All of the digits

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पटिरूप:Short description पटिरूप:About पटिरूप:Pp पटिरूप:Featured article पटिरूप:Use Oxford spelling पटिरूप:Use dmy dates पटिरूप:Pi box The number पटिरूप:Pi (पटिरूप:IPAc-en; spelled out as "pi") is a mathematical constant that is the ratio of a circle's circumference to its diameter, approximately equal to 3.1415926535897932384626433832795028841971693993751051209749445923078164062862089986280348253421170679821480865132823066470930844609550582231725352841027019385211055596446229489549303819 The number पटिरूप:Pi appears in many formulae across mathematics and physics. It is an irrational number, meaning that it cannot be expressed exactly as a ratio of two integers, although fractions such as ${\displaystyle \frac{22}{7}}$ are commonly used to approximate it. Consequently, its decimal representation never ends, nor enters a permanently repeating pattern. It is a transcendental number, meaning that it cannot be a solution of an equation involving only finite sums, products, powers, and integers. The transcendence of पटिरूप:Pi implies that it is impossible to solve the ancient challenge of squaring the circle with a compass and straightedge. The decimal digits of पटिरूप:Pi appear to be randomly distributed,पटिरूप:Efn but no proof of this conjecture has been found.

For thousands of years, mathematicians have attempted to extend their understanding of पटिरूप:Pi, sometimes by computing its value to a high degree of accuracy. Ancient civilizations, including the Egyptians and Babylonians, required fairly accurate approximations of पटिरूप:Pi for practical computations. Around 250पटिरूप:NbspBC, the Greek mathematician Archimedes created an algorithm to approximate पटिरूप:Pi with arbitrary accuracy. In the 5th century AD, Chinese mathematicians approximated पटिरूप:Pi to seven digits, while Indian mathematicians made a five-digit approximation, both using geometrical techniques. The first computational formula for पटिरूप:Pi, based on infinite series, was discovered a millennium later.पटिरूप:Sfn^[१] The earliest known use of the Greek letter π to represent the ratio of a circle's circumference to its diameter was by the Welsh mathematician William Jones in 1706.^[२]

The invention of calculus soon led to the calculation of hundreds of digits of पटिरूप:Pi, enough for all practical scientific computations. Nevertheless, in the 20th and 21st centuries, mathematicians and computer scientists have pursued new approaches that, when combined with increasing computational power, extended the decimal representation of पटिरूप:Pi to many trillions of digits.^[३][४] These computations are motivated by the development of efficient algorithms to calculate numeric series, as well as the human quest to break records.पटिरूप:Sfn^[५] The extensive computations involved have also been used to test supercomputers as well as stress testing consumer computer hardware.

Because its definition relates to the circle, पटिरूप:Pi is found in many formulae in trigonometry and geometry, especially those concerning circles, ellipses and spheres. It is also found in formulae from other topics in science, such as cosmology, fractals, thermodynamics, mechanics, and electromagnetism. It also appears in areas having little to do with geometry, such as number theory and statistics, and in modern mathematical analysis can be defined without any reference to geometry. The ubiquity of पटिरूप:Pi makes it one of the most widely known mathematical constants inside and outside of science. Several books devoted to पटिरूप:Pi have been published, and record-setting calculations of the digits of पटिरूप:Pi often result in news headlines.

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The symbol used by mathematicians to represent the ratio of a circle's circumference to its diameter is the lowercase [[Pi (letter)|Greek letter पटिरूप:Pi]], sometimes spelled out as pi.^[६] In English, पटिरूप:Pi is pronounced as "pie" (पटिरूप:IPAc-en पटिरूप:Respell).^[७] In mathematical use, the lowercase letter पटिरूप:Pi is distinguished from its capitalized and enlarged counterpart पटिरूप:Math, which denotes a product of a sequence, analogous to how पटिरूप:Math denotes summation.

The choice of the symbol पटिरूप:Pi is discussed in the section [[#Adoption of the symbol π|Adoption of the symbol पटिरूप:Pi]].

पटिरूप:Pi is commonly defined as the ratio of a circle's circumference पटिरूप:Math to its diameter पटिरूप:Math:पटिरूप:Sfn $${\displaystyle \pi =\frac{C}{d}}$$

The ratio $\frac{C}{d}$ is constant, regardless of the circle's size. For example, if a circle has twice the diameter of another circle, it will also have twice the circumference, preserving the ratio $\frac{C}{d}$. This definition of पटिरूप:Pi implicitly makes use of flat (Euclidean) geometry; although the notion of a circle can be extended to any curve (non-Euclidean) geometry, these new circles will no longer satisfy the formula $\pi =\frac{C}{d}$.पटिरूप:Sfn

Here, the circumference of a circle is the arc length around the perimeter of the circle, a quantity which can be formally defined independently of geometry using limits—a concept in calculus.^[८] For example, one may directly compute the arc length of the top half of the unit circle, given in Cartesian coordinates by the equation $x^2+y^2=1$, as the integral:पटिरूप:Sfn $${\displaystyle \pi ={\displaystyle \underset{-1}{\overset{1}{\int }}}\frac{dx}{\sqrt{1-x^2}}.}$$

An integral such as this was proposed as a definition of पटिरूप:Pi by Karl Weierstrass, who defined it directly as an integral in 1841.पटिरूप:Efn

Integration is no longer commonly used in a first analytical definition because, as पटिरूप:Harvnb explains, differential calculus typically precedes integral calculus in the university curriculum, so it is desirable to have a definition of पटिरूप:Pi that does not rely on the latter. One such definition, due to Richard Baltzer^[९] and popularized by Edmund Landau,^[१०] is the following: पटिरूप:Pi is twice the smallest positive number at which the cosine function equals 0.पटिरूप:Sfnपटिरूप:Sfn^[११] पटिरूप:Pi is also the smallest positive number at which the sine function equals zero, and the difference between consecutive zeroes of the sine function. The cosine and sine can be defined independently of geometry as a power series,^[१२] or as the solution of a differential equation.^[११]

