ࡱ> ;=:W Objbjzz 4.eeO::<IKKKKKK$x."okkkok:IkIcI^/507,"v"cc&"" _ooyvkkkk": E: Descriptive statistics and z-scores 1. Consider a psychologist studying individuals' responses to different types of music. In one condition of his study he asks ten participants to listen to loud alternative rock music (e.g., Tool) for five minutes while he measures their heart rate in beats per minute with a photoplethysmograph. The psychologist obtains the following results: 76.1, 82.1, 71.3, 77.7, 87.2, 81.5, 81.0, 72.0, 71.2, 77.9 Enter the data into SPSS and obtain the mean, median, mode, observed range, variance, and standard deviation (s). Using the variance and sample size, compute the SS. Based on your computations, how would you characterize the variability in the data? Are the values low/medium/high in variability? What statistic did you primarily use to answer this question? 2. Convert the 76.1 and the 81.0 values from above to z-scores. Interpret the meaning of the z-scores and interpret whether or not they are extreme using the Empirical Rule (thus assuming a mesokurtic distribution of photoplethysmograph readings). 3. In SPSS convert the data for #1 to z-scores. Obtain the mean and standard deviation from SPSS of these new z-scores. What are the values for the mean and standard deviation? Show the TA your results on SPSS _______ (TA initials) 4. Consider a student who completed a measure of will-power. Her score was equal to 15, and the test mean is 50 with a standard deviation of 20. If we assume the scores on this test form a perfect normal curve, what is her percentile rank? 5. Assume that the following z-scores came from a standard normal distribution. Report the proportion of scores that fall at and below each of the z-scores. {sketch a diagram of the normal distribution, roughly locate the z-value in the distribution, shade in the area you want, and then look the proportion up in the z-table} a. 0.45 b. -1.75 c. 0.00 6. Assume that the following z-scores came from a standard normal distribution. Report the proportion of scores that fall at and above each of the z-scores. a. 2.02 b. -2.55 c. 0.68 7. The following values, taken from a standard normal distribution, reflect the proportion of scores that fall at and below a particular z-score. What z-score corresponds to each? {Here, you have to shade in the area and then look up the z-value} a. 0.95 (95%) b. 0.50 c. 0.20 d. 0.87 e. 0.05 8. What proportion of scores from a standard normal distribution fall at and between the z-scores -0.44 and 1.10? 9. Suppose you wish to compare the mean performance of men and women on the quantitative portion of the GRE. Your colleague (a fellow student) tells you that before comparing the two means you need to convert the mens scores to z-scores and then, separately, convert the womens scores to z-scores. You can then compare the means of the two sets of z-scores. He tells you to do this because comparing men and women on the GRE is like comparing apples to oranges, and you can only do that with z-scores. Is he giving you good advice? Why or why not? 10. In another study your professor tells you to examine your data for non-normality. If the data are not normal, you need to use a type of normalizing transformation. You in fact find that your data are radically skewed to the left. Your colleague tells you that you can easily transform your data to normality by converting the data to z-scores. He reminds you that z-scores are normally distributed and shows you the z-table in the back of his book. Is he giving you good advice? Why or why not? 11. Using SPSS, create a data set with six numbers such that their z-scores are all within the range of -1 to +1, but none of their z-scores is equal to 0. Hint: Look at the formula for the z-score and consider what values it involves, then play around with different numbers until you come up with six that all have z-scores between -1 and +1. TA initials _____ 12. Using SPSS, create a data set of ten numbers such that one of the scores yields a z-score greater than 2.5. Hint: Again, you'll probably need to experiment with different numbers until hitting upon the right combination. TA initials _____ 13. Enter the data for #1 above into your calculator and obtain the mean and standard deviation (s) from the automatic functions in your calculator. Compute the variance from the standard deviation using the square function key, and then compute the sum of squares (SS) from the variance. You can get the SS from the variance by using the following formula: SS = (s2)(n-1). Show the TA that you can obtain the standard deviation from your calculators functions. 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