Chapter 3.1 Measures of Central Tendency

Average  The word average is ambiguous, since several different methods can be used to obtain an average.  The average means the center of the distribution  Measures of average are also called measures of central tendency.  The measures of central tendency are mean, median, mode, and midrange

Parameters and Statistics  Recall the difference between a population and a sample  Measures found by using all the data values in the population are called parameters (the average of sales obtained from the entire population is a parameter)  Measures obtained by using the data values from samples are called statistics (average of the sales from a sample of representatives is a statistic)

Rounding Rules  In statistics, the basic rounding rule is that when computations are done in the calculation, rounding should not be done until the final answer is calculated.

The mean  The mean, or arithmetic average, is found by adding the values of the data and dividing by the total number of values.  Symbols associated with mean: ∑ and X (used for samples) and µ (used for populations)  Ex: find the mean of 3, 2, 6, 5, and 4.

Find the mean  The data show the number of patients in a sample of six hospitals who acquired an infection while hospitalized. Find the mean

Median  The median is the midpoint of the data array. (MD)  Example: find the median of the data: The number of rooms in the seven hotels in downtown Pittsburgh is 713, 300, 618, 595, 311, 401, 292

Find the median  The number of tornadoes that have occurred in the United States over an 8 year period follows. Find the median. 684, 764, 656, 702, 856, 1133, 1132, 1303

Mode  The value that occurs most often in a data set is called the mode.  A data set that has only one value that occurs with the greatest frequency is said to be unimodal  If a data set has two values that occur with the same greatest frequency, both values are considered to be the mode and the data set is said to be bimodal  If a data set has more than two values that occur with the same greatest frequency, each value is used as the mode, and the data set is said to be multimodal.  When no data value occurs more than once, the data set is said to have no mode.

Mode Find the mode of the signing bonuses of eight NFL players for a specific year. The bonuses in millions of dollars are: 18.0, 14.0, 34.5, 10, 11.3, 10, 12.4, 12.4, 10

Mode Find the mode of the number of branches that six banks have. 401, 344, 209, 201, 227, 353

Mode The data show the number of licensed nuclear reactors in the United States for a recent 15 year period. Find the mode

Midrange  The midrange is defined as the sum of the lowest and highest values in the data divided by 2 (MR)  Example: In the last two winter seasons, the city of Brownsville, Minnesota, reported these numbers of water- line breaks per month. Find the midrange. 2, 3, 6, 8, 4, 1

All of the above A small company consists of the owner, the manager, the salesperson, and two technicians, all of whose annual salaries are listed here. Find the mean, median, mode, and midrange. StaffSalary Owner$100,000 Manager40,000 Salesperson24,000 Technician18,000 Technician18,000

Recall the distributions: where does mean, median, and mode fit?

Try it!  Pg. 126 #1-6