, this doesn't help us for a variety of reasons -- basically because it answers the wrong question (and does so more or less from the opening sentence).
To start with, there's a fundamental difference between probability and statistics that you're glossing over. Probability is about the future, while statistics is about the past. Now, it's certainly true that the past is a good predictor of the future (often the best one that we have), and for this reason a good statistical model of what has happened can often be modified to a probabilistic model of what will happen. And this is essentially how the frequentists define probability. The probability now is the same number that we will give then after we run an infinite series of experiments.
And in the case of coin flips, I have no problem with seeing how that definition applies, even though I can't actually run the infinitely extended experiment.
But I'm not interested in a coin flip. I don't care about interpreting an outcome. I'm interested in the outcome itself, the outcome of an event that will happen once, and I'm interested not in figuring out why it happened (after the fact), but what will happen, beforehand. I don't want to know why McNabb won, but whether or not he will. And there's even a very simple empirical way to evaluate whether or not the assessed probability is any good -- I want to have more money in my pocket on Monday than I do today.
Which is why I'm a Bayesian. Because the frequentist interpretation doesn't tell me why I should believe someone's assessed probability. There are no meaningful statistics regarding this game, as it hasn't happened yet. On the other hand, there is "evidence" that can be interpreted in a Bayesian framework to yield a "credible-degree-of-belief" (which is one of the usual interpretations of Bayesian formalism). Now, that I understand and can work with.....
Both ways of thinking are good at solving different problems.
