1. Chapter 3 Numerically Summarizing Data 3.4 Measures of Location

2. The z-score represents the number of standard deviations that a data value is from the mean. It is obtained by subtracting the mean from the data value and dividing this result by the standard deviation. The z-score is unitless with a mean of 0 and a standard deviation of 1.

3. Population Z - score Sample Z - score

4. EXAMPLE Using Z-Scores The mean height of males 20 years or older is 69.1 inches with a standard deviation of 2.8 inches. The mean height of females 20 years or older is 63.7 inches with a standard deviation of 2.7 inches. Data based on information obtained from National Health and Examination Survey. Who is relatively taller: Shaquille O’Neal whose height is 85 inches or Lisa Leslie whose height is 77 inches.

5. The median divides the lower 50% of a set of data from the upper 50% of a set of data. In general, the kth percentile, denoted P k, of a set of data divides the lower k% of a data set from the upper (100 – k) % of a data set.

6. Computing the kth Percentile, P k Step 1: Arrange the data in ascending order.

7. Step 2: Compute an index i using the following formula: where k is the percentile of the data value and n is the number of individuals in the data set. Computing the kth Percentile, P k

8. Step 1: Arrange the data in ascending order. Step 2: Compute an index i using the following formula: where k is the percentile of the data value and n is the number of individuals in the data set. Step 3: (a) If i is not an integer, round up to the next highest integer. Locate the ith value of the data set written in ascending order. This number represents the kth percentile. (b) If i is an integer, the kth percentile is the arithmetic mean of the ith and (i + 1)st data value. Computing the kth Percentile, P k

9. EXAMPLE Finding a Percentile For the employment ratio data on the next slide, find the (a) 60th percentile (b) 33rd percentile

12. Finding the Percentile that Corresponds to a Data Value Step 1: Arrange the data in ascending order.

13. Step 2: Use the following formula to determine the percentile of the score, x: Percentile of x = Round this number to the nearest integer. Finding the Percentile that Corresponds to a Data Value Step 1: Arrange the data in ascending order.

14. EXAMPLE Finding the Percentile Rank of a Data Value Find the percentile rank of the employment ratio of Michigan.

15. The most common percentiles are quartiles. Quartiles divide data sets into fourths or four equal parts. The 1 st quartile, denoted Q 1, divides the bottom 25% the data from the top 75%. Therefore, the 1 st quartile is equivalent to the 25 th percentile.

16. The most common percentiles are quartiles. Quartiles divide data sets into fourths or four equal parts. The 1 st quartile, denoted Q 1, divides the bottom 25% the data from the top 75%. Therefore, the 1 st quartile is equivalent to the 25 th percentile. The 2 nd quartile divides the bottom 50% of the data from the top 50% of the data, so that the 2 nd quartile is equivalent to the 50 th percentile, which is equivalent to the median.

17. The most common percentiles are quartiles. Quartiles divide data sets into fourths or four equal parts. The 1 st quartile, denoted Q 1, divides the bottom 25% the data from the top 75%. Therefore, the 1 st quartile is equivalent to the 25 th percentile. The 2 nd quartile divides the bottom 50% of the data from the top 50% of the data, so that the 2 nd quartile is equivalent to the 50 th percentile, which is equivalent to the median. The 3 rd quartile divides the bottom 75% of the data from the top 25% of the data, so that the 3 rd quartile is equivalent to the 75 th percentile.

18. EXAMPLE Finding the Quartiles Find the quartiles corresponding to the employment ratio data.

19. Checking for Outliers Using Quartiles Step 1: Determine the first and third quartiles of the data.

20. Step 2: Compute the interquartile range. The interquartile range or IQR is the difference between the third and first quartile. That is, IQR = Q 3 - Q 1 Checking for Outliers Using Quartiles

21. Step 3: Compute the fences that serve as cut-off points for outliers. Lower Fence = Q 1 - 1.5(IQR) Upper Fence = Q 3 + 1.5(IQR) Step 1: Determine the first and third quartiles of the data. Step 2: Compute the interquartile range. The interquartile range or IQR is the difference between the third and first quartile. That is, IQR = Q 3 - Q 1 Checking for Outliers Using Quartiles

22. Step 3: Compute the fences that serve as cut-off points for outliers. Lower Fence = Q 1 - 1.5(IQR) Upper Fence = Q 3 + 1.5(IQR) Step 4: If a data value is less than the lower fence or greater than the upper fence, then it is considered an outlier. Step 1: Determine the first and third quartiles of the data. Step 2: Compute the interquartile range. The interquartile range or IQR is the difference between the third and first quartile. That is, Checking for Outliers Using Quartiles IQR = Q 3 - Q 1

23. EXAMPLE Checking for Outliers Check the employment ratio data for outliers.

24. West Virginia