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- The title given to this article is incorrect due to technical limitations. The correct title is π.
- Alternative meanings: Pi (letter), π (movie), Pi meson, Pi bond
The minuscule, or lower-case, pi
The mathematical constant π (written as "pi" when the Greek letter is not available) is ubiquitous in mathematics and physics. In Euclidean plane geometry, π may be defined as either the ratio of a circle's circumference to its diameter, or as the area of a circle of radius 1. Most modern textbooks define π analytically using trigonometric functions, e.g. as the smallest positive x for which sin(x) = 0, or as twice the smallest positive x for which cos(x) = 0.
All these definitions are equivalent.
Pi is also known as Archimedes' constant (not to be confused with Archimedes' number) and Ludolph's number.
The first sixty-four decimal digits of π (sequence A000796 (http://www.research.att.com/cgi-bin/access.cgi/as/njas/sequences/eisA.cgi?Anum=A000796) in OEIS) are:
- 3.14159 26535 89793 23846 26433 83279 50288 41971 69399 37510 58209 74944 5923...
More digits of π may be found at the following Wikisource links: Wikisource - Pi to 1,000 Places (http://sources.wikipedia.org/wiki/Pi_to_1,000_places) | 10,000 Places | 100,000 Places | 1,000,000 Places
Properties
Pi is an irrational number: that is, it cannot be written as the ratio of two integers. This was proven in 1761 by Johann Heinrich Lambert. In fact, the number is transcendental, as was proven by Ferdinand von Lindemann in 1882. This means that there is no polynomial with rational (equivalently, integer) coefficients of which π is a root.
An important consequence of the transcendence of π is the fact that it is not constructible. This means that it is impossible to express π using only a finite number of integers, fractions and their roots. This result establishes the impossibility of squaring the circle: it is impossible to construct, using ruler and compass alone, a square whose area is equal to the area of a given circle. The reason is that the coordinates of all points that can be constructed with ruler and compass are constructible numbers.
While the original Greek letter for pi was phonetically equivalent to the English letter p, it has now evolved to be pronounced like the word pie in most circles.
Formulas involving π
Geometry
Pi appears in many formulas in geometry involving circles and spheres.
| Geometrical shape
| Formula
|
| Circumference of circle of radius r
| <math>C = 2 \pi r \,\!<math>
|
| Area of circle of radius r
| <math>A = \pi r^2 \,\!<math>
|
| Area of ellipse with semiaxes a and b
| <math>A = \pi a b \,\!<math>
|
| Volume of sphere of radius r
| <math>V = \frac{4}{3} \pi r^3 \,\!<math>
|
| Surface area of sphere of radius r
| <math>A = 4 \pi r^2 \,\!<math>
|
| Volume of cylinder of height h and radius r
| <math>V = \pi r^2 h \,\!<math>
|
| Surface area of cylinder of height h and radius r
| <math>A = 2 ( \pi r^2 ) + ( 2 \pi r ) h = 2 \pi r (r + h) \,\!<math>
|
| Volume of cone of height h and radius r
| <math>V = \frac{1}{3} \pi r^2 h \,\!<math>
|
| Surface area of cone of height h and radius r
| <math>A = \pi r \sqrt{r^2 + h^2} + \pi r^2 = \pi r (r + \sqrt{r^2 + h^2}) \,\!<math>
|
Also, the angle measurement 180° (in degrees) is equal to π radians.
Analysis
Many formulas in analysis contain π, including infinite series (and infinite product) representations, integrals, and so-called special functions.
