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# Golden ratio

In mathematics and the arts, two quantities are in the golden ratio if the ratio between the sum of those quantities and the larger one is the same as the ratio between the larger one and the smaller. The golden ratio is approximately 1.6180339887.

At least since the Renaissance, many artists and architects 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. Mathematicians have studied the golden ratio because of its unique and interesting properties.

The golden ratio can be expressed as a mathematical constant, usually denoted by the Greek letter $varphi$ (phi). The figure of a golden section illustrates the geometric relationship that defines this constant. Expressed algebraically:

$frac\left\{a+b\right\}\left\{a\right\} = frac\left\{a\right\}\left\{b\right\} = varphi,.$

This equation has as its unique positive solution the algebraic irrational number

$varphi = frac\left\{1 + sqrt\left\{5\right\}\right\}\left\{2\right\}approx 1.61803,39887ldots.,$

Other names frequently used for or closely related to the golden ratio are golden section (Latin: sectio aurea), golden mean, golden number, and the Greek letter phi ($varphi$). Other terms encountered include extreme and mean ratio, medial section, divine proportion, divine section (Latin: sectio divina), golden proportion, golden cut, and mean of Phidias.

## Calculation

 List of numbersγ - ζ(3) - √2 - √3 - √5 - φ - α - e - π - δ Binary 1.1001111000110111011... Decimal 1.6180339887498948482... Hexadecimal 1.9E3779B97F4A7C15F39... Continued fraction $1 + frac\left\{1\right\}\left\{1 + frac\left\{1\right\}\left\{1 + frac\left\{1\right\}\left\{1 + frac\left\{1\right\}\left\{ddots\right\}\right\}\right\}\right\}$ Algebraic form $frac\left\{1 + sqrt\left\{5\right\}\right\}\left\{2\right\}$

Two quantities (positive numbers) a and b are said to be in the golden ratio $varphi$ if

$frac\left\{a+b\right\}\left\{a\right\} = frac\left\{a\right\}\left\{b\right\} = varphi,.$

This equation unambiguously defines $varphi.,$

The right equation shows that $a=bvarphi$, which can be substituted in the left part, giving

$frac\left\{bvarphi+b\right\}\left\{bvarphi\right\}=frac\left\{bvarphi\right\}\left\{b\right\},.$

Cancelling b yields

$frac\left\{varphi+1\right\}\left\{varphi\right\}=varphi.$

Multiplying both sides by $varphi$ and rearranging terms leads to:

$varphi^2 - varphi - 1 = 0.$

The only positive solution to this quadratic equation is

$varphi = frac\left\{1 + sqrt\left\{5\right\}\right\}\left\{2\right\} approx 1.61803,39887dots,$

## History

The golden ratio has fascinated intellectuals of diverse interests for at least 2,400 years:

Ancient Greek mathematicians first studied what we now call the golden ratio because of its frequent appearance in geometry. The ratio is important in the geometry of regular pentagrams and pentagons. The Greeks usually attributed discovery of the ratio to Pythagoras or his followers. The regular pentagram, which has a regular pentagon inscribed within it, was the Pythagoreans' symbol.

Euclid's Elements (Greek: Στοιχεῖα) provides the first known written definition of what is now called the golden ratio: "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 less." Euclid explains a construction for cutting (sectioning) a line "in extreme and mean ratio", i.e. the golden ratio. Throughout the Elements, several propositions (theorems in modern terminology) and their proofs employ the golden ratio. Some of these propositions show that the golden ratio is an irrational number.

The name "extreme and mean ratio" was the principal term used from the 3rd century BC until about the 18th century.

The modern history of the golden ratio starts with Luca Pacioli's Divina Proportione of 1509, which captured the imagination of artists, architects, scientists, and mystics with the properties, mathematical and otherwise, of the golden ratio.

The first known approximation of the (inverse) golden ratio by a decimal fraction, stated as "about 0.6180340," was written in 1597 by Prof. Michael Maestlin of the University of Tübingen in a letter to his former student Johannes Kepler.

Since the twentieth century, the golden ratio has been represented by the Greek letter $varphi$ (phi, after Phidias, a sculptor who is said to have employed it) or less commonly by $tau$ (tau, the first letter of the ancient Greek root τομή—meaning cut).

