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Integral symbol

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(Redirected from Integral sign) Mathematical symbol used to denote integrals and antiderivatives Not to be confused with Long s, Esh (letter), or Voiceless postalveolar fricative.
Integral symbol
In UnicodeU+222B ∫ INTEGRAL (∫, ∫)
Graphical variants
{\displaystyle \displaystyle \int }
Different from
Different fromU+017F ſ LATIN SMALL LETTER LONG S
U+0283 ʃ LATIN SMALL LETTER ESH

The integral symbol (see below) is used to denote integrals and antiderivatives in mathematics, especially in calculus.

∫ (Unicode), {\displaystyle \displaystyle \int } (LaTeX)


History

Main article: Leibniz's notation

The notation was introduced by the German mathematician Gottfried Wilhelm Leibniz in 1675 in his private writings; it first appeared publicly in the article "De Geometria Recondita et analysi indivisibilium atque infinitorum" (On a hidden geometry and analysis of indivisibles and infinites), published in Acta Eruditorum in June 1686. 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.

Typography in Unicode and LaTeX

Fundamental symbol

Main article: Integral calculus

The integral symbol is U+222B ∫ INTEGRAL in Unicode 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 letter ʃ ("esh").

Extensions of the symbol

See also: Multiple integral

Related symbols include:

Meaning Unicode LaTeX
Double integral U+222C {\displaystyle \iint } \iint
Triple integral U+222D {\displaystyle \iiint } \iiint
Quadruple integral U+2A0C {\displaystyle \iiiint } \iiiint
Contour integral U+222E {\displaystyle \oint } \oint
Clockwise integral U+2231
Counterclockwise integral U+2A11
Clockwise contour integral U+2232 \varointclockwise \varointclockwise
Counterclockwise contour integral U+2233 \ointctrclockwise \ointctrclockwise
Closed surface integral U+222F \oiint \oiint
Closed volume integral U+2230 \oiiint \oiiint

Typography in other languages

Regional variations (English, German, and Russian from left to right) 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 slightly to the left to occupy less horizontal space.

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:

0 5 f ( t ) d t , g ( t ) = a g ( t ) = b f ( t ) d t . {\displaystyle \int _{0}^{5}f(t)\,\mathrm {d} t,\quad \int _{g(t)=a}^{g(t)=b}f(t)\,\mathrm {d} t.}

By contrast, in German and Russian texts, the limits are placed above and below the integral symbol, and, as a result, the notation requires larger line spacing but is more compact horizontally, especially when using longer expressions in the limits:

0 T f ( t ) d t , g ( t ) = a g ( t ) = b f ( t ) d t . {\displaystyle \int \limits _{0}^{T}f(t)\,\mathrm {d} t,\quad \int \limits _{\!\!\!\!\!g(t)=a\!\!\!\!\!}^{\!\!\!\!\!g(t)=b\!\!\!\!\!}f(t)\,\mathrm {d} t.}

See also

Notes

  1. Gottfried Wilhelm Leibniz, Sämtliche Schriften und Briefe, Reihe VII: Mathematische Schriften, vol. 5: Infinitesimalmathematik 1674–1676, Berlin: Akademie Verlag, 2008, pp. 288–295 Archived 2021-10-09 at the Wayback Machine ("Analyseos tetragonisticae pars secunda", October 29, 1675) and 321–331 Archived 2016-10-03 at the Wayback Machine ("Methodi tangentium inversae exempla", November 11, 1675).
  2. Aldrich, John. "Earliest Uses of Symbols of Calculus". Retrieved 20 April 2017.
  3. Swetz, Frank J., Mathematical Treasure: Leibniz's Papers on Calculus – Integral Calculus, Convergence, Mathematical Association of America, archived from the original on December 27, 2016, retrieved February 11, 2017
  4. Stillwell, John (1989). Mathematics and its History. Springer. p. 110.
  5. ^ "Mathematical Operators – Unicode" (PDF). Retrieved 2013-04-26.
  6. "Supplemental Mathematical Operators – Unicode" (PDF). Retrieved 2013-05-05.
  7. "Russian Typographical Traditions in Mathematical Literature" (PDF). giftbot.toolforge.org. Archived from the original (PDF) on 28 September 2012. Retrieved 11 October 2021.

References

External links

Infinitesimals
History
Related branches
Formalizations
Individual concepts
Mathematicians
Textbooks
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