Statistics

1. Statistics Measures of Center

2. Mean…… • The mean is the average of a set of numbers.

3. Example…… • Roy compared the prices of a cd player at 5 stores. The prices at each store were $80, $95, $60, $90, and $85. • What was the mean price of the cd players? • Answer:

4. Example…… • George’s scores on 3 math tests were 70, 80, and 86. • What score does he need to make on the 4th test to have a final average of 84? • Answer:

5. Median…… • Definition: The number in the center of the data. a. Odd # in set – median is middle number. b. Even # in set – median is the average of the 2 numbers in the center. c. The numbers must be in order from smallest to largest.

6. Example…… • Consider the following scores: • 95, 30, 100, 100, and 95. • Find the median. • Arrange in Order: 30, 95, 95, 100, 100 • Odd # in set – median is the middle number. 30, 95, 95, 100 100

7. Example…… • Use the following numbers: • 8, 9, 9, 10, 11, 11 • Find the median. • Even # in set: • Average the 2 middle numbers: 8, 9, 9, 10, 11, 11

8. Example…… • Tracey had scores of 11, 10, 12, 6, 6, and 8 on her math quizzes. What is her median score? • Arrange in Order 1st: 6, 6, 8, 10, 11, 12 • Even # in set – average the 2 in the middle. 6, 6, 8, 10, 11, 12

9. Mode…… • The number that appears the most often. • There can be more than one mode. • There can also be no mode if each item appears only once.

10. Example…… • Tony had scores of 12, 11, 10, 9, 10, 11, 12, 10, 11, 11. • What is the mode of his scores? • Answer: • It helps to put them in order to see the grouping: 9, 10,10,10, 11,11,11,11,12,12 • The mode is 11.

11. Example…… • Tina had scores of 90, 96, 94, 90, 98, and 94 on her science tests. • What is the mode? • Put in order first: 90, 90, 94, 94, 96, 98 • 2 scores appear twice (the most). • The mode is 90 and 94.

12. Example…… • Find the mode for the high temperatures for the week. • 97, 92, 88, 99, 90, 91, and 94. • Put in order first: 88, 90, 91, 92, 94, 97, 99 • Each number occurs only once, therefore there is no mode.

13. Range…… • Definition: The range is the difference between the greatest and least values of the data set.

14. Example…… • Joyce’s bowling scores are 148, 195, 193, 145, 186, and 149. • What is the range of her scores? • Find the highest number and the lowest number in the set. 148, 195, 193, 145, 186, 149 • Subtract 195 and 145.

15. Which is the best to use? • Mean, median, and mode are called measures of central tendency. They tell something about where the data tends to cluster, or where the center of the data is located. • When the range is small, the mean is most likely to be the best measure of central tendency.

16. Example…… • Ted’s earnings for 5 weeks were $84, $76, $86, $300, and $76. • Which measure of central tendency best describes her typical wage? • Why?

17. $76, $76, $84, $86, $300 • Mode = 76. It is too low because it is less than 3 other measures. NO • Mean = 124.4. It is too high because it is greater than 4 of the 5 salaries. NO • Range = 224. Very Big. Mean is probably not good to use. • Median = 84. It is the most representative of the data. YES.

18. Box Plots(Box and Whiskers)

19. Boxplot • A graph of a set of data obtained by drawing a horizontal line from the minimum to maximum values with quartiles labeled in between. • It is a graphical plot of 5 specific values called the 5-number summary.

20. 5-number summary….. Minimum – lowest number in set Q1- middle number of the lower half Median – middle number of entire set Q3 – middle number of upper half Maximum – highest number in set

21. 1. Find the 5-number summary. 2. Draw and label a scale of equal intervals. 3. Place dots above the 5 numbers 4. Put a box around Q1 and Q3. 5. Draw a vertical line through the median. 6. Draw “whiskers” from the minimum to Q1 and maximum to Q3. Steps……

22. Example…… • Draw a box plot of the following data. 33, 38, 43, 30, 29, 40, 51, 27, 42, 23, 31

23. Example…… • Draw a box plot of the following data. 59, 60, 65, 52, 51, 64, 71, 48, 47, 40, 50

24. Assignment…… • Worksheet.