### Timeline

Timeline according to Priya Hemenway.

• Phidias (490–430 BC) made the Parthenon statues that seem to embody the golden ratio.
• Plato (427–347 BC), in his Timaeus, describes five possible regular solids (the Platonic solids, the tetrahedron, cube, octahedron, dodecahedron and icosahedron), some of which are related to the golden ratio.
• Euclid (c. 325–c. 265 BC), in his Elements, gave the first recorded definition of the golden ratio, which he called, as translated into English, "extreme and mean ratio" (Greek: ακρος και μεσος λογος).
• Fibonacci (1170–1250) mentioned the numerical series now named after him in his Liber Abaci; the Fibonacci sequence is closely related to the golden ratio.
• Luca Pacioli (1445–1517) defines the golden ratio as the "divine proportion" in his Divina Proportione.
• Johannes Kepler (1571–1630) describes the golden ratio as a "precious jewel": "Geometry has two great treasures: one is the Theorem of Pythagoras, and the other the division of a line into extreme and mean ratio; the first we may compare to a measure of gold, the second we may name a precious jewel." These two treasures are combined in the Kepler triangle.
• Charles Bonnet (1720–1793) points out that in the spiral phyllotaxis of plants going clockwise and counter-clockwise were frequently two successive Fibonacci series.
• Martin Ohm (1792–1872) is believed to be the first to use the term goldener Schnitt (golden section) to describe this ratio, in 1835.
• Edouard Lucas (1842–1891) gives the numerical sequence now known as the Fibonacci sequence its present name.
• Mark Barr (20th century) suggests the Greek letter phi (φ), the initial letter of Greek sculptor Phidias's name, as a symbol for the golden ratio.
• Roger Penrose (b.1931) discovered a symmetrical pattern that uses the golden ratio in the field of aperiodic tilings, which led to new discoveries about quasicrystals.

## Aesthetics

Beginning in the Renaissance, a body of literature on the aesthetics of the golden ratio has developed. As a result, architects, artists, book designers, and others have been encouraged to use the golden ratio in the dimensional relationships of their works.

The first and most influential of these was De Divina Proportione by Luca Pacioli, a three-volume work published in 1509. Pacioli, a Franciscan friar, was known mostly as a mathematician, but he was also trained and keenly interested in art. De 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 that interpretation has been traced to an error in 1799, and that Pacioli actually advocated the Vitruvian system of rational proportions. Pacioli also saw Catholic religious significance in the ratio, which led to his work's title. Containing illustrations of regular solids by Leonardo Da Vinci, Pacioli's longtime friend and collaborator, De Divina Proportione was a major influence on generations of artists and architects alike.

### Architecture

Some studies of the Acropolis, including the Parthenon, conclude that many of its proportions approximate the golden ratio. The Parthenon's facade as well as elements of its facade and elsewhere can be circumscribed by golden rectangles. To the extent that classical buildings or their elements are proportioned according to the golden ratio, this might indicate that their architects were aware of the golden ratio and consciously employed it in their designs. Alternatively, it is possible that the architects used their own sense of good proportion, and that this led to some proportions that closely approximate the golden ratio. On the other hand, such retrospective analyses can always be questioned on the ground that the investigator chooses the points from which measurements are made or where to superimpose golden rectangles, and that these choices affect the proportions observed.

Some scholars deny that the Greeks had any aesthetic association with golden ratio. 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 B.C.) 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 (a regular polyhedron whose twelve faces are regular pentagons). It is indeed exemplary that the great Euclid, contrary to generations of mystics who followed, would soberly treat that number for what it is, without attaching to it other than its factual properties. 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 B.C., showed how to calculate its value. Near-contemporary sources like Vitruvius exclusively discuss proportions that can be expressed in whole numbers, i.e. commensurate as opposed to irrational proportions.

A geometrical analysis of the Great Mosque of Kairouan reveals a consistent application of the golden ratio throughout the design, according to Boussora and Mazouz. It is found in the overall proportion of the plan and in the dimensioning of the prayer space, the court, and the minaret. Boussora and Mazouz also examined earlier archaeological theories about the mosque, and demonstrate the geometric constructions based on the golden ratio by applying these constructions to the plan of the mosque to test their hypothesis.

