average

Did you mean: average (in mathematics), arithmetic mean, Average (sports), mean (average), worst-case

 
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average

  (ăv'ər-ĭj, ăv'rĭj) pronunciation
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n.
  1. Mathematics.
    1. A number that typifies a set of numbers of which it is a function.
    2. See arithmetic mean.
    1. An intermediate level or degree: near the average in size.
    2. The usual or ordinary kind or quality: Although the wines vary, the average is quite good.
  3. Sports. The ratio of a team's or player's successful performances such as wins, hits, or goals, divided by total opportunities for successful performance, such as games, times at bat, or shots: finished the season with a .500 average; a batting average of .274.
  4. Law.
    1. The loss of a ship or cargo, caused by damage at sea.
    2. The incurrence of damage or loss of a ship or cargo at sea.
    3. The equitable distribution of such a loss among concerned parties.
    4. A charge incurred through such a loss.
  5. Nautical. Small expenses or charges that are usually paid by the master of a ship.
adj.
  1. Mathematics. Of, relating to, or constituting an average.
  2. Being intermediate between extremes, as on a scale: a player of average ability.
  3. Usual or ordinary in kind or character: a poll of average people; average eyesight.
  4. Assessed in accordance with the law of averages.

v., -aged, -ag·ing, -ag·es.

v.tr.
  1. Mathematics. To calculate the average of: average a set of numbers.
  2. To do or have an average of: averaged three hours of work a day.
  3. To distribute proportionately: average one's income over four years so as to minimize the tax rate.
v.intr.

To be or amount to an average: Some sparrows are six inches long, but they average smaller. Our expenses averaged out to 45 dollars per day.

phrasal verbs:

average down

  1. To purchase shares of the same security at successively lower prices in order to reduce the average price of one's position.
average up
  1. To purchase shares of the same security at successively higher prices in order to achieve a larger position at an average price that is lower than the current market value.

[From Middle English averay, charge above the cost of freight, from Old French avarie, from Old Italian avaria, duty, from Arabic ‘awārīya, damaged goods, from ‘awār, blemish, from ‘awira, to be damaged.]

averagely av'er·age·ly adv.
averageness av'er·age·ness n.

SYNONYMS  average, medium, mediocre, fair, middling, indifferent, tolerable. These adjectives indicate a middle position on a scale of evaluation. Average and medium apply to what is midway between extremes and imply both sufficiency and lack of distinction: a novel of average merit; an orange of medium size. Mediocre stresses the undistinguished aspect of what is average: “The caliber of the students . . . has gone from mediocre to above average” (Judy Pasternak). What is fair is passable but substantially below excellent: in fair health. Middling refers to a ranking between average and mediocre: gave a middling performance. Indifferent suggests neutrality: “His home, alas, was but an indifferent attic” (Edward Everett Hale). Something tolerable is merely acceptable: prepared a tolerable meal.


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Financial & Investment Dictionary: Average
Home > Library > Business & Finance > Finance and Investment Dictionary

Appropriately weighted and adjusted Arithmetic Mean of selected securities designed to represent market behavior generally or important segments of the market. Among the most familiar averages are the Dow Jones industrial and transportation averages.

Because the evaluation of individual securities involves measuring price trends of securities in general or within an industry group, the various averages are important analytical tools.

See also Stock Indexes and Averages.

 
Thesaurus: average
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noun

    Something, as a type, number, quantity, or degree, that represents a midpoint between extremes on a scale of valuation: mean, median, medium, norm, par. See usual/unusual.

adjective

  1. Of moderately good quality but less than excellent: acceptable, adequate, all right, common, decent, fair, fairish, goodish, moderate, passable, respectable, satisfactory, sufficient, tolerable. Informal OK, tidy. See good/bad.
  2. Commonly encountered: common, commonplace, general, normal, ordinary, typical, usual. See surprise/expect.
  3. Being of no special quality or type: common, commonplace, cut-and-dried, formulaic, garden, garden-variety, indifferent, mediocre, ordinary, plain, routine, run-of-the-mill, standard, stock, undistinguished, unexceptional, unremarkable. See good/bad, usual/unusual.

