Pre-Algebra 4-4 Variability Learn to find measures of variability.
Pre-Algebra 4-4 Variability The table below summarizes a veterinarian’s records for kitten litters born in a given year. Litter Size Number of Litters While central tendency describes the middle of a data set, variability describes how spread out the data is. The table below summarizes a veterinarian's records for kitten litters born in a given year. While central tendency describes the middle of a data set, variability describes how spread out the data is.
Pre-Algebra 4-4 Variability The table below summarizes a veterinarian’s records for kitten litters born in a given year. Litter Size Number of Litters While central tendency describes the middle of a data set, variability describes how spread out the data is. The range of a data set is the largest value minus the smallest value. The range is affected by outliers, so another measure is often used. Quartiles divide a data set into four equal parts. The third quartile minus the first quartile is the range for the middle half of the data.
Pre-Algebra 4-4 Variability Litter Size23456 Number of Litters The range of a data set is the largest value minus the smallest value. For the kitten data, the range is 6 — 2 = 4. The range is affected by outliers, so another measure is often used. Quartiles divide a data set into four equal parts. The third quartile minus the first quartile is the range for the middle half of the data. Kitten Data Lower halfUpper half First quartile: 3 median of lower half Third quartile: 5 median of upper half Median: 4 (second quartile)
Pre-Algebra 4-4 Variability Find the range and the first and third quartiles for the data set. Example 1A: Finding Measures of Variability A. 15, 83, 75, 12, 19, 74, Order the values. range: 83 – 12 = 71 first quartile: 15 third quartile: 75
Pre-Algebra 4-4 Variability Find the range and the first and third quartiles for the data set. Example 1B: Finding Measures of Variability B. 75, 61, 88, 79, 79, 99, 63, range: 99 – 61 = 38 first quartile: = third quartile: = Order the values.
Pre-Algebra 4-4 Variability A box-and-whisker plot shows the distribution of data. The middle half of the data is represented by a “box” with a vertical line at the median. The lower fourth and upper fourth quarters are represented by “whiskers” that extend to the smallest and largest values. First quartile Third quartile Median
Pre-Algebra 4-4 Variability Use the given data to make a box-and-whisker plot: 21, 25, 15, 13, 17, 19, 19, 21 Example 2: Making a Box-and-Whisker Plot Step 1. Order the data and find the smallest value, first quartile, median, third quartile, and largest value smallest value: 13 largest value: 25 first quartile: = third quartile: = median: =
Pre-Algebra 4-4 Variability Step 1. Order the data and find the smallest value, first quartile, median, third quartile, and largest value. Use the given data to make a box-and-whisker plot Step 2. Draw a number line and plot a point above each value from Step 1. smallest value first quartile 16 median 19 third quartile 21 largest value 25 Example 2 Continued
Pre-Algebra 4-4 Variability Step 2. Draw a number line and plot a point above each value. Use the given data to make a box-and-whisker plot Step 3. Draw the box and whiskers Example 2 Continued
Pre-Algebra 4-4 Variability The table below summarizes a veterinarian’s records for kitten litters born in a given year. Litter Size Number of Litters While central tendency describes the middle of a data set, variability describes how spread out the data is. The range of a data set is the largest value minus the smallest value. The range is affected by outliers, so another measure is often used. Quartiles divide a data set into four equal parts. The third quartile minus the first quartile is the range for the middle half of the data.
Pre-Algebra 4-4 Variability Litter Size23456 Number of Litters The range of a data set is the largest value minus the smallest value. For the kitten data, the range is 6 — 2 = 4. The range is affected by outliers, so another measure is often used. Quartiles divide a data set into four equal parts. The third quartile minus the first quartile is the range for the middle half of the data. Kitten Data Lower halfUpper half First quartile: 3 median of lower half Third quartile: 5 median of upper half Median: 4 (second quartile)
Pre-Algebra 4-4 Variability Find the range and the first and third quartiles for the data set. Try This: Example 1A A. 25, 38, 66, 19, 91, 47, Order the values. range: 91 – 13 = 78 first quartile: 19 third quartile: 66
Pre-Algebra 4-4 Variability A box-and-whisker plot shows the distribution of data. The middle half of the data is represented by a “box” with a vertical line at the median. The lower fourth and upper fourth quarters are represented by “whiskers” that extend to the smallest and largest values. First quartile Third quartile Median
Pre-Algebra 4-4 Variability Use the given data to make a box-and-whisker plot. 31, 23, 33, 35, 26, 24, 31, 29 Try This: Example 2 Step 1. Order the data and find the smallest value, first quartile, median, third quartile, and largest value. smallest value: 23 largest value: 35 first quartile: = third quartile: = median: =
Pre-Algebra 4-4 Variability Use the given data to make a box-and-whisker plot Step 2. Draw a number line and plot a point above each value Try This: Example 2 Continued
Pre-Algebra 4-4 Variability Step 2. Draw a number line and plot a point above each value. Use the given data to make a box-and-whisker plot Step 3. Draw the box and whiskers Try This: Example 2 Continued
Pre-Algebra 4-4 Variability Example 3: Comparing Data Sets Using Box-and- Whisker Plots These box-and-whisker plots compare the ages of the first ten U.S. presidents with the ages of the last ten presidents (through George W. Bush) when they took office. Note: 57 is the first quartile and the median.
Pre-Algebra 4-4 Variability Example 3 Continued A. Compare the medians and ranges. The median for the first ten presidents is slightly greater. The range for the last ten presidents is greater. Note: 57 is the first quartile and the median.
Pre-Algebra 4-4 Variability Example 3 Continued B. Compare the differences between the third quartile and first quartile for each. The difference between the third quartile and first quartile is the length of the box, which is greater for the last ten presidents. Note: 57 is the first quartile and the median.
Pre-Algebra 4-4 Variability B. 45, 31, 59, 49, 49, 69, 33, Order the values. range: 69 – 31 = 38 Find the range and the first and third quartiles for the data set. Try This: Example 1B first quartile: = third quartile: =
Pre-Algebra 4-4 Variability Use the given data to make a box-and-whisker plot: 21, 25, 15, 13, 17, 19, 19, 21 Example 2: Making a Box-and-Whisker Plot Step 1. Order the data and find the smallest value, first quartile, median, third quartile, and largest value smallest value: 13 largest value: 25 first quartile: = third quartile: = median: =
Pre-Algebra 4-4 Variability Step 1. Order the data and find the smallest value, first quartile, median, third quartile, and largest value. Use the given data to make a box-and-whisker plot Step 2. Draw a number line and plot a point above each value from Step 1. smallest value first quartile 16 median 19 third quartile 21 largest value 25 Example 2 Continued
Pre-Algebra 4-4 Variability Step 2. Draw a number line and plot a point above each value. Use the given data to make a box-and-whisker plot Step 3. Draw the box and whiskers Example 2 Continued
Pre-Algebra 4-4 Variability Try This: Example 3 Final 1234T Oakland Tampa Bay These box-and-whisker plots compare the scores per quarter at Super Bowl XXXVII. The data in the T column is left out because it is a total of all the quarters. Oakland Tampa Bay
Pre-Algebra 4-4 Variability A. Compare the medians and ranges. Try This: Example 3 Continued The median for Tampa Bay is significantly greater, however the range for Tampa Bay is slightly greater. Oakland Tampa Bay
Pre-Algebra 4-4 Variability B. Compare the differences between the third quartile and first quartile for each. Try This: Example 3 Continued The difference between the third quartile and first quartile is the length of the box, which is slightly greater for Oakland. Oakland Tampa Bay