Using SPSS software, all the responses of a thesis survey has been extracted and statistical values has been calculated. A multiple regression analysis and median analysis including mean, standard dev

Click on Skewness and Kurtosis .  Click on Continue .  Finally, click OK . Practice Descriptives Use the High School and Beyond data set (hsbdata.sav) to practice running Descriptives .  Analyze  Descriptive Statistics  Descriptives  Highlight math achievement , then click on the arrow button.  Highlight scholastic aptitude test - math , then click on the arrow button.  Click on Options .  Mean, standard deviation, minimum and maximum should be checked as the defaults.

Click on Skewness and Kurtosis .  Click on Continue .  Click OK . Reading a Descriptives Output The following is the Descriptives Output for the practice session and the presentation. Descriptives This is all there is to the output , but there is a lot of information. Look at the first five columns in blue . The first column has the number of cases with valid data for each test. The next two columns tell you the minimum and maximum score that were earned on each test. Then the mean and standard deviation for each test is listed. Descriptive Statistics N Minimum Maximum Mean Std. Deviation Skewness Kurtosis Statistic Statistic Statistic Statistic Statistic Statistic Std.

Error Statistic Std.

Error math achievement test 75 -1.67 23.67 12.5645 6.67031 .044 .277 -.940 .548 scholastic aptitude test - math 75 250 730 490.53 94.553 .128 .277 .943 .548 Valid N (listwise) 75 Now look at the last two columns in purple. These are the skewness and kurtosis statistics. These statistics are more precise than looking at a histogram of the distribution. The rule to remember is that if either of these values for skewness or kurtosis are less than ± 1.0, then the skewness or kurtosis for the distribution is not outside the range of normality, so the distribution can be considered normal. If the values are greater than ± 1.0 , then the skewness or kurtosis for the distribution is outside the range of normality, so the distribution can not be con sidered normal. This column tells you the number of cases with scores . These two columns tell you the minimum and maximum score that were earned on each test. These two columns tell you the mean score and the standard deviation for each test. These two columns give the skewness and kurtosis statistics. Values should be less than ± 1.0 to be considered normal. For both of these variables the skewness is very close to 0, indicating that the distrib ution of scores in not skewed. But look at the kurtosis. The math achievement test has a negative kurtosis, meaning that the distribution is slightly fl atter than normal or platykurtik. Just the opposite is true for the SAT math test. W hile it is not outside the normal range, the distribution is tall, it is leptokurtik, hence the positive kurtosis value. For skewness, if the value is greater than + 1.0 , the distribution is right skewed. If the value is less than -1.0, the distribution is left skewed. For kurtosis, if the value is greater than + 1.0 , the distribution is leptokurtik. If the value is less than -1.0, the distribution is platykurtik.