 
Antonyms: average
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adj

Definition: normal, typical
Antonyms: abnormal, atypical, exceptional, extraordinary, extreme, outstanding, unusual

n

Definition: mean
Antonyms: maximum, minimum

n

Definition: normal, typical amount
Antonyms: abnormality, exception, extreme, unusual

 
Measures and Units: average
Home > Library > Science > Measures and Units

statistics For a set of numbers, a synonym for the arithmetic mean, i.e. the sum of those numbers divided by their count. The term referred originally to the damage, partial loss, else taxation of ships' cargo, the sharing of such costs between the shareholders in the cargo presumably prompting its general use in statistics. Other central values sometimes seen as averages, though not properly called such, include the median (the value such that there are just as many numbers greater than it as there are less than it, by convention the mean of the nearest values for a set with an even count) and the midrange (the mean of the two extreme-valued numbers in the set).

Clearly all three of these definitions can result in values that are not in the set, indeed values that could not be in the set. The average family with 2.2 children is the best-known unreal result.

No average can give more than a cursory picture of the set; it ignores the dispersion of the member numbers, due to erratic distribution and overall spread. The derived parameter standard deviation provides a measure of the dispersion.

 
Geography Dictionary: average
Home > Library > Science > Geographical Dictionary

A measure of central tendency; the most representative value for a group of numbers. The term is usually synonymous with the arithmetic mean.

 
Sports Science and Medicine: average
Home > Library > Health > Sports Science and Medicine

A vague term that refers to the normal or typical amount. It sometimes refers specifically to the arithmetic mean. See also measures of central tendency.

 
Columbia Encyclopedia: average,
Home > Library > Miscellaneous > Columbia Encyclopedia
number used to represent or characterize a group of numbers. The most common type of average is the arithmetic mean. See median; mode.

 
Science Dictionary: average
Home > Library > Science > Science Dictionary

A single number that represents a set of numbers. Means, medians, and modes are kinds of averages; usually, however, the term average refers to a mean.

 
Veterinary Dictionary: average
Home > Library > Animal Life > Veterinary Dictionary

The sum of the values divided by the number of values. Called also arithmetic mean.

  • a. daily gain — average daily increase in liveweight of an animal or group of animals. Measured by weighing on two dates and dividing the difference by the number of days between.
  • moving a. — a series of averages over time, based on a constant number of values, by including the next installment of data, and excluding the oldest data. Used to reduce the variability of a series by calculating a new series based on the average of a constant number of values of the original series. Called also rolling average.
 
Word Tutor: average
Home > Library > Literature & Language > Spelling & Usage
pronunciation

IN BRIEF: The usual amount or kind.

pronunciation We are all more average than we think. — Gorham B. Munson

 
Quotes About: Averages
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Quotes:

"The average, healthy, well-adjusted adult gets up at seven-thirty in the morning feeling just plain terrible." - Jean Kerr

"I consider myself an average man, except in the fact that I consider myself an average man." - Michel Eyquem De Montaigne

"Ain't no man can avoid being born average, but there ain't no man got to be common." - Leroy ''Satchel'' Paige

"I am only an average man but, by George, I work harder at it than the average man." - Theodore Roosevelt

"If you do it right 51 percent of the time you will end up a hero." - Alfred P. Sloan

"If your batting average is high enough, the Big League will find you." - Source Unknown

See more famous quotes about Averages

 
Wikipedia: Average
Home > Library > Miscellaneous > Wikipedia
 This article needs additional citations for verification.
Please help improve this article by adding reliable references. Unsourced material may be challenged and removed. (September 2008)

In mathematics, an average, or central tendency [1] of a data set refers to a measure of the "middle" or "expected" value of the data set. There are many different descriptive statistics that can be chosen as a measurement of the central tendency of the data items.

An average is a single value that is meant to typify a list of values. If all the numbers in the list are the same, then this number should be used. If the numbers are not all the same, an easy way to get a representative value from a list is to randomly pick any number from the list. However, the word 'average' is usually reserved for more sophisticated methods that are generally found to be more useful.

The most common method is the arithmetic mean. There are many other types of averages, such as median (used most often to describe house prices and incomes). [2]The average is calculated by combining the measurements related to a set and to compute a number as being the average of the set.

Contents

Calculation

Arithmetic mean

Main article: Arithmetic mean

Simply put, if n numbers are given, each number denoted by ai, where i=1, \dots ,n, the arithmetic mean is the sum of the ai's divided by n or

AM=\frac{1}{n}\sum_{i=1}^na_i.

