Location parameters are calculated to determine the central tendency of data. In everyday language, we refer to these as average values.
The three Location parameter have different requirements for the data.
▪ The mode can be determined for any data type.
▪ The median requires at least one ordinal characteristic.
▪ The arithmetic mean requires the data to be metric (quantitative).
The median is a stable measure of central tendency in the presence of outliers or skewed distributions. In symmetric distributions, the mode, median, and mean are almost identical.
To calculate the corresponding location parameter, the data must be counted, summed, divided, or simply identified.
Mode (xD): The most frequent value of the characteristic is the mode.
Median (~x): The value in the middle of a sorted list is the median.
Mean (x¯): The sum of all values divided by the number of values gives the mean.
Mode:
The mode is the most frequent value. Four out of ten employees earn xD= 2.500 €. If there are two values that occur most frequently, it is a bimodal distribution.
Name | Salary/Month |
---|---|
Mr. Anton | 2.300 € |
Mr. Berta | 1.700 € |
Mr. Cäsar | 2.500 € |
Mr. Dora | 2.500 € |
Mrs. Emil | 1.700 € |
Mrs. Friedrich | 2.500 € |
Mrs. Gustav | 2.300 € |
Mrs. Heinrich | 2.300 € |
Mrs. Ida | 2.500 € |
(Mrs. Julius) | (7.000 €) |
Table 1: Salary table, sorted alphabetically by name
Median:
The median is the value in the middle of a sorted data set. Without Mrs. Julius’s salary, Mrs. Heinrich is the median with ~x = 2.300 €. With Mrs. Julius included, the median is the middle value, so:
~x = 2.400 € ( 2.500 2+ 2.300 ).
Name | Salary/Month |
---|---|
Mr. Berta | 1.700 € |
Mrs. Emil | 1.700 € |
Mr. Anton | 2.300 € |
Mrs. Gustav | 2.300 € |
Mrs. Heinrich | 2.300 € |
Mr. Cäsar | 2.500 € |
Mr. Dora | 2.500 € |
Mrs. Friedrich | 2.500 € |
Mrs. Ida | 2.500 € |
(Mrs. Julius) | (7.000 €) |
Table 2: Salary table, sorted in ascending order.
Arithmetic Mean:
The mean is the sum of all salaries divided by the number of salaries. With Mrs. Julius’s salary included, the mean increases significantly.
x¯1 = 2.300 + 1.700 + 2.500 + 2.500 + 1.7900 + 2.500 + 2.300 + 2.300 + 2.500 = 2.255,55 €
x¯2 = 2.300 + 1.700 + 2.500 + 1.700 + 2.500 + 2.500 + 1.700 + 2.500 + 2.300 + 2.300 + 2.500 + 7.000 = 2.730,00 €
The Human Resources Department decides to offer the new employee a median salary, as this is fairer.
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