Golden ratio






Line segments in the golden ratio




A golden rectangle with longer side a and shorter side b, when placed adjacent to a square with sides of length a, will produce a similar golden rectangle with longer side a + b and shorter side a. This illustrates the relationship a+ba=ab≡φdisplaystyle frac a+ba=frac abequiv varphi frac a+ba=frac abequiv varphi .




The golden spiral is calculated by tiling the square of Fibonacci numbers, which are related by the golden ratio.


In mathematics, two quantities are in the golden ratio if their ratio is the same as the ratio of their sum to the larger of the two quantities. The figure on the right illustrates the geometric relationship. The golden ratio is also called the golden mean or golden section (Latin: sectio aurea).[1][2][3] Other names include extreme and mean ratio,[4]divine proportion,[5]divine section (Latin: sectio divina), golden proportion, golden cut,[6] and golden number (not to be confused with the related Fibonacci numbers).[7][8]


Mathematicians since Euclid—and perhaps earlier—have studied the properties of the golden ratio, including its self-similarity and appearance in the dimensions of a regular pentagon and in a golden rectangle, which may be cut into a square and a smaller rectangle with the same aspect ratio. The golden ratio appears in some patterns in nature, including the spiral arrangement of leaves and other plant parts. The golden ratio has also been used to analyze the proportions of natural objects as well as man-made systems such as financial markets, in some cases based on dubious fits to data.[9]


Some twentieth-century artists and architects, including Le Corbusier and Salvador Dalí, have proportioned their works to approximate the golden ratio—especially in the form of the golden rectangle, in which the ratio of the longer side to the shorter is the golden ratio—believing this proportion to be aesthetically pleasing.


Expressed algebraically, for quantities a and b with a > b > 0,


a+ba=ab =def φ,displaystyle frac a+ba=frac ab stackrel textdef= varphi ,frac a+ba=frac ab stackrel textdef= varphi ,

where the Greek letter phi (φdisplaystyle varphi varphi or ϕdisplaystyle phi phi ) represents the golden ratio.[a] It is an irrational number with a value of:



φ=1+52=1.6180339887….displaystyle varphi =frac 1+sqrt 52=1.6180339887ldots .varphi =frac 1+sqrt 52=1.6180339887ldots .[10]

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Contents





  • 1 History


  • 2 Applications

    • 2.1 Architecture


    • 2.2 Art


    • 2.3 Books and design


    • 2.4 Music


    • 2.5 In nature


    • 2.6 Disputed claims

      • 2.6.1 The Parthenon


      • 2.6.2 Section d'Or and Cubism




  • 3 Mathematics

    • 3.1 Calculation


    • 3.2 Irrationality

      • 3.2.1 Contradiction from an expression in lowest terms


      • 3.2.2 By irrationality of 5



    • 3.3 Minimal polynomial


    • 3.4 Golden ratio conjugate


    • 3.5 Alternative forms


    • 3.6 Geometry

      • 3.6.1 Dividing a line segment by interior division


      • 3.6.2 Dividing a line segment by exterior division


      • 3.6.3 Golden triangle, pentagon and pentagram

        • 3.6.3.1 Golden triangle


        • 3.6.3.2 Pentagon


        • 3.6.3.3 Odom's construction


        • 3.6.3.4 Pentagram


        • 3.6.3.5 Ptolemy's theorem



      • 3.6.4 Scalenity of triangles


      • 3.6.5 Triangle whose sides form a geometric progression


      • 3.6.6 Golden triangle, rhombus, and rhombic triacontahedron


      • 3.6.7 Golden pyramid



    • 3.7 Relation to Fibonacci sequence


    • 3.8 Symmetries


    • 3.9 Other properties


    • 3.10 Decimal expansion



  • 4 See also


  • 5 References

    • 5.1 Works cited



  • 6 Further reading


  • 7 External links



History



The Great Pyramid of Giza (c. 2560 BC) closely approximates a golden pyramid according to various measurements. The Babylonian Tablet of Shamash (c. 888–855 BC) can be superimposed with two orders of golden rectangles.[11] Various attempts have been made to link other ancient objects to the golden ratio, but many of these claims lack specificity or evidence to back them.[12]




A pentagram with colored line segments of different lengths, related to one another via the golden ratio.


Though ancient Greek philosopher Pythagoras (c. 570 BC–c. 495 BC) left behind no writing, he is generally credited with knowledge of the golden ratio and the related dodecahedron, and imparting this knowledge to his followers; their symbol was the pentagram.[13][14] According to one story, the 5th-century Pythagorean Hippasus discovered that the golden ratio was an irrational number, surprising other Pythagoreans.[15] Hippasus was also the first to write of the dodecahedron,[16] with Theaetetus (c. 417–c. 369 BC) being the first to describe all five possible regular solids.[17] In the Republic (c. 380 BC), Plato expresses the concept of self-similarity in his Analogy of the Divided Line.[18]Euclid in his Elements (c. 300 BC) provides several propositions and their proofs employing the golden ratio,[b] using it in the construction of the pentagon, icosahedron and dodecahedron.[19] It also contains the first known definition:[20][21]


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A straight line is said to have been cut in extreme and mean ratio when, as the whole line is to the greater segment, so is the greater to the lesser.[4]


Hero of Alexandria developed formulas for the area of a pentagon and the volumes of icosahedrons and dodecahedrons in the first century AD.[22] Fellow Alexandrians Ptolemy calculated trigonometric chords for angles relating to the golden ratio in the second century, and Pappus made calculations for the comparison of Platonic solids related to the golden ratio c. 340 AD.[23]




Three golden rectangles in an icosahedron


Abū Kāmil Shujāʿ ibn Aslam (c. 850–930) employed the golden ratio in his calculations of pentagons; some of his work influenced that of Fibonacci.[24]Piero della Francesca (c. 1412–1492) developed geometrical solutions involving pentagons and the Platonic solids; much of his work was translated by Luca Pacioli in his 1509 Divina proportione (Divine Proportion),[25][20] which points out that golden rectangles can be inscribed by an icosahedron.[26] Other 16th-century mathematicians such as Flussates Candalla and Rafael Bombelli solved problems related to pentagons and Platonic solids using the golden ratio.[27] The first known approximation of the (inverse) golden ratio by a decimal fraction was stated as "about 0.6180340" in 1597 by Michael Maestlin in a letter to his former student Johannes Kepler.[20][28] Kepler combined the golden ratio with the Pythagorean theorem in the triangle named for him by 1597,[20][29] and proved that consecutive Fibonacci numbers approximate the golden ratio with greater accuracy by 1608.[30][31][c]


18th-century mathematicians Abraham de Moivre, Daniel Bernoulli, and Leonhard Euler used a golden ratio-based formula which finds the value of a Fibonacci number based on its placement in the sequence; in 1843 this was rediscovered by Jacques Philippe Marie Binet, for whom it was named.[33][34][35] In 1754, Charles Bonnet pointed out that the spiral phyllotaxis of plants were frequently expressed in golden ratio series.[36][20]Martin Ohm is believed to have been the first to use the term Goldener Schnitt ('golden section') to describe the ratio in 1835.[20][37] In 1855, Friedrich Röber theorized that the Great Pyramid of Giza was based on a Kepler triangle.[38][29][39]





Phi (pronounced 'fee'[40] or 'fai')[41]


By 1914, mathematician Mark Barr suggested Greek letter Phi (φ) as a symbol for the golden ratio.[d] Previously, it was represented by τ (tau, the first letter of the ancient Greek root τομή—meaning cut or section).[44][45] In 1966, Fibonacci Quarterly published φ calculated to 4,600 digits; thirty years later, it was calculated to 10 million decimal places.[46] In 1974, Roger Penrose discovered a form of tiling derived from the diagonal division of pentagons which is related to the golden ratio both in the relationship of areas of its two rhombic tiles and their relative frequency within the pattern.[47][48] This in turn led to new discoveries about quasicrystals.[20][49]


Applications


Architecture





A regular square pyramid is determined by its medial right triangle, whose edges are the pyramid's semi-base (b), apothem (a), and height (h). Proportions b:h:a of 1:φ:φdisplaystyle 1:sqrt varphi :varphi 1:sqrt varphi :varphi and 3:4:5displaystyle 3:4:5displaystyle 3:4:5 are of particular interest in relation to Egyptian pyramids.


