Английская Википедия:Al-Jabr

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Шаблон:Short description Шаблон:Other uses Шаблон:Use dmy dates Шаблон:Infobox book Al-Jabr (Arabic: Шаблон:Lang), also known as The Compendious Book on Calculation by Completion and Balancing (Шаблон:Lang-ar, Шаблон:Transliteration;Шаблон:Efn or Шаблон:Lang-la), is an Arabic mathematical treatise on algebra written in Baghdad around 820 CE by the Persian polymath Al-Khwarizmi. It was a landmark work in the history of mathematics, with its title being the ultimate etymology of the word "algebra" itself, later borrowed into Medieval Latin as Шаблон:Lang.

Al-Jabr provided an exhaustive account of solving for the positive roots of polynomial equations up to the second degree.[1]Шаблон:RpШаблон:Efn It was the first text to teach elementary algebra, and the first to teach algebra for its own sake.Шаблон:Efn It also introduced the fundamental concept of "reduction" and "balancing" (which the term al-jabr originally referred to), the transposition of subtracted terms to the other side of an equation, i.e. the cancellation of like terms on opposite sides of the equation.Шаблон:Efn Mathematics historian Victor J. Katz regards Al-Jabr as the first true algebra text that is still extant.Шаблон:Efn Translated into Latin by Robert of Chester in 1145, it was used until the sixteenth century as the principal mathematical textbook of European universities.[2]Шаблон:Efn[3][4]

Several authors have also published texts under this name, including Abu Hanifa Dinawari, Abu Kamil, Abū Muḥammad al-ʿAdlī, Abū Yūsuf al-Miṣṣīṣī, 'Abd al-Hamīd ibn Turk, Sind ibn ʿAlī, Sahl ibn Bišr, and Šarafaddīn al-Ṭūsī.

Legacy

R. Rashed and Angela Armstrong write: Шаблон:Blockquote

J. J. O'Connor and E. F. Robertson wrote in the MacTutor History of Mathematics archive: Шаблон:Blockquote

The book

The book was a compilation and extension of known rules for solving quadratic equations and for some other problems, and considered to be the foundation of algebra, establishing it as an independent discipline. The word algebra is derived from the name of one of the basic operations with equations described in this book, following its Latin translation by Robert of Chester.[5]

Quadratic equations

Файл:Bodleian MS. Huntington 214 roll332 frame36.jpg
Pages from a 14th-century Arabic copy of the book, showing geometric solutions to two quadratic equations.

The book classifies quadratic equations to one of the six basic types and provides algebraic and geometric methods to solve the basic ones. Historian Carl Boyer notes the following regarding the lack of modern abstract notations in the book:[6] Шаблон:Blockquote

Thus the equations are verbally described in terms of "squares" (what would today be "x2"), "roots" (what would today be "x") and "numbers" ("constants": ordinary spelled out numbers, like 'forty-two'). The six types, with modern notations, are:

  1. squares equal roots (ax2 = bx)
  2. squares equal number (ax2 = c)
  3. roots equal number (bx = c)
  4. squares and roots equal number (ax2 + bx = c)
  5. squares and number equal roots (ax2 + c = bx)
  6. roots and number equal squares (bx + c = ax2)

Islamic mathematicians, unlike the Hindus, did not deal with negative numbers at all; hence an equation like bx + c = 0 does not appear in the classification, because it has no positive solutions if all the coefficients are positive. Similarly equation types 4, 5 and 6, which look equivalent to the modern eye, were distinguished because the coefficients must all be positive.[7]Шаблон:Page needed

Al-Jabr ("forcing", "restoring") operation is moving a deficient quantity from one side of the equation to the other side. In an al-Khwarizmi's example (in modern notation), "x2 = 40x − 4x2" is transformed by al-Jabr into "5x2 = 40x". Repeated application of this rule eliminates negative quantities from calculations.

Al-Muqābala (Шаблон:Lang, "balancing" or "corresponding") means subtraction of the same positive quantity from both sides: "x2 + 5 = 40x + 4x2" is turned into "5 = 40x + 3x2". Repeated application of this rule makes quantities of each type ("square"/"root"/"number") appear in the equation at most once, which helps to see that there are only 6 basic solvable types of the problem, when restricted to positive coefficients and solutions.

Subsequent parts of the book do not rely on solving quadratic equations.

Area and volume

The second chapter of the book catalogues methods of finding area and volume. These include approximations of pi (π), given three ways, as 3 1/7, √10, and 62832/20000. This latter approximation, equalling 3.1416, earlier appeared in the Indian Āryabhaṭīya (499 CE).[8]

Other topics

Al-Khwārizmī explicates the Jewish calendar and the 19-year cycle described by the convergence of lunar months and solar years.[8]

About half of the book deals with Islamic rules of inheritance, which are complex and require skill in first-order algebraic equations.[9]

References

Notes

Шаблон:Notelist

Citations

Шаблон:Reflist

Further reading

External links

Шаблон:Wikisource

Шаблон:Islamic mathematics Шаблон:Mathematics in Iran

Шаблон:Authority control

Партнерские ресурсы
Криптовалюты
Магазины
Хостинг
Разное

  1. Шаблон:Cite book
  2. Шаблон:Cite book
  3. Шаблон:Cite web
  4. Шаблон:Cite web
  5. Шаблон:Cite book
  6. Carl B. Boyer, A History of Mathematics, Second Edition (Wiley, 1991), p. 228
  7. Ошибка цитирования Неверный тег <ref>; для сносок Katz2006 не указан текст
  8. 8,0 8,1 B.L. van der Waerden, A History of Algebra: From al-Khwārizmī to Emmy Noether; Berlin: Springer-Verlag, 1985. Шаблон:ISBN
  9. Шаблон:Cite encyclopedia
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