Logarithmic spiral

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Logarithmic spiral

A logarithmic spiral, equiangular spiral or growth spiral is a special kind of spiral

Spiral

In mathematics, a spiral is a curve which emanates from a central point, getting progressively farther away as it revolves around the point....
curve

Curve

In mathematics, a curve consists of the points through which a continuous function moving point passes. This notion captures the intuitive idea of a geometrical dimension object, which furthermore is connectedness in the sense of having no continuous function or continuum ....
which often appears in nature.

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Encyclopedia

A logarithmic spiral, equiangular spiral or growth spiral is a special kind of spiral

Spiral

In mathematics, a spiral is a curve which emanates from a central point, getting progressively farther away as it revolves around the point....
curve

Curve

René Descartes

Ren? Descartes , , also known as Renatus Cartesius , was a French philosophy, mathematician, scientist, and writer who spent most of his adult life in the Dutch Republic....
and later extensively investigated by Jakob Bernoulli

Jakob Bernoulli

Jacob Bernoulli was one of the many prominent mathematicians in the Bernoulli family.Following his father's wish, Jacob studied theology and entered the ministry....
, who called it Spira mirabilis, "the marvelous spiral".

Definition

In polar coordinates the curve can be written as

or

with

E (mathematical constant)

The mathematical constant e is the unique real number such that the function ex has the same value as the derivative, for all values of x....
being the base of natural logarithms, and and being arbitrary positive real constants.

In parametric form, the curve is

with real number

Real number

In mathematics, the real numbers may be described informally in several different ways. The real numbers include both rational numbers, such as 42 and −23/129, and irrational numbers, such as pi and the square root of two; or, a real number can be given by an infinite decimal representation, such as 2.4871773339...., where the digits co...
s and .

The spiral has the property that the angle ? between the tangent

Tangent

In geometry, the tangent line to a curve at a given Point is the straight line that "just touches" the curve at that point . As it passes through the point of tangency, the tangent line is "going in the same direction" as the curve, and in this sense it is the best straight-line approximation to the curve at that point....
and radial line

Radial line

This article is about the mathematical concept, for the medical meaning, see 'arterial line'.A 'radial line' is a line passing through the center of a circle or sphere....
at the point is constant. This property can be expressed in differential geometric terms

Differential geometry of curves

Differential geometry of curves is the branch of geometry that dealswith smooth curve in the Euclidean plane and in the Euclidean space by methods of differential calculus and integral calculus....
as

The derivative

Derivative

In calculus, a branch of mathematics, the derivative is a measure of how a function changes as its input changes. Loosely speaking, a derivative can be thought of as how much a quantity is changing at a given point....
is proportional to the parameter . In other words, it controls how "tightly" and in which direction the spiral spirals. In the extreme case that the spiral becomes a circle

Circle

A circle is a simple shape of Euclidean geometry consisting of those point in a plane which are the same distance from a given point called the center....
of radius . Conversely, in the limit

Limit (mathematics)

In mathematics, the concept of a "limit" is used to describe the behavior of a Function as its argument or input either "gets close" to some point, or as the argument becomes arbitrarily large; or the behavior of a sequence's elements as their index increases indefinitely....
that approaches infinity

Extended real number line

In mathematics, the affinely extended real number system is obtained from the real number system R by adding two elements: +8 and −8 ....
(? ? 0) the spiral tends toward a straight line. The complement

Complementary angles

A pair of angles are complementary if the sum of their measures is 90 degree .If the two complementary angles are adjacent their non-shared sides form a angle....
of ? is called the pitch.

Spira mirabilis and Jakob Bernoulli

Spira mirabilis, Latin

Latin

Latin is an Italic language, historically spoken in Latium and Ancient Rome. Through the Military history of the Roman Empire, Latin spread throughout the Mediterranean and a large part of Europe....
for "miraculous spiral", is another name for the logarithmic spiral. Although this curve

Curve

Jakob Bernoulli

Jacob Bernoulli was one of the many prominent mathematicians in the Bernoulli family.Following his father's wish, Jacob studied theology and entered the ministry....
, because he was fascinated by one of its unique mathematical properties: the size of the spiral

Spiral

In mathematics, a spiral is a curve which emanates from a central point, getting progressively farther away as it revolves around the point....
increases but its shape is unaltered with each successive curve. Possibly as a result of this unique property, the spira mirabilis has evolved in nature, appearing in certain growing forms such as nautilus

Nautilus

Nautilus is the common name of any marine creatures of the cephalopod family Nautilidae, the sole family of the suborder Nautilina....
shells and sunflower