The perimeter-to-height ratio of the Great Pyramid of Giza (c. 2560 BC) is very close to 2π.[50] Based on the most reliable measurements, its slant height divided by half the base width produces φ; together with its height, the three lengths form a Kepler triangle, making it a golden pyramid.[50][51] This was first theorized by Friedrich Röber in 1855.[29][38][39][e] Based on the averages of values published by 21 different authors beginning with Howard Vyse in 1840, the ratio of slant height to semi-base is 1.61893.[52][f] Modern scholars have long debated whether the Egyptians had knowledge of the golden ratio,[53][54] with many contending that its appearance in ancient Egyptian architecture is the result of chance.[55][56][57]Eric Temple Bell argued in 1950 that ancient Egyptians would not have had the ability to calculate a pyramid's slant height or its ratio to the height, except in the simple example of a design based on the 3:4:5 triangle as described in the Rhind Mathematical Papyrus.[58][59] Furthermore, ancient Egyptian mathematics did not include irrational numbers.[60][g]


It has been speculated that the golden ratio was used by the designers of the Naqsh-e Jahan Square (1629) and the adjacent Lotfollah Mosque.[62] A 2004 geometrical analysis of earlier research into the Great Mosque of Kairouan reveals a consistent application of the golden ratio throughout the design, according to Boussora and Mazouz.[63] They found ratios close to the golden ratio in the overall proportion of the plan and in the dimensioning of the prayer space, the court, and the minaret. The authors note, however, that the areas where ratios close to the golden ratio were found are not part of the original construction, and theorize that these elements were added in a reconstruction.




An example of Le Corbusier's architecture


The Swiss architect Le Corbusier, famous for his contributions to the modern international style, centered his design philosophy on systems of harmony and proportion. Le Corbusier's faith in the mathematical order of the universe was closely bound to the golden ratio and the Fibonacci series, which he described as "rhythms apparent to the eye and clear in their relations with one another. And these rhythms are at the very root of human activities. They resound in man by an organic inevitability, the same fine inevitability which causes the tracing out of the Golden Section by children, old men, savages and the learned."[64][65] Le Corbusier explicitly used the golden ratio in his Modulor system for the scale of architectural proportion. He saw this system as a continuation of the long tradition of Vitruvius, Leonardo da Vinci's Vitruvian Man, the work of Leon Battista Alberti, and others who used the proportions of the human body to improve the appearance and function of architecture. In addition to the golden ratio, Le Corbusier based the system on human measurements, Fibonacci numbers, and the double unit. He took suggestion of the golden ratio in human proportions to an extreme: he sectioned his model human body's height at the navel with the two sections in golden ratio, then subdivided those sections in golden ratio at the knees and throat; he used these golden ratio proportions in the Modulor system. Le Corbusier's 1927 Villa Stein in Garches exemplified the Modulor system's application. The villa's rectangular ground plan, elevation, and inner structure closely approximate golden rectangles.[66]


Another Swiss architect, Mario Botta, bases many of his designs on geometric figures. Several private houses he designed in Switzerland are composed of squares and circles, cubes and cylinders. In a house he designed in Origlio, the golden ratio is the proportion between the central section and the side sections of the house.[67]


Art





Da Vinci's illustration of a dodecahedron


Divina proportione (Divine Proportion), a three-volume work by Luca Pacioli, was published in 1509. Pacioli, a Franciscan friar, was known mostly as a mathematician, but he was also trained and keenly interested in art. Divina proportione explored the mathematics of the golden ratio. Though it is often said that Pacioli advocated the golden ratio's application to yield pleasing, harmonious proportions, Livio points out that the interpretation has been traced to an error in 1799, and that Pacioli actually advocated the Vitruvian system of rational proportions.[68] Pacioli insists the golden ratio should be called the "Divine Proportion", the work's title.[69]


Divina proportione contains illustrations of polyhedra by Leonardo da Vinci;[70] this collaboration has led some to speculate that Leonardo incorporated the golden ratio in his work, but this is not supported by any of his writings.[71] Similarly, although the Vitruvian Man is often connected with the golden ratio,[72] its proportions do not actually match it, and the text only mentions whole number ratios.[73] The 16th-century philosopher Heinrich Agrippa drew a man inscribed by a pentagram, implying a more direct relationship to the golden ratio.[2] The vanishing point in Albrecht Dürer's Melencolia I divides the diameter of a rainbow in the golden proportion.[74]


Early 20th-century artist Jay Hambidge's concept of "dynamic symmetry" included the golden ratio and logarithmic spiral, which he postulated had more life than the "static symmetry" of equilateral forms.[75]Salvador Dalí, influenced by the works of Matila Ghyka,[76] explicitly used the golden ratio in his masterpiece, The Sacrament of the Last Supper. The dimensions of the canvas are a golden rectangle, and a huge dodecahedron, in perspective so that its edges appear in golden ratio to one another, dominates the composition.[71][77] Other 20th-century artists such as Gino Severini, Juan Gris, and Jacques Lipchitz used the golden ratio in Cubist or Cubism-related art.[78]


A statistical study performed in 1999 on 565 works of art by different painters found that they did not use the golden ratio in their canvas sizes. The study concluded that the average ratio of the two sides of the paintings studied is 1.34, with averages for individual artists ranging from 1.04 to 1.46.[79] On the other hand, Pablo Tosto listed over 350 works by well-known artists, including more than 100 which have canvasses with golden rectangle and root-5 proportions.[80]


Books and design




Depiction of the proportions in a medieval manuscript, with "page proportion 2:3. Margin proportions 1:1:2:3. Text area proportioned in the Golden Section."[81]



Historian John Man states that the pages and text area of the Gutenberg Bible were based on 5:8 golden ratio proportions.[82] According to Jan Tschichold,[83]


There was a time when deviations from the truly beautiful page proportions 2:3, 1:√3, and the Golden Section were rare. Many books produced between 1550 and 1770 show these proportions exactly, to within half a millimeter.


Some sources claim that the golden ratio is commonly used in everyday design, for example in the shapes of postcards, playing cards, posters, wide-screen televisions, photographs, light switch plates and cars.[84][85][86][87][88]


Music


Ernő Lendvai analyzes Béla Bartók's works as being based on two opposing systems, that of the golden ratio and the acoustic scale,[89] though other music scholars reject that analysis.[90] French composer Erik Satie used the golden ratio in several of his pieces, including Sonneries de la Rose+Croix. The golden ratio is also apparent in the organization of the sections in the music of Debussy's Reflets dans l'eau (Reflections in Water), from Images (1st series, 1905), in which "the sequence of keys is marked out by the intervals 34, 21, 13 and 8, and the main climax sits at the phi position."[91]


The musicologist Roy Howat has observed that the formal boundaries of Debussy's La Mer correspond exactly to the golden section.[92] Trezise finds the intrinsic evidence "remarkable", but cautions that no written or reported evidence suggests that Debussy consciously sought such proportions.[93]


Pearl Drums positions the air vents on its Masters Premium models based on the golden ratio. The company claims that this arrangement improves bass response and has applied for a patent on this innovation.[94]


Though Heinz Bohlen proposed the non-octave-repeating 833 cents scale based on combination tones, the tuning features relations based on the golden ratio. As a musical interval the ratio 1.618... is 833.090... cents (About this soundPlay ).[95]