- <math>\frac2\pi=
\frac{\sqrt2}2
\frac{\sqrt{2+\sqrt2}}2
\frac{\sqrt{2+\sqrt{2+\sqrt2}}}2\ldots<math>
- <math>\frac{1}{1} - \frac{1}{3} + \frac{1}{5} - \frac{1}{7} + \frac{1}{9} - \cdots = \frac{\pi}{4}<math>
- <math> \frac{2}{1} \cdot \frac{2}{3} \cdot \frac{4}{3} \cdot \frac{4}{5} \cdot \frac{6}{5} \cdot \frac{6}{7} \cdot \frac{8}{7} \cdot \frac{8}{9} \cdots = \frac{\pi}{2} <math>
- <math>\int_{-\infty}^{\infty} e^{-x^2}\,dx = \sqrt{\pi}<math>
- <math>\zeta(2) = \frac{1}{1^2} + \frac{1}{2^2} + \frac{1}{3^2} + \frac{1}{4^2} + \cdots = \frac{\pi^2}{6}<math>
- <math>\zeta(4)= \frac{1}{1^4} + \frac{1}{2^4} + \frac{1}{3^4} + \frac{1}{4^4} + \cdots = \frac{\pi^4}{90}<math>
- and generally, <math>\zeta(2n)<math> is a rational multiple of <math>\pi^{2n}<math> for positive integer n
- <math>\Gamma\left({1 \over 2}\right)=\sqrt{\pi}<math>
- <math>n! \sim \sqrt{2 \pi n} \left(\frac{n}{e}\right)^n<math>
- <math>e^{\pi i} + 1 = 0\;<math>
- <math>\sum_{k=0}^{n} \phi (k) \sim 3 n^2 / \pi^2<math>
- Area of one quarter of the unit circle:
- <math>\int_0^1 \sqrt{1-x^2} = {\pi \over 4}<math>
Continued fractions
Pi has many continued fractions representations, including:
- <math> \frac{4}{\pi} = 1 + \frac{1}{3 + \frac{4}{5 + \frac{9}{7 + \frac{16}{9 + \frac{25}{11 + \frac{36}{13 + ...}}}}}} <math>
(You can see other representations at The Wolfram Functions Site (http://functions.wolfram.com/Constants/Pi/10/).)
Number theory
Some results from number theory:
Here, "probability", "average", and "random" are taken in a limiting sense, e.g. we consider the probability for the set of integers {1, 2, 3,..., N}, and then take the limit as N approaches infinity.
Dynamical systems / ergodic theory
In dynamical systems theory (see also ergodic theory), for almost every real-valued x0 in the interval [0,1],
- <math> \lim_{n \to \infty} \frac{1}{n} \sum_{i = 1}^{n} \sqrt{x_i} = \frac{2}{\pi}\,, <math>
where the xi are iterates of the Logistic map for r = 4.
Physics
Formulas from physics.
- <math> \Delta x \Delta p \ge \frac{h}{4\pi} <math>
- <math> R_{ik} - {g_{ik} R \over 2} + \Lambda g_{ik} = {8 \pi G \over c^4} T_{ik} <math>
- <math> F = \frac{\left|q_1q_2\right|}{4 \pi \epsilon_0 r^2} <math>
Probability and statistics
In probability and statistics, there are many distributions whose formulas contain π, including:
- <math>f(x) = {1 \over \sigma\sqrt{2\pi} }\,e^{-{(x-\mu )^2 \over 2\sigma^2}}<math>
- <math>f(x) = \frac{1}{\pi (1 + x^2)}<math>
Note that since <math>\int_{-\infty}^{\infty} f(x)\,dx = 1<math>, for any pdf f(x), the above formulas can be used to produce other integral formulas for π.
An interesting empirical approximation of π is based on Buffon's needle problem. Consider dropping a needle of length L repeatedly on a surface containing parallel lines drawn S units apart (with S > L). If the needle is dropped n times and x of those times it comes to rest crossing a line (x > 0), then one may approximate π using:
- <math>\pi \approx \frac{2nL}{xS}<math>
History
The symbol "π" for Archimedes' constant was first introduced in 1706 by William Jones when he published A New Introduction to Mathematics, although the same symbol had been used earlier to indicate the circumference of a circle. The notation became standard after it was adopted by Leonhard Euler. In either case, π is the first letter of περιμετρος (perimetros), meaning 'measure around' in Greek.
Here is a brief chronology of π:
| Date |
Person |
Value of π
(world records in bold)
|
| 20th century BC | Babylonians | 25/8 = 3.125
|
| 20th century BC | Egyptian Rhind Papyrus | (16/9)² = 3.160493...
|
| 12th century BC | Chinese | 3
|
| 434 BC | Anaxagoras tried to square the circle with straightedge and compass |
|
| 3rd century BC | Archimedes | 223/71 < π < 22/7
(3.140845... < π < 3.142857...)