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.

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 Leonardo's 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.

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.

### Art

#### Painting

Leonardo da Vinci's illustrations in De Divina Proportione (On the Divine Proportion) and his views that some bodily proportions exhibit the golden ratio have led some scholars to speculate that he incorporated the golden ratio in his own paintings. Some suggest that his Mona Lisa, for example, employs the golden ratio in its geometric equivalents. Whether Leonardo proportioned his paintings according to the golden ratio has been the subject of intense debate. The secretive Leonardo seldom disclosed the bases of his art, and retrospective analysis of the proportions in his paintings can never be conclusive.

Salvador Dalí explicitly used the golden ratio in his masterpiece, The Sacrament of the Last Supper. The dimensions of the canvas are a golden rectangle. A huge dodecahedron, with edges in golden ratio to one another, is suspended above and behind Jesus and dominates the composition.

Mondrian used the golden section extensively in his geometrical paintings.

Side Note: Interestingly, a statistical study on 565 works of art of different great painters, performed in 1999, found that these artists had not used the golden ratio in the size of their canvases. 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 (Goya) to 1.46 (Bellini).

### Book design

According to Jan Tschichold, "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 millimetre."

### Perceptual studies

Studies by psychologists, starting with Fechner, have been devised to test the idea that the golden ratio plays a role in human perception of beauty. While Fechner found a preference for rectangle ratios centered on the golden ratio, later attempts to carefully test such a hypothesis have been, at best, inconclusive.

### Music

James Tenney reconceived his piece For Ann (rising), which consists of up to twelve computer-generated upwardly glissandoing tones (see Shepard tone), as having each tone start so it is the golden ratio (in between an equal tempered minor and major sixth) below the previous tone, so that the combination tones produced by all consecutive tones are a lower or higher pitch already, or soon to be, produced.

Ernő Lendvai analyzes Béla Bartók's works as being based on two opposing systems, that of the golden ratio and the acoustic scale, though other music scholars reject that analysis. In Bartok's Music for Strings, Percussion and Celesta the xylophone progression occurs at the intervals 1:2:3:5:8:5:3:2:1. French composer Erik Satie used the golden ratio in several of his pieces, including Sonneries de la Rose+Croix. His use of the ratio gave his music an otherworldly symmetry.

The golden ratio is also apparent in the organisation of the sections in the music of Debussy's Image, Reflections in Water, 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."

The musicologist Roy Howat has observed that the formal boundaries of La Mer correspond exactly to the golden section. Trezise finds the intrinsic evidence "remarkable," but cautions that no written or reported evidence suggests that Debussy consciously sought such proportions. Also, many works of Chopin, mainly Etudes (studies) and Nocturnes, are formally based on the golden ratio. This results in the biggest climax of both musical expression and technical difficulty after about 2/3 of the piece.

This Binary Universe, an experimental album by Brian Transeau (aka BT), includes a track entitled "1.618" in homage to the golden ratio. The track features musical versions of the ratio and the accompanying video displays various animated versions of the golden mean.

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.

In the opinion of author Leon Harkleroad, "Some of the most misguided attempts to link music and mathematics have involved Fibonacci numbers and the related golden ratio.

## Nature

Adolf Zeising, whose main interests were mathematics and philosophy, found the golden ratio expressed in the arrangement of branches along the stems of plants and of veins in leaves. He extended his research to the skeletons of animals and the branchings of their veins and nerves, to the proportions of chemical compounds and the geometry of crystals, even to the use of proportion in artistic endeavors. In these phenomena he saw the golden ratio operating as a universal law. Zeising wrote in 1854:

## Mathematics

### Golden ratio conjugate

The negative root of the quadratic equation for φ (the "conjugate root") is $1 - varphi approx -0.618$. 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. It is denoted here by the capital Phi ($Phi$):

$Phi = \left\{1 over varphi\right\} approx 0.61803,39887,.$

Alternatively, $Phi$ can be expressed as

$Phi = varphi -1,.$

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

$\left\{1 over varphi\right\} = varphi - 1,$

or its inverse:

$\left\{1 over Phi\right\} = Phi + 1,.$

### Short proofs of irrationality

#### Consideration of the Euclidean algorithm

Irrationality of the golden ratio is immediate from the properties of the Euclidean algorithm to compute the greatest common divisor of a pair of positive integers.

