histogram

American Heritage Dictionary:

his·to·gram

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(hĭs'tə-grăm') pronunciation

n.
A bar graph of a frequency distribution in which the widths of the bars are proportional to the classes into which the variable has been divided and the heights of the bars are proportional to the class frequencies.

[Greek histos, mast, web + -GRAM.]

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Oxford Dictionary of Statistics:

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A diagram that uses rectangles to represent frequency. It differs from the bar chart in that the rectangles may have differing widths, but the key feature is that, for each rectangle, the area is proportional to the frequency represented. The term 'histogram' was introduced by Karl Pearson in his lectures prior to 1895.

Histogram. This histogram represents data on the cross-sectional area of 30 erratics (boulders left behind by retreating glaciers). Note the use of wider intervals for the classes corresponding to the scarcer larger boulders. In a histogram, area is proportional to frequency.

Britannica Concise Encyclopedia:

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Graph using vertical or horizontal bars whose lengths indicate quantities. Along with the pie chart, the histogram is the most common format for representing statistical data. Its advantage is that it not only clearly shows the largest and smallest categories but gives an immediate impression of the distribution of the data. In fact, a histogram is a representation of a frequency distribution.

For more information on histogram, visit Britannica.com.

Computer Desktop Encyclopedia:

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A bar graph that uses the width of the bars to represent the various classes and the height of the bars to represent their relative frequencies.

Camera Histograms

Digital camera histograms show the image's overall exposure. Using 256 vertical bars to represent brightness levels from 0 to 255, the leftmost bar is the darkest pixel level (0), and the rightmost bar is the lightest (255). The height of the bars represents the total number of pixels at that brightness level.

What is of most interest to the photographer is how the bars spread horizontally from left to right. For example, if there are no bars on the left, there are no black pixels in the image.

Light Pixels

Histograms appear on the same LCD screen used to preview the image. In this daylight example, there is an absence of dark shadows because the histogram shows no pixels on the left side (dark side).

Dark Pixels

In this example, the camera was pointed into a totally dark room, and the bars are confined entirely to the leftmost side (dark side).

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Barron's Business Dictionary:

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A bar graph in which the frequency of occurrence for each class of data is represented by the relative height of the bars.

Previous:	Highs, Highly Leveraged, Highest and Best Use
Next:	Historic District, Historic Structure, Historical Cost

Oxford Dictionary of Geography:

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A graph which uses bars (rectangles) to show the frequency of certain classes of values within a dataset. Classes can be descriptive, as in a histogram showing numbers of voters for different parties, or numerical, so that the numbers, or percentages of a population in different age groups (0-4, 5-9, 10-14, and so on) are illustrated by a rectangle (bar). The widths of the rectangles should be proportional to the class intervals just as the heights are proportional to the frequencies of occurrence (numbers, or percentages) within each class.

Oxford Companion to the Photograph:

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In digital photography, an electronic bar chart showing the distribution of tones in an image, from completely dark (on the left) to completely light (on the right). In advanced cameras it can be displayed ‘live’ as an exposure aid in the viewfinder, to indicate the dynamic (tonal) range of the image being taken.

— Robin Lenman

Oxford Dictionary of Sports Science & Medicine:

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A graph used in statistics in which frequency distributions of interval-level data are represented by contiguous rectangles. In a histogram, the area of each rectangle is directly proportional to the frequency of each class interval represented. Compare bar chart.

Investopedia Financial Dictionary:

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1. A graphical representation, similar to a bar chart in structure, that organizes a group of data points into user-specified ranges. The histogram condenses a data series into an easily interpreted visual by taking many data points and grouping them into logical ranges or bins.

2. The MACD histogram is a very common technical indicator that illustrates the difference between the MACD line and the trigger line. This difference is then plotted on a chart in the form of a histogram to make it easy for a trader to determine a specific asset's momentum.

Investopedia Says:
1. Histograms are commonly used in statistics to demonstrate how many of a certain type of variable occurs within a specific range. For example, a census focused on the demography of a country may use a histogram of how many people there are between the ages of 0 and 10, 11 and 20, 21 and 30, 31 and 40, 41 and 50 etc. This histogram would look similar to the graph above.

