7.6: Critical Analysis

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While probability is used extensively in many studies, we will need further development of the statistical framework used with the scientific method before most of those studies can be critically analyzed. We will highlight a couple of applications of probability where we will discuss how to interpret some probabilities that are reported in several situations. Some of these applications deal with such things as having the same birthday as someone else, while others are about more serious subjects.

When considering studies that use probability, keep in mind that the computation of specific probabilities may be very complicated and may use techniques that require specialized training to understand. Even the assumptions used to compute probabilities in some cases are very technical in nature. In these cases, an individual can still assess the conclusions that are based on the probabilities. For example, when a study concludes that something is rare, and includes a probability, you can assess for yourself whether the probability really means that the event is rare. Such a determination is often related to the context of the outcome. For example, a probability equal to 0.10 may seem rare if you are considering the probability that your favorite team might win a game, while the same probability may not seem rare if it is connected to contracting serious disease. These are conclusions that everyone makes for themselves when assessing a probability.

Many people do not have a great deal of experience thinking in terms of odds, particularly when they are not in the form of 1 in \(x\), where \(x\) is some whole number. It is often convenient to convert odds into probabilities to make the results easier to understand, though it can be somewhat tedious for interpreting the results of large research projects.

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