In its original form, that algorithm repeatedly replaces that larger of the two numbers by their difference, until the numbers become equal, which must happen after finitely many steps. The only property needed will be that this number of steps for an initial pair (a,b) only depends on the ratio a : b. This is because, if both numbers are multiplied by a common positive factor λ so as to obtain another pair (λab) with the same ratio, then this factor does not affect the comparison: say if a > b then also λa > λb; moreover the difference λa − λb=λ(a − b) is also multiplied by the same factor. Therefore comparing the algorithm applied to (a,b) and to (λab) after one step, the pairs will still have the same ratio, and this relation will persist until the algorithm terminates.

Now suppose the golden ratio were a rational number, that is, one has positive integers a, b with

$frac\left\{a+b\right\}a = frac ab,$
in other words the ratio of a + b and a is the same as that of a and b. The first step of the Euclidean algorithm applied to the pair (a + b,a) reduces it to (b,a), whence complete execution of the algorithm will take one more step for (a + b,a) than for (a,b). But on the other hand it was shown above that due to the equality of ratios, the two cases require the same number of steps; this is an obvious contradiction.

Another way to express this argument is as follows: the formulation of the Euclidean algorithm does not require the operands to be integer numbers; they could be real numbers or indeed any pair of quantities that can be compared and subtracted. For instance one could operate on lengths in a geometric figure (without requiring a unit of measure to express everything in numbers); in fact this is a point of view already familiar to the ancient Greeks. In this setting however there is no longer a guarantee that the algorithm will terminate as it will for integer numbers (which cannot descend further than the number 1). One does retain the property mentioned above that pairs having the same ratio will behave similarly throughout the algorithm (even if it should go on forever), which is directly related to the algorithm not requiring any unit of measure. Now examples can be given of ratios for which this form of the algorithm will never terminate, and the golden ratio is the simplest possible such example: by construction a pair with the golden ratio will give another pair with the same ratio after just one step, so that it will go on similarly forever.

Note that apart from the Euclidean algorithm, this proof does not require any number theoretic facts, such as prime factorisation or even the fact that any fraction can be expressed in lowest terms.

#### Contradiction from an expression in lowest terms

Recall that we denoted the "larger part" by $a$ and the "smaller part" by $b$. If the golden ratio is a positive rational number, then it must be expressible as a fraction in lowest terms in the form $a / b$ where $a$ and $b$ are coprime positive integers. The algebraic definition of the golden ratio then indicates that if $a / b = phi$, then
$frac\left\{a\right\}\left\{b\right\} = frac\left\{a+b\right\}\left\{a\right\}.,$

Multiplying both sides by $ab$ leads to:

$a^2 = ab+b^2,.$

Subtracting ab from both sides and factoring out a gives:

$a\left(a-b\right) = b^2,.$

Finally, dividing both sides by $b\left(a-b\right)$ yields:

$frac\left\{a\right\}\left\{b\right\} = frac\left\{b\right\}\left\{a-b\right\},.$

This last equation indicates that $a/b$ could be further reduced to $b/\left(a-b\right)$, where $a-b$ is still positive, which is an equivalent fraction with smaller numerator and denominator. But since $a/b$ was already given in lowest terms, this is a contradiction. Thus this number cannot be so written, and is therefore irrational.

#### Derivation from irrationality of $sqrt\left\{5\right\}$

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 $textstylefrac\left\{1 + sqrt\left\{5\right\}\right\}\left\{2\right\}$ is rational, then $textstyle2left\left(frac\left\{1 + sqrt\left\{5\right\}\right\}\left\{2\right\} - frac\left\{1\right\}\left\{2\right\}right\right) = sqrt\left\{5\right\}$ is also rational, which is a contradiction if it is already known that the square root of a non-square natural number is irrational.

