8.7: How Do We Get the P Value for the Statistical Test?

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Note that when we say p < .05, that .05 is something that we, the researchers, set. The reason we set it at .05 is a different story, and we will cover that when we discuss Type I and Type II errors. But how does the actual p value get generated for a statistical test? In other words, if a statistical test, such as a t-test = 2.45, p = .027, how did the p value of .027 get calculated?

The answer to that question is that it is based on a t-distribution. Statistical inference depends on knowing the population mean and SD. Recall from the normal distribution discussion that for normal population distribution, all values will fall under the normal distribution curve in the form of values that are 68%, 95%, and 99% above and or below the mean.

But recall that it is a population distribution; by definition, the population is unknown. Consequently, we do not know the population's mean and standard deviation. What do we do? We do what we always do: we estimate population means from sample means. Recall that every time we estimate using a sample, our estimates vary because each sample gives us a different estimate. What do we do?

We use a t-distribution. Not a population distribution. It is a sample distribution. The t-distribution is a table of generated t-values corresponding to p values for a given sample distribution. If the sample is large, the sample means will be similar to the population mean. Based on data simulations, if the sample size is n >= 30, the t-value is 1.96, and results are significant at the p < .05 level. If n < 30, the t-value is adjusted; consult a t-table. These t-tables are found in most introductory statistics textbooks in the appendix. BTW, the formula for calculating a p value is elusive, and it involves calculus. Learning this calculation is not easy and is not worth your time. I never use a t-table; your statistical software will compute the p value for you, and SPSS always provides a p value for you. You do not have to compute the p value associated with the statistical test. Let the computer program do it for you.

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