There are many quantities that can be used to describe properties of a distribution. In what follows some of the more common quantities are briefly discussed and defined.

The mean is a measure of the center or most likely value in a distribution. For N samples

from some population, the mean (also sometimes called the average or expected value) is defined as

There are other quantities that also give a measure of the most likely value. The mode is the most often occurring value, generally only applicable for integer samples. The median is the middle value, that is, half the sum of the highest value plus the lowest value.

The variance and standard deviation are a measure of the extent to which a distribution varies from its mean. The simplest measure of variation is the range, the difference between the largest and the smallest value, the variance however has more desirable features. The variance (square of the standard deviation) is defined as

For computational ease the above is often expanded as follows to avoid the need to precalculate the mean.

Definitions for center of mass (also known as center of gravity) and radius of gyration for discrete points are given below.

	mi Pi i
Center of mass C =
	mi i

Center of Gyration

The average square distance to the center of gravity.

	mi || Pi - C ||2 i
Radius of gyration r, r2 =
	mi i