Hey SW VandeCarr,
yep I know what a pdf is - and I am comfortable with the idea that if you integrate between bounds of a pdf that it gives you the probability of your random variable being between those bounds.
As I understood it you get this thing called a z statistic from that formula
[tex]
z = \frac{\bar{X}-\mu}{\sigma}[/tex]
and then you integrate from this value of z you work out to the tail (I guess here I am assuming a one sided test).
I thought that what you were doing with the above z formula, was scaling your probability distribution to a gaussian function with mean mu and variance sigma, which we have tables for the integration bounds.
I guess thinking about your questions about what I know, I don't really understand the connection between that z curve (if it is indeed called that) and the z statistic.
Then I also don't understand why the p value, which as I understand it is the probability of getting the result you got IF the null hypothesis was true, is given by getting the area under a standard normal curve from the z statistic value to the tail.
Thanks