2. MACD histograms are a popular tool used in technical analysis to gauge the strength of an asset's momentum. An increasing MACD histogram signals an increase in upward momentum while a decreasing histogram is used to signal downward momentum.

Related Links:
Currency traders can use this method to avoid stop-order triggers before the real reversal. Trading The MACD Divergence
Using the simple MACD histogram could change how forex traders analyze currency pairs for good. Forex: Keep An Eye On Momentum
This straightforward histogram can help you analyze the buying and selling interest in a stock. Gauging Support And Resistance With Price By Volume
Read the case against this well-established indicator. Candle Sheds More Light Than The MACD

Oxford Dictionary of Biochemistry:

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a diagram representing a frequency distribution. It consists of a number of contiguous rectangles whose widths are proportional to the class interval under consideration and whose heights are proportional to the frequency associated with each class.

Previous:	histoelectrofocusing, histocompatibility gene, histocompatibility antigen
Next:	histohematin, histone, histone acetyltransferase

Saunders Veterinary Dictionary:

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A graph in which values found in a statistical study are represented by lines or symbols placed horizontally or vertically, to indicate frequency distribution.

Mosby's Dental Dictionary:

histogram

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A bar graph; a graphic representation of a frequency distribution.

Random House Word Menu:

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Mathematical Tools - histogram: vertical block graph

Wikipedia on Answers.com:

Histogram

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For the histograms used in digital image processing, see Image histogram and Color histogram.

Histogram

One of the Seven Basic Tools of Quality
First described by	Karl Pearson
Purpose	To roughly assess the probability distribution of a given variable by depicting the frequencies of observations occurring in certain ranges of values

In statistics, a histogram is a graphical representation showing a visual impression of the distribution of data. It is an estimate of the probability distribution of a continuous variable and was first introduced by Karl Pearson.^[1] A histogram consists of tabular frequencies, shown as adjacent rectangles, erected over discrete intervals (bins), with an area equal to the frequency of the observations in the interval. The height of a rectangle is also equal to the frequency density of the interval, i.e., the frequency divided by the width of the interval. The total area of the histogram is equal to the number of data. A histogram may also be normalized displaying relative frequencies. It then shows the proportion of cases that fall into each of several categories, with the total area equaling 1. The categories are usually specified as consecutive, non-overlapping intervals of a variable. The categories (intervals) must be adjacent, and often are chosen to be of the same size.^[2] The rectangles of a histogram are drawn so that they touch each other to indicate that the original variable is continuous.^[3]

Histograms are used to plot density of data, and often for density estimation: estimating the probability density function of the underlying variable. The total area of a histogram used for probability density is always normalized to 1. If the length of the intervals on the x-axis are all 1, then a histogram is identical to a relative frequency plot.

An alternative to the histogram is kernel density estimation, which uses a kernel to smooth samples. This will construct a smooth probability density function, which will in general more accurately reflect the underlying variable.

The histogram is one of the seven basic tools of quality control.^[4]

Contents

1 Etymology
2 Examples
3 Activities and demonstrations
4 Mathematical definition
- 4.1 Cumulative histogram
- 4.2 Number of bins and width
5 See also
6 References
7 Further reading
8 External links

Etymology

An example histogram of the heights of 31 Black Cherry trees.

The etymology of the word histogram is uncertain. Sometimes it is said to be derived from the Greek histos 'anything set upright' (as the masts of a ship, the bar of a loom, or the vertical bars of a histogram); and gramma 'drawing, record, writing'. It is also said that Karl Pearson, who introduced the term in 1895, derived the name from "historical diagram".^[5]

Examples

The U.S. Census Bureau found that there were 124 million people who work outside of their homes.^[6] Using their data on the time occupied by travel to work, Table 2 below shows the absolute number of people who responded with travel times "at least 15 but less than 20 minutes" is higher than the numbers for the categories above and below it. This is likely due to people rounding their reported journey time.^{[citation needed]} The problem of reporting values as somewhat arbitrarily rounded numbers is a common phenomenon when collecting data from people.^{[citation needed]}

Histogram of travel time, US 2000 census. Area under the curve equals the total number of cases. This diagram uses Q/width from the table.