211875/67441 = 3.14163...
|
| 20 BC | Vitruvius | 25/8 = 3.125
|
| 130 | Chang Hong | √10 = 3.162277...
|
| 150 | Ptolemy | 377/120 = 3.141666...
|
| 250 | Wang Fau | 142/45 = 3.155555...
|
| 263 | Liu Hui | 3.14159
|
| 480 | Zu Chongzhi | 3.1415926 < π < 3.1415927
|
| 499 | Aryabhatta | 62832/20000 = 3.1416
|
| 598 | Brahmagupta | √10 = 3.162277...
|
| 800 | Al Khwarizmi | 3.1416
|
| 12th Century | Bhaskara | 3.14156
|
| 1220 | Fibonacci | 3.141818
|
| 1400 | Madhava | 3.1415926359
|
| All records from 1424 are given as the number of correct decimal places (dps).
|
| 1424 | Jamshid Masud Al Kashi
| 16 dps
|
| 1573 | Valenthus Otho
| 6 dps
|
| 1593 | François Viète
| 9 dps
|
| 1593 | Adriaen van Roomen
| 15 dps
|
| 1596 | Ludolph van Ceulen
| 20 dps
|
| 1615 | Ludolph van Ceulen
| 32 dps
|
| 1621 | Willebrord Snel, a pupil of Van Ceulen
| 35 dps
|
| 1665 | Isaac Newton
| 16 dps
|
| 1699 | Abraham Sharp
| 71 dps
|
| 1700 | Seki Kowa
| 10 dps
|
| 1706 | John Machin
| 100 dps
|
| 1706 | William Jones introduced the Greek letter π |
|
| 1730 | Kamata
| 25 dps
|
| 1719 | De Lagny calculated 127 decimal places, but not all were correct
| 112 dps
|
| 1723 | Takebe
| 41 dps
|
| 1734 | Leonhard Euler adopted the Greek letter π and assured its popularity |
|
| 1739 | Matsunaga
| 50 dps
|
| 1761 | Johann Heinrich Lambert proved that π is irrational |
|
| 1775 | Euler pointed out the possibility that π might be transcendental |
|
| 1789 | Jurij Vega calculated 140 decimal places, but not all are correct
| 137 dps
|
| 1794 | Adrien-Marie Legendre showed that π² (and hence π) is irrational, and mentioned the possibility that π might be transcendental. |
|
| 1841 | Rutherford calculated 208 decimal places, but not all were correct
| 152 dps
|
| 1844 | Zacharias Dase and Strassnitzky
| 200 dps
|
| 1847 | Thomas Clausen
| 248 dps
|
| 1853 | Lehmann
| 261 dps
|
| 1853 | Rutherford
| 440 dps
|
| 1853 | William Shanks
| 527 dps
|
| 1855 | Richter
| 500 dps
|
| 1874 | William Shanks took 15 years to calculate 707 decimal places, but not all were correct (the error was found by D. F. Ferguson in 1946)
| 527 dps
|
| 1882 | Lindemann proved that π is transcendental (the Lindemann-Weierstrass theorem) |
|
| 1946
| D. F. Ferguson used a desk calculator
| 620 dps
|
| 1947
| 710 dps
|
| 1947
| 808 dps
|
| All records from 1949 onwards were calculated with electronic computers.
|
| 1949
| J. W. Wrench, Jr, and L. R. Smith were the first to use an electronic computer (the Eniac) to calculate π
| 2,037 dps
|
| 1953 | Mahler showed that π is not a Liouville number |
|
| 1955
| J. W. Wrench, Jr, and L. R. Smith
| 3,089 dps
|
| 1961
| 100,000 dps
|
| 1966
| 250,000 dps
|
| 1967
| 500,000 dps
|
| 1974
| 1,000,000 dps
|
| 1992
| 2,180,000,000 dps
|
| 1995 | Kanada
| > 6,000,000,000 dps
|
| 1997 | Kanada and Takahashi
| > 51,500,000,000 dps
|
| 1999 | Kanada and Takahashi
| > 206,000,000,000 dps
|
| 2002 | Kanada and team
| > 1,240,000,000,000 dps
|
Numerical approximations of π
Due to the transcendental nature of π, there are no nice closed expressions for π. Therefore numerical calculations must use approximations to the number. For many purposes, 3.14 or 22/7 is close enough, although engineers often use 3.1416 (5 significant figures) or 3.14159 (6 significant figures) for more accuracy. The approximations 22/7 and 355/113, with 3 and 7 significant figures respectively, are obtained from the simple continued fraction expansion of π.
An Egyptian scribe called Ahmes is the source of the oldest known text to give an approximate value for π. The Rhind Papyrus dates from the 17th century BCE and describes the value in such a way that the result obtained comes out to 256 divided by 81 or 3.160.
The Chinese mathematician Liu Hui computed π to 3.141014 (good to three decimal places) in 263 and suggested that 3.14 was a good approximation.