Sunflower

The sunflower is an annual plant in the family Asteraceae and native to the Americas, with a large flowering head . The stem can grow as high as 3 meters , and the flower head can reach 30 cm in diameter with the "large" seeds....
heads. Jakob Bernoulli wanted such a spiral engraved on his headstone

Headstone

A headstone, tombstone, or gravestone is a marker, normally carved from Rock , placed over or next to the site of a burial in a cemetery or elsewhere....
, but, by error, an Archimedean spiral

Archimedean spiral

The Archimedean spiral is a spiral named after the 3rd century BC Ancient Greece mathematician Archimedes. It is the locus of points corresponding to the locations over time of a point moving away from a fixed point with a constant speed along a line which rotates with constant angular velocity....
was placed there instead.

Properties

The logarithmic spiral can be distinguished from the Archimedean spiral

Archimedean spiral

Geometric progression

In mathematics, a geometric progression, also known as a geometric sequence, is a sequence of numbers where each term after the first is found by multiplying the previous one by a fixed non-zero number called the common ratio....
, while in an Archimedean spiral these distances are constant.

Logarithmic spirals are self-similar in that they are self-congruent under all similarity transformations

Similarity (geometry)

Two geometrical objects are called similar if they both have the same shape. Equivalently and more precisely, one is congruence to the result of a uniform Scaling of the other....
(scaling them gives the same result as rotating them). Scaling by a factor gives the same as the original, without rotation. They are also congruent to their own involute

Involute

In the differential geometry of curves, an involute of a smooth curve is another curve, obtained by attaching an imaginary taut string to the given curve and tracing its free end as it is wound onto that given curve; or in reverse, unwound....
s, evolute

Evolute

In the differential geometry of curves, the evolute of a curve is the locus of all its Osculating circle. Equivalently, it is the envelope of the perpendicular to a curve....
s, and the pedal curve

Pedal curve

In the differential geometry of curves, a pedal curve is a curve derived by construction from a given curve .Take a curve and a fixed point P ....
s based on their centers.

Starting at a point and moving inward along the spiral, one can circle the origin an unbounded number of times without reaching it; yet, the total distance covered on this path is finite; that is, the limit

Limit (mathematics)

Evangelista Torricelli

Evangelista Torricelli was an Italy physics and mathematics, best known for his invention of the barometer....
even before calculus

Calculus

Calculus is a branch of mathematics that includes the study of limit , derivatives, integrals, and infinite series, and constitutes a major part of modern university education....
had been invented. The total distance covered is , where is the straight-line distance from to the origin.

The exponential function

Exponential function

The exponential function is a function in mathematics. The application of this function to a value x is written as exp. Equivalently, this can be written in the form ex, where e is the mathematical constant that is the base of the natural logarithm and that is also known as Euler's number....
exactly maps all lines not parallel with the real or imaginary axis in the complex plane, to all logarithmic spirals in the complex plane with centre at 0. (Up to

Up to

In mathematics, the phrase "up to xxxx" indicates that members of an equivalence class are to be regarded as a single entity for some purpose. "xxxx" describes a property or process which transforms an element into one from the same equivalence class, i.e....
adding integer multiples of to the lines, the mapping of all lines to all logarithmic spirals is onto.) The pitch angle of the logarithmic spiral is the angle between the line and the imaginary axis.

The function , where the constant is a complex number

Complex number

In mathematics, the complex numbers are an extension of the real numbers obtained by adjoining an imaginary unit, denoted i, which satisfies:...
with non-zero imaginary part

Imaginary part

In mathematics, the imaginary part of a complex number , is the second element of the ordered pair of real numbers representing i.e. if , or equivalently, , then the imaginary part of is ....
, maps the real line

Real line

In mathematics, the real line is simply the set R of singleton real numbers.However, this term is usually used when R is to be treated as a space of some sort, such as a topological space or a vector space....
to a logarithmic spiral in the complex plane.

One can construct a golden spiral

Golden spiral

In geometry, a golden spiral is a logarithmic spiral whose growth factor b is related to φ, the golden ratio. Specifically, a golden spiral gets wider by a factor of φ for every quarter turn it makes....
, a logarithmic spiral that grows outward by a factor of the golden ratio

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....
for every 90 degrees of rotation (pitch about 17.03239 degrees), or approximate it using Fibonacci number

Fibonacci number

In mathematics, the Fibonacci numbers are a sequence of numbers named after Leonardo of Pisa, known as Fibonacci . Fibonacci's 1202 book Liber Abaci introduced the sequence to Western European mathematics, although the sequence had been previously described in Indian mathematics....
s.