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Learn the importance of mode, median, and mean in statistical analysis. Discover how to calculate and interpret these key measures of central tendency effectively. Understand when to utilize each statistic based on the scale of measurement and distribution characteristics.
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Central Tendency Quantitative Methods in HPELS HPELS 6210
Agenda • Introduction • Mode • Median • Mean • Selection
Introduction • Statistics of central tendency: • Describe typical value within the distribution • Describe the middle of the distribution • Describe how values cluster around the middle of the distribution • Several statistics Appropriate measurement depends on: • Scale of measurement • Distribution
Introduction • The Three M’s: • Mode • Median • Mean • Each statistic has its advantages and disadvantages
Agenda • Introduction • Mode • Median • Mean • Selection
Mode • Definition: The score that occurs most frequently • Scale of measurement: • Appropriate for all scales • Only statistic appropriate for nominal data • On a frequency distribution: • Tallest portion of graph • Category with greatest frequency
Central Tendency: Mode • Example: 2, 3, 4, 6, 7, 8, 8, 8, 9, 9, 10, 10, 10, 10 Mode?
Mode • Advantages • Ease of determination • Only statistic appropriate for nominal data • Disadvantages • Unstable • Terminal statistic • Disregards majority of data • Lack of precision (no decimals) • There maybe more than one mode • Bimodal two • Multimodal > 2
Calculation of the Mode Instat • Statistics tab • Summary tab • Group tab • Select “group” • Select column of interest • OK
Agenda • Introduction • Mode • Median • Mean • Selection
Median • Definition:The score associated with the 50th percentile • Scale of measurement: • Ordinal, interval or ratio • Methods of determination: • N = even • List scores from low to high • Median is the middle score • N = odd • List scores from low to high • Median = sum of two middle numbers / 2
Central Tendency: Median • Example 1: 1, 2, 3, 4, 5 • Example 2: 1, 2, 3, 4 Odd #: Median = middle number Even #: Median = middle two numbers / 2
Median • Advantages • Ease of determination • Effective with ordinal data • Effective with skewed data • Not sensitive to extreme outliers • Examples: Housing costs • Disadvantages: • Terminal statistic • Not appropriate for nominal data • Disregards majority of data • Lack of precision
Calculation of the Median Instat • Statistics tab • Summary tab • Describe tab • Choose “additional statistics” • Choose “median” • OK
Agenda • Introduction • Mode • Median • Mean • Selection
Mean • Definition: Arithmetic average • Most common measure of central tendency • Scale of measurement: • Interval or ratio • Statistical notation: • Population: “myoo” • Sample: x-bar or M
Mean • Method of determination: • = ΣX/N • X-bar or M = ΣX/n • Advantages: • Sensitive to all values • Considers all data • Not a terminal statistic • Precision (decimals) • Disadvantages: • Not appropriate with nominal or ordinal data • Sensitive to extreme outliers
Calculation of the Mean Instat • Same as median • Mean is calculated automatically
Agenda • Introduction • Mode • Median • Mean • Selection
When to Use the Mode • Appropriate for all scales of measurement • Use the mode with nominal data
When to Use the Median • Appropriate with ordinal, interval and ratio data • Especially effective with ordinal data • DO NOT use with nominal data • Use the median with skewed data
When to Use the Median • Use the median with undetermined values
When to Use the Median • Use the median with open-ended distributions
When to Use the Mean • Use the mean with interval or ratio data • Use the mean when the distribution is normal or near normal
Textbook Problem Assignment • Problems: 2, 4, 6, 8, 12, 16, 22.