In a similar spirit, पटिरूप:Pi can be defined using properties of the complex exponential, पटिरूप:Math, of a complex variable पटिरूप:Math. Like the cosine, the complex exponential can be defined in one of several ways. The set of complex numbers at which पटिरूप:Math is equal to one is then an (imaginary) arithmetic progression of the form: $${\displaystyle \{\dots ,-2\pi i,0,2\pi i,4\pi i,\dots \}=\{2\pi ki\mid k\in \mathbb{Z}\}}$$ and there is a unique positive real number पटिरूप:Pi with this property.पटिरूप:Sfn^[१३]

A variation on the same idea, making use of sophisticated mathematical concepts of topology and algebra, is the following theorem:^[१४] there is a unique (up to automorphism) continuous isomorphism from the group R/Z of real numbers under addition modulo integers (the circle group), onto the multiplicative group of complex numbers of absolute value one. The number पटिरूप:Pi is then defined as half the magnitude of the derivative of this homomorphism.^[१५]

पटिरूप:Pi is an irrational number, meaning that it cannot be written as the ratio of two integers. Fractions such as पटिरूप:Math and पटिरूप:Math are commonly used to approximate पटिरूप:Pi, but no common fraction (ratio of whole numbers) can be its exact value.पटिरूप:Sfn Because पटिरूप:Pi is irrational, it has an infinite number of digits in its decimal representation, and does not settle into an infinitely repeating pattern of digits. There are several [[proof that π is irrational|proofs that पटिरूप:Pi is irrational]]; they generally require calculus and rely on the reductio ad absurdum technique. The degree to which पटिरूप:Pi can be approximated by rational numbers (called the irrationality measure) is not precisely known; estimates have established that the irrationality measure is larger or at least equal to the measure of पटिरूप:Math but smaller than the measure of Liouville numbers.^[१६]

The digits of पटिरूप:Pi have no apparent pattern and have passed tests for statistical randomness, including tests for normality; a number of infinite length is called normal when all possible sequences of digits (of any given length) appear equally often. The conjecture that पटिरूप:Pi is normal has not been proven or disproven.पटिरूप:Sfn

Since the advent of computers, a large number of digits of पटिरूप:Pi have been available on which to perform statistical analysis. Yasumasa Kanada has performed detailed statistical analyses on the decimal digits of पटिरूप:Pi, and found them consistent with normality; for example, the frequencies of the ten digits 0 to 9 were subjected to statistical significance tests, and no evidence of a pattern was found.पटिरूप:Sfn Any random sequence of digits contains arbitrarily long subsequences that appear non-random, by the infinite monkey theorem. Thus, because the sequence of पटिरूप:Pi's digits passes statistical tests for randomness, it contains some sequences of digits that may appear non-random, such as a sequence of six consecutive 9s that begins at the 762nd decimal place of the decimal representation of पटिरूप:Pi.पटिरूप:Sfn This is also called the "Feynman point" in mathematical folklore, after Richard Feynman, although no connection to Feynman is known.

पटिरूप:See also

In addition to being irrational, पटिरूप:Pi is also a transcendental number, which means that it is not the solution of any non-constant polynomial equation with rational coefficients, such as $\frac{x^5}{120}-\frac{x^3}{6}+x=0$.पटिरूप:Sfnपटिरूप:Efn This follows from the so-called Lindemann–Weierstrass theorem, which also establishes the transcendence of [[E (mathematical constant)|the constant पटिरूप:Mvar]].

The transcendence of पटिरूप:Pi has two important consequences: First, पटिरूप:Pi cannot be expressed using any finite combination of rational numbers and square roots or n-th roots (such as ${\displaystyle \sqrt[3]{31}}$ or ${\displaystyle \sqrt{10}}$). Second, since no transcendental number can be constructed with compass and straightedge, it is not possible to "square the circle". In other words, it is impossible to construct, using compass and straightedge alone, a square whose area is exactly equal to the area of a given circle.^[१७] Squaring a circle was one of the important geometry problems of the classical antiquity.^[१८] Amateur mathematicians in modern times have sometimes attempted to square the circle and claim success—despite the fact that it is mathematically impossible.^{[१९][२०]}

An unsolved problem thus far is the question of whether or not the numbers पटिरूप:Mvar and पटिरूप:Mvar are algebraically independent ("relatively transcendental"). This would be resolved by Schanuel's conjecture^{[२१][२२]} – a currently unproven generalization of the Lindemann–Weierstrass theorem.^[२३]

As an irrational number, पटिरूप:Pi cannot be represented as a common fraction. But every number, including पटिरूप:Pi, can be represented by an infinite series of nested fractions, called a continued fraction: $${\displaystyle \pi =3+\frac{1}{7+\frac{1}{15+\frac{1}{1+\frac{1}{292+\frac{1}{1+\frac{1}{1+\frac{1}{1+\ddots }}}}}}}}$$

Truncating the continued fraction at any point yields a rational approximation for पटिरूप:Pi; the first four of these are पटिरूप:Math, पटिरूप:Math, पटिरूप:Math, and पटिरूप:Math. These numbers are among the best-known and most widely used historical approximations of the constant. Each approximation generated in this way is a best rational approximation; that is, each is closer to पटिरूप:Pi than any other fraction with the same or a smaller denominator.^[२४] Because पटिरूप:Pi is transcendental, it is by definition not algebraic and so cannot be a quadratic irrational. Therefore, पटिरूप:Pi cannot have a periodic continued fraction. Although the simple continued fraction for पटिरूप:Pi (shown above) also does not exhibit any other obvious pattern,पटिरूप:Sfn^[२५] several generalized continued fractions do, such as:^[२६] $${\displaystyle \begin{array}{cc}\pi & =3+\frac{1^2}{6+\frac{3^2}{6+\frac{5^2}{6+\frac{7^2}{6+\ddots }}}}=\frac{4}{1+\frac{1^2}{2+\frac{3^2}{2+\frac{5^2}{2+\ddots }}}}=\frac{4}{1+\frac{1^2}{3+\frac{2^2}{5+\frac{3^2}{7+\ddots }}}}\end{array}}$$

The middle of these is due to the mid-17th century mathematician William Brouncker, see § Brouncker's formula.