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. It is then simple to 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 than the maximum 8. If we increase the number of terms in the list for which we want an average, we get, for example, that the arithmetic mean of 2, 8, and 11 is found by solving for the value of A in the equation 2 + 8 + 11 = A + A + A. It is simple to find that A = (2 + 8 + 11)/3 = 7.

Again, changing the order of the three members of the list does not change the result: A = (8 + 11 + 2)/3 = 7, and that 7 is between 2 and 11. This summation method is easily generalized for lists with any number of elements. However, the mean of a list of integers is not necessarily an integer. "The average family has 1.7 children" is a jarring way of making a statement that is more appropriately expressed by "the average number of children in the collection of families examined is 1.7".

Geometric mean

Main article: Geometric mean

Geometric mean of a1,a2,...,an is defined as

GM=\sqrt[n]{a_1 a_2 ... 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

Main article: Harmonic mean

Harmonic mean for a set of numbers a1,a2,...,an is defined as the reciprocal of the arithmetic mean of the reciprocals of ai's:

HM = \frac{1}{\frac{1}{n}\sum_{i=0}^n \frac{1}{a_i}}=\frac{n}{\frac{1}{a_1}+\frac{1}{a_2}+...+\frac{1}{a_n}}

One example where it is useful is calculating the average speed. For example, if the speed for going from point A to B was 60km/h, and the speed for returning from B to A was 40km/h, then the average speed is given by \frac{2}{1/60+1/40}=48.

Inequality Concerning AM, GM & 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.

Mode and median

Main article: Mode (statistics)

The most frequently occurring number in a list of numbers is called the mode. The mode of the list (1, 2, 2, 3, 3, 3, 4) is 3. The mode is not necessarily well defined, the list (1, 2, 2, 3, 3, 5) has the two modes 2 and 3. The mode can be subsumed under the general method of defining averages by understanding it as taking the list and setting each member of the list equal to the most common value in the list if there is a most common value. This list is then equated to the resulting list with all values replaced by the same value. Since they are already all the same, this does not require any change.

Main article: Median

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. Now do the same for the equal-sized list consisting of all the same value M: M, M, M, M. It is already ordered. We remove the two end values to get M, M. We take their arithmetic mean to get M. Finally, set this result equal to our previous result to get M = 5.

Annualized return

The annualized return is a type of average used in finance. For example, if there are two years in which the return in the first year is −10% and the return in the second year is +60%, then the annualized return, R, can be obtained by solving the equation: (1 − 10%) × (1 + 60%) = (1 − 0.1) × (1 + 0.6) = (1 + R) × (1 + R). The value of R that makes this equation true is 0.2, or 20%. Note that changing the order to find the annualized returns of +60% and −10% gives the same result as the annualized returns of −10% and +60%.

This method can be generalized to examples in which the periods are not all of one-year duration. Annualization of a set of returns is a variation on the geometric average that provides the intensive property of a return per year corresponding to a list of returns. For example, consider a period of a half of a year for which the return is −23% and a period of two and one half years for which the return is +13%. The annualized return for the combined period is the single year return, R, that is the solution of the following equation: (1 − 0.23)0.5 × (1 + 0.13)2.5 = (1 + R)0.5+2.5, giving an annualized return R of 0.0600 or 6.00%.

Types

The table of mathematical symbols explains the symbols used below.

Name Equation or description
Arithmetic mean \bar{x} = \frac{1}{n}\sum_{i=1}^n x_i = \frac{1}{n} (x_1+\cdots+x_n)
Median The middle value that separates the higher half from the lower half of the data set
Geometric median A rotation invariant extension of the median for points in Rn
Mode The most frequent value in the data set
Geometric mean \bigg(\prod_{i=1}^n x_i \bigg)^{1/n} = \sqrt[n]{x_1 \cdot x_2 \dotsb x_n}
Harmonic mean \frac{n}{\frac{1}{x_1} + \frac{1}{x_2} + \cdots + \frac{1}{x_n}}
Quadratic mean
(or RMS)		 \sqrt{\frac{1}{n} \sum_{i=1}^{n} x_i^2} = \sqrt {\frac{x_1^2 + x_2^2 + \cdots + x_n^2}{n}}
Generalized mean \sqrt[p]{\frac{1}{n} \cdot \sum_{i=1}^n x_{i}^p}
Weighted mean \frac{ \sum_{i=1}^n w_i x_i}{\sum_{i=1}^n w_i} = \frac{w_1 x_1 + w_2 x_2 + \cdots + w_n x_n}{w_1 + w_2 + \cdots + w_n}
Truncated mean The arithmetic mean of data values after a certain number or proportion of the highest and lowest data values have been discarded
Interquartile mean A special case of the truncated mean, using the interquartile range
Midrange \frac{\max x + \min x}{2}
Winsorized mean Similar to the truncated mean, but, rather than deleting the extreme values, they are set equal to the largest and smallest values that remain
Annualization -1 + {\prod (1+Rt)}^{1/\sum t_i}