Data by absolute numbers
Interval	Width	Quantity	Quantity/width
0	5	4180	836
5	5	13687	2737
10	5	18618	3723
15	5	19634	3926
20	5	17981	3596
25	5	7190	1438
30	5	16369	3273
35	5	3212	642
40	5	4122	824
45	15	9200	613
60	30	6461	215
90	60	3435	57

This histogram shows the number of cases per unit interval so that the height of each bar is equal to the proportion of total people in the survey who fall into that category. The area under the curve represents the total number of cases (124 million). This type of histogram shows absolute numbers, with Q in thousands.

Histogram of travel time, US 2000 census. Area under the curve equals 1. This diagram uses Q/total/width from the table.

Data by proportion
Interval	Width	Quantity (Q)	Q/total/width
0	5	4180	0.0067
5	5	13687	0.0221
10	5	18618	0.0300
15	5	19634	0.0316
20	5	17981	0.0290
25	5	7190	0.0116
30	5	16369	0.0264
35	5	3212	0.0052
40	5	4122	0.0066
45	15	9200	0.0049
60	30	6461	0.0017
90	60	3435	0.0005

This histogram differs from the first only in the vertical scale. The height of each bar is the decimal percentage of the total that each category represents, and the total area of all the bars is equal to 1, the decimal equivalent of 100%. The curve displayed is a simple density estimate. This version shows proportions, and is also known as a unit area histogram.

In other words, a histogram represents a frequency distribution by means of rectangles whose widths represent class intervals and whose areas are proportional to the corresponding frequencies. The intervals are placed together in order to show that the data represented by the histogram, while exclusive, is also continuous. (E.g., in a histogram it is possible to have two connecting intervals of 10.5–20.5 and 20.5–33.5, but not two connecting intervals of 10.5–20.5 and 22.5–32.5. Empty intervals are represented as empty and not skipped.)^[7]

Activities and demonstrations

The SOCR resource pages contain a number of hands-on interactive activities demonstrating the concept of a histogram, histogram construction and manipulation using Java applets and charts.

Mathematical definition

An ordinary and a cumulative histogram of the same data. The data shown is a random sample of 10,000 points from a normal distribution with a mean of 0 and a standard deviation of 1.

In a more general mathematical sense, a histogram is a function m_i that counts the number of observations that fall into each of the disjoint categories (known as bins), whereas the graph of a histogram is merely one way to represent a histogram. Thus, if we let n be the total number of observations and k be the total number of bins, the histogram m_i meets the following conditions:

$n = \sum_{i=1}^k{m_i}.$

Cumulative histogram

A cumulative histogram is a mapping that counts the cumulative number of observations in all of the bins up to the specified bin. That is, the cumulative histogram M_i of a histogram m_j is defined as:

$M_i = \sum_{j=1}^i{m_j}.$

Number of bins and width

There is no "best" number of bins, and different bin sizes can reveal different features of the data. Some theoreticians have attempted to determine an optimal number of bins, but these methods generally make strong assumptions about the shape of the distribution. Depending on the actual data distribution and the goals of the analysis, different bin widths may be appropriate, so experimentation is usually needed to determine an appropriate width. There are, however, various useful guidelines and rules of thumb.^[8]

The number of bins k can be assigned directly or can be calculated from a suggested bin width h as:^{[citation needed]}

$k = \left \lceil \frac{\max x - \min x}{h} \right \rceil.$

The braces indicate the ceiling function.

Sturges' formula

Sturges' formula^[9] is derived from a binomial distribution and implicitly assumes an approximately normal distribution.

$k = \lceil \log_2 n + 1 \rceil, \,$

It implicitly bases the bin sizes on the range of the data and can perform poorly if n < 30.^{[citation needed]} It may also perform poorly if the data are not normally distributed.

Doane's formula

Doane's formula^[10] is a modification of Sturges' formula which attempts to improve its performance with non-normal data.

$k = 1 + log_e( n ) + log_e ( 1 + \hat a ( \frac { n } { 6 } )^{ 1 / 2 } )$

where a is the estimated kurtosis of the distribution.

