geometry Geometry (; ) is, with arithmetic, one of the oldest branches of mathematics. It is concerned with properties of space such as the distance, shape, size, and relative position of figures. A mathematician who works in the field of geometry is ...

, the spiral of Theodorus (also called ''square root spiral'', ''Einstein spiral'', ''Pythagorean spiral'', or ''Pythagoras's snail'') is a spiral composed of

right triangle A right triangle (American English) or right-angled triangle ( British), or more formally an orthogonal triangle, formerly called a rectangled triangle ( grc, ὀρθόσγωνία, lit=upright angle), is a triangle in which one angle is a right a ...

s, placed edge-to-edge. It was named after Theodorus of Cyrene.

Construction

The spiral is started with an

isosceles In geometry, an isosceles triangle () is a triangle that has two sides of equal length. Sometimes it is specified as having ''exactly'' two sides of equal length, and sometimes as having ''at least'' two sides of equal length, the latter versio ...

right triangle, with each

leg A leg is a weight-bearing and locomotive anatomical structure, usually having a columnar shape. During locomotion, legs function as "extensible struts". The combination of movements at all joints can be modeled as a single, linear element ca ...

having unit length. Another right triangle is formed, an automedian right triangle with one leg being the

hypotenuse In geometry, a hypotenuse is the longest side of a right-angled triangle, the side opposite the right angle. The length of the hypotenuse can be found using the Pythagorean theorem, which states that the square of the length of the hypotenuse e ...

of the prior triangle (with length the square root of 2) and the other leg having length of 1; the length of the hypotenuse of this second triangle is the

square root of 3 The square root of 3 is the positive real number that, when multiplied by itself, gives the number 3. It is denoted mathematically as \sqrt or 3^. It is more precisely called the principal square root of 3 to distinguish it from the negative nu ...

. The process then repeats; the

n

th triangle in the sequence is a right triangle with the side lengths

\sqrt

and 1, and with hypotenuse

\sqrt

. For example, the 16th triangle has sides measuring

4=\sqrt

, 1 and hypotenuse of

\sqrt

History and uses

Although all of Theodorus' work has been lost,

Plato Plato ( ; grc-gre, Πλάτων ; 428/427 or 424/423 – 348/347 BC) was a Greek philosopher born in Athens during the Classical period in Ancient Greece. He founded the Platonist school of thought and the Academy, the first institution ...

put Theodorus into his dialogue '' Theaetetus'', which tells of his work. It is assumed that Theodorus had proved that all of the square roots of non-square integers from 3 to 17 are

irrational Irrationality is cognition, thinking, talking, or acting without inclusion of rationality. It is more specifically described as an action or opinion given through inadequate use of reason, or through emotional distress or cognitive deficiency. T ...

by means of the Spiral of Theodorus. Plato does not attribute the irrationality of the square root of 2 to Theodorus, because it was well known before him. Theodorus and Theaetetus split the rational numbers and irrational numbers into different categories.

Hypotenuse

Each of the triangles' hypotenuses

h_n

gives the square root of the corresponding

natural number In mathematics, the natural numbers are those numbers used for counting (as in "there are ''six'' coins on the table") and ordering (as in "this is the ''third'' largest city in the country"). Numbers used for counting are called ''cardinal ...

, with

h_1=\sqrt

. Plato, tutored by Theodorus, questioned why Theodorus stopped at

\sqrt

. The reason is commonly believed to be that the

\sqrt

hypotenuse belongs to the last triangle that does not overlap the figure.

Overlapping

In 1958, Kaleb Williams proved that no two hypotenuses will ever coincide, regardless of how far the spiral is continued. Also, if the sides of unit length are extended into a line, they will never pass through any of the other vertices of the total figure.

Extension

Theodorus stopped his spiral at the triangle with a hypotenuse of

\sqrt

. If the spiral is continued to infinitely many triangles, many more interesting characteristics are found.

Growth rate

Angle

\varphi_n

is the angle of the

n

th triangle (or spiral segment), then:

\tan\left(\varphi_n\right)=\frac.

Therefore, the growth of the angle

\varphi_n

of the next triangle

n

is:

\varphi_n=\arctan\left(\frac\right).

The sum of the angles of the first

k

triangles is called the total angle

\varphi(k)

for the

k

th triangle. It grows proportionally to the square root of

k

, with a bounded correction term

c_2

\varphi\left (k\right)=\sum_^k\varphi_n = 2\sqrt+c_2(k)

where

\lim_ c_2(k)= - 2.157782996659\ldots

().

Radius

The growth of the radius of the spiral at a certain triangle

n

\Delta r=\sqrt-\sqrt.

Archimedean spiral

The Spiral of Theodorus approximates the Archimedean spiral. Just as the distance between two windings of the Archimedean spiral equals mathematical constant

\pi

, as the number of spins of the spiral of Theodorus approaches infinity, the distance between two consecutive windings quickly approaches

\pi

. The following is a table showing of two windings of the spiral approaching pi: As shown, after only the fifth winding, the distance is a 99.97% accurate approximation to

\pi

Continuous curve

The question of how to interpolate the discrete points of the spiral of Theodorus by a smooth curve was proposed and answered in by analogy with Euler's formula for the gamma function as an

interpolant In the mathematical field of numerical analysis, interpolation is a type of estimation, a method of constructing (finding) new data points based on the range of a discrete set of known data points. In engineering and science, one often has a ...

for the factorial function. Davis found the function

T(x) = \prod_^\infty \frac \qquad ( -1 < x < \infty )

which was further studied by his student Leader and by Iserles (in an appendix to ). An axiomatic characterization of this function is given in as the unique function that satisfies the

functional equation In mathematics, a functional equation is, in the broadest meaning, an equation in which one or several functions appear as unknowns. So, differential equations and integral equations are functional equations. However, a more restricted meaning ...

f(x+1) = \left( 1 + \frac\right) \cdot f(x),

the initial condition

f(0) = 1,

and monotonicity in both argument and modulus; alternative conditions and weakenings are also studied therein. An alternative derivation is given in . An analytic continuation of Davis' continuous form of the Spiral of Theodorus which extends in the opposite direction from the origin is given in . In the figure the nodes of the original (discrete) Theodorus spiral are shown as small green circles. The blue ones are those, added in the opposite direction of the spiral. Only nodes

n

with the integer value of the polar radius

r_n=\pm\sqrt

are numbered in the figure. The dashed circle in the coordinate origin

O

is the circle of curvature at

O