In nature






Detail of Aeonium tabuliforme showing its multiple spiral arrangement


Johannes Kepler (1571–1630) used the golden ratio and Platonic solids in his models of the Solar System, and wrote that:


... the image of man and woman stems from the divine proportion. In my opinion, the propagation of plants and the progenitive acts of animals are in the same ratio ...[96]


He also used the Fibonacci sequence to explain the pentagonal form of some flowers.[97] The angular arrangement of petals in a rose are guided by the fractional portion of multiples of ϕ (e.g. for petal 1, (1×φ)−1=.618...displaystyle (1times varphi )-1=.618...displaystyle (1times varphi )-1=.618... and for petal 2, (2×φ)−3=.236...displaystyle (2times varphi )-3=.236...displaystyle (2times varphi )-3=.236...).[98] In 1754, Charles Bonnet pointed out that the spiral phyllotaxis of plants were frequently expressed in successive golden ratio series.[20][36][99] In 1837, Auguste Bravais and his brother Louis connected phyllotaxis ratios to the Fibonacci sequence, noting that the divergence angle of new leaves was 137.5 degrees (360°/φ), or the golden angle.[100]Adolf Zeising (1810–1876) also found the golden ratio expressed in the arrangement of parts such as leaves and branches along the stems of plants and veins in leaves. He extended his research to the skeletons of animals and the branchings of their veins and nerves, the proportions of chemical compounds, and the geometry of crystals. In 1854, he wrote of a universal law:


... in which is contained the ground-principle of all formative striving for beauty and completeness in the realms of both nature and art, and which permeates, as a paramount spiritual ideal, all structures, forms and proportions, whether cosmic or individual, organic or inorganic, acoustic or optical; which finds its fullest realization, however, in the human form.[101][102][103]


However, some have argued that many apparent manifestations of the golden ratio in nature, especially in regard to animal dimensions, are fictitious.[104]


In 1989, Paul Davies proved that rotating black holes transition between hot and cold when the square of their mass equals ϕ times the square of their speed.[105][106][107] Physics experiments in the 1990s showed that magnetic fluids in a magnetic field repel each other in patterns tending toward the golden ratio.[108] In 2010, the journal Science reported that the golden ratio is present at the atomic scale in the magnetic resonance of spins in cobalt niobate crystals.[109]


Disputed claims


Examples of discredited observations of the golden ratio include the following:


  • Some specific proportions in the bodies of many animals (including humans)[110][111] and parts of the shells of mollusks[3] are often claimed to be in the golden ratio. There is a large variation in the real measures of these elements in specific individuals, however, and the proportion in question is often significantly different from the golden ratio.[110] The ratio of successive phalangeal bones of the digits and the metacarpal bone has been said to approximate the golden ratio.[111] The nautilus shell, the construction of which proceeds in a logarithmic spiral, is often cited, usually with the claim that such a spiral is related to the golden ratio, or that successive chambers are proportioned by it;[112] however, actual measurements do not support this claim.[113]

  • Inspired by the ideas of Adolf Zeising, psychologist Gustav Fechner devised a poll to test whether the golden ratio plays a role in the human perception of beauty. While Fechner found a preference amongst those he polled for golden rectangles, later attempts to test such a hypothesis have been inconclusive.[114][71][115]


  • Piet Mondrian has been said by some to have used the golden section extensively in his geometrical paintings,[116] though other experts including Yve-Alain Bois have discredited these claims.[71][117]

  • In investing, some practitioners of technical analysis use the golden ratio to indicate support of a price level, or resistance to price increases, of a stock or commodity; after significant price changes up or down, new support and resistance levels are supposedly found at or near prices related to the starting price via the golden ratio.[118] The use of the golden ratio in investing is also related to more complicated patterns described by Fibonacci numbers (e.g. Elliott wave principle and Fibonacci retracement). However, other market analysts have published analyses suggesting that these percentages and patterns are not supported by the data.[119]

The Parthenon




Many of the proportions of the Parthenon have been theorized to exhibit the golden ratio, but this has largely been discredited.


The Parthenon's façade has been said by some to contain golden ratio properties,[120] but this has been discredited by other scholars.[121] For example, Midhat J. Gazalé says, "It was not until Euclid, however, that the golden ratio's mathematical properties were studied. In the Elements (308 BC) the Greek mathematician merely regarded that number as an interesting irrational number, in connection with the middle and extreme ratios. Its occurrence in regular pentagons and decagons was duly observed, as well as in the dodecahedron".[122] And Keith Devlin says, "Certainly, the oft repeated assertion that the Parthenon in Athens is based on the golden ratio is not supported by actual measurements. In fact, the entire story about the Greeks and golden ratio seems to be without foundation. The one thing we know for sure is that Euclid, in his famous textbook Elements, written around 300 BC, showed how to calculate its value."[123] Later sources like Vitruvius exclusively discuss proportions that can be expressed in whole numbers, i.e. commensurate as opposed to irrational proportions. One researcher concluded that the golden ratio was totally absent from Greek architecture of the classical fifth century BC, and almost absent during the following six centuries, based on measurements of 15 temples, 18 monumental tombs, 8 sarcophagi, and 58 grave stelae.[124]



Section d'Or and Cubism





Les Baigneuses (The Bathers) (1912) is a candidate for featuring the golden ratio. (size 1:1.618 ± 0.07, golden ratio grid so1–so4)


The Section d'Or ("Golden Section") was a collective of painters, sculptors, poets and critics associated with Cubism and Orphism.[125] Active from 1911 to around 1914, they adopted the name both to highlight that Cubism represented the continuation of a grand tradition, rather than being an isolated movement, and in homage to the mathematical harmony associated with Georges Seurat.[126][127] The Cubists observed in its harmonies, geometric structuring of motion and form, the primacy of idea over nature, an absolute scientific clarity of conception.[128] However, despite this general interest in mathematical harmony, whether the paintings featured in the celebrated 1912 Salon de la Section d'Or exhibition used the golden ratio itself in their compositions is more difficult to determine. Mario Livio, for example, claims that they did not,[129] and Marcel Duchamp said as much in an interview.[130] On the other hand, an analysis by Camfield suggests that Juan Gris made use of the golden ratio in composing works that were likely, but not definitively, shown at the exhibition.[131][132] Art historian Daniel Robbins has argued that in addition to referencing the mathematical term, the exhibition's name also refers to the earlier Bandeaux d'Or group, with which Albert Gleizes and other former members of the Abbaye de Créteil had been deeply involved.[133]


In her 1974 book Life with the Painters of La Ruche, Marie Vorobieff implies that several Cubist friends of hers including Pablo Picasso and Diego Rivera used the golden ratio, although Livio notes that she "does not give any specific examples and some of her historical comments are inaccurate."[75]


Mathematics


Usually, the lowercase form of phi (φ or φ) is used to symbolize the golden ratio. Sometimes the uppercase form (Φdisplaystyle Phi Phi ) is used for the reciprocal of the golden ratio, 1/φ.[134]


Calculation
















  • List of numbers

  • Irrational numbers




  • ζ(3)

  • 2

  • 3

  • 5

  • φ

  • e

  • π



Binary
1.1001111000110111011...

Decimal
1.6180339887498948482...[10]

Hexadecimal
1.9E3779B97F4A7C15F39...

Continued fraction

1+11+11+11+11+⋱displaystyle 1+cfrac 11+cfrac 11+cfrac 11+cfrac 11+ddots 1+cfrac 11+cfrac 11+cfrac 11+cfrac 11+ddots

Algebraic form

1+52displaystyle frac 1+sqrt 52frac 1+sqrt 52

Infinite series

138+∑n=0∞(−1)(n+1)(2n+1)!(n+2)!n!4(2n+3)displaystyle frac 138+sum _n=0^infty frac (-1)^(n+1)(2n+1)!(n+2)!n!4^(2n+3)frac 138+sum _n=0^infty frac (-1)^(n+1)(2n+1)!(n+2)!n!4^(2n+3)

Two quantities a and b are said to be in the golden ratio φ if


a+ba=ab=φ.displaystyle frac a+ba=frac ab=varphi .frac a+ba=frac ab=varphi .