Scott's normal reference rule^[11]

$h = \frac{3.5 \hat \sigma}{n^{1/3}},$

where $\hat \sigma$ is the sample standard deviation. Scott's normal reference rule is optimal for random samples of normally distributed data, in the sense that it minimizes the integrated mean squared error of the density estimate.^[12]

Square-root choice

$k = \sqrt{n}, \,$

which takes the square root of the number of data points in the sample (used by Excel histograms and many others).^{[citation needed]}

Freedman–Diaconis' choice

The Freedman–Diaconis rule is ^[13]^[12]:

$h = 2 \frac{\operatorname{IQR}(x)}{n^{1/3}},$

which is based on the interquartile range, denoted by IQR. It replaces 3.5σ of Scott's rule with 2 IQR, which is less sensitive than the standard deviation to outliers in data.

Choice based on minimization of an estimated L² risk function^[14]

$\underset{h}{\operatorname{arg\,min}} \frac{ 2 \bar{m} - v } {h^2}$

where $\textstyle \bar{m}$ and $\textstyle v$ are mean and biased variance of a histogram with bin-width $\textstyle h$ , $\textstyle \bar{m}=\frac{1}{k} \sum_{i=1}^{k} m_i$ and $\textstyle v= \frac{1}{k} \sum_{i=1}^{k} (m_i - \bar{m})^2$ .

References

^ Pearson, K. (1895). "Contributions to the Mathematical Theory of Evolution. II. Skew Variation in Homogeneous Material". Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences 186: 343–326. Bibcode 1895RSPTA.186..343P. doi:10.1098/rsta.1895.0010. edit
^ Howitt, D. and Cramer, D. (2008) Statistics in Psychology. Prentice Hall
^ C. Stangor (2011) "Research Methods For The Behavioral Sciences". Wadsworth, Cengage Learning.
^ Nancy R. Tague (2004). "Seven Basic Quality Tools". The Quality Toolbox. Milwaukee, Wisconsin: American Society for Quality. p. 15. http://www.asq.org/learn-about-quality/seven-basic-quality-tools/overview/overview.html. Retrieved 2010-02-05.
^ M. Eileen Magnello (December 1856). "Karl Pearson and the Origins of Modern Statistics: An Elastician becomes a Statistician". The New Zealand Journal for the History and Philosophy of Science and Technology 1 volume. ISSN 1177–1380. http://www.rutherfordjournal.org/article010107.html.
^ US 2000 census.
^ Dean, S., & Illowsky, B. (2009, February 19). Descriptive Statistics: Histogram. Retrieved from the Connexions Web site: http://cnx.org/content/m16298/1.11/
^ e.g. § 5.6 "Density Estimation", W. N. Venables and B. D. Ripley, Modern Applied Statistics with S, Springer, 4th edition
^ Sturges, H. A. (1926). "The choice of a class interval". J American Statistical Association: 65–66. JSTOR 2965501.
^ Doane DP (1976) Aesthetic frequency classiﬁcation. American Statistician, 30: 181–183
^ Scott, David W. (1979). "On optimal and data-based histograms". Biometrika 66 (3): 605–610. doi:10.1093/biomet/66.3.605.
^ ^a ^b Scott, D. (1992). Multivariate Density Estimation: Theory, Practice, and Visualization. New York: John Wiley.
^ Freedman, David; Diaconis, P. (1981). "On the histogram as a density estimator: L₂ theory". Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete 57 (4): 453–476. doi:10.1007/BF01025868.
^ Shimazaki, H.; Shinomoto, S. (2007). "A method for selecting the bin size of a time histogram". Neural Computation 19 (6): 1503–1527. doi:10.1162/neco.2007.19.6.1503. PMID 17444758. http://www.mitpressjournals.org/doi/abs/10.1162/neco.2007.19.6.1503.

External links

Look up histogram in Wiktionary, the free dictionary.