Some approximations of pi include:

• Integers: 3
• Fractions: Approximate fractions include (in order of increasing accuracy) पटिरूप:Sfrac, पटिरूप:Sfrac, पटिरूप:Sfrac, पटिरूप:Sfrac, पटिरूप:Sfrac, पटिरूप:Sfrac, and पटिरूप:Sfrac.^[२४] (List is selected terms from पटिरूप:OEIS2C and पटिरूप:OEIS2C.)
• Digits: The first 50 decimal digits are पटिरूप:Gapsपटिरूप:Sfn (see पटिरूप:OEIS2C)

Digits in other number systems

• The first 48 binary (base 2) digits (called bits) are पटिरूप:Gaps (see पटिरूप:OEIS2C)
• The first 36 digits in ternary (base 3) are पटिरूप:Gaps (see पटिरूप:OEIS2C)
• The first 20 digits in hexadecimal (base 16) are पटिरूप:Gapsपटिरूप:Sfn (see पटिरूप:OEIS2C)
• The first five sexagesimal (base 60) digits are 3;8,29,44,0,47^[२७] (see पटिरूप:OEIS2C)

Any complex number, say पटिरूप:Mvar, can be expressed using a pair of real numbers. In the polar coordinate system, one number (radius or पटिरूप:Mvar) is used to represent पटिरूप:Mvar's distance from the origin of the complex plane, and the other (angle or पटिरूप:Mvar) the counter-clockwise rotation from the positive real line:पटिरूप:Sfn $${\displaystyle z=r\cdot (\cos \phi +i\sin \phi ),}$$ where पटिरूप:Mvar is the imaginary unit satisfying ${\displaystyle i^2=-1}$. The frequent appearance of पटिरूप:Pi in complex analysis can be related to the behaviour of the exponential function of a complex variable, described by Euler's formula:^[२८] $${\displaystyle e^{i\phi }=\cos \phi +i\sin \phi ,}$$ where [[E (mathematical constant)|the constant पटिरूप:Math]] is the base of the natural logarithm. This formula establishes a correspondence between imaginary powers of पटिरूप:Math and points on the unit circle centred at the origin of the complex plane. Setting ${\displaystyle \phi =\pi }$ in Euler's formula results in Euler's identity, celebrated in mathematics due to it containing five important mathematical constants:^{[२८][२९]} $${\displaystyle e^{i\pi }+1=0.}$$

There are पटिरूप:Math different complex numbers पटिरूप:Mvar satisfying ${\displaystyle z^n=1}$, and these are called the "पटिरूप:Math-th roots of unity"पटिरूप:Sfn and are given by the formula: $${\displaystyle e^{2\pi ik/n}(k=0,1,2,\dots ,n-1).}$$

पटिरूप:Main पटिरूप:See also

The best-known approximations to पटिरूप:Pi dating before the Common Era were accurate to two decimal places; this was improved upon in Chinese mathematics in particular by the mid-first millennium, to an accuracy of seven decimal places. After this, no further progress was made until the late medieval period.

The earliest written approximations of पटिरूप:Pi are found in Babylon and Egypt, both within one percent of the true value. In Babylon, a clay tablet dated 1900–1600 BC has a geometrical statement that, by implication, treats पटिरूप:Pi as पटिरूप:Sfrac = 3.125.पटिरूप:Sfn In Egypt, the Rhind Papyrus, dated around 1650 BC but copied from a document dated to 1850 BC, has a formula for the area of a circle that treats पटिरूप:Pi as $(\frac{16}{9}{)}^2\approx 3.16$.^[२५]पटिरूप:Sfn Although some pyramidologists have theorized that the Great Pyramid of Giza was built with proportions related to पटिरूप:Pi, this theory is not widely accepted by scholars.^[३०] In the Shulba Sutras of Indian mathematics, dating to an oral tradition from the first or second millennium BC, approximations are given which have been variously interpreted as approximately 3.08831, 3.08833, 3.004, 3, or 3.125.^[३१]

The first recorded algorithm for rigorously calculating the value of पटिरूप:Pi was a geometrical approach using polygons, devised around 250 BC by the Greek mathematician Archimedes, implementing the method of exhaustion.पटिरूप:Sfn This polygonal algorithm dominated for over 1,000 years, and as a result पटिरूप:Pi is sometimes referred to as Archimedes's constant.पटिरूप:Sfn Archimedes computed upper and lower bounds of पटिरूप:Pi by drawing a regular hexagon inside and outside a circle, and successively doubling the number of sides until he reached a 96-sided regular polygon. By calculating the perimeters of these polygons, he proved that पटिरूप:Math (that is, पटिरूप:Math).^[३२] Archimedes' upper bound of पटिरूप:Math may have led to a widespread popular belief that पटिरूप:Pi is equal to पटिरूप:Math.पटिरूप:Sfn Around 150 AD, Greek-Roman scientist Ptolemy, in his Almagest, gave a value for पटिरूप:Pi of 3.1416, which he may have obtained from Archimedes or from Apollonius of Perga.पटिरूप:Sfnपटिरूप:Sfn Mathematicians using polygonal algorithms reached 39 digits of पटिरूप:Pi in 1630, a record only broken in 1699 when infinite series were used to reach 71 digits.^[३३]

In ancient China, values for पटिरूप:Pi included 3.1547 (around 1 AD), ${\displaystyle \sqrt{10}}$ (100 AD, approximately 3.1623), and पटिरूप:Math (3rd century, approximately 3.1556).पटिरूप:Sfn Around 265 AD, the Wei Kingdom mathematician Liu Hui created a polygon-based iterative algorithm and used it with a 3,072-sided polygon to obtain a value of पटिरूप:Pi of 3.1416.^[३४]पटिरूप:Sfn Liu later invented a faster method of calculating पटिरूप:Pi and obtained a value of 3.14 with a 96-sided polygon, by taking advantage of the fact that the differences in area of successive polygons form a geometric series with a factor of 4.^[३४] The Chinese mathematician Zu Chongzhi, around 480 AD, calculated that ${\displaystyle 3.1415926<\pi <3.1415927}$ and suggested the approximations $\pi \approx \frac{355}{113}=3.14159292035...$ and $\pi \approx \frac{22}{7}=3.142857142857...$, which he termed the Milü (''close ratio") and Yuelü ("approximate ratio"), respectively, using Liu Hui's algorithm applied to a 12,288-sided polygon. With a correct value for its seven first decimal digits, this value remained the most accurate approximation of पटिरूप:Pi available for the next 800 years.पटिरूप:Sfn

