# Arithmetic Mean Average

## What it is:

The arithmetic mean average is the average of a series of numbers.

## How it works (Example):

The formula for calculating the arithmetic mean average is:

Arithmetic mean average = (X1 + X2 + X3 + ... +XN) / N

where X1, X2, X3, XN are the values of the observations being averaged and N equals the number of observations

Let's assume that you would like to find the arithmetic mean average price of Company XYZ over the last four years. Here are the stock prices from each of the last four years:

Year 1: \$10

Year 2: \$15

Year 3: \$20

Year 4: \$25

Using the formula above, we can calculate the arithmetic mean average price of Company XYZ to be:

(\$10+\$15+\$20+\$25)/4 = \$17.50

The arithmetic mean average always lies between the smallest and the largest of the numbers in the set.

## Why it Matters:

The arithmetic mean average allows investors to gain some insight into stock prices, economic data, and a host of other information. For instance, if Company XYZ's stock price is trading above its arithmetic mean average, it could be that the stock is overvalued.

It is important to note that arithmetic mean averages are not very useful if the underlying data is erratic. One "outlier" could artificially increase or decrease the arithmetic mean average to where it no longer reflects the nature of the bulk of the underlying data. This is one reason some analysts prefer to use weighted averages in certain circumstances.