### Alternate forms

The formula $varphi = 1 + 1/varphi$ can be expanded recursively to obtain a continued fraction for the golden ratio:

$varphi = \left[1; 1, 1, 1, dots\right] = 1 + cfrac\left\{1\right\}\left\{1 + cfrac\left\{1\right\}\left\{1 + cfrac\left\{1\right\}\left\{1 + ddots\right\}\right\}\right\}$

and its reciprocal:

$varphi^\left\{-1\right\} = \left[0; 1, 1, 1, dots\right] = 0 + cfrac\left\{1\right\}\left\{1 + cfrac\left\{1\right\}\left\{1 + cfrac\left\{1\right\}\left\{1 + ddots\right\}\right\}\right\},.$

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

The equation $varphi^2 = 1 + varphi$ likewise produces the continued square root form:

$varphi = sqrt\left\{1 + sqrt\left\{1 + sqrt\left\{1 + sqrt\left\{1 + cdots\right\}\right\}\right\}\right\},.$

Also:

$varphi = 1+2sin\left(pi/10\right) = 1 + 2sin 18^circ$
$varphi = \left\{1 over 2\right\}csc\left(pi/10\right) = \left\{1 over 2\right\}csc 18^circ$
$varphi = 2cos\left(pi/5\right)=2cos 36^circ.,$

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.

If x agrees with $varphi$ to n decimal places, then $frac\left\{x^2+2x\right\}\left\{x^2+1\right\}$ agrees with it to 2n decimal places.

An equation derived in 1994 connects the golden ratio to the Number of the Beast (666):

$-frac\left\{varphi\right\}\left\{2\right\}=sin666^circ=cos\left(6cdot 6 cdot 6^circ\right).$
Which can be combined into the expression:
$-varphi=sin666^circ+cos\left(6cdot 6 cdot 6^circ\right).$
This relationship depends upon the choice of the degree as the measure of angle, and will not hold when using other units of angular measure.

### 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.

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 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..

#### Golden triangle, pentagon and pentagram

##### Golden triangle

The golden triangle can be characterised 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.

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 BC=XC and XC=XA, 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, and so AC also equals φ2. Thus φ2 = φ+1, confirming that φ is indeed the golden ratio.

##### Pentagram
The golden ratio plays an important role in regular pentagons and 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 2 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 gnomon.

##### Ptolemy's theorem
The golden ratio can also be confirmed by applying Ptolemy's theorem to the quadrilateral formed by removing one vertex from a regular pentagon. 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
$\left\{b over a\right\}=\left\{\left\{\left(1+sqrt\left\{5\right\}\right)\right\}over 2\right\},.$

#### 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.

### Relationship to Fibonacci sequence

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

0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, ...

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

$Fleft\left(nright\right)$
= {{varphi^n-(1-varphi)^n} over {sqrt 5}} = over {sqrt 5}},.

The golden ratio is the limit of the ratios of successive terms of the Fibonacci sequence (or any Fibonacci-like sequence):

$lim_\left\{ntoinfty\right\}frac\left\{F\left(n+1\right)\right\}\left\{F\left(n\right)\right\}=varphi.$

Therefore, 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 on φ as the Fibonacci numbers increase, and:

$sum_\left\{n=1\right\}^\left\{infty\right\}|F\left(n\right)varphi-F\left(n+1\right)|$
= varphi,.

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

$varphi^\left\{n+1\right\}$
= varphi^n + varphi^{n-1},.

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

$3varphi^3 - 5varphi^2 + 4$
= 3(varphi^2 + varphi) - 5varphi^2 + 4 = 3[(varphi + 1) + varphi] - 5(varphi + 1) + 4 = varphi + 2 approx 3.618,.

### 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 the Lagrange's approximation theorem. This may be the reason angles close to the golden ratio often show up in phyllotaxis (the growth of plants).

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

$varphi^2 = varphi + 1 = 2.618dots,$

$\left\{1 over varphi\right\} = varphi - 1 = 0.618dots,.$

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:

$varphi^n = varphi^\left\{n-1\right\} + varphi^\left\{n-2\right\} = varphi cdot operatorname\left\{F\right\}_n + operatorname\left\{F\right\}_\left\{n-1\right\},.$

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 $lfloor n/2 - 1 rfloor = m$, then:

$! varphi^n = varphi^\left\{n-1\right\} + varphi^\left\{n-3\right\} + cdots + varphi^\left\{n-1-2m\right\} + varphi^\left\{n-2-2m\right\}.$

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 the fundamental unit of the algebraic number field $mathbb\left\{Q\right\}\left(sqrt\left\{5\right\}\right)$ and is a Pisot-Vijayaraghavan number.