One method for finding the value of φ is to start with the left fraction. Through simplifying the fraction and substituting in b/a = 1/φ,


a+ba=aa+ba=1+ba=1+1φ.displaystyle frac a+ba=frac aa+frac ba=1+frac ba=1+frac 1varphi .displaystyle frac a+ba=frac aa+frac ba=1+frac ba=1+frac 1varphi .

Therefore,


1+1φ=φ.displaystyle 1+frac 1varphi =varphi .1+frac 1varphi =varphi .

Multiplying by φ gives


φ+1=φ2displaystyle varphi +1=varphi ^2varphi +1=varphi ^2

which can be rearranged to


φ2−φ−1=0.displaystyle varphi ^2-varphi -1=0.varphi ^2-varphi -1=0.

Using the quadratic formula, two solutions are obtained:


φ=1+52=1.6180339887…displaystyle varphi =frac 1+sqrt 52=1.61803,39887dots varphi =frac 1+sqrt 52=1.61803,39887dots

and


φ=1−52=−0.6180339887…displaystyle varphi =frac 1-sqrt 52=-0.6180,339887dots varphi =frac 1-sqrt 52=-0.6180,339887dots

Because φ is the ratio between positive quantities φ is necessarily positive:



φ=1+52=1.6180339887…displaystyle varphi =frac 1+sqrt 52=1.61803,39887dots varphi =frac 1+sqrt 52=1.61803,39887dots .

Irrationality


The golden ratio is an irrational number, and due to its nature as an infinite continued fraction, it is the most impossible irrational number to express as a simple fraction.[135] Below are two short proofs of its irrationality:


Contradiction from an expression in lowest terms




If φ were rational, then it would be the ratio of sides of a rectangle with integer sides (the rectangle comprising the entire diagram). But it would also be a ratio of integer sides of the smaller rectangle (the rightmost portion of the diagram) obtained by deleting a square. The sequence of decreasing integer side lengths formed by deleting squares cannot be continued indefinitely because the integers have a lower bound, so φ cannot be rational.


Recall that:


the whole is the longer part plus the shorter part;

the whole is to the longer part as the longer part is to the shorter part.

If we call the whole n and the longer part m, then the second statement above becomes



n is to m as m is to n − m,

or, algebraically


nm=mn−m.(∗)displaystyle frac nm=frac mn-m.qquad (*)frac nm=frac mn-m.qquad (*)

To say that the golden ratio φ is rational means that φ is a fraction n/m where n and m are integers. We may take n/m to be in lowest terms and n and m to be positive. But if n/m is in lowest terms, then the identity labeled (*) above says m/(n − m) is in still lower terms. That is a contradiction that follows from the assumption that φ is rational.



By irrationality of 5


Another short proof—perhaps more commonly known—of the irrationality of the golden ratio makes use of the closure of rational numbers under addition and multiplication. If 1+52displaystyle textstyle frac 1+sqrt 52textstyle frac 1+sqrt 52 is rational, then 2(1+52)−1=5displaystyle textstyle 2left(frac 1+sqrt 52right)-1=sqrt 5textstyle 2left(frac 1+sqrt 52right)-1=sqrt 5 is also rational, which is a contradiction if it is already known that the square root of a non-square natural number is irrational.


Minimal polynomial


The golden ratio is also an algebraic number and even an algebraic integer. It has minimal polynomial


x2−x−1.displaystyle x^2-x-1.displaystyle x^2-x-1.

Having degree 2, this polynomial actually has two roots, the other being the golden ratio conjugate.


Golden ratio conjugate


The conjugate root to the minimal polynomial x2 − x − 1 is


−1φ=1−φ=1−52=−0.6180339887….displaystyle -frac 1varphi =1-varphi =frac 1-sqrt 52=-0.61803,39887dots .-frac 1varphi =1-varphi =frac 1-sqrt 52=-0.61803,39887dots .

The absolute value of this quantity (≈ 0.618) corresponds to the length ratio taken in reverse order (shorter segment length over longer segment length, b/a), and is sometimes referred to as the golden ratio conjugate.[134] It is denoted here by the capital Phi (Φdisplaystyle Phi Phi ):


Φ=1φ=φ−1=0.6180339887….displaystyle Phi =1 over varphi =varphi ^-1=0.61803,39887ldots .Phi =1 over varphi =varphi ^-1=0.61803,39887ldots .

Alternatively, Φdisplaystyle Phi Phi can be expressed as


Φ=φ−1=1.6180339887…−1=0.6180339887….displaystyle Phi =varphi -1=1.61803,39887ldots -1=0.61803,39887ldots .Phi =varphi -1=1.61803,39887ldots -1=0.61803,39887ldots .

This illustrates the unique property of the golden ratio among positive numbers, that


1φ=φ−1,displaystyle 1 over varphi =varphi -1,1 over varphi =varphi -1,

or its inverse:


1Φ=Φ+1.displaystyle 1 over Phi =Phi +1.1 over Phi =Phi +1.

This means 0.61803...:1 = 1:1.61803....


Alternative forms




Approximations to the reciprocal golden ratio by finite continued fractions, or ratios of Fibonacci numbers


The formula φ = 1 + 1/φ can be expanded recursively to obtain a continued fraction for the golden ratio:[136]


φ=[1;1,1,1,…]=1+11+11+11+⋱displaystyle varphi =[1;1,1,1,dots ]=1+cfrac 11+cfrac 11+cfrac 11+ddots varphi =[1;1,1,1,dots ]=1+cfrac 11+cfrac 11+cfrac 11+ddots

and its reciprocal:


φ−1=[0;1,1,1,…]=0+11+11+11+⋱displaystyle varphi ^-1=[0;1,1,1,dots ]=0+cfrac 11+cfrac 11+cfrac 11+ddots varphi ^-1=[0;1,1,1,dots ]=0+cfrac 11+cfrac 11+cfrac 11+ddots

The convergents of these continued fractions (1/1, 2/1, 3/2, 5/3, 8/5, 13/8, ..., or 1/1, 1/2, 2/3, 3/5, 5/8, 8/13, ...) are ratios of successive Fibonacci numbers.


The equation φ2 = 1 + φ likewise produces the continued square root, or infinite surd, form:


φ=1+1+1+1+⋯.displaystyle varphi =sqrt 1+sqrt 1+sqrt 1+sqrt 1+cdots .varphi =sqrt 1+sqrt 1+sqrt 1+sqrt 1+cdots .

An infinite series can be derived to express phi:[137]


φ=138+∑n=0∞(−1)(n+1)(2n+1)!(n+2)!n!4(2n+3).displaystyle varphi =frac 138+sum _n=0^infty frac (-1)^(n+1)(2n+1)!(n+2)!n!4^(2n+3).varphi =frac 138+sum _n=0^infty frac (-1)^(n+1)(2n+1)!(n+2)!n!4^(2n+3).

Also:


φ=1+2sin⁡(π/10)=1+2sin⁡18∘displaystyle varphi =1+2sin(pi /10)=1+2sin 18^circ varphi =1+2sin(pi /10)=1+2sin 18^circ

φ=12csc⁡(π/10)=12csc⁡18∘displaystyle varphi =1 over 2csc(pi /10)=1 over 2csc 18^circ varphi =1 over 2csc(pi /10)=1 over 2csc 18^circ

φ=2cos⁡(π/5)=2cos⁡36∘displaystyle varphi =2cos(pi /5)=2cos 36^circ varphi =2cos(pi /5)=2cos 36^circ

φ=2sin⁡(3π/10)=2sin⁡54∘.displaystyle varphi =2sin(3pi /10)=2sin 54^circ .varphi =2sin(3pi /10)=2sin 54^circ .