The Indian astronomer Aryabhata used a value of 3.1416 in his Āryabhaṭīya (499 AD).पटिरूप:Sfn Fibonacci in पटिरूप:Circa computed 3.1418 using a polygonal method, independent of Archimedes.पटिरूप:Sfn Italian author Dante apparently employed the value $3+\frac{\sqrt{2}}{10}\approx 3.14142$.पटिरूप:Sfn

The Persian astronomer Jamshīd al-Kāshī produced nine sexagesimal digits, roughly the equivalent of 16 decimal digits, in 1424, using a polygon with $3\times 2^{28}$ sides,^{[३५][३६]} which stood as the world record for about 180 years.पटिरूप:Sfn French mathematician François Viète in 1579 achieved nine digits with a polygon of $3\times 2^{17}$ sides.पटिरूप:Sfn Flemish mathematician Adriaan van Roomen arrived at 15 decimal places in 1593.पटिरूप:Sfn In 1596, Dutch mathematician Ludolph van Ceulen reached 20 digits, a record he later increased to 35 digits (as a result, पटिरूप:Pi was called the "Ludolphian number" in Germany until the early 20th century).पटिरूप:Sfn Dutch scientist Willebrord Snellius reached 34 digits in 1621,पटिरूप:Sfn and Austrian astronomer Christoph Grienberger arrived at 38 digits in 1630 using 10⁴⁰ sides.^[३७] Christiaan Huygens was able to arrive at 10 decimal places in 1654 using a slightly different method equivalent to Richardson extrapolation.^{[३८][३९]}

पटिरूप:Comparison pi infinite series.svg The calculation of पटिरूप:Pi was revolutionized by the development of infinite series techniques in the 16th and 17th centuries. An infinite series is the sum of the terms of an infinite sequence. Infinite series allowed mathematicians to compute पटिरूप:Pi with much greater precision than Archimedes and others who used geometrical techniques.^[४०] Although infinite series were exploited for पटिरूप:Pi most notably by European mathematicians such as James Gregory and Gottfried Wilhelm Leibniz, the approach also appeared in the Kerala school sometime in the 14th or 15th century.^[४१]पटिरूप:Sfn Around 1500 AD, a written description of an infinite series that could be used to compute पटिरूप:Pi was laid out in Sanskrit verse in Tantrasamgraha by Nilakantha Somayaji.^[४१] The series are presented without proof, but proofs are presented in a later work, Yuktibhāṣā, from around 1530 AD. Several infinite series are described, including series for sine (which Nilakantha attributes to Madhava of Sangamagrama), cosine, and arctangent which are now sometimes referred to as Madhava series. The series for arctangent is sometimes called Gregory's series or the Gregory–Leibniz series.^[४१] Madhava used infinite series to estimate पटिरूप:Pi to 11 digits around 1400.^[४२]

In 1593, François Viète published what is now known as Viète's formula, an infinite product (rather than an infinite sum, which is more typically used in पटिरूप:Pi calculations):पटिरूप:Sfn^{[४३][४४]} $${\displaystyle \frac{2}{\pi }=\frac{\sqrt{2}}{2}\cdot \frac{\sqrt{2+\sqrt{2}}}{2}\cdot \frac{\sqrt{2+\sqrt{2+\sqrt{2}}}}{2}\cdots }$$

In 1655, John Wallis published what is now known as Wallis product, also an infinite product:पटिरूप:Sfn $${\displaystyle \frac{\pi }{2}=(\frac{2}{1}\cdot \frac{2}{3})\cdot (\frac{4}{3}\cdot \frac{4}{5})\cdot (\frac{6}{5}\cdot \frac{6}{7})\cdot (\frac{8}{7}\cdot \frac{8}{9})\cdots }$$

In the 1660s, the English scientist Isaac Newton and German mathematician Gottfried Wilhelm Leibniz discovered calculus, which led to the development of many infinite series for approximating पटिरूप:Pi. Newton himself used an arcsine series to compute a 15-digit approximation of पटिरूप:Pi in 1665 or 1666, writing, "I am ashamed to tell you to how many figures I carried these computations, having no other business at the time."^[४५]

In 1671, James Gregory, and independently, Leibniz in 1673, discovered the Taylor series expansion for arctangent:^{[४१][४६][४७]} $${\displaystyle \arctan z=z-\frac{z^3}{3}+\frac{z^5}{5}-\frac{z^7}{7}+\cdots }$$

This series, sometimes called the Gregory–Leibniz series, equals $\frac{\pi }{4}$ when evaluated with ${\displaystyle z=1}$.^[४७] But for ${\displaystyle z=1}$, it converges impractically slowly (that is, approaches the answer very gradually), taking about ten times as many terms to calculate each additional digit.^[४८]

In 1699, English mathematician Abraham Sharp used the Gregory–Leibniz series for $z=\frac{1}{\sqrt{3}}$ to compute पटिरूप:Pi to 71 digits, breaking the previous record of 39 digits, which was set with a polygonal algorithm.पटिरूप:Sfn

In 1706, John Machin used the Gregory–Leibniz series to produce an algorithm that converged much faster:^{[२][४९]}पटिरूप:Sfn $${\displaystyle \frac{\pi }{4}=4\arctan \frac{1}{5}-\arctan \frac{1}{239}.}$$

Machin reached 100 digits of पटिरूप:Pi with this formula.^[५०] Other mathematicians created variants, now known as Machin-like formulae, that were used to set several successive records for calculating digits of पटिरूप:Pi.^{[५१][५०]}

Isaac Newton accelerated the convergence of the Gregory–Leibniz series in 1684 (in an unpublished work; others independently discovered the result):^[५२]

${\displaystyle \arctan x=\frac{x}{1+x^2}+\frac{2}{3}\frac{x^3}{(1+x^2{)}^2}+\frac{2\cdot 4}{3\cdot 5}\frac{x^5}{(1+x^2{)}^3}+\cdots }$

