Silver ratio

In mathematics, the silver ratio is a geometrical proportion with exact value the positive solution of the equation

The name ''silver ratio'' results from analogy with the golden ratio, the positive solution of the equation

Although its name is recent, the silver ratio (or silver mean) has been studied since ancient times because of its connections to the square root of 2, almost-isosceles Pythagorean triples, square triangular numbers, Pell numbers, the octagon, and six polyhedra with octahedral symmetry.

Definition

If the ratio of two quantities is proportionate to the sum of two and their reciprocal ratio, they are in the silver ratio: $\frac =\frac$
The ratio $\frac$ is here denoted

Substituting $a=\sigma b \,$ in the second fraction,
$\sigma =\frac.$ It follows that the silver ratio is the positive solution of quadratic equation $\sigma^2 -2\sigma -1 =0.$ The quadratic formula gives the two solutions $1 \pm \sqrt,$ the decimal expansion of the positive root begins as .

Using the tangent function
:$\sigma =\tan \left( \frac \right) =\cot \left( \frac \right),$
or the hyperbolic sine
:$\sigma =\exp( \operatorname(1) ).$

is the superstable fixed point of the iteration x \gets \tfrac12 (x^2+1) /(x-1), \text x_0 \in ,3/math>

The iteration $x \gets \sqrt$ results in the continued radical $\sigma =\sqrt \;.$

Properties

The defining equation can be written
$\begin 1 &=\frac + \frac \\ &=\frac + \frac.\end$

The silver ratio can be expressed in terms of itself as fractions
$\begin \sigma &=\frac \\ \sigma^2 &=\frac +\frac.\end$

Similarly as the infinite geometric series
$\begin \sigma &=2\sum_^ \sigma^ \\ \sigma^2 &=-1 +2\sum_^ (\sigma -1)^.\end$

For every integer one has
$\begin \sigma^ &=2\sigma^ +\sigma^ \\ &=\sigma^ +3\sigma^ +\sigma^ \\ &=2\sigma^ +2\sigma^ +\sigma^ \end$
From this an infinite number of further relations can be found.

Continued fraction pattern of a few low powers
\begin
\sigma^ &= ;2,2,2,2,...\approx 0.4142 \;(17/41) \\
\sigma^0 &= \\
\sigma^1 &= ;2,2,2,2,...\approx 2.4142 \;(70/29) \\
\sigma^2 &= ;1,4,1,4,...\approx 5.8284 \;(5 + 29/35) \\
\sigma^3 &= 4;14,14,14,...\approx 14.0711 \;(14 + 1/14) \\
\sigma^4 &= 3;1,32,1,32,...\approx 33.9706 \;(33 + 33/34) \\
\sigma^5 &= 2;82,82,82,...\approx 82.0122 \;(82 + 1/82) \end

:$\sigma^ \equiv (-1)^ \sigma^n \bmod 1.$

The silver ratio is a Pisot number, the next quadratic Pisot number after the golden ratio. By definition of these numbers, the absolute value $\sqrt -1$ of the algebraic conjugate is smaller than thus powers of generate almost integers and the sequence $\sigma^n \bmod 1$ is dense at the borders of the unit interval.

is the fundamental unit of real quadratic field $K =\mathbb\left( \sqrt \right).$

The silver ratio can be used as base of a numeral system, here called the ''sigmary scale''. Every real number in can be represented as a convergent series
:$x =\sum_^ \frac,$ with weights

Sigmary expansions are not unique. Due to the identities
$\begin \sigma^ &=2\sigma^n +\sigma^ \\ \sigma^ +\sigma^ &=2\sigma^n +2\sigma^,\end$
digit blocks $21_\sigma \text 22_\sigma$ carry to the next power of resulting in $100_\sigma \text 101_\sigma.$ The number one has finite and infinite representations $1.0_\sigma, 0.21_\sigma$ and $0.\overline_\sigma, 0.1\overline_\sigma,$ where the first of each pair is in canonical form. The algebraic number can be written or non-canonically as The decimal number $10 =111.12_\sigma,$ $7\sigma +3 =1100_\sigma \,$ and $\tfrac =0.\overline_\sigma.$

Properties of canonical sigmary expansions, with coefficients $a,b,c,d \in \mathbb:$
* Every algebraic integer $\xi =a +b\sigma \text K$ has a finite expansion.
* Every rational number $\rho =\tfrac \text K$ has a purely periodic expansion.
* All numbers that do not lie in have chaotic expansions.