These correspond to the fact that the length of the diagonal of a regular pentagon is φ times the length of its side, and similar relations in a pentagram.


Geometry


The number φ turns up frequently in geometry, particularly in figures with pentagonal symmetry. The length of a regular pentagon's diagonal is φ times its side. The vertices of a regular icosahedron are those of three mutually orthogonal golden rectangles. Odd numbered groups of golden rectangles fit perfectly into a square.[138]


There is no known general algorithm to arrange a given number of nodes evenly on a sphere, for any of several definitions of even distribution (see, for example, Thomson problem). However, a useful approximation results from dividing the sphere into parallel bands of equal surface area and placing one node in each band at longitudes spaced by a golden section of the circle, i.e. 360°/φ ≅ 222.5°. This method was used to arrange the 1500 mirrors of the student-participatory satellite Starshine-3.[139]




Dividing a line segment by interior division according to the golden ratio


Dividing a line segment by interior division


  1. Having a line segment AB, construct a perpendicular BC at point B, with BC half the length of AB. Draw the hypotenuse AC.

  2. Draw an arc with center C and radius BC. This arc intersects the hypotenuse AC at point D.

  3. Draw an arc with center A and radius AD. This arc intersects the original line segment AB at point S. Point S divides the original line segment AB into line segments AS and SB with lengths in the golden ratio.

Dividing a line segment by exterior division




Dividing a line segment by exterior division according to the golden ratio


  1. Draw a line segment AS and construct off the point S a segment SC perpendicular to AS and with the same length as AS.

  2. Do bisect the line segment AS with M.

  3. A circular arc around M with radius MC intersects in point B the straight line through points A and S (also known as the extension of AS). The ratio of AS to the constructed segment SB is the golden ratio.

Application examples you can see in the articles Pentagon with a given side length, Decagon with given circumcircle and Decagon with a given side length.


Both the above displayed different algorithms produce geometric constructions that determine two aligned line segments where the ratio of the longer to the shorter one is the golden ratio.



Golden triangle, pentagon and pentagram


Golden triangle

The golden triangle can be characterized as an isosceles triangle ABC with the property that bisecting the angle C produces a new triangle CXB which is a similar triangle to the original.




A golden triangle. The double-red-arched angle is 36 degrees,
or π5displaystyle frac pi 5displaystyle frac pi 5 radians.


If angle BCX = α, then XCA = α because of the bisection, and CAB = α because of the similar triangles; ABC = 2α from the original isosceles symmetry, and BXC = 2α by similarity. The angles in a triangle add up to 180°, so 5α = 180, giving α = 36°. So the angles of the golden triangle are thus 36°-72°-72°. The angles of the remaining obtuse isosceles triangle AXC (sometimes called the golden gnomon) are 36°-36°-108°.


Suppose XB has length 1, and we call BC length φ. Because of the isosceles triangles XC=XA and BC=XC, so these are also length φ. Length AC = AB, therefore equals φ + 1. But triangle ABC is similar to triangle CXB, so AC/BC = BC/BX, AC/φ = φ/1, and so AC also equals φ2. Thus φ2 = φ + 1, confirming that φ is indeed the golden ratio.


Similarly, the ratio of the area of the larger triangle AXC to the smaller CXB is equal to φ, while the inverse ratio is φ − 1.


Pentagon

In a regular pentagon the ratio of a diagonal to a side is the golden ratio, while intersecting diagonals section each other in the golden ratio.[5]




A and B are midpoints of the sides EF and ED of an equilateral triangle DEF. Extend AB to meet the circumcircle of DEF at C.
|AB||BC|=|AC||AB|=ϕ{displaystyle tfrac =tfrac AC=phi {tfrac =tfrac AC=phi



Odom's construction

George Odom has given a remarkably simple construction for φ involving an equilateral triangle: if an equilateral triangle is inscribed in a circle and the line segment joining the midpoints of two sides is continued to intersect the circle, then these three points are in golden proportion. This result is a straightforward consequence of the intersecting chords theorem and can be used to construct a regular pentagon, a construction that attracted the attention of the noted geometer H. S. M. Coxeter, who published it in Odom's name as a diagram in the American Mathematical Monthly.[140]


Pentagram

The golden ratio plays an important role in the geometry of pentagrams. Each intersection of edges sections other edges in the golden ratio. Also, the ratio of the length of the shorter segment to the segment bounded by the two intersecting edges (a side of the pentagon in the pentagram's center) is φ, as the four-color illustration shows.


The pentagram includes ten isosceles triangles: five acute and five obtuse isosceles triangles. In all of them, the ratio of the longer side to the shorter side is φ. The acute triangles are golden triangles. The obtuse isosceles triangles are golden gnomons.



Ptolemy's theorem



The golden ratio in a regular pentagon can be computed using Ptolemy's theorem.


The golden ratio properties of a regular pentagon can be confirmed by applying Ptolemy's theorem to the quadrilateral formed by removing one of its vertices. If the quadrilateral's long edge and diagonals are b, and short edges are a, then Ptolemy's theorem gives b2 = a2 + ab which yields


ba=1+52.displaystyle b over a=1+sqrt 5 over 2.b over a=1+sqrt 5 over 2.

Scalenity of triangles


Consider a triangle with sides of lengths a, b, and c in decreasing order. Define the "scalenity" of the triangle to be the smaller of the two ratios a/b and b/c. The scalenity is always less than φ and can be made as close as desired to φ.[141]


Triangle whose sides form a geometric progression


If the side lengths of a triangle form a geometric progression and are in the ratio 1 : r : r2, where r is the common ratio, then r must lie in the range φ−1 < r < φ, which is a consequence of the triangle inequality (the sum of any two sides of a triangle must be strictly bigger than the length of the third side). If r = φ then the shorter two sides are 1 and φ but their sum is φ2, thus r < φ. A similar calculation shows that r > φ−1. A triangle whose sides are in the ratio 1 : φ : φ is a right triangle (because 1 + φ = φ2) known as a Kepler triangle.[38]




All of the faces of the rhombic triacontahedron are golden rhombi.



Golden triangle, rhombus, and rhombic triacontahedron


A golden rhombus is a rhombus whose diagonals are in the golden ratio. The rhombic triacontahedron is a convex polytope that has a very special property: all of its faces are golden rhombi. In the rhombic triacontahedron the dihedral angle between any two adjacent rhombi is 144°, which is twice the isosceles angle of a golden triangle and four times its most acute angle.[142]


Golden pyramid


A square pyramid in which the apothem (slant height along the bisector of a face) is equal to φ times the semi-base (half the base width) is called a golden pyramid. The isosceles triangle that is the face of such a pyramid can be constructed from the two halves of a diagonally split golden rectangle (of size apothem by semi-base). The height of this pyramid is φdisplaystyle sqrt varphi sqrt varphi times the semi-base, and the medial right triangle of the pyramid is a Kepler triangle, with sides 1:φ:φdisplaystyle 1:sqrt varphi :varphi 1:sqrt varphi :varphi .[143] This is the only right triangle proportion with edge lengths in geometric progression.[38] The angle with tangent φdisplaystyle sqrt varphi sqrt varphi corresponds to the angle that the side of the pyramid makes with respect to the ground, 51.827... degrees (51° 49' 38").[144]


According to various measurements, the Great Pyramid of Giza (c. 2560 BC) closely approximates a golden pyramid.


Relation to Fibonacci sequence


The mathematics of the golden ratio and of the Fibonacci sequence are intimately interconnected. The Fibonacci sequence is:


1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, ...

