Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 1 Measures of Central Tendency Section 2-4 M A R I O F. T R I O L A Copyright © 1998, Triola, Elementary Statisitics Addison Wesley Longman

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 2 Measure of Central Tendency

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 3 a value at the center or middle of a data set Measure of Central Tendency

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 4 Mean Arithmetic Mean AVERAGE Definitions

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 5 FIGURE 2-7 Mean as a Balance Point

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 6 Mean FIGURE 2-7 Mean as a Balance Point

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 7 Notation

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 8 Notation  denotes the summation of a set of values

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 9 Notation  denotes the summation of a set of values x is the variable usually used to represent the individual data values

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 10 Notation  denotes the summation of a set of values x is the variable usually used to represent the individual data values n represents the number of data values in a sample

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 11 Notation  denotes the summation of a set of values x is the variable usually used to represent the individual data values n represents the number of data values in a sample N represents the number of data values in a population

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 12 Notation x is pronounced ‘x-bar’ and denotes the mean of a set of sample values  denotes the summation of a set of values x is the variable usually used to represent the individual data values n represents the number of data values in a sample N represents the number of data values in a population

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 13 µ is pronounced ‘mu’ and denotes the mean of all values Notation x is pronounced ‘x-bar’ and denotes the mean of a set of sample values  denotes the summation of a set of values x is the variable usually used to represent the individual data values n represents the number of data values in a sample N represents the number of data values in a population in a population

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 14 Definitions  Mean

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 15 Definitions  Mean the value obtained by adding the scores and dividing the total by the number of scores

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 16 x = Definitions  Mean the value obtained by adding the scores and dividing the total by the number of scores n  x Sample

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 17 x = Definitions  Mean the value obtained by adding the scores and dividing the total by the number of scores n  x x Sample N µ =  x x Population

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 18 Calculators can calculate the mean of data Definitions  Mean the value obtained by adding the scores and dividing the total by the number of scores n x =  x x Sample N µ =  x x Population

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 19 Examples

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 20 use class mark of classes for variable x Mean from a Frequency Table

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 21 use class mark of classes for variable x Mean from a Frequency Table x = Formula 2-2 f  (f x) 

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 22 use class mark of classes for variable x Mean from a Frequency Table x = Formula 2-2 f  (f x)  x = class mark

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 23 use class mark of classes for variable x Mean from a Frequency Table x = Formula 2-2 f  (f x)  x = class mark f = frequency

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 24 use class mark of classes for variable x Mean from a Frequency Table x = Formula 2-2 f  (f x)  x = class mark f = frequency  f = n f = n

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 25 Weighted Mean

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 26 Weighted Mean x = w  (w x) 

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 27 Examples

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 28 Definitions  Median the middle value when scores are arranged in (ascending or descending) order

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 29 Definitions  Median the middle value when scores are arranged in (ascending or descending) order often denoted by x (pronounced ‘x-tilde’) ~

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 30 Definitions  Median the middle value when scores are arranged in (ascending or descending) order often denoted by x (pronounced ‘x-tilde’) is not affected by an extreme value ~

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman (in order) exact middle Examples MEDIAN is 4

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman no exact middle -- shared by two numbers = (in order) exact middle MEDIAN is 4 Examples MEDIAN is 4.5

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 33 Definitions  Mode the score that occurs most frequently Bimodal Multimodal No Mode

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 34 Examples Mode is 5 Bimodal (2 & 6) No Mode a b c

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 35 Examples Mode is 5 Bimodal (2 & 6) No Mode a b c d e

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 36 Examples Mode is 5 Bimodal (2 & 6) No Mode a b c d e Mode is 3 No Mode

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 37 Mode is “O” blood type Blood types: O 35 A 14 B 16 AB 10 Remark: Mode is the only measure of central tendency that can be used with nominal data

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 38  Midrange the value halfway between the highest and lowest scores Definitions

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 39  Midrange the value halfway between the highest and lowest scores Definitions Midrange = highest score + lowest score 2

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman (in order) Midrange is (5 + 1)/2 = 3 Examples

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 41 Carry one more decimal place than is present in the original set of data Round-off rule for measures of central tendency

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 42 Advantages - Disadvantages Best Measure of Central Tendency Table 2-6

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 43 Table 2-6

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 44 Skewness Mode = Mean = Median SYMMETRIC Figure 2-8 (b)

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 45 Skewness Mode = Mean = Median SKEWED LEFT (negatively ) SYMMETRIC Mean Mode Median Figure 2-8 (b) Figure 2-8 (a)

Copyright © 1998, Triola, Elementary Statistics Addison Wesley Longman 46 Skewness Mode = Mean = Median SKEWED LEFT (negatively ) SYMMETRIC Mean Mode Median SKEWED RIGHT (positively) Mean Mode Median Figure 2-8 (b) Figure 2-8 (a) Figure 2-8 (c)