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Chapter 3 – Data Description section 3.3 –Measures of Position. Measures of Position Z-Scores. Different data sets can have vastly different characteristics. ( apples and oranges ) Z-Scores allow us to compare them.
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Chapter 3 – Data Descriptionsection 3.3 –Measures of Position
Measures of PositionZ-Scores • Different data sets can have vastly different characteristics. (apples and oranges) • Z-Scores allow us to compare them. • a z-score (or standard score) for a value is obtained by subtracting the mean from the value and dividing the result by the standard deviation.
Measures of PositionZ-Scores Example: • a student scored 65 on a calculus test that had a mean of 50 and a standard deviation of 10. • She scored 30 on a history test with a mean of 25 and a standard deviation of 5. • Compare her relative positions for the two tests
Measures of PositionPercentiles • Percentiles divide the data set into 100 equal parts. • SAT Score Reports usually give percentiles scores • a percentile score of 73 means that you did better than 73 percent of everyone who took the test at the same time as you. • Percentile graphs are similar to Ogives • take a look at the graph on page 133…
Measures of PositionPercentiles The percentile corresponding to a given value X is computed by using the following formula:
Measures of PositionPercentiles Example • A teacher give a 20-point quiz to 10 students. Here are the scores: 18, 15, 12, 6, 8, 2, 3, 5, 20, 10 • Find the percentile rank for a score of 12. • So the kid who scored 12 did better than 65% of the class. • find the percentile rank for a score of 6.
Measures of PositionPercentiles Example • A teacher give a 20-point quiz to 10 students. Here are the scores: 18, 15, 12, 6, 8, 2, 3, 5, 20, 10 • Using the same data, find the score corresponding to the 25th percentile. • what about the 60th percentile?
Measures of PositionPercentiles Going backwards is a little different: • Arrange the data from lowest to highest • substitute into the formula c = np/100 where: • n = total number of values • p = percentile • If c is not a whole number, round up to the next whole number. Count up to that number. • If c is a whole number, average the cth and (c+1)th values.
Measures of PositionPercentiles Example • A teacher give a 20-point quiz to 10 students. Here are the scores: 18, 15, 12, 6, 8, 2, 3, 5, 20, 10 • Using the same data, find the score corresponding to the 25th percentile. • what about the 60th percentile?
Measures of PositionQuartiles • Quartiles divide the data into quarters. • We call the quartiles Q1, Q2, Q3 • First find the median • this is Q2 • Next find the “median” of the data that falls below Q2 • this is Q1 • Finally, find the “median” of the data that falls above Q2 • this is Q3
Measures of PositionQuartiles • The Inter-quartile range (IQR) is another useful measure of variability. • IQR = Q3 – Q1 • This is the range of the middle 50% of the data. • we discussed resistant measures. • is the IQR resistant? • calculate the IQR for the quiz data.
Measures of PositionOutliers • an outlier is an extremely high or low data value when compared to the rest of the data values. • Outliers are: • Data values smaller than Q1 – 1.5(IQR) • Data values larger than Q3 + 1.5(IQR) • Check this set for outliers: • 5, 6, 12, 13, 15, 18, 22, 50
Practice • page 141 #1 – 29 odd!
