Khayyam$98042$ - Definition. Was ist Khayyam$98042$
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Was (wer) ist Khayyam$98042$ - definition

QUADRILATERAL WITH TWO EQUAL SIDES PERPENDICULAR TO THE BASE
Khayyam-Saccheri quadrilateral; Saccheri Quadrilateral; Khayyam–Saccheri quadrilateral; Khayyam quadrilateral
  • 160px
  • 160px
  • Saccheri quadrilaterals

Rubaiyat of Omar Khayyam         
  • Illustration by [[Adelaide Hanscom]] (c. 1910).
  • Illustration by [[Edmund Joseph Sullivan]] for Quatrain 12 of FitzGerald's First Version.
  • Illustration by [[Edmund Joseph Sullivan]] for Quatrain 51 of FitzGerald's First Version.
  • Calligraphic manuscript page with three of FitzGerald's ''Rubaiyat'' written by [[William Morris]], illustration by [[Edward Burne-Jones]] (1870s).
  • Indian]] artist [[M. V. Dhurandhar]].
PERSIAN-ENGLISH QUATRAINS TRANSLATIONS BY EDWARD FITZGERALD
Rubaiyat of Omar Khayyam/Introduction; Rubaiyat of Omar Khayyam/Notes on Fifth Edition; The Rubáiyát of Omar Khayyám; Rubaiyat (Khayyam); Rubáiyát of Omar Khayyám; Rubaiyat of Omar Khayam; Rubayait of omhar kayyam; Rubaiyat of omhar kayyam; The Rubaiyat of Omar Khayyam; Rubaiyyat of Omar Khayyam; The Rubaiyat; Rubaiyat of Omar Khayyám; Rubaiyat of Omar Khayyim; The Rubayat of Omar Khayyam; Rubáiyat of Omar Khayyam; The Rubaiyat of Omar Khayyám; The Rubaiyyat Of Omar Khayyam; A jug of wine, a loaf of bread, and thou
Rubáiyát of Omar Khayyám is the title that Edward FitzGerald gave to his 1859 translation from Persian to English of a selection of quatrains () attributed to Omar Khayyam (1048–1131), dubbed "the Astronomer-Poet of Persia".
Saccheri quadrilateral         
A Saccheri quadrilateral (also known as a Khayyam–Saccheri quadrilateral) is a quadrilateral with two equal sides perpendicular to the base. It is named after Giovanni Gerolamo Saccheri, who used it extensively in his book Euclides ab omni naevo vindicatus (literally Euclid Freed of Every Flaw) first published in 1733, an attempt to prove the parallel postulate using the method Reductio ad absurdum.
Pascal's triangle         
  • Visualisation of binomial expansion up to the 4th power
  • a4 white rook
  • b4 one
  • c4 one
  • b3 two
  • c3 three
  • d3 four
  • c2 six
  • [[Fibonacci sequence]] in Pascal's triangle
  • Each frame represents a row in Pascal's triangle. Each column of pixels is a number in binary with the least significant bit at the bottom. Light pixels represent ones and the dark pixels are zeroes.
  • In Pascal's triangle, each number is the sum of the two numbers directly above it.
  • A level-4 approximation to a Sierpinski triangle obtained by shading the first 32 rows of a Pascal triangle white if the binomial coefficient is even and black if it is odd.
  • Pascal]]'s version of the triangle
  • rod numerals]], appears in [[Jade Mirror of the Four Unknowns]], a mathematical work by [[Zhu Shijie]], dated 1303.
TRIANGULAR ARRAY OF THE BINOMIAL COEFFICIENTS IN MATHEMATICS
Pascals triangle; Pascals Triangle; Pascal's Triangle; Yang Hui's triangle; Pascal triangle; Khayyam-Pascal's triangle; Binomial triangle; Yanghui Triangle; Yanghui's triangle; Pascals tringle; Pascals triagle; Khayyam-Pascal triangle; Yang Hui's Triangle; Tartaglia's triangle; Khayyam triangle; Khayyám triangle; Yanghui triangle; Chinese's triangle; Triangle of Pascal; Triangle's Pascal; Pascal’s triangle; D-triangle number; Meru Prastara
In mathematics, Pascal's triangle is a triangular array of the binomial coefficients that arises in probability theory, combinatorics, and algebra. In much of the Western world, it is named after the French mathematician Blaise Pascal, although other mathematicians studied it centuries before him in India,Maurice Winternitz, History of Indian Literature, Vol.

Wikipedia

Saccheri quadrilateral

A Saccheri quadrilateral (also known as a Khayyam–Saccheri quadrilateral) is a quadrilateral with two equal sides perpendicular to the base. It is named after Giovanni Gerolamo Saccheri, who used it extensively in his book Euclides ab omni naevo vindicatus (literally Euclid Freed of Every Flaw) first published in 1733, an attempt to prove the parallel postulate using the method Reductio ad absurdum. The Saccheri quadrilateral may occasionally be referred to as the Khayyam–Saccheri quadrilateral, in reference to the 11th century Persian scholar Omar Khayyam.

For a Saccheri quadrilateral ABCD, the sides AD and BC (also called the legs) are equal in length, and also perpendicular to the base AB. The top CD is the summit or upper base and the angles at C and D are called the summit angles.

The advantage of using Saccheri quadrilaterals when considering the parallel postulate is that they place the mutually exclusive options in very clear terms:

Are the summit angles right angles, obtuse angles, or acute angles?

As it turns out:

  • when the summit angles are right angles, the existence of this quadrilateral is equivalent to the statement expounded by Euclid's fifth postulate.
  • When the summit angles are acute, this quadrilateral leads to hyperbolic geometry, and
  • when the summit angles are obtuse, the quadrilateral leads to elliptical or spherical geometry (provided that also some other modifications are made to the postulates).

Saccheri himself, however, thought that both the obtuse and acute cases could be shown to be contradictory. He did show that the obtuse case was contradictory, but failed to properly handle the acute case.