Integral symbol

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Not to be confused with Long s or Esh (letter).

The integral symbol:

∫ (Unicode), $\displaystyle \int$ (LaTeX)

is used to denote integrals and antiderivatives in mathematics. The notation was introduced by the German mathematician Gottfried Wilhelm Leibniz towards the end of the 17th century. The symbol was based on the ſ (long s) character, and was chosen because Leibniz thought of the integral as an infinite sum of infinitesimal summands. See long s for more details on the history of ſ.

Typography in Unicode and LaTeX

Fundamental symbol

The integral symbol is U+222B ∫ integral in Unicode^[1] and \int in LaTeX. In HTML, it is written as ∫ (hexadecimal), ∫ (decimal) and ∫ (named "entity").

The original IBM PC code page 437 character set included a couple of characters ⌠ and ⌡ (codes 244 and 245, respectively) to build the integral symbol. These were deprecated in subsequent MS-DOS code pages, but they still remain in Unicode (U+2320 and U+2321, respectively) for compatibility.

The ∫ symbol is very similar to, but not to be confused with, the ʃ symbol (called "esh").

Extensions of the symbol

Meaning	Unicode	LaTeX
Double integral	∬	U+222C	$\iint$	`\iint`
Triple integral	∭	U+222D	$\iiint$	`\iiint`
Contour integral	∮	U+222E	$\oint$	`\oint`
Clockwise integral	∱	U+2231
Anticlockwise integral	⨑	U+2A11
Clockwise contour integral	∲	U+2232	$\oiint$	`\varointclockwise`
Anticlockwise contour integral	∳	U+2233	$\oiint$	`\ointctrclockwise`
Closed surface integral	∯	U+222F	$\oiint$	`\oiint`
Closed volume integral	∰	U+2230	$\oiint$	`\oiiint`

Typography in other languages

Regional variations (English, German, Russian) of the integral symbol.

In other languages, the shape of the integral symbol differs slightly from the shape commonly seen in English-language textbooks. While the English integral symbol leans to the right, the German symbol (used throughout Central Europe) is upright, and the Russian variant leans to the left.

Another difference is in the placement of limits for definite integrals. Generally, in English-language books, limits go to the right of the integral symbol: $\int _{0}^{T}f(t)\;dt$ .

By contrast, in German and Russian texts, limits for definite integrals are placed above and below the integral symbol, and, as a result, the notation requires larger line spacing: $\int \limits _{0}^{T}f(t)\;{\mathrm {d}}t$ .

Notes

↑ 1.0 1.1 "Mathematical Operators – Unicode". Retrieved 2013-04-26.
↑ "Supplemental Mathematical Operators – Unicode". Retrieved 2013-05-05.

References

Stewart, James (2003). "Integrals". Single Variable Calculus: Early Transcendentals (5th edition ed.). Belmont, CA: Brooks/Cole. p. 381. ISBN 0-534-39330-6. |accessdate= requires |url= (help)
Zaitcev, V.; Janishewsky, A.; Berdnikov, A. (1999), "Russian Typographical Traditions in Mathematical Literature", EuroTeX'99 Proceedings

External links

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v t e Infinitesimals

History	Adequality Infinitesimal calculus Leibniz's notation Integral symbol Criticism of non-standard analysis The Analyst The Method of Mechanical Theorems Cavalieri's principle

Related branches	Non-standard analysis Non-standard calculus Internal set theory Synthetic differential geometry Constructive non-standard analysis

Formalizations	Differentials Hyperreal numbers Dual numbers Surreal numbers

Individual concepts	Standard part function Transfer principle Hyperinteger Increment theorem Monad Internal set Levi-Civita field Hyperfinite set Law of Continuity Overspill Microcontinuity Transcendental law of homogeneity

Scientists	Gottfried Wilhelm Leibniz Abraham Robinson Pierre de Fermat Augustin-Louis Cauchy Leonhard Euler

Physics Engineering	Infinitesimal strain theory Infinitesimal oscillations of a pendulum

Textbooks	Analyse des Infiniment Petits Elementary Calculus Cours d'Analyse

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