A closed-form expression for the Fibonacci sequence involves the golden ratio:


F(n)=φn−(1−φ)n5=φn−(−φ)−n5.displaystyle Fleft(nright)=varphi ^n-(1-varphi )^n over sqrt 5=varphi ^n-(-varphi )^-n over sqrt 5.displaystyle Fleft(nright)=varphi ^n-(1-varphi )^n over sqrt 5=varphi ^n-(-varphi )^-n over sqrt 5.

The golden ratio is the limit of the ratios of successive terms of the Fibonacci sequence (or any Fibonacci-like sequence), as originally shown by Kepler:[31]


limn→∞Fn+1Fn=φ.displaystyle lim _nto infty frac F_n+1F_n=varphi .displaystyle lim _nto infty frac F_n+1F_n=varphi .

In other words, if a Fibonacci number is divided by its immediate predecessor in the sequence, the quotient approximates φ; e.g., 987/610  1.6180327868852. These approximations are alternately lower and higher than φ, and converge to φ as the Fibonacci numbers increase, and:


∑n=1∞|Fnφ−Fn+1|=φ.F_nvarphi -F_n+1F_nvarphi -F_n+1

More generally:


limn→∞Fn+aFn=φa,displaystyle lim _nto infty frac F_n+aF_n=varphi ^a,displaystyle lim _nto infty frac F_n+aF_n=varphi ^a,

where above, the ratios of consecutive terms of the Fibonacci sequence, is a case when a=1.displaystyle a=1.displaystyle a=1.


Furthermore, the successive powers of φ obey the Fibonacci recurrence:


φn+1=φn+φn−1.displaystyle varphi ^n+1=varphi ^n+varphi ^n-1.displaystyle varphi ^n+1=varphi ^n+varphi ^n-1.

This identity allows any polynomial in φ to be reduced to a linear expression. For example:


3φ3−5φ2+4=3(φ2+φ)−5φ2+4=3[(φ+1)+φ]−5(φ+1)+4=φ+2≈3.618.displaystyle beginaligned3varphi ^3-5varphi ^2+4&=3(varphi ^2+varphi )-5varphi ^2+4\&=3[(varphi +1)+varphi ]-5(varphi +1)+4\&=varphi +2approx 3.618.endalignedbeginaligned3varphi ^3-5varphi ^2+4&=3(varphi ^2+varphi )-5varphi ^2+4\&=3[(varphi +1)+varphi ]-5(varphi +1)+4\&=varphi +2approx 3.618.endaligned

The reduction to a linear expression can be accomplished in one step by using the relationship


φk=Fkφ+Fk−1,displaystyle varphi ^k=F_kvarphi +F_k-1,varphi ^k=F_kvarphi +F_k-1,

where Fkdisplaystyle F_kF_k is the kth Fibonacci number.


However, this is no special property of φ, because polynomials in any solution x to a quadratic equation can be reduced in an analogous manner, by applying:


x2=ax+bdisplaystyle x^2=ax+bx^2=ax+b

for given coefficients a, b such that x satisfies the equation. Even more generally, any rational function (with rational coefficients) of the root of an irreducible nth-degree polynomial over the rationals can be reduced to a polynomial of degree n ‒ 1. Phrased in terms of field theory, if α is a root of an irreducible nth-degree polynomial, then Q(α)displaystyle mathbb Q (alpha )mathbb Q (alpha ) has degree n over Qdisplaystyle mathbb Q mathbb Q , with basis 1,α,…,αn−1.displaystyle 1,alpha ,dots ,alpha ^n-1.displaystyle 1,alpha ,dots ,alpha ^n-1.


Symmetries


The golden ratio and inverse golden ratio φ±=(1±5)/2displaystyle varphi _pm =(1pm sqrt 5)/2varphi _pm =(1pm sqrt 5)/2 have a set of symmetries that preserve and interrelate them. They are both preserved by the fractional linear transformations x,1/(1−x),(x−1)/x,displaystyle x,1/(1-x),(x-1)/x,x,1/(1-x),(x-1)/x, – this fact corresponds to the identity and the definition quadratic equation.
Further, they are interchanged by the three maps 1/x,1−x,x/(x−1)displaystyle 1/x,1-x,x/(x-1)1/x,1-x,x/(x-1) – they are reciprocals, symmetric about 1/2displaystyle 1/21/2, and (projectively) symmetric about 2.


More deeply, these maps form a subgroup of the modular group PSL⁡(2,Z)displaystyle operatorname PSL (2,mathbf Z )operatorname PSL (2,mathbf Z ) isomorphic to the symmetric group on 3 letters, S3,displaystyle S_3,S_3, corresponding to the stabilizer of the set 0,1,∞displaystyle 0,1,infty 0,1,infty of 3 standard points on the projective line, and the symmetries correspond to the quotient map S3→S2displaystyle S_3to S_2S_3to S_2 – the subgroup C3<S3displaystyle C_3<S_3C_3<S_3 consisting of the 3-cycles and the identity ()(01∞)(0∞1)displaystyle ()(01infty )(0infty 1)()(01infty )(0infty 1) fixes the two numbers, while the 2-cycles interchange these, thus realizing the map.


Other properties


The golden ratio has the simplest expression (and slowest convergence) as a continued fraction expansion of any irrational number (see Alternate forms above). It is, for that reason, one of the worst cases of Lagrange's approximation theorem and it is an extremal case of the Hurwitz inequality for Diophantine approximations. This may be why angles close to the golden ratio often show up in phyllotaxis (the growth of plants).[145]


The defining quadratic polynomial and the conjugate relationship lead to decimal values that have their fractional part in common with φ:


φ2=φ+1=2.618…displaystyle varphi ^2=varphi +1=2.618dots varphi ^2=varphi +1=2.618dots
1φ=φ−1=0.618….displaystyle 1 over varphi =varphi -1=0.618dots .1 over varphi =varphi -1=0.618dots .

The sequence of powers of φ contains these values 0.618..., 1.0, 1.618..., 2.618...; more generally,
any power of φ is equal to the sum of the two immediately preceding powers:


φn=φn−1+φn−2=φ⋅Fn+Fn−1.displaystyle varphi ^n=varphi ^n-1+varphi ^n-2=varphi cdot operatorname F _n+operatorname F _n-1.varphi ^n=varphi ^n-1+varphi ^n-2=varphi cdot operatorname F _n+operatorname F _n-1.

As a result, one can easily decompose any power of φ into a multiple of φ and a constant. The multiple and the constant are always adjacent Fibonacci numbers. This leads to another property of the positive powers of φ:


If ⌊n/2−1⌋=mdisplaystyle lfloor n/2-1rfloor =mlfloor n/2-1rfloor =m, then:


 φn=φn−1+φn−3+⋯+φn−1−2m+φn−2−2mdisplaystyle ! varphi ^n=varphi ^n-1+varphi ^n-3+cdots +varphi ^n-1-2m+varphi ^n-2-2m! varphi ^n=varphi ^n-1+varphi ^n-3+cdots +varphi ^n-1-2m+varphi ^n-2-2m
 φn−φn−1=φn−2.displaystyle ! varphi ^n-varphi ^n-1=varphi ^n-2.! varphi ^n-varphi ^n-1=varphi ^n-2.

When the golden ratio is used as the base of a numeral system (see Golden ratio base, sometimes dubbed phinary or φ-nary), every integer has a terminating representation, despite φ being irrational, but every fraction has a non-terminating representation.


The golden ratio is a fundamental unit of the algebraic number field Q(5)displaystyle mathbb Q (sqrt 5)mathbb Q (sqrt 5) and is a Pisot–Vijayaraghavan number.[146] In the field Q(5)displaystyle mathbb Q (sqrt 5)mathbb Q (sqrt 5) we have φn=Ln+Fn52displaystyle varphi ^n=L_n+F_nsqrt 5 over 2varphi ^n=L_n+F_nsqrt 5 over 2, where Lndisplaystyle L_nL_n is the ndisplaystyle nn-th Lucas number.


