Sign in or register
for additional privileges

Quantitative Literacy and the Humanities

aa, Author

You appear to be using an older verion of Internet Explorer. For the best experience please upgrade your IE version or switch to a another web browser.

Statistical thinking: Central tendencies

Students define and calculate mean, median and mode. 

  • Mean: the average
  • Median: the middle number
  • Mode: the most common number


Students recognize that the difference between mean and median can change the interpretation of the data.

  • If there are significant outliers that might skew the mean, the median is probably a better number.
  • But, if the outliers are an important part of the story, then the mean might be better.
  • You can, of course, present both!  And if only the median or the mean is presented, what story is the data telling (or not telling)?


Students recognize Simpson’s Paradox: averaging the averages of two groups does not yield the average of all the members of the two groups.  The size of the two groups is crucial.

  • Example: In one study, 50 percent of participants improved from a treatment.  In a second study, 30 percent of participants improved from treatment.  What percentage of all the participants improved?  Answer!
Comment on this page
 

Discussion of "Statistical thinking: Central tendencies"

Add your voice to this discussion.

Checking your signed in status ...

Previous page on path Statistical thinking, page 4 of 8 Next page on path