It’s best to use the weighted harmonic mean when averaging multiples with price in the numerator. For example, if you use a weighted arithmetic average to calculate the price-earnings ratio, the results will be skewed upwards because higher data points are given more weight. The weighted harmonic mean, on the other hand, gives equal weight to all data points, resulting in the most accurate average.

Let’s imagine you need to figure out the P/E stock index for three different companies. The first has a market capitalization of $10 billion and $1 billion in earnings; the second has a market capitalization of $27 billion and $3 billion in earnings; and the third has a market capitalization of $100 million and $2 million in earnings. The P/E ratios of the first, second, and third companies are 10, 9, and 50, respectively. The index you must calculate is made up of three equities, with 60 percent invested in the first, 25 percent in the second, and 15 percent in the third. Using the weighted harmonic mean, the P/E ratio is:

 P/E = (0.6 + 0.25 + 0.15)/ 0.6/10 + 0.25/9 + 0.15/50 = 1/ 0.09 = 11.1

Let’s use the weighted arithmetic mean to figure it out:

P/E = 15.75 = 0.6 x 10 + 0.25 x 9 + 0.15 x 50

Clearly, the weighted arithmetic average overestimates the index, providing you with inaccurate data.