Mean

From Wikipedia, the free encyclopedia
(Redirected from Mean (statistics))
Jump to: navigation, search

In mathematics and statistics, the mean is another name for the average.

The mean is calculated by adding all of the values together, then dividing by the number of values.

Example: 1, 2, 2, 100, 100 is a set of numbers or scores. If we add all the numbers, the answer is 205. By dividing this number by the number of numbers, we discover that the mean is 41. The difficulty with this particular set of numbers is that no one in this group scored anything like a 41, and the mean does not tell us much about what kind of scores these numbers represent.

Calculation details[change | edit source]

To find the average of N numbers, the N numbers are added and the total is divided by N.

In symbols, if the numbers are X_1, X_2, X_3, ... X_N, the total is:


X_1 + X_2 + X_3 + ... + X_N


The total is divided by N to make the average:


{X_1 + X_2 + X_3 + ... + X_N} \over N

Examples[change | edit source]

  • Lucy is 5 years old. Tom is 6 years old. Emily is 7 years old. To find the average age:
    • Add the three numbers :
5+6+7=18
  • The total is 18. Divide the total 18 by three:
18/3=6
  • The average of the three numbers is 6.
\frac{5+6+7}{3}
Therefore, the average age of Lucy, Tom and Emily is 6 years.

Related calculations[change | edit source]

The idea behind the mean is to represent a number of measurements, or values, by one value only. But there are different ways to calculate such a representing value.

  • The median is the number that divides all the samples in such a way that half of the samples are below it, and the other half above. Example: 1, 10, 50, 100, 100 is a set of numbers or scores. If we look at these scores we discover that the number 50 falls in the middle of the range of numbers and tells us that half the numbers or scores are above this number and half the numbers and scores are below this number. This is more information, depending on what you are trying to find out about this group of numbers, to help you find out what you want to know. It is not always possible to make the higher and lower group each exactly half of the total (example: 1, 2, 2), but that is the ideal.
  • The modus or mode is the number that occurs most often. Example: 1, 2, 2, 100, 200 is a set of numbers or scores. If we look at the numbers we discover that the number 2 recurs most often and would tell us that the number or score of 2 is the most common score or number in the group.
  • The arithmetic mean is just the average, the value that is the sum of all values, divided by their number. This is what is most often referred to as mean.
  • The geometric mean is the root of the product of all values. For example, the geometric mean of 4, 6, and 9 is 6, because 4 times 6 times 9 is 216, and the cube root (because there are three values) of 216 is 6.
  • The harmonic mean is the reciprocal of the arithmetic mean of the reciprocals. It is often used when people want a mean of rates or percentages.
  • The root mean square is the square root of the arithmetic mean of the squares of the values. The root mean square is at least as high as the arithmetic mean, and usually higher.

If people do many different measurements, they will get many different results. Those results have a certain distribution, and they can also be centered around an average value. This average value is what mathematicians call arithmetic mean.

Mean can also stand for expected value.