Remarkably, the same holds ''mutatis mutandis'' for all quadratic Pisot numbers that satisfy the general equation with integer It follows by repeated substitution of that all positive solutions $\tfrac12 \left(n +\sqrt \right)$ have a purely periodic continued fraction expansion $\sigma_n =n +\cfrac$
Vera de Spinadel described the properties of these irrationals and introduced the moniker metallic means.

Pell sequences

These numbers are related to the silver ratio as the Fibonacci numbers and Lucas numbers are to the golden ratio.

The fundamental sequence is defined by the recurrence relation
$P_ =2P_ +P_ \text n > 1,$
with initial values $P_ =0, P_ =1.$

The first few terms are 0, 1, 2, 5, 12, 29, 70, 169,... . The limit ratio of consecutive terms is the silver mean.

Fractions of Pell numbers provide rational approximations of with error
$\left\vert \sigma - \frac \right\vert < \frac$

The sequence is extended to negative indices using $P_ =(-1)^ P_n.$

Powers of can be written with Pell numbers as linear coefficients $\sigma^n =\sigma P_n +P_,$ which is proved by mathematical induction on The relation also holds for

The generating function of the sequence is given by
:$\frac = \sum_^ P_x^ \text \vert x \vert <1 /\sigma \;.$

The characteristic equation of the recurrence is $x^2 -2x -1 =0$ with discriminant If the two solutions are silver ratio and conjugate so that $\sigma +\bar =2 \;\text \;\sigma \cdot \bar =-1,$ the Pell numbers are computed with the Binet formula
$P_n =a( \sigma^n -\bar^n ),$
with the positive root of $8x^2 -1 =0.$

Since $\left\vert a\,\bar^n \right\vert < 1 /\sigma^,$ the number is the nearest integer to $a\,\sigma^,$ with $a =1 /\sqrt$ and

The Binet formula $\sigma^n +\bar^n$ defines the companion sequence $Q_ =P_ +P_.$

The first few terms are 2, 2, 6, 14, 34, 82, 198,... .

This Pell-Lucas sequence has the Fermat property: if p is prime, $Q_ \equiv Q_ \bmod p.$ The converse does not hold, the least odd pseudoprimes $\,n \mid (Q_ -2)$ are 13, 385, 31, 1105, 1121, 3827, 4901.

Pell numbers are obtained as integral powers of a matrix with positive eigenvalue $M = \begin 2 & 1 \\ 1 & 0 \end ,$

$M^ = \begin P_ & P_ \\ P_ & P_ \end$

The trace of gives the above

Geometry

Silver rectangle and regular octagon

A rectangle with edges in ratio can be created from a square piece of paper with an origami folding sequence. Considered a proportion of great harmony in Japanese aesthetics — ''Yamato-hi'' (大和比) — the ratio is retained if the rectangle is folded in half, parallel to the short edges. Rabatment produces a rectangle with edges in the silver ratio (according to ).

* Fold a square sheet of paper in half, creating a falling diagonal crease (bisect 90° angle), then unfold.
* Fold the right hand edge onto the diagonal crease (bisect 45° angle).
* Fold the top edge in half, to the back side (reduce width by ), and open out the triangle. The result is a rectangle.
* Fold the bottom edge onto the left hand edge (reduce height by ). The horizontal part on top is a silver rectangle.

If the folding paper is opened out, the creases coincide with diagonal sections of a regular octagon. The first two creases divide the square into a silver gnomon with angles in the ratios between two right triangles with angles in ratios (left) and (right). The unit angle is equal to degrees.