The golden ratio also appears in hyperbolic geometry, as the maximum distance from a point on one side of an ideal triangle to the closer of the other two sides: this distance, the side length of the equilateral triangle formed by the points of tangency of a circle inscribed within the ideal triangle, is 4log⁡(φ)displaystyle 4log(varphi )4log(varphi ).[147]


Decimal expansion


The golden ratio's decimal expansion can be calculated directly from the expression


φ=1+52displaystyle varphi =1+sqrt 5 over 2varphi =1+sqrt 5 over 2

with 5 ≈ 2.2360679774997896964 OEIS: A002163. The square root of 5 can be calculated with the Babylonian method, starting with an initial estimate such as xφ = 2 and iterating


xn+1=(xn+5/xn)2displaystyle x_n+1=frac (x_n+5/x_n)2x_n+1=frac (x_n+5/x_n)2

for n = 1, 2, 3, ..., until the difference between xn and xn−1 becomes zero, to the desired number of digits.


The Babylonian algorithm for 5 is equivalent to Newton's method for solving the equation x2 − 5 = 0. In its more general form, Newton's method can be applied directly to any algebraic equation, including the equation x2 − x − 1 = 0 that defines the golden ratio. This gives an iteration that converges to the golden ratio itself,


xn+1=xn2+12xn−1,displaystyle x_n+1=frac x_n^2+12x_n-1,x_n+1=frac x_n^2+12x_n-1,

for an appropriate initial estimate xφ such as xφ = 1. A slightly faster method is to rewrite the equation as x − 1 − 1/x = 0, in which case the Newton iteration becomes


xn+1=xn2+2xnxn2+1.displaystyle x_n+1=frac x_n^2+2x_nx_n^2+1.x_n+1=frac x_n^2+2x_nx_n^2+1.

These iterations all converge quadratically; that is, each step roughly doubles the number of correct digits. The golden ratio is therefore relatively easy to compute with arbitrary precision. The time needed to compute n digits of the golden ratio is proportional to the time needed to divide two n-digit numbers. This is considerably faster than known algorithms for the transcendental numbers π and e.


An easily programmed alternative using only integer arithmetic is to calculate two large consecutive Fibonacci numbers and divide them. The ratio of Fibonacci numbers F 25001 and F 25000, each over 5000 digits, yields over 10,000 significant digits of the golden ratio.


The decimal expansion of the golden ratio φ[10] has been calculated to an accuracy of two trillion (7012200000000000000♠2×1012 = 2,000,000,000,000) digits.[148]


See also



  • Donald in Mathmagic Land

  • Golden angle

  • Golden-section search

  • List of works designed with the golden ratio

  • Plastic number

  • Sacred geometry

  • Section d'Or

  • Silver ratio

  • Supergolden ratio


References


Footnotes




  1. ^ If the constraint on a and b each being greater than zero is lifted, then there are actually two solutions, one positive and one negative, to this equation. ϕ is defined as the positive solution. The negative solution can be written as 1−52displaystyle frac 1-sqrt 52displaystyle frac 1-sqrt 52. The sum of the two solutions is one, and the product of the two solutions is negative one.


  2. ^ Euclid, Elements, Book II, Proposition 11; Book IV, Propositions 10–11; Book VI, Proposition 30; Book XIII, Propositions 1–6, 8–11, 16–18.


  3. ^ This was partially proven later by Robert Simson (1687–1768).[32]


  4. ^ Barr chose Phi because it is the first letter of the name of Classical Greek sculptor Phidias (c. 490–430 BC),[42] but later wrote that he thought it unlikely that Phidias had actually used the golden proportion.[43]


  5. ^ In 1859, pyramidologist John Taylor misinterpreted Herodotus as saying c. 440 BC that the pyramid's height squared would equal the area of one of its face triangles, producing a golden pyramid. Herodotus's square dimensions of eight plethron is quite accurate, but Arthur Woollgar Verrall pointed out that with no way to measure vertically, Herodotus's height measurement was off by about 11 metres (36 ft 1 in).[50]


  6. ^ The triangle proportions 1:4/π:1.61899displaystyle 1:4/pi :1.61899displaystyle 1:4/pi :1.61899 have also been suggested. Coincidentally, φ≈4/πdisplaystyle sqrt varphi approx 4/pi sqrt varphi approx 4/pi . The Kepler triangle's face angle is 51.827°, while the π-related triangle's is 51.854°.[50]


  7. ^ The rational inverse slope (multiplied by a factor of 7 to convert to the conventional Egyptian units of palms per cubit) was used in some pyramids.[59][61]



Citations




  1. ^ Livio 2003, pp. 3, 81.


  2. ^ ab Piotr Sadowski (1996). The knight on his quest: symbolic patterns of transition in Sir Gawain and the Green Knight. University of Delaware Press. p. 124. ISBN 978-0-87413-580-0..mw-parser-output cite.citationfont-style:inherit.mw-parser-output qquotes:"""""""'""'".mw-parser-output code.cs1-codecolor:inherit;background:inherit;border:inherit;padding:inherit.mw-parser-output .cs1-lock-free abackground:url("//upload.wikimedia.org/wikipedia/commons/thumb/6/65/Lock-green.svg/9px-Lock-green.svg.png")no-repeat;background-position:right .1em center.mw-parser-output .cs1-lock-limited a,.mw-parser-output .cs1-lock-registration abackground:url("//upload.wikimedia.org/wikipedia/commons/thumb/d/d6/Lock-gray-alt-2.svg/9px-Lock-gray-alt-2.svg.png")no-repeat;background-position:right .1em center.mw-parser-output .cs1-lock-subscription abackground:url("//upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Lock-red-alt-2.svg/9px-Lock-red-alt-2.svg.png")no-repeat;background-position:right .1em center.mw-parser-output .cs1-subscription,.mw-parser-output .cs1-registrationcolor:#555.mw-parser-output .cs1-subscription span,.mw-parser-output .cs1-registration spanborder-bottom:1px dotted;cursor:help.mw-parser-output .cs1-hidden-errordisplay:none;font-size:100%.mw-parser-output .cs1-visible-errorfont-size:100%.mw-parser-output .cs1-subscription,.mw-parser-output .cs1-registration,.mw-parser-output .cs1-formatfont-size:95%.mw-parser-output .cs1-kern-left,.mw-parser-output .cs1-kern-wl-leftpadding-left:0.2em.mw-parser-output .cs1-kern-right,.mw-parser-output .cs1-kern-wl-rightpadding-right:0.2em


  3. ^ ab Dunlap, Richard A., The Golden Ratio and Fibonacci Numbers, World Scientific Publishing, 1997


  4. ^ ab Euclid, Elements, Book 6, Definition 3.


  5. ^ ab Pacioli, Luca. Divina proportione, Luca Paganinem de Paganinus de Brescia (Antonio Capella) 1509, Venice.


  6. ^ Summerson John, Heavenly Mansions: And Other Essays on Architecture (New York: W.W. Norton, 1963) p. 37. "And the same applies in architecture, to the rectangles representing these and other ratios (e.g. the 'golden cut'). The sole value of these ratios is that they are intellectually fruitful and suggest the rhythms of modular design."


  7. ^ Hambidge, Jay, Dynamic Symmetry: The Greek Vase, New Haven CT: Yale University Press, 1920


  8. ^ William Lidwell, Kritina Holden, Jill Butler, Universal Principles of Design: A Cross-Disciplinary Reference, Gloucester MA: Rockport Publishers, 2003


  9. ^ Strogatz, Steven (September 24, 2012). "Me, Myself, and Math: Proportion Control". The New York Times.


  10. ^ abc OEIS: A001622


  11. ^ Olsen 2006, p. 3.


  12. ^ Livio 2003, pp. 46, 61.


  13. ^ Livio 2003, pp. 6, 25, 34, 36.