Leonhard Euler popularized this series in his 1755 differential calculus textbook, and later used it with Machin-like formulae, including $\frac{\pi }{4}=5\arctan \frac{1}{7}+2\arctan \frac{3}{79},$ with which he computed 20 digits of पटिरूप:Pi in one hour.^[५३]

Machin-like formulae remained the best-known method for calculating पटिरूप:Pi well into the age of computers, and were used to set records for 250 years, culminating in a 620-digit approximation in 1946 by Daniel Ferguson – the best approximation achieved without the aid of a calculating device.पटिरूप:Sfn

In 1844, a record was set by Zacharias Dase, who employed a Machin-like formula to calculate 200 decimals of पटिरूप:Pi in his head at the behest of German mathematician Carl Friedrich Gauss.^[५४]

In 1853, British mathematician William Shanks calculated पटिरूप:Pi to 607 digits, but made a mistake in the 528th digit, rendering all subsequent digits incorrect. Though he calculated an additional 100 digits in 1873, bringing the total up to 707, his previous mistake rendered all the new digits incorrect as well.^[५५]

Some infinite series for पटिरूप:Pi converge faster than others. Given the choice of two infinite series for पटिरूप:Pi, mathematicians will generally use the one that converges more rapidly because faster convergence reduces the amount of computation needed to calculate पटिरूप:Pi to any given accuracy.^[५६] A simple infinite series for पटिरूप:Pi is the Gregory–Leibniz series:पटिरूप:Sfn $${\displaystyle \pi =\frac{4}{1}-\frac{4}{3}+\frac{4}{5}-\frac{4}{7}+\frac{4}{9}-\frac{4}{11}+\frac{4}{13}-\cdots }$$

As individual terms of this infinite series are added to the sum, the total gradually gets closer to पटिरूप:Pi, and – with a sufficient number of terms – can get as close to पटिरूप:Pi as desired. It converges quite slowly, though – after 500,000 terms, it produces only five correct decimal digits of पटिरूप:Pi.^[५७]

An infinite series for पटिरूप:Pi (published by Nilakantha in the 15th century) that converges more rapidly than the Gregory–Leibniz series is:पटिरूप:Sfn^[५८] $${\displaystyle \pi =3+\frac{4}{2\times 3\times 4}-\frac{4}{4\times 5\times 6}+\frac{4}{6\times 7\times 8}-\frac{4}{8\times 9\times 10}+\cdots }$$

The following table compares the convergence rates of these two series:

Infinite series for पटिरूप:Pi	After 1st term	After 2nd term	After 3rd term	After 4th term	After 5th term	Converges to:
${\displaystyle \pi =\frac{4}{1}-\frac{4}{3}+\frac{4}{5}-\frac{4}{7}+\frac{4}{9}-\frac{4}{11}+\frac{4}{13}+\cdots }$	4.0000	2.6666 ...	3.4666 ...	2.8952 ...	3.3396 ...	पटिरूप:Pi = 3.1415 ...
${\displaystyle \pi =3+\frac{4}{2\times 3\times 4}-\frac{4}{4\times 5\times 6}+\frac{4}{6\times 7\times 8}-\cdots }$	3.0000	3.1666 ...	3.1333 ...	3.1452 ...	3.1396 ...

After five terms, the sum of the Gregory–Leibniz series is within 0.2 of the correct value of पटिरूप:Pi, whereas the sum of Nilakantha's series is within 0.002 of the correct value. Nilakantha's series converges faster and is more useful for computing digits of पटिरूप:Pi. Series that converge even faster include Machin's series and Chudnovsky's series, the latter producing 14 correct decimal digits per term.^[५६]

पटिरूप:See also Not all mathematical advances relating to पटिरूप:Pi were aimed at increasing the accuracy of approximations. When Euler solved the Basel problem in 1735, finding the exact value of the sum of the reciprocal squares, he established a connection between पटिरूप:Pi and the prime numbers that later contributed to the development and study of the Riemann zeta function:^[५९]

$${\displaystyle \frac{{\pi }^2}{6}=\frac{1}{1^2}+\frac{1}{2^2}+\frac{1}{3^2}+\frac{1}{4^2}+\cdots }$$

Swiss scientist Johann Heinrich Lambert in 1768 proved that पटिरूप:Pi is irrational, meaning it is not equal to the quotient of any two integers.पटिरूप:Sfn Lambert's proof exploited a continued-fraction representation of the tangent function.^[६०] French mathematician Adrien-Marie Legendre proved in 1794 that पटिरूप:Pi² is also irrational. In 1882, German mathematician Ferdinand von Lindemann proved that पटिरूप:Pi is transcendental,^[६१] confirming a conjecture made by both Legendre and Euler.पटिरूप:Sfn^[६२] Hardy and Wright states that "the proofs were afterwards modified and simplified by Hilbert, Hurwitz, and other writers".^[६३]

पटिरूप:Multiple image In the earliest usages, the [[Pi (letter)|Greek letter पटिरूप:Pi]] was used to denote the semiperimeter (semiperipheria in Latin) of a circle^[६] and was combined in ratios with [[delta (letter)|पटिरूप:Mvar]] (for diameter or semidiameter) or [[rho|पटिरूप:Mvar]] (for radius) to form circle constants.^{[६४][६५][६६][६७]} (Before then, mathematicians sometimes used letters such as पटिरूप:Mvar or पटिरूप:Mvar instead.पटिरूप:Sfn) The first recorded use is Oughtred's पटिरूप:Nobr, to express the ratio of periphery and diameter in the 1647 and later editions of पटिरूप:Lang.^[६८]पटिरूप:Sfn Barrow likewise used पटिरूप:Nobr to represent the constant पटिरूप:Math,^[६९] while Gregory instead used पटिरूप:Nobr to represent पटिरूप:Math.^{[७०][६६]}

The earliest known use of the Greek letter पटिरूप:Pi alone to represent the ratio of a circle's circumference to its diameter was by Welsh mathematician William Jones in his 1706 work पटिरूप:Lang; or, a New Introduction to the Mathematics.^[२]पटिरूप:Sfn The Greek letter appears on p. 243 in the phrase "$\frac{1}{2}$ Periphery (पटिरूप:Pi)", calculated for a circle with radius one. However, Jones writes that his equations for पटिरूप:Pi are from the "ready pen of the truly ingenious Mr. John Machin", leading to speculation that Machin may have employed the Greek letter before Jones.पटिरूप:Sfn Jones' notation was not immediately adopted by other mathematicians, with the fraction notation still being used as late as 1767.^{[६४][७१]}

