Additional Measures of Central Tendency
Prerequisites
Percentiles,
Distributions, What
is Central Tendency, Measures of Central
Tendency, Mean and Median
Learning Objectives
 Compute the trimean
 Compute the geometric mean directly
 Compute the geometric mean using logs
 Use the geometric to compute annual portfolio returns
 Compute a trimmed mean
Although the mean, median, and mode are by far
the most commonly used measures of central tendency, they are
by no means the only measures. This section defines three additional
measures of central tendency: the trimean, the geometric mean,
and the trimmed mean. These measures will be discussed again in
the section "Comparing
Measures of Central Tendency."
Trimean
The trimean is a weighted
average of the 25th percentile, the 50 percentile, and the 75th
percentile. Letting P25 be the 25th percentile, P50 be the 50th
and P75 be the 75th percentile, the formula for the trimean is:
Trimean = (P25 + 2P50 +
P75)/4
As you can see from the formula, the median is
weighted twice as much as the 25th and 75th percentiles.
Table 1 shows the number of touchdown (TD) passes
thrown by each of the 31 teams in the National Football League
in the 2000 season. The relevant percentiles are shown in Table
2.
The trimean is therefore (15 + 2 x 20 + 23)/4
= 78/4 = 19.5.
Geometric Mean
The geometric mean is computed by multiplying
all the numbers together and then taking the nth root of the product.
For example, for the numbers 1, 10, and 100, the product of all
the numbers is: 1 x 10 x 100 = 1,000. Since there are three numbers,
we take the cubed root of the product (1,000) which is equal to
10. The formula for the geometric mean is therefore
where the symbol Π means to multiply. Therefore,
the equation says to multiply all the values of X and then raise
the result to the 1/Nth power. Raising a value to the 1/Nth power
is, of course, the same as taking the Nth root of the value. In
this case, 10001/3 is the cube root of
1,000.
The geometric mean has a close relationship with
logarithms. Table 3 shows the logs (base 10) of these three numbers.
The arithmetic mean of the three logs is 1. The antilog of this
arithmetic mean of 1 is the geometric mean. The antilog of 1
is 101 = 10. Note that the geometric
mean only makes sense if all the numbers are positive.
The geometric mean is an appropriate measure
to use for averaging rates.
For example, consider a stock portfolio that began with a value of $1,000
and had annual returns of 13%, 22%, 12%, 5%, and 13%. Table 4
shows the value after each of the five years.
The question is how to compute annual rate of
return? The answer is to compute the geometric mean of the returns.
Instead of using the percents, each return is represented as
a multiplier indicating how much higher the value is after the
year. This multiplier is 1.13 for a 13% return and 0.95 for a
5% loss. The multipliers for this example are 1.13, 1.22, 1.12,
0.95, and 0.87. The geometric mean of these multipliers is 1.05.
Therefore, the average annual rate of return is 5%. Table
5 shows how a portfolio gaining 5% a year would end up with the
same value ($1,276) as shown in Table 4.
Trimmed Mean
To compute a trimmed mean,
you remove some of the higher and lower scores and compute the
mean of the remaining scores. A mean trimmed 10% is a mean computed
with 10% of the scores trimmed off; 5% from the bottom and 5%
from the top. A mean trimmed 50% is computed by trimming the upper
25% of the scores and the lower 25% of the scores and computing
the mean of the remaining scores. The trimmed mean is similar
to the median which, in essence, trims the upper 49+% and the
lower 49+% of the scores. Therefore the trimmed mean is a hybrid
of the mean and the median. To compute the mean trimmed 20% of
the touchdown pass data shown in Table 1, you remove the lower
10% of the scores (6, 9, and 12) as well as the upper 10% of the
scores (33, 33, and 37) and compute the mean of the remaining
25 scores. This mean is 20.16.