Also, $\left\{varphi + 1 over varphi - 1\right\} = varphi ^3$

### Decimal expansion

The golden ratio's decimal expansion can be calculated directly from the expression
$varphi = \left\{1+sqrt\left\{5\right\} over 2\right\},$

with √5 ≈ 2.2360679774997896964. The square root of 5 can be calculated with the Babylonian method, starting with an initial estimate such as x1 = 2 and iterating

$x_\left\{n+1\right\} = frac\left\{\left(x_n + 5/x_n\right)\right\}\left\{2\right\}$

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,

$x_\left\{n+1\right\} = frac\left\{x_n^2 + 1\right\}\left\{2x_n - 1\right\},$

for an appropriate initial estimate x1 such as x1 = 1. A slightly faster method is to rewrite the equation as x − 1 − 1/x = 0, in which case the Newton iteration becomes

$x_\left\{n+1\right\} = frac\left\{x_n^2 + 2x_n\right\}\left\{x_n^2 + 1\right\}.$

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 F25001 and F25000, each over 5000 digits, yields over 10,000 significant digits of the golden ratio.

Millions of digits of φ are available . See the web page of Alexis Irlande for the 17,000,000,000 first digits.

## Pyramids

Both Egyptian pyramids and those mathematical regular square pyramids that resemble them can be analyzed with respect to the golden ratio and other ratios.

### Mathematical pyramids and triangles

A 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 sometimes 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 semi-base by apothem), joining the medium-length edges to make the apothem. The height of this pyramid is $sqrt\left\{varphi\right\}$ times the semi-base (that is, the slope of the face is $sqrt\left\{varphi\right\}$); the square of the height is equal to the area of a face, φ times the square of the semi-base.

The medial right triangle of this "golden" pyramid (see diagram), with sides $1:sqrt\left\{varphi\right\}:varphi$ is interesting in its own right, demonstrating via the Pythagorean theorem the relationship $sqrt\left\{varphi\right\} = sqrt\left\{varphi^2 - 1\right\}$ or $varphi = sqrt\left\{1 + varphi\right\}$. This "Kepler triangle is the only right triangle proportion with edge lengths in geometric progression, just as the 3–4–5 triangle is the only right triangle proportion with edge lengths in arithmetic progression. The angle with tangent $sqrt\left\{varphi\right\}$ corresponds to the angle that the side of the pyramid makes with respect to the ground, 51.827... degrees (51° 49' 38").

A nearly similar pyramid shape, but with rational proportions, is described in the Rhind Mathematical Papyrus (the source of a large part of modern knowledge of ancient Egyptian mathematics), based on the 3:4:5 triangle; the face slope corresponding to the angle with tangent 4/3 is 53.13 degrees (53 degrees and 8 minutes). The slant height or apothem is 5/3 or 1.666... times the semi-base. The Rhind papyrus has another pyramid problem as well, again with rational slope (expressed as run over rise). Egyptian mathematics did not include the notion of irrational numbers, and the rational inverse slope (run/rise, multiplied by a factor of 7 to convert to their conventional units of palms per cubit) was used in the building of pyramids.

Another mathematical pyramid with proportions almost identical to the "golden" one is the one with perimeter equal to 2π times the height, or h:b = 4:π. This triangle has a face angle of 51.854° (51°51'), very close to the 51.827° of the golden triangle. This pyramid relationship corresponds to the coincidental relationship $sqrt\left\{varphi\right\} approx 4/pi$.

Egyptian pyramids very close in proportion to these mathematical pyramids are known.

### Egyptian pyramids

One Egyptian pyramid is remarkably close to a "golden pyramid" – the Great Pyramid of Giza (also known as the Pyramid of Cheops or Khufu). Its slope of 51° 52' is extremely close to the "golden" pyramid inclination of 51° 50' and the π-based pyramid inclination of 51° 51'; other pyramids at Giza (Chephren, 52° 20', and Mycerinus, 50° 47') are also quite close. Whether the relationship to the golden ratio in these pyramids is by design or by accident remains controversial. Several other Egyptian pyramids are very close to the rational 3:4:5 shape.