Journey To Work and Place Of Work (location of census document cited in example)
Smooth histogram for signals and images from a few samples
Histograms: Construction, Analysis and Understanding with external links and an application to particle Physics.
A Method for Selecting the Bin Size of a Histogram
Interactive histogram generator
Matlab function to plot nice histograms

Statistics

Descriptive statistics

Continuous data

Location	Mean (Arithmetic, Geometric, Harmonic) Median Mode

Dispersion	Range Standard deviation Coefficient of variation Percentile Interquartile range

Shape	Variance Skewness Kurtosis Moments L-moments

Count data

Index of dispersion

Summary tables

Dependence

Statistical graphics

Data collection

Designing studies	Effect size Standard error Statistical power Sample size determination

Survey methodology	Sampling Stratified sampling Opinion poll Questionnaire

Controlled experiment	Design of experiments Randomized experiment Random assignment Replication Blocking Factorial experiment Optimal design

Uncontrolled studies	Natural experiment Quasi-experiment Observational study

Statistical inference

Statistical theory	Sampling distribution Sufficient statistic Meta-analysis

Bayesian inference	Bayesian probability Prior Posterior Credible interval Bayes factor Bayesian estimator Maximum posterior estimator

Frequentist inference	Confidence interval Hypothesis testing Likelihood-ratio

Specific tests	Z-test (normal) Student's t-test F-test Chi-squared test Wald test Mann–Whitney U Shapiro–Wilk Signed-rank Kolmogorov–Smirnov test

General estimation	Bias Robustness Efficiency Maximum likelihood Method of moments Minimum distance Density estimation

Correlation and regression analysis

Correlation	Pearson product-moment correlation Partial correlation Confounding variable Coefficient of determination

Regression analysis	Errors and residuals Regression model validation Mixed effects models Simultaneous equations models

Linear regression	Simple linear regression Ordinary least squares General linear model Bayesian regression

Non-standard predictors	Nonlinear regression Nonparametric Semiparametric Isotonic Robust

Generalized linear model	Exponential families Logistic (Bernoulli) Binomial Poisson

Partition of variance	Analysis of variance (ANOVA) Analysis of covariance Multivariate ANOVA Degrees of freedom

Categorical, multivariate, time-series, or survival analysis

Categorical data

Multivariate statistics

Time series analysis

General	Decomposition Trend Stationarity Seasonal adjustment

Time domain	ACF PACF XCF ARMA model ARIMA model Vector autoregression

Frequency domain	Spectral density estimation

Survival analysis

Applications

Biostatistics	Bioinformatics Biometrics Clinical trials & studies Epidemiology Medical statistics

Engineering statistics	Chemometrics Methods engineering Probabilistic design Process & Quality control Reliability System identification

Social statistics	Actuarial science Census Crime statistics Demography Econometrics National accounts Official statistics Population Psychometrics

Spatial statistics	Cartography Environmental statistics Geographic information system Geostatistics Kriging

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Translations:

Histogram

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Dansk (Danish)
n. - histogram, blokdiagram

Nederlands (Dutch)
histogram

Français (French)
n. - histogramme

Deutsch (German)
n. - Histogramm, Balkendiagramm

Ελληνική (Greek)
n. - (στατιστικό) ιστόγραμμα

Italiano (Italian)
istogramma

Português (Portuguese)
n. - histograma (m)

Русский (Russian)
гистограмма

Español (Spanish)
n. - histograma

Svenska (Swedish)
n. - histogram, stapeldiagram

中文（简体）(Chinese (Simplified))
柱状图

中文（繁體）(Chinese (Traditional))
n. - 柱狀圖

한국어 (Korean)
n. - 막대 그래프

日本語 (Japanese)
n. - 柱状図表, 柱状グラフ

العربيه (Arabic)
‏(الاسم) الرسم البياني النسيجي, رسم بياني مؤلف من سلسله من المستطيلات في علم الاحصاء‏

עברית (Hebrew)
n. - ‮תרשים עמודות, היסטוגרמה‬

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American Heritage Dictionary The American Heritage® Dictionary of the English Language, Fourth Edition Copyright © 2007, 2000 by Houghton Mifflin Company. Updated in 2009. Published by Houghton Mifflin Company. All rights reserved. Read

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Computer Desktop Encyclopedia THIS DEFINITION IS FOR PERSONAL USE ONLY.
All other reproduction is strictly prohibited without permission from the publisher.
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Wikipedia on Answers.com This article is licensed under the Creative Commons Attribution/Share-Alike License. It uses material from the Wikipedia article Histogram. Read