Solutions to variational problems

Several measures of central tendency can be characterized as solving a variational problem, in the sense of the calculus of variations, namely minimizing variation from the center. That is, given a measure of statistical dispersion, one asks for a measure of central tendency that minimizes variation: such that variation from the center is minimal among all choices of center. In a quip, "dispersion precedes location". In the sense of Lp spaces, the correspondence is:

Lp dispersion central tendency
L1 average absolute deviation median
L2 standard deviation mean
L^\infty maximum deviation midrange

Thus standard deviation about the mean is lower than standard deviation about any other point; the uniqueness of this characterization of mean and midrange follows from convex optimization, as the L2 and L^\infty norms are convex functions. Note that the median in this sense is not in general unique, and in fact any point between the two central points of a discrete distribution minimizes average absolute deviation.

Similarly, the mode minimizes qualitative variation.[citation needed]

Miscellaneous types

Other more sophisticated averages are: trimean, trimedian, and normalized mean. These are usually more representative of the whole data set.[citation needed]

One can create one's own average metric using generalized f-mean:

y = f^{-1}\left(\frac{f(x_1)+f(x_2)+\cdots+f(x_n)}{n}\right),

where f is any invertible function. The harmonic mean is an example of this using f(x) = 1/x, and the geometric mean is another, using f(x) = log x. Another example, expmean (exponential mean) is a mean using the function f(x) = ex, and it is inherently biased towards the higher values. However, this method for generating means is not general enough to capture all averages. A more general method for defining an average, y, takes any function of a list g(x1, x2, ..., xn), which is symmetric under permutation of the members of the list, and equates it to the same function with the value of the average replacing each member of the list: g(x1, x2, ..., xn) = g(y, y, ..., y). This most general definition still captures the important property of all averages that the average of a list of identical elements is that element itself. The function g(x1, x2, ..., xn) =x1+x2+ ...+ xn provides the arithmetic mean. The function g(x1, x2, ..., xn) =x1·x2· ...· xn provides the geometric mean. The function g(x1, x2, ..., xn) =x1−1+x2−1+ ...+ xn−1 provides the harmonic mean. (See John Bibby (1974) “Axiomatisations of the average and a further generalisation of monotonic sequences,” Glasgow Mathematical Journal, vol. 15, pp. 63–65.)

In data streams

The concept of an average can be applied to a stream of data as well as a bounded set, the goal being to find a value about which recent data is in some way clustered. The stream may be distributed in time, as in samples taken by some data acquisition system from which we want to remove noise, or in space, as in pixels in an image from which we want to extract some property. An easy-to-understand and widely used application of average to a stream is the simple moving average in which we compute the arithmetic mean of the most recent N data items in the stream. To advance one position in the stream, we add 1/N times the new data item and subtract 1/N times the data item N places back in the stream.

Etymology

The original meaning of the word average is "damage sustained at sea": the same word is found in Arabic as awar, in Italian as avaria and in French as avarie. Hence an average adjuster is a person who assesses an insurable loss.

Marine damage is either particular average, which is borne only by the owner of the damaged property, or general average, where the owner can claim a proportional contribution from all the parties to the marine venture. The type of calculations used in adjusting general average gave rise to the use of "average" to mean "arithmetic mean".

Footnotes

  1. ^ In statistics, the term central tendency is used in some fields of empirical research to refer to what statisticians sometimes call "location".
  2. ^ An axiomatic approach to averages is provided by John Bibby (1974) “Axiomatisations of the average and a further generalization of monotonic sequences,” Glasgow Mathematical Journal, vol. 15, pp. 63–65.