Euler started using the single-letter form beginning with his 1727 Essay Explaining the Properties of Air, though he used पटिरूप:Math, the ratio of periphery to radius, in this and some later writing.^{[७२][७३]} Euler first used पटिरूप:Nowrap in his 1736 work Mechanica,^[७४] and continued in his widely read 1748 work पटिरूप:Lang (he wrote: "for the sake of brevity we will write this number as पटिरूप:Pi; thus पटिरूप:Pi is equal to half the circumference of a circle of radius पटिरूप:Math").^[७५] Because Euler corresponded heavily with other mathematicians in Europe, the use of the Greek letter spread rapidly, and the practice was universally adopted thereafter in the Western world,पटिरूप:Sfn though the definition still varied between पटिरूप:Math and पटिरूप:Math as late as 1761.^[७६]

पटिरूप:Quote box

The development of computers in the mid-20th century again revolutionized the hunt for digits of पटिरूप:Pi. Mathematicians John Wrench and Levi Smith reached 1,120 digits in 1949 using a desk calculator.पटिरूप:Sfn Using an inverse tangent (arctan) infinite series, a team led by George Reitwiesner and John von Neumann that same year achieved 2,037 digits with a calculation that took 70 hours of computer time on the ENIAC computer.पटिरूप:Sfn^[७७] The record, always relying on an arctan series, was broken repeatedly (3089 digits in 1955,^[७८] 7,480 digits in 1957; 10,000 digits in 1958; 100,000 digits in 1961) until 1 million digits were reached in 1973.पटिरूप:Sfn

Two additional developments around 1980 once again accelerated the ability to compute पटिरूप:Pi. First, the discovery of new iterative algorithms for computing पटिरूप:Pi, which were much faster than the infinite series; and second, the invention of fast multiplication algorithms that could multiply large numbers very rapidly.पटिरूप:Sfn Such algorithms are particularly important in modern पटिरूप:Pi computations because most of the computer's time is devoted to multiplication.पटिरूप:Sfn They include the Karatsuba algorithm, Toom–Cook multiplication, and Fourier transform-based methods.पटिरूप:Sfn

The iterative algorithms were independently published in 1975–1976 by physicist Eugene Salamin and scientist Richard Brent.पटिरूप:Sfn These avoid reliance on infinite series. An iterative algorithm repeats a specific calculation, each iteration using the outputs from prior steps as its inputs, and produces a result in each step that converges to the desired value. The approach was actually invented over 160 years earlier by Carl Friedrich Gauss, in what is now termed the arithmetic–geometric mean method (AGM method) or Gauss–Legendre algorithm.पटिरूप:Sfn As modified by Salamin and Brent, it is also referred to as the Brent–Salamin algorithm.

The iterative algorithms were widely used after 1980 because they are faster than infinite series algorithms: whereas infinite series typically increase the number of correct digits additively in successive terms, iterative algorithms generally multiply the number of correct digits at each step. For example, the Brent–Salamin algorithm doubles the number of digits in each iteration. In 1984, brothers John and Peter Borwein produced an iterative algorithm that quadruples the number of digits in each step; and in 1987, one that increases the number of digits five times in each step.^[७९] Iterative methods were used by Japanese mathematician Yasumasa Kanada to set several records for computing पटिरूप:Pi between 1995 and 2002.^[८०] This rapid convergence comes at a price: the iterative algorithms require significantly more memory than infinite series.^[८०]

For most numerical calculations involving पटिरूप:Pi, a handful of digits provide sufficient precision. According to Jörg Arndt and Christoph Haenel, thirty-nine digits are sufficient to perform most cosmological calculations, because that is the accuracy necessary to calculate the circumference of the observable universe with a precision of one atom. Accounting for additional digits needed to compensate for computational round-off errors, Arndt concludes that a few hundred digits would suffice for any scientific application. Despite this, people have worked strenuously to compute पटिरूप:Pi to thousands and millions of digits.^[८१] This effort may be partly ascribed to the human compulsion to break records, and such achievements with पटिरूप:Pi often make headlines around the world.^{[८२][८३]} They also have practical benefits, such as testing supercomputers, testing numerical analysis algorithms (including high-precision multiplication algorithms); and within pure mathematics itself, providing data for evaluating the randomness of the digits of पटिरूप:Pi.पटिरूप:Sfn

Modern पटिरूप:Pi calculators do not use iterative algorithms exclusively. New infinite series were discovered in the 1980s and 1990s that are as fast as iterative algorithms, yet are simpler and less memory intensive.^[८०] The fast iterative algorithms were anticipated in 1914, when Indian mathematician Srinivasa Ramanujan published dozens of innovative new formulae for पटिरूप:Pi, remarkable for their elegance, mathematical depth and rapid convergence.^[८४] One of his formulae, based on modular equations, is $${\displaystyle \frac{1}{\pi }=\frac{2\sqrt{2}}{9801}{\displaystyle \sum _{k=0}^{\mathrm{\infty }}}\frac{(4k)!(1103+26390k)}{k{!}^4\left(396^{4k}\right)}.}$$

This series converges much more rapidly than most arctan series, including Machin's formula.^[८५] Bill Gosper was the first to use it for advances in the calculation of पटिरूप:Pi, setting a record of 17 million digits in 1985.^[८६] Ramanujan's formulae anticipated the modern algorithms developed by the Borwein brothers (Jonathan and Peter) and the Chudnovsky brothers.^[८७] The Chudnovsky formula developed in 1987 is $${\displaystyle \frac{1}{\pi }=\frac{\sqrt{10005}}{4270934400}{\displaystyle \sum _{k=0}^{\mathrm{\infty }}}\frac{(6k)!(13591409+545140134k)}{(3k)!k{!}^3(-640320{)}^{3k}}.}$$

It produces about 14 digits of पटिरूप:Pi per term^[८८] and has been used for several record-setting पटिरूप:Pi calculations, including the first to surpass 1 billion (10⁹) digits in 1989 by the Chudnovsky brothers, 10 trillion (10¹³) digits in 2011 by Alexander Yee and Shigeru Kondo,^[८९] and 100 trillion digits by Emma Haruka Iwao in 2022.^[९०] For similar formulae, see also the Ramanujan–Sato series.