Michael Rice asserts that principal authorities on the history of Egyptian architecture have argued that the Egyptians were well acquainted with the golden ratio and that it is part of mathematics of the Pyramids, citing Giedon (1957). Some recent historians of science have denied that the Egyptians had any such knowledge, contending rather that its appearance in an Egyptian building is the result of chance.

In 1859, the Pyramidologist John Taylor (1781-1864) claimed that in the Great Pyramid of Giza the golden ratio is represented by the ratio of the length of the face (the slope height), inclined at an angle θ to the ground, to half the length of the side of the square base, equivalent to the secant of the angle θ. The above two lengths were about 186.4 and 115.2 meters respectively. The ratio of these lengths is the golden ratio, accurate to more digits than either of the original measurements. Similarly, Howard Vyse, according to Matila Ghyka, reported the great pyramid height 148.2 m, and half-base 116.4 m, yielding 1.6189 for the ratio of slant height to half-base, again more accurate than the data variability.

Adding fuel to controversy over the architectural authorship of the Great Pyramid, Eric Temple Bell, mathematician and historian, claims that Egyptian mathematics would not have supported the ability to calculate the slant height of the pyramids, or the ratio to the height, except in the case of the 3:4:5 pyramid, since the 3:4:5 triangle was the only right triangle known to the Egyptians and they did not know the Pythagorean theorem nor any way to reason about irrationals such as π or φ.

## Disputed sightings

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

• Historian John Man states that the pages of the Gutenberg Bible were "based on the golden section shape". However, according to Man's own measurements, the ratio of height to width was 1.45.
• In 1991, Jean-Claude Perez proposed a connection between DNA base sequences and gene sequences and the golden ratio. Another such connection, between the Fibonacci numbers and golden ratio and Chargaff's second rule concerning the proportions of nucleobases in the human genome, was proposed in 2007.
• Australian sculptor Andrew Rogers's 50-ton stone and gold sculpture entitled Ratio, installed outdoors in Jerusalem. Despite the sculpture's sometimes being referred to as "Golden Ratio, it is not proportioned according to the golden ratio, and the sculptor does not call it that: the height of each stack of stones, beginning from either end and moving toward the center, is the beginning of the Fibonacci sequence: 1, 1, 2, 3, 5, 8. His sculpture Ascend in Sri Lanka, also in his Rhythms of Life series, is similarly constructed, with heights 1, 1, 2, 3, 5, 8, 13, but no descending side.
• It is sometimes claimed that the number of bees in a beehive divided by the number of drones yields the golden ratio. In reality, the proportion of drones in a beehive varies greatly by beehive, by bee race, by season, and by beehive health status; normal hive populations range from 5,000 to 20,000 bees, while drone numbers range "from none in the winter to as many as 1,500 in the spring and summer" (Graham, 1992, pp 350), thus the ratio is normally much greater than the golden ratio. * This misunderstanding may arise because in theory bees have approximately this ratio of male to female ancestors - the caveat being that ancestry can trace back to the same drone by more than one route, so the actual numbers of bees do not need to match the formula.
• Some specific proportions in the bodies of many animals (including humans) and parts of the shells of mollusks and cephalopods are often claimed to be in the golden ratio. There is actually a large variation in the real measures of these elements in a specific individual and the proportion in question is often significantly different from the golden ratio. The ratio of successive phalangeal bones of the digits and the metacarpal bone has been said to approximate the golden ratio. The Nautilus shell, whose construction proceeds in a logarithmic spiral, is often cited, usually under the idea that any logarithmic spiral is related to the golden ratio, but sometimes with the claim that each new chamber is proportioned by the golden ratio relative to the previous one.
• The proportions of different plant components (numbers of leaves to branches, diameters of geometrical figures inside flowers) are often claimed to show the golden ratio proportion in several species. In practice, there are significant variations between individuals, seasonal variations, and age variations in these species. While the golden ratio may be found in some proportions in some individuals at particular times in their life cycles, there is no consistent ratio in their proportions.
• 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. The use of the golden ratio in investing is also related to more complicated patterns described by Fibonacci numbers; see, e.g. Elliott wave principle. However, other market analysts have published analyses suggesting that these percentages and patterns are not supported by the data.