Meaning of MEAN in English


in mathematics, quantity that has a value intermediate between those of the extreme members of some set. Several kinds of mean exist, and the method of calculating a mean depends upon the relationship known or assumed to govern the other members. The arithmetic mean, denoted x, of a set of n numbers x1, x2, . . . , xn is defined as the sum of the numbers divided by n: The arithmetic mean represents a point about which the numbers balance. For example, if unit masses are placed on a line at points with coordinates x1, x2, . . . , xn, then the arithmetic mean is the coordinate of the centre of gravity of the system. In statistics, the arithmetic mean is commonly used as the single value typical of a set of data. For a system of particles having unequal masses, the centre of gravity is determined by a more general average, the weighted arithmetic mean. If each number xi is assigned a positive weight wi, the weighted arithmetic mean is defined as the sum of the products wixi divided by the sum of the weights. In this case, The weighted arithmetic mean also is used in statistical analysis of grouped data; each number xi is the midpoint of an interval; and each corresponding value of wi is the number of data points within that interval. For a given set of data, many possible means can be defined, depending on which features of the data are of interest. For example, suppose five squares are given, with sides 1, 1, 2, 5, and 7 inches. Their average area is (12 + 12 + 22 + 52 + 72)/5, or 16 square inches, the area of a square of side 4 inches. The number 4 is the quadratic mean (or root mean square) of the numbers 1, 1, 2, 5, 7 and differs from their arithmetic mean, which is 3 1/5. In general, the quadratic mean of n numbers x1, x2, . . . , xn is the square root of the arithmetic mean of their squares, The arithmetic mean gives no indication of how widely the data are spread or dispersed about the mean. Measures of the dispersion are provided by the arithmetic and quadratic means of the n differences x1 - x, x2 - x, . . . , xn - x. These are called the variance and the standard deviation of x1, x2, . . . , xn. The arithmetic and quadratic means are the special cases p = 1 and p = 2 of the pth-power mean, Mp, defined by the formula where p may be any real number except zero. The case p = -1 is also called the harmonic mean. Weighted pth-power means are defined by If x is the arithmetic mean of x1 and x2, the three numbers x1, x, x2 are in arithmetic progression. If h is the harmonic mean of x1 and x2, the numbers x1, h, x2 are in harmonic progression. A number g such that x1, g, x2 are in geometric progression is defined by the condition that x1/g = g/x2, or g2 = x1x2; hence g = . This g is called the geometric mean of x1 and x2. The geometric mean of n numbers x1, x2, . . . , xn is defined to be the nth root of their product; g = n. All the means discussed are special cases of a more general mean. If f is a function having an inverse f-1, the number is called the mean value of x1, x2, . . . , xn associated with f . When f (x) = xp the inverse is f-1(x) = x1/p and the mean value is the pth-power mean, Mp. When f (x) = logex, the inverse is f-1(x) = ex and the mean value is the geometric mean.

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