References

See also

External links

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Misspellings: averaged
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Common misspelling(s) of averaged

  • averageed

 
Translations: Translations for: Average
Home > Library > Literature & Language > Translations

Dansk (Danish)
n. - gennemsnit, normal, norm
adj. - gennemsnitlig, normal, middel-
v. tr. - have som gennemsnit, udgøre gennemsnit
v. intr. - være gennemsnit, udgøre gennemsnit

idioms:

  • average out    udlignes, jævnes
  • on average    gennemsnitligt, i gennemsnit

Nederlands (Dutch)
gemiddeld(e), doorsnee, middelmatig, gewoon, averij (zeeschade), als gemiddelde hebben, gemiddeld per dag etc. werken/doen, het gemiddelde inschatten, kwaliteit inschatten

Français (French)
n. - moyenne, (Assur) avarie
adj. - moyenne, moyen
v. tr. - établir/faire la moyenne de, atteindre la moyenne de, (Aut) faire une moyenne de
v. intr. - s'égaliser, faire en moyenne

idioms:

  • average out    s'égaliser, faire en moyenne
  • on average    en moyenne

Deutsch (German)
n. - Durchschnitt, Mittelwert
adj. - durchschnittlich, Durchschnitts-, Mittel-, mittelmäßig
v. - durchschnittlich betragen, den Mittelwert nehmen

idioms:

  • average out    sich ausgleichen
  • on average    im Durchschnitt

Ελληνική (Greek)
n. - (μαθημ.) μέσος όρος, (ναυτ., οικον.) αβαρία, βλάβη
v. - έχω/κάνω/πιάνω/βγάζω κατά μέσον όρο, υπολογίζω/εξάγω τον μέσο όρο
adj. - μέσος, του μέσου όρου, μέτριος, αντιπροσωπευτικός, συνήθης

idioms:

  • average out    υπολογίζω τον μέσο όρο
  • on average    κατά μέσον όρο

Italiano (Italian)
media, medio, mediocre

idioms:

  • average out    in media
  • bowling average    media personale (cricket)
  • law of averages    statistica
  • on average    in media

Português (Portuguese)
n. - média (f), proporção (f), avaria (f)
v. - dividir proporcionalmente, calcular a média, comprar ou vender por atacado
adj. - médio, proporcional, mediano, padrão, medíocre

idioms:

  • average out    perfazer a média
  • bowling average    média de arremessos (Esp.)
  • law of averages    lei das probabilidades (Mat.)
  • on average    na média

Русский (Russian)
среднее число, средний, посредственный

idioms:

  • average out    рассчитать среднее число
  • bowling average    показатель в крикете
  • law of averages    закон средних величин
  • on average    в среднем

Español (Spanish)
n. - promedio, media, término medio, medio
adj. - regular, mediano, mediocre
v. tr. - promediar
v. intr. - hacer un promedio

idioms:

  • average out    alcanzar un promedio de, ser por término medio
  • on average    por término medio, como promedio, como media

Svenska (Swedish)
n. - genomsnitt, medeltal
v. - beräkna medeltalet, fördela
adj. - genomsnittlig, medel-

中文(简体) (Chinese (Simplified))
平均, 平均水平, 平均数, 一般的, 通常的, 平均的, 均分, 使平衡, 平均为

idioms:

  • average out    达到平均数, 最终得到平衡
  • on average    平均起来

中文(繁體) (Chinese (Traditional))
n. - 平均, 平均水準, 平均數
adj. - 一般的, 通常的, 平均的
v. tr. - 均分, 使平衡, 平均為
v. intr. - 平均為

idioms:

  • average out    達到平均數, 最終得到平衡
  • on average    平均起來

한국어 (Korean)
n. - 평균
adj. - 평균의, 보통의
v. tr. - 의 평균치를 구하다
v. intr. - 평균에 달하다

idioms:

  • average out    매매해 버리고 손을 떼다, 결국 평균치가 되다

日本語 (Japanese)
n. - 平均, 普通
v. - 平均して…になる, 平均して…を得る, 平均する
adj. - 平均の, 平均的な

idioms:

  • average out    結局平均…に達する
  • on average    平均して

العربيه (Arabic)
‏(الاسم) معدل, متوسط, عادي (فعل) يوجد المعدل, يقسم على نحو متناسب (صفه) يعمل بمعدل, يبلغ معدله‏

עברית (Hebrew)
n. - ‮ממוצע‬
adj. - ‮ממוצע, רגיל, בינוני‬
v. tr. - ‮חישב את הממוצע, מיצע, העריך את הרמה הכללית או את הממוצע של‬
v. intr. - ‮הציג את הממוצע של‬

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