In 2006, mathematician Simon Plouffe used the PSLQ integer relation algorithm^[९१] to generate several new formulae for पटिरूप:Pi, conforming to the following template: $${\displaystyle {\pi }^k={\displaystyle \sum _{n=1}^{\mathrm{\infty }}}\frac{1}{n^k}(\frac{a}{q^n-1}+\frac{b}{q^{2n}-1}+\frac{c}{q^{4n}-1}),}$$ where पटिरूप:Math is पटिरूप:Math (Gelfond's constant), पटिरूप:Math is an odd number, and पटिरूप:Math are certain rational numbers that Plouffe computed.^[९२]

पटिरूप:Multiple image Monte Carlo methods, which evaluate the results of multiple random trials, can be used to create approximations of पटिरूप:Pi.^[९३] Buffon's needle is one such technique: If a needle of length पटिरूप:Math is dropped पटिरूप:Math times on a surface on which parallel lines are drawn पटिरूप:Math units apart, and if पटिरूप:Math of those times it comes to rest crossing a line (पटिरूप:Math > 0), then one may approximate पटिरूप:Pi based on the counts:^[९४] $${\displaystyle \pi \approx \frac{2n\ell }{xt}.}$$

Another Monte Carlo method for computing पटिरूप:Pi is to draw a circle inscribed in a square, and randomly place dots in the square. The ratio of dots inside the circle to the total number of dots will approximately equal पटिरूप:Math.^[९५]

Another way to calculate पटिरूप:Pi using probability is to start with a random walk, generated by a sequence of (fair) coin tosses: independent random variables पटिरूप:Math such that पटिरूप:Math with equal probabilities. The associated random walk is $${\displaystyle W_n={\displaystyle \sum _{k=1}^n}{X}_k}$$ so that, for each पटिरूप:Mvar, पटिरूप:Math is drawn from a shifted and scaled binomial distribution. As पटिरूप:Mvar varies, पटिरूप:Math defines a (discrete) stochastic process. Then पटिरूप:Pi can be calculated by^[९६] $${\displaystyle \pi =\underset{n\to \mathrm{\infty }}{\lim }\frac{2n}{E[|W_n|{]}^2}.}$$

This Monte Carlo method is independent of any relation to circles, and is a consequence of the central limit theorem, discussed below.

These Monte Carlo methods for approximating पटिरूप:Pi are very slow compared to other methods, and do not provide any information on the exact number of digits that are obtained. Thus they are never used to approximate पटिरूप:Pi when speed or accuracy is desired.^[९७]

Two algorithms were discovered in 1995 that opened up new avenues of research into पटिरूप:Pi. They are called spigot algorithms because, like water dripping from a spigot, they produce single digits of पटिरूप:Pi that are not reused after they are calculated.पटिरूप:Sfn^[९८] This is in contrast to infinite series or iterative algorithms, which retain and use all intermediate digits until the final result is produced.पटिरूप:Sfn

Mathematicians Stan Wagon and Stanley Rabinowitz produced a simple spigot algorithm in 1995.^[९८]पटिरूप:Sfn^[९९] Its speed is comparable to arctan algorithms, but not as fast as iterative algorithms.पटिरूप:Sfn

Another spigot algorithm, the BBP digit extraction algorithm, was discovered in 1995 by Simon Plouffe:पटिरूप:Sfn^[१००] $${\displaystyle \pi ={\displaystyle \sum _{k=0}^{\mathrm{\infty }}}\frac{1}{16^k}(\frac{4}{8k+1}-\frac{2}{8k+4}-\frac{1}{8k+5}-\frac{1}{8k+6}).}$$

This formula, unlike others before it, can produce any individual hexadecimal digit of पटिरूप:Pi without calculating all the preceding digits.पटिरूप:Sfn Individual binary digits may be extracted from individual hexadecimal digits, and octal digits can be extracted from one or two hexadecimal digits. An important application of digit extraction algorithms is to validate new claims of record पटिरूप:Pi computations: After a new record is claimed, the decimal result is converted to hexadecimal, and then a digit extraction algorithm is used to calculate several randomly selected hexadecimal digits near the end; if they match, this provides a measure of confidence that the entire computation is correct.^[८९]

Between 1998 and 2000, the distributed computing project PiHex used Bellard's formula (a modification of the BBP algorithm) to compute the quadrillionth (10¹⁵th) bit of पटिरूप:Pi, which turned out to be 0.^[१०१] In September 2010, a Yahoo! employee used the company's Hadoop application on one thousand computers over a 23-day period to compute 256 bits of पटिरूप:Pi at the two-quadrillionth (2×10¹⁵th) bit, which also happens to be zero.^[१०२]

In 2022, Plouffe found a base-10 algorithm for calculating digits of पटिरूप:Pi.^[१०३]

Because पटिरूप:Pi is closely related to the circle, it is found in many formulae from the fields of geometry and trigonometry, particularly those concerning circles, spheres, or ellipses. Other branches of science, such as statistics, physics, Fourier analysis, and number theory, also include पटिरूप:Pi in some of their important formulae.

पटिरूप:Pi appears in formulae for areas and volumes of geometrical shapes based on circles, such as ellipses, spheres, cones, and tori. Below are some of the more common formulae that involve पटिरूप:Pi.^[१०४]

• The circumference of a circle with radius पटिरूप:Math is पटिरूप:Math.
• The area of a circle with radius पटिरूप:Math is पटिरूप:Math.
• The area of an ellipse with semi-major axis पटिरूप:Math and semi-minor axis पटिरूप:Math is पटिरूप:Math.
• The volume of a sphere with radius पटिरूप:Math is पटिरूप:Math.
• The surface area of a sphere with radius पटिरूप:Math is पटिरूप:Math.

Some of the formulae above are special cases of the volume of the n-dimensional ball and the surface area of its boundary, the (n−1)-dimensional sphere, given below.

