Article 1Arithmetic meanMain articl

Article 1
Arithmetic mean
Main article: Arithmetic mean
The most common type of average is the arithmetic mean. If n numbers are given, each number denoted by ai (where i = 1,2, …, n), the arithmetic mean is the sum of the as divided by n orAM =frac{1}{n}sum_{i=1}^ na _i = frac{1}{n}left(a_1 + a_2 + cdots + a_n
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The arithmetic mean, often simply called the mean, of two numbers, such as 2 and 8, is obtained by finding a value A such that 2 + 8 = A + A. One may find that A = (2 + 8)/2 = 5. Switching the order of 2 and 8 to read 8 and 2 does not change the resulting value obtained for A. The mean 5 is not less than the minimum 2 nor greater thanthe maximum 8. If we increase the number of terms in the list to 2, 8, and 11, the arithmetic mean is found by solving for the value of A in the equation 2 + 8 + 11 = A + A + A. One finds that A = ( 2 + 8 + 11 )/3 = 7.Along with the arithmetic mean above, the geometric mean and the harmonic mean are known collectively as the Pythagorean means.
Geometric meanThe geometric mean of n non-negative numbers is obtained by multiplying them all together and then taking the nth root. In algebraic terms, the geometric mean of a1, a2, …, an is defined as GM = sqrt [n] {prod_{i=1}^n a_i} = sqrt[n]{a_1 a_2 cdots a_n}. Geometric mean can be thought of as the antilog of the arithmetic mean of the logs of the numbers.
Example: Geometric mean of 2 and 8 is GM = sqrt{2 cdot 8} = 4
Harmonic mean for a non-empty collection of numbers a1, a2, …, an, all different from 0, is defined as the reciprocal of the arithmetic mean of the reciprocals of the ai 's: HM = frac{1}{frac{1}{n}sum_{i=1}^n frac {1} {a_i}} = frac{n}{frac{1}{a_1} + frac{1}{a_2} + cdots + frac{1}{a_n}}
One example where the harmonic mean is useful is when examining the speed for a number of fixed-distance trips. For example, if the speed for going from point A to B was 60 km/h, and the speed for returning from B to A was 40 km/h, then the harmonic mean speed is given byfrac{2}{frac{1}{60} + frac{1}{40}} = 48
Inequality concerning AM, GM, and HM.A well known inequality concerning arithmetic, geometric, and harmonic means for any set of positive numbers is AM ge GM ge HM. It is easy to remember noting that the alphabetical order of the letters A, G, and H is preserved in the inequality. See Inequality of arithmetic and geometric means. Thus for the above harmonic mean example: AM = 50, GM ≈ 49, and HM = 48 km/h.
Statistical location The mode, the median, and the mid-range are often used in addition to the mean as estimates of central tendency in descriptive statistics.
Mode Comparison of arithmetic mean, median and mode of two log-normal distributions with different skewness.
Main article: Mode (statistics) The most frequently occurring number in a list is called the mode. For example, the mode of the list (1, 2, 2, 3, 3, 3, 4) is 3. It may happen that there are two or more numbers which occur equally often and more often than any other number. In this case there is no agreed definition of mode. Some authors say they are all modes and some say there is no mode.
MedianThe median is the middle number of the group when they are ranked in order. (If there are an even number of numbers, the mean of the middle two is taken.)Thus to find the median, order the list according to its elements' magnitude and then repeatedly remove the pair consisting of the highest and lowest values until either one or two values are left. If exactly one value is left, it is the median; if two values, the median is the arithmetic mean of these two. This method takes the list 1, 7, 3, 13 and orders it to read 1, 3, 7, 13. Then the 1 and 13 are removed to obtain the list 3, 7. Since there are two elements in this remaining list, the median is their arithmetic mean, (3 + 7)/2 = 5.