If the octagon has edge length its area is and the diagonals have lengths $\sqrt, \;\sigma$ and $\sqrt.$ The coordinates of the vertices are given by the permutations of $\left( \pm \tfrac12, \pm \tfrac \right).$ The paper square has edge length and area The triangles have areas $1, \frac$ and $\frac ;$ the rectangles have areas $\sigma -1 \text \frac.$

Silver whirl

Divide a rectangle with sides in ratio into four congruent right triangles with legs of equal length and arrange these in the shape of a silver rectangle, enclosing a similar rectangle that is scaled by factor and rotated about the centre by Repeating the construction at successively smaller scales results in four infinite sequences of adjoining right triangles, tracing a whirl of converging silver rectangles.

The logarithmic spiral through the vertices of adjacent triangles has polar slope $k =\frac \ln( \sigma).$ The parallelogram between the pair of grey triangles on the sides has perpendicular diagonals in ratio , hence is a ''silver rhombus''.

If the triangles have legs of length then each discrete spiral has length $\frac =\sum_^ \sigma^ .$ The areas of the triangles in each spiral region sum to $\frac =\tfrac12 \sum_^ \sigma^ ;$ the perimeters are equal to (light grey) and (silver regions).

Arranging the tiles with the four hypotenuses facing inward results in the diamond-in-a-square shape. Roman architect Vitruvius recommended the implied ''ad quadratura'' ratio as one of three for proportioning a town house ''atrium''. The scaling factor is and iteration on edge length gives an angular spiral of length

Polyhedra

The silver mean has connections to the following Archimedean solids with octahedral symmetry; all values are based on edge length
* Rhombicuboctahedron
The coordinates of the vertices are given by 24 distinct permutations of $( \pm \sigma, \pm 1, \pm 1),$ thus three mutually-perpendicular silver rectangles touch six of its square faces.
The midradius is $\sqrt,$ the centre radius for the square faces is
* Truncated cube
Coordinates: 24 permutations of $( \pm \sigma, \pm \sigma, \pm 1).$
Midradius: centre radius for the octagon faces:
* Truncated cuboctahedron
Coordinates: 48 permutations of $( \pm (2\sigma -1), \pm \sigma, \pm 1).$
Midradius: $\sqrt,$ centre radius for the square faces: for the octagon faces:

See also the dual Catalan solids
* Tetragonal trisoctahedron
* Trisoctahedron
* Hexakis octahedron

Silver triangle

The acute isosceles triangle formed by connecting two adjacent vertices of a regular octagon to its centre point, is here called the ''silver triangle''. It is uniquely identified by its angles in ratios The apex angle measures each base angle degrees. It follows that the height to base ratio is $\tfrac12 \tan(67 \tfrac12) =\tfrac.$

By trisecting one of its base angles, the silver triangle is partitioned into a similar triangle and an obtuse ''silver gnomon''. The trisector is collinear with a medium diagonal of the octagon. Sharing the apex of the parent triangle, the gnomon has angles of $67 \tfrac12 /3 =22 \tfrac12, 45 \text 112 \tfrac12$ degrees in the ratios From the law of sines, its edges are in ratios $1 :\sqrt :\sigma.$

The similar silver triangle is likewise obtained by scaling the parent triangle in base to leg ratio , accompanied with an degree rotation. Repeating the process at decreasing scales results in an infinite sequence of silver triangles, which converges at the centre of rotation. It is assumed without proof that the centre of rotation is the intersection point of sequential median lines that join corresponding legs and base vertices.
The assumption is verified by construction, as demonstrated in the vector image.

The centre of rotation has barycentric coordinates
$\left( \tfrac :\tfrac :\tfrac \right) \sim \left( \tfrac :1 :1 \right),$
the three whorls of stacked gnomons have areas in ratios
$\left( \tfrac \right)^ :\tfrac :1.$

The logarithmic spiral through the vertices of all nested triangles has polar slope
:$k =\frac \ln \left( \tfrac \right),$ or an expansion rate of for every degrees of rotation.

