Standard deviations

Different university departments use different tests to compare student performance and to determine graduate admission status. Three such tests are the GMAT, the LSAT, and the GRE. Where appropriate on the questions below, show how you calculate your values.

Across the United States, results for these exams are normally distributed. What does that mean, and why is this the case?
Other than the GMAT, LSAT, and GRE, provide an example of another normally distributed set of data (you are not limited to student performance exams). Explain why you believe the data are normally distributed.
Suppose that the mean GRE score for the United States is 500 and the standard deviation is 75. Use the 68-95-99.7 (empirical) rule to determine the percentage of students likely to get a score below 275? Is a score below 275 significantly different from the mean? Why or why not?
Choose any GRE score between 200 and 800. Be creative, choosing unusual scores such as 483. This will allow you to likely not choose a score that a fellow student has already selected. Using your chosen score, how many standard deviations from the mean is your score? (This value is called the z-value). Using the table above (or the z table also located in Course Resources), what percentage of students will likely get a score below this value?
Hints: The “standard score,” the “z-score,” the “z-value,” and the “number of standard deviations from the mean” are all saying the same thing. If you cannot find your exact score on the table, use the closest value, or use the z-table in Course Resources.

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