Data Analysis: Descriptive Statistics

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Created by
Ben Harper

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Cards (15)

  • Measures of Central Tendency
    Measures of central tendency are 'averages' we use them to find the most typical values in a set of data.
  • Mean
    Add all the data and divide by however many data values there are.
  • When should I use the mean?
    When there are no extreme data scores.
  • Strengths and limitations of mean
    +It is the most sensitive of all this measures of central tendency as it includes all scores.
    -It is easily distorted by extreme values, it stops the mean representing the whole data.
  • Median
    Put all data values in order of lowest to highest then find the one in the middle. If you have an even number of scores in a data set, put all data values in order of lowest to highest then find the one in the middle. If you have an even number of scores in a data set then the median is halfway between the two middle scores.
  • When should I use the median?
    When there are extreme data scores in the data set
  • Median strengths and limitations
    +Not affected by extreme scores so the average is more realistic
    -Less sensitive then the mean as not all scores are included
  • Mode
    The most commonly occurring data score in the data set. There may be 2 modes (bimodal) or no mode at alll.
  • When should I use the mode?
    When data is categorical.
  • Strengths and limitations of mode
    +Shows the most common category in nominal data
    -Less sensitive than the mean as only a couple of values may be used
    -Not unique as there is likely to be more than one mode
  • Measures of dispersion
    Based on the spread of scores; that is, how far scores vary and differ from each other.
  • Range
    You need to be able to work out the range.
    Take the smallest value from the largest value, and add 1
    e.g. the scores on a maths test out of 20
    16 9 4 19 15 7 10 12
    the range would be (19 - 4) + 1 = 16
    +Easy to calculate
    -Only takes into account 2 most extreme values so isn't representative
  • Standard deviation
    You don't need to work out standard deviation
    + More precise as it encompasses all values
    -Swayed by extreme results