The long, medium and short diagonals of the regular octagon concur respectively at the apex, the circumcenter and the orthocenter of a silver triangle.

Silver rectangle and silver triangle

Assume a silver rectangle has been constructed as indicated above, with height , length and diagonal length $\sqrt$. The triangles on the diagonal have altitudes $1 /\sqrt\,;$ each perpendicular foot divides the diagonal in ratio

If an horizontal line is drawn through the intersection point of the diagonal and the internal edge of a rabatment square, the parent silver rectangle and the two scaled copies along the diagonal have areas in the ratios $\sigma^2 :2 :1\,,$ the rectangles opposite the diagonal both have areas equal to $\tfrac.$

Relative to vertex , the coordinates of feet of altitudes and are
$\left( \tfrac, \tfrac \right) \text \left( \tfrac, \tfrac \right).$

If the diagram is further subdivided by perpendicular lines through and , the lengths of the diagonal and its subsections can be expressed as trigonometric functions of argument $\alpha =67 \tfrac12$ degrees, the base angle of the silver triangle:

$\begin \overline =\sqrt &=\sec(\alpha) \\ \overline =\sigma^2 /\overline &=\sigma\sin(\alpha) \\ \overline =2 /\overline &=2\sin(\alpha) \\ \overline =4 /\overline &=4\cos(\alpha) \\ \overline =3 /\overline &=3\cos(\alpha) \\ \overline =\sqrt &=\csc(\alpha) \\ \overline =1 /\overline &=\sin(\alpha) \\ \overline =\overline -\overline &=(2\sigma -3)\cos(\alpha) \\ \overline =1 /\overline &=\cos(\alpha),\end$
:with

Both the lengths of the diagonal sections and the trigonometric values are elements of biquadratic number field $K =\mathbb\left( \sqrt \right).$

The silver rhombus with edge has diagonal lengths equal to and The regular octagon with edge has long diagonals of length that divide it into eight silver triangles. Since the regular octagon is defined by its side length and the angles of the silver triangle, it follows that all measures can be expressed in powers of and the diagonal segments of the silver rectangle, as illustrated above, ''pars pro toto'' on a single triangle.

The leg to base ratio has been dubbed the ''Cordovan proportion'' by Spanish architect Rafael de la Hoz Arderius. According to his observations, it is a notable measure in the architecture and intricate decorations of the mediæval Mosque of Córdoba, Andalusia.

Silver spiral

A silver spiral is a logarithmic spiral that gets wider by a factor of for every quarter turn. It is described by the polar equation $r( \theta) =a \exp(k \theta),$ with initial radius and parameter $k =\frac \ln( \sigma).$ If drawn on a silver rectangle, the spiral has its pole at the foot of altitude of a triangle on the diagonal and passes through vertices of paired squares which are perpendicularly aligned and successively scaled by a factor $1/ \sigma.$

Ammann–Beenker tiling

The silver ratio appears prominently in the Ammann–Beenker tiling, a non-periodic tiling of the plane with octagonal symmetry, build from a square and silver rhombus with equal side lengths. Discovered by Robert Ammann in 1977, its algebraic properties were described by Frans Beenker five years later.
If the squares are cut into two triangles, the inflation factor for Ammann A5-tiles is the dominant eigenvalue of substitution matrix $M =\begin 3 & 2 \\ 4 & 3 \end.$

See also

* Solutions of equations similar to $x^2 =2x +1$:
** Golden ratio – the real positive solution of the equation $x^2 =x +1$
** Metallic means – real positive solutions of the general equation $x^2 =nx +1$
** Supersilver ratio – the only real solution of the equation $x^3 =2x^2 +1$

Notes

References

External links

YouTube lecture on the silver ratio, Pell sequence and metallic means
at Tartapelago by Giorgio Pietrocola

{{Metallic ratios

Quadratic irrational numbers
Mathematical constants
History of geometry
Metallic means