The Indian mathematician and astronomer Aryabhata gave an accurate approximation for π. He wrote "Add four to one hundred, multiply by eight and then add sixty-two thousand. the result is approximately the circumference of a circle of diameter twenty thousand. By this rule the relation of the circumference to diameter is given." In other words (4+100)*8 + 62000 is the circumference of a circle with radius 20000. This provides a value of π = 62832/20000 = 3.1416, correct when rounded off to four decimal places.
The Chinese mathematician and astronomer Zu Chongzhi computed π to 3.1415926 to 3.1415927 and gave two approximations of π 355/113 and 22/7 in the 5th century.
The Iranian mathematician and astronomer, Ghyath ad-din Jamshid Kashani, 1350-1439, computed π to 9 digits in the base of 60, which is equivalent to 16 decimal digit as:
- 2 π = 6.2831853071795865
The German mathematician Ludolph van Ceulen (circa 1600) computed the first 35 decimals. He was so proud of this accomplishment that he had them inscribed on his tombstone.
The Slovene mathematician Jurij Vega in 1789 calculated the first 140 decimal places for π of which the first 137 were correct and held the world record for 52 years until 1841, when William Rutherford calculated 208 decimal places of which the first 152 were correct. Vega improved John Machin's formula from 1706 and his method is still mentioned today.
None of the formulas given above can serve as an efficient way of approximating π. For fast calculations, one may use formulas such as Machin's:
- <math>\frac{\pi}{4} = 4 \arctan\frac{1}{5} - \arctan\frac{1}{239} <math>
together with the Taylor series expansion of the function arctan(x). This formula is most easily verified using polar coordinates of complex numbers, starting with
- <math>(5+i)^4\cdot(-239+i)=-114244-114244i.<math>
Formulas of this kind are known as Machin-like formulas.
Extremely long decimal expansions of π are typically computed with the Gauss-Legendre algorithm and Borwein's algorithm; the Salamin-Brent algorithm which was invented in 1976 has also been used in the past.
The first one million digits of π and 1/π are available from Project Gutenberg (see external links below).
The current record (December 2002) stands at 1,241,100,000,000 digits, which were computed in September 2002 on a 64-node Hitachi supercomputer with 1 terabyte of main memory, which carries out 2 trillion operations per second, nearly twice as many as the computer used for the previous record (206 billion digits). The following Machin-like formulas were used for this:
- <math> \frac{\pi}{4} = 12 \arctan\frac{1}{49} + 32 \arctan\frac{1}{57} - 5 \arctan\frac{1}{239} + 12 \arctan\frac{1}{110443}<math>
- K. Takano (1982).
- <math> \frac{\pi}{4} = 44 \arctan\frac{1}{57} + 7 \arctan\frac{1}{239} - 12 \arctan\frac{1}{682} + 24 \arctan\frac{1}{12943}<math>
- F. C. W. Störmer (1896).
These approximations have so many digits that they are no longer of any practical use, except for testing new supercomputers and (obviously) for establishing new π calculation records.
In 1996 David H. Bailey, together with Peter Borwein and Simon Plouffe, discovered a new formula for π as an infinite series:
- <math>\pi = \sum_{k = 0}^{\infty} \frac{1}{16^k}
\left( \frac{4}{8k + 1} - \frac{2}{8k + 4} - \frac{1}{8k + 5} - \frac{1}{8k + 6}\right)<math>
This formula permits one to easily compute the kth binary or hexadecimal digit of π, without
having to compute the preceding k − 1 digits. Bailey's website (http://www.nersc.gov/~dhbailey/) contains the derivation as well as implementations in various programming languages. The PiHex project computed 64-bits around the quadrillionth bit of π (which turns out to be 0).
Other formulas that have been used to compute estimates of π include:
- <math>
\frac{\pi}{2}=
\sum_{k=0}^\infty\frac{k!}{(2k+1)!!}=
1+\frac{1}{3}\left(1+\frac{2}{5}\left(1+\frac{3}{7}\left(1+\frac{4}{9}(1+...)\right)\right)\right)
<math>
- Newton.
- <math> \frac{1}{\pi} = \frac{2\sqrt{2}}{9801} \sum^\infty_{k=0} \frac{(4k)!(1103+26390k)}{(k!)^4 396^{4k}} <math>
- Ramanujan.
- <math> \frac{1}{\pi} = 12 \sum^\infty_{k=0} \frac{(-1)^k (6k)! (13591409 + 545140134k)}{(3k)!(k!)^3 640320^{3k + 3/2}} <math>
- David Chudnovsky and Gregory Chudnovsky.