Apart from circles, there are other curves of constant width. By Barbier's theorem, every curve of constant width has perimeter पटिरूप:Pi times its width. The Reuleaux triangle (formed by the intersection of three circles with the sides of an equilateral triangle as their radii) has the smallest possible area for its width and the circle the largest. There also exist non-circular smooth and even algebraic curves of constant width.^[१०५]

Definite integrals that describe circumference, area, or volume of shapes generated by circles typically have values that involve पटिरूप:Pi. For example, an integral that specifies half the area of a circle of radius one is given by:^[१०६] $${\displaystyle {\displaystyle \underset{-1}{\overset{1}{\int }}}\sqrt{1-x^2}dx=\frac{\pi }{2}.}$$

In that integral, the function ${\displaystyle \sqrt{1-x^2}}$ represents the height over the ${\displaystyle x}$-axis of a semicircle (the square root is a consequence of the Pythagorean theorem), and the integral computes the area below the semicircle.

The existence of such integrals makes पटिरूप:Pi an algebraic period.^[१०७]

पटिरूप:Main

The trigonometric functions rely on angles, and mathematicians generally use radians as units of measurement. पटिरूप:Pi plays an important role in angles measured in radians, which are defined so that a complete circle spans an angle of 2पटिरूप:Pi radians. The angle measure of 180° is equal to पटिरूप:Pi radians, and पटिरूप:Nowrap.पटिरूप:Sfn

Common trigonometric functions have periods that are multiples of पटिरूप:Pi; for example, sine and cosine have period 2पटिरूप:Pi,^[१०८] so for any angle पटिरूप:Math and any integer पटिरूप:Math,^[१०८] $${\displaystyle \sin \theta =\sin (\theta +2\pi k)\text{ and }\cos \theta =\cos (\theta +2\pi k).}$$

Many of the appearances of पटिरूप:Pi in the formulae of mathematics and the sciences have to do with its close relationship with geometry. However, पटिरूप:Pi also appears in many natural situations having apparently nothing to do with geometry.

In many applications, it plays a distinguished role as an eigenvalue. For example, an idealized vibrating string can be modelled as the graph of a function पटिरूप:Math on the unit interval पटिरूप:Closed-closed, with fixed ends पटिरूप:Math. The modes of vibration of the string are solutions of the differential equation ${\displaystyle f^{″}(x)+\lambda f(x)=0}$, or ${\displaystyle f^{″}(t)=-\lambda f(x)}$. Thus पटिरूप:Math is an eigenvalue of the second derivative operator ${\displaystyle f\mapsto f^{″}}$, and is constrained by Sturm–Liouville theory to take on only certain specific values. It must be positive, since the operator is negative definite, so it is convenient to write पटिरूप:Math, where पटिरूप:Math is called the wavenumber. Then पटिरूप:Math satisfies the boundary conditions and the differential equation with पटिरूप:Math.^[१०९]

The value पटिरूप:Pi is, in fact, the least such value of the wavenumber, and is associated with the fundamental mode of vibration of the string. One way to show this is by estimating the energy, which satisfies Wirtinger's inequality:पटिरूप:Sfn for a function ${\displaystyle f:[0,1]\to ℂ}$ with पटिरूप:Math and पटिरूप:Math, पटिरूप:Math both square integrable, we have: $${\displaystyle {\pi }^2{\displaystyle \underset{0}{\overset{1}{\int }}}|f(x){|}^{2}dx\le {\displaystyle \underset{0}{\overset{1}{\int }}}|f^{\prime }(x){|}^{2}dx,}$$ with equality precisely when पटिरूप:Math is a multiple of पटिरूप:Math. Here पटिरूप:Pi appears as an optimal constant in Wirtinger's inequality, and it follows that it is the smallest wavenumber, using the variational characterization of the eigenvalue. As a consequence, पटिरूप:Pi is the smallest singular value of the derivative operator on the space of functions on पटिरूप:Closed-closed vanishing at both endpoints (the Sobolev space ${\displaystyle H_0^1[0,1]}$).

The number पटिरूप:Pi serves appears in similar eigenvalue problems in higher-dimensional analysis. As mentioned above, it can be characterized via its role as the best constant in the isoperimetric inequality: the area पटिरूप:Mvar enclosed by a plane Jordan curve of perimeter पटिरूप:Mvar satisfies the inequality $${\displaystyle 4\pi A\le P^2,}$$ and equality is clearly achieved for the circle, since in that case पटिरूप:Math and पटिरूप:Math.^[१११]

Ultimately, as a consequence of the isoperimetric inequality, पटिरूप:Pi appears in the optimal constant for the critical Sobolev inequality in n dimensions, which thus characterizes the role of पटिरूप:Pi in many physical phenomena as well, for example those of classical potential theory.^{[११२][११३][११४]} In two dimensions, the critical Sobolev inequality is $${\displaystyle 2\pi \Vert f{\Vert }_2\le \Vert \mathrm{\nabla }f{\Vert }_1}$$ for f a smooth function with compact support in पटिरूप:Math, ${\displaystyle \mathrm{\nabla }f}$ is the gradient of f, and ${\displaystyle \Vert f{\Vert }_2}$ and ${\displaystyle \Vert \mathrm{\nabla }f{\Vert }_1}$ refer respectively to the [[Lp space|पटिरूप:Math and पटिरूप:Math-norm]]. The Sobolev inequality is equivalent to the isoperimetric inequality (in any dimension), with the same best constants.

Wirtinger's inequality also generalizes to higher-dimensional Poincaré inequalities that provide best constants for the Dirichlet energy of an n-dimensional membrane. Specifically, पटिरूप:Pi is the greatest constant such that $${\displaystyle \pi \le \frac{{(\underset{G}{\int }|\mathrm{\nabla }u{|}^2)}^{1/2}}{{(\underset{G}{\int }|u{|}^2)}^{1/2}}}$$ for all convex subsets पटिरूप:Math of पटिरूप:Math of diameter 1, and square-integrable functions u on पटिरूप:Math of mean zero.^[११५] Just as Wirtinger's inequality is the variational form of the Dirichlet eigenvalue problