1 / 16

Measures of Central Tendency

Measures of Central Tendency. Measures of Central Tendency. Central Tendency = values that summarize/ represent the majority of scores in a distribution Three main measures of central tendency: Mean ( = Sample Mean; μ = Population Mean ) Median Mode. Measures of Central Tendency.

ford
Download Presentation

Measures of Central Tendency

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Measures of Central Tendency

  2. Measures of Central Tendency • Central Tendency = values that summarize/ represent the majority of scores in a distribution • Three main measures of central tendency: • Mean ( = Sample Mean; μ = Population Mean) • Median • Mode

  3. Measures of Central Tendency • Mode = most frequently occurring data point

  4. Measures of Central Tendency • Mode = (3+4)/2 = 3.5

  5. Measures of Central Tendency • Median = the middle number when data are arranged in numerical order • Data: 3 5 1 • Step 1: Arrange in numerical order 1 3 5 • Step 2: Pick the middle number (3) • Data: 3 5 7 11 14 15 • Median = (7+11)/2 = 9

  6. Measures of Central Tendency • Median • Median Location = (N +1)/2 = (56 + 1)/2 = 28.5 • Median = (3+4)/2 = 3.5

  7. Measures of Central Tendency • Mean = Average = X/N • X = 191 Mean = 191/56 = 3.41

  8. Measures of Central Tendency • Occasionally we may need to add or subtract, multiply or divide, a certain fixed number (constant) to all values in our dataset • i.e. curving a test • What do you think would happen to the average score if 4 points were added to each score? • What would happen if each score was doubled?

  9. Measures of Central Tendency • Characteristics of the Mean • Adding or subtracting a constant from each score also adds or subtracts the same number from the mean • i.e. adding 10 to all scores in a sample will increase the mean of these scores by 10 X = 751 Mean = 751/56 = 13.41

  10. Measures of Central Tendency • Characteristics of the Mean • Multiplying or dividing a constant from each score has similar effects upon the mean • i.e. multiplying each score in a sample by 10 will increase the mean by 10x X = 1910 Mean = 1910/56 = 34.1

  11. Measures of Central Tendency • Advantages and Disadvantages of the Measures: • Mode • Typically a number that actually occurs in dataset • Has highest probability of occurrence • Applicable to Nominal, as well as Ordinal, Interval and Ratio Scales • Unaffected by extreme scores • But not representative if multimodal with peaks far apart (see next slide)

  12. Measures of Central Tendency • Mode

  13. Measures of Central Tendency • Advantages and Disadvantages of the Measures: • Median • Also unaffected by extreme scores Data: 5 8 11 Median = 8 Data: 5 8 5 million Median = 8 • Usually its value actually occurs in the data • But cannot be entered into equations, because there is no equation that defines it • And not as stable from sample to sample, because dependent upon the number of scores in the sample

  14. Measures of Central Tendency • Advantages and Disadvantages of the Measures: • Mean • Defined algebraically • Stable from sample to sample • But usually does not actually occur in the data • And heavily influenced by outliers Data: 5 8 11 Mean = 8 Data: 5 8 5 million Mean = 1,666,671

  15. Measures of Central Tendency • Advantages and Disadvantages of the Measures: • Mean • Sums/totals vs. average or mean values • i.e. Basketball player has 134 total points this season, while average of other players is 200 points • What would most people reasonably conclude?

  16. Measures of Central Tendency • What if he played fewer games than other players (due to injury)? • Looking at averages, the player actually averaged ~50 pts. per game, but has only played three games, whereas other players average 20 or less pts. over more games • Using this much richer information, our conclusions would be completely different – AVERAGES ARE ALWAYS MORE INFORMATIVE THAN SIMPLE SUMS

More Related