- <math>{\pi} = 20 \arctan\frac{1}{7} - 8 \arctan\frac{3}{79} <math>
- Euler.
Open questions
The most pressing open question about π is whether it is a normal number, i.e. whether any digit block occurs in the expansion of π just as often as one would statistically expect if the digits had been produced completely "randomly". This must be true in any base, not just in base 10. Current knowledge in this direction is very weak; e.g., it is not even known which of the digits 0,...,9 occur infinitely often in the decimal expansion of π.
Bailey and Crandall showed in 2000 that the existence of the above mentioned Bailey-Borwein-Plouffe formula and similar formulas imply that the normality in base 2 of π and various other constants can be reduced to a plausible conjecture of chaos theory. See Bailey's above mentioned web site for details.
It is also unknown whether π and e are algebraically independent, i.e. whether there is a polynomial relation between π and e with rational coefficients.
The nature of π
In non-Euclidean geometry the sum of the angles of a triangle may be more or less than π, and the ratio of a circle's circumference to its diameter may also differ from π. This doesn't change the definition of π, but it does affect many formulae in which π appears. So, in particular, π is not affected by the shape of the universe; it is not a physical constant but a mathematical constant defined independently of any physical measurements.
π culture
There is an entire field of humorous yet serious study that involves the use of mnemonic techniques to remember the digits of π, which is known as piphilology. For example, part of the school cheer of MIT is: "Cosine, secant, tangent, sine! 3 point 1 4 1 5 9!" See Pi mnemonics (http://en.wikiquote.org/wiki/English_mnemonics#Pi) for more examples.
March 14 (3/14) marks Pi Day which is celebrated by many lovers of π. On July 22, Pi Approximation Day is celebrated (22/7 is a popular approximation of π).
Another example of math-humor is this approximation of π: Take the number "1234", transpose the first two digits and the last two digits, so the number becomes "2143". Divide that number by "two-two" (22, so 2143/22 = 97.40909...). Take the two-squaredth root (4th root) of this number. The final outcome is remarkably close to π: 3.14159265.
Related articles
External links
- Wikisource - Pi to 1,000 Places (http://sources.wikipedia.org/wiki/Pi_to_1,000_places) | 10,000 Places (http://sources.wikipedia.org/wiki/Pi_to_10,000_places) | 100,000 Places (http://sources.wikipedia.org/wiki/Pi_to_100,000_places) | 1,000,000 Places (http://sources.wikipedia.org/wiki/Pi_to_1,000,000_places)
- Project Gutenberg E-Text containing a million digits of Pi (http://www.gutenberg.net/etext/50)
- Statistics about the first 1.2 trillion digits of Pi (http://www.super-computing.org/pi-decimal_current.html)
- Archives of Pi calculated to 1,000,000 or 10,000,000 places. (http://www.solidz.com/pi/)
- PiHex Project (http://www.cecm.sfu.ca/projects/pihex/index.html)
- J J O'Connor and E F Robertson: A history of Pi. Mac Tutor project (http://www-history.mcs.st-andrews.ac.uk/history/HistTopics/Pi_through_the_ages.html)
- Andreas P. Hatzipolakis: PiPhilology. A site with hundreds of examples of π mnemonics (http://www.cilea.it/~bottoni/www-cilea/F90/piph.htm)
- Pi memorised as poetry (http://www.startfromhere.freeserve.co.uk/nudesci/abc/pi.htm)
- From the Wolfram Mathematics site lots of formulae for π (http://mathworld.wolfram.com/PiFormulas.html)
- Finding the value of Pi (http://mathforum.org/isaac/problems/pi1.html)
- PlanetMath: Pi (http://planetmath.org/encyclopedia/Pi.html)
- The pi-hacks Yahoo! Group (http://groups.yahoo.com/group/pi-hacks)
- A banner of approximately 220 million digits of pi (http://3.14.maxg.org/)
- http://3.141592653589793238462643383279502884197169399375105820974944592.com - Pi to 1,000,000 Places (http://3.141592653589793238462643383279502884197169399375105820974944592.com)
- A collection of Machin-type formulas for Pi (http://machination.mysite.freeserve.com/)
- A proof that Pi Is Irrational (http://www.lrz-muenchen.de/~hr/numb/pi-irr.html)
- Calculating Pi: The open source project for calculating Pi. (http://projectpi.sourceforge.net/)
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