  14. ^ Constantine J. Vamvacas (2009). The Founders of Western Thought – The Presocratics. Springer Science & Business Media. p. 65. ISBN 9781402097911.


  15. ^ Livio 2003, pp. 4–5.


  16. ^ Livio 2003, p. 36.


  17. ^ Livio 2003, p. 67.


  18. ^ Plato, The Republic, Book 6, translated by Benjamin Jowett, online Archived 18 April 2009 at the Wayback Machine.


  19. ^ Livio 2003, p. 78.


  20. ^ abcdefgh Hemenway, Priya (2005). Divine Proportion: Phi In Art, Nature, and Science. New York: Sterling. pp. 20–21. ISBN 1-4027-3522-7.


  21. ^ Livio 2003, p. 3.


  22. ^ Livio 2003, pp. 86–87.


  23. ^ Livio 2003, p. 87.


  24. ^ Livio 2003, pp. 89–90, 96.


  25. ^ Livio 2003, pp. 128, 130.


  26. ^ Livio 2003, p. 132.


  27. ^ Livio 2003, p. 141.


  28. ^ "The Golden Ratio". The MacTutor History of Mathematics archive. Retrieved 18 September 2007.


  29. ^ abc Livio 2003, p. 149.


  30. ^ Livio 2003, pp. 151–52.


  31. ^ ab Tattersall, James Joseph (2005). Elementary number theory in nine chapters (2nd ed.). Cambridge University Press. p. 28. ISBN 978-0-521-85014-8.


  32. ^ Livio 2003, p. 101.


  33. ^ Livio 2003, p. 108.


  34. ^ Weisstein, Eric W. "Binet's Fibonacci Number Formula". MathWorld.


  35. ^ Wells, David (1987) [1986]. The Penguin Dictionary of Curious and Interesting Numbers. United Kingdom: Penguin Books. p. 43. ISBN 978-0140080292.


  36. ^ ab Olsen 2006, p. 12.


  37. ^ Dudley, Underwood (1999). Die Macht der Zahl: Was die Numerologie uns weismachen will. Springer. p. 245. ISBN 3-7643-5978-1.


  38. ^ abcd Herz-Fischler, Roger (2000). The Shape of the Great Pyramid. Wilfrid Laurier University Press. p. 81. ISBN 0-88920-324-5.


  39. ^ ab Gamwell, Lynn (2015). Mathematics and Art: A Cultural History. Princeton University Press. p. 516. ISBN 978-0691165288.


  40. ^ Livio 2003, cover.


  41. ^ Oxford English Dictionary, 3rd ed. "phi, n." Oxford University Press (Oxford), 2005.


  42. ^ Cook, Theodore Andrea (1914). The Curves of Life. London: Constable and Company Ltd. p. 420.


  43. ^ Barr, Mark (1929). "Parameters of beauty". Architecture (NY). Vol. 60. p. 325. Reprinted: "Parameters of beauty". Think. Vol. 10–11. International Business Machines Corporation. 1944.


  44. ^ Livio 2003, p. 5.


  45. ^ Weisstein, Eric W. "Golden Ratio". MathWorld.


  46. ^ Livio 2003, p. 81.


  47. ^ Olsen 2006, p. 48.


  48. ^ Gardner, Martin (2001), The Colossal Book of Mathematics: Classic Puzzles, Paradoxes, and Problems : Number Theory, Algebra, Geometry, Probability, Topology, Game Theory, Infinity, and Other Topics of Recreational Mathematics, W. W. Norton & Company, p. 88, ISBN 9780393020236.


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    Cox, Simon (2004). Cracking the Da Vinci code: the unauthorized guide to the facts behind Dan Brown's bestselling novel. Barnes & Noble Books. ISBN 978-0-7607-5931-8. The Golden Ratio also crops up in some very unlikely places: widescreen televisions, postcards, credit cards and photographs all commonly conform to its proportions.



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  118. ^ For instance, Osler writes that "38.2 percent and 61.8 percent retracements of recent rises or declines are common," in Osler, Carol (2000). "Support for Resistance: Technical Analysis and Intraday Exchange Rates" (PDF). Federal Reserve Bank of New York Economic Policy Review. 6 (2): 53–68.


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Works cited



  • Livio, Mario (2003) [2002]. The Golden Ratio: The Story of Phi, the World's Most Astonishing Number (First trade paperback ed.). New York City: Broadway Books. ISBN 0-7679-0816-3.


  • Olsen, Scott (2006). The Golden Section: Nature's Greatest Secret. Glastonbury: Wooden Books. ISBN 978-1-904263-47-0.


  • Stakhov, Alexey P.; Olsen, Scott (2009). The Mathematics of Harmony: From Euclid to Contemporary Mathematics and Computer Science. Singapore: World Scientific Publishing. ISBN 978-981-277-582-5.

Further reading


.mw-parser-output .refbeginfont-size:90%;margin-bottom:0.5em.mw-parser-output .refbegin-hanging-indents>ullist-style-type:none;margin-left:0.mw-parser-output .refbegin-hanging-indents>ul>li,.mw-parser-output .refbegin-hanging-indents>dl>ddmargin-left:0;padding-left:3.2em;text-indent:-3.2em;list-style:none.mw-parser-output .refbegin-100font-size:100%


  • Doczi, György (2005) [1981]. The Power of Limits: Proportional Harmonies in Nature, Art, and Architecture. Boston: Shambhala Publications. ISBN 1-59030-259-1.


  • Huntley, H. E. (1970). The Divine Proportion: A Study in Mathematical Beauty. New York: Dover Publications. ISBN 0-486-22254-3.


  • Joseph, George G. (2000) [1991]. The Crest of the Peacock: The Non-European Roots of Mathematics (New ed.). Princeton, NJ: Princeton University Press. ISBN 0-691-00659-8.


  • Sahlqvist, Leif (2008). Cardinal Alignments and the Golden Section: Principles of Ancient Cosmography and Design (3rd Rev. ed.). Charleston, SC: BookSurge. ISBN 1-4196-2157-2.


  • Schneider, Michael S. (1994). A Beginner's Guide to Constructing the Universe: The Mathematical Archetypes of Nature, Art, and Science. New York: HarperCollins. ISBN 0-06-016939-7.


  • Scimone, Aldo (1997). La Sezione Aurea. Storia culturale di un leitmotiv della Matematica. Palermo: Sigma Edizioni. ISBN 978-88-7231-025-0.


  • Walser, Hans (2001) [Der Goldene Schnitt 1993]. The Golden Section. Peter Hilton trans. Washington, DC: The Mathematical Association of America. ISBN 0-88385-534-8.


External links





  • Hazewinkel, Michiel, ed. (2001) [1994], "Golden ratio", Encyclopedia of Mathematics, Springer Science+Business Media B.V. / Kluwer Academic Publishers, ISBN 978-1-55608-010-4


  • "Golden Section" by Michael Schreiber, Wolfram Demonstrations Project, 2007.

  • Golden Section in Photography: Golden Ratio, Golden Triangles, Golden Spiral

  • Weisstein, Eric W. "Golden Ratio". MathWorld.

  • Quotes about the Golden Ratio


  • "Researcher explains mystery of golden ratio". PhysOrg. December 21, 2009..


  • Knott, Ron. "The Golden section ratio: Phi". Information and activities by a mathematics professor.


  • The Pentagram & The Golden Ratio. Green, Thomas M. Updated June 2005. Archived November 2007. Geometry instruction with problems to solve.


  • Schneider, Robert P. (2011). "A Golden Pair of Identities in the Theory of Numbers". arXiv:1109.3216 [math.HO]. Proves formulas that involve the golden mean and the Euler totient and Möbius functions.


  • The Myth That Will Not Go Away, by Keith Devlin, addressing multiple allegations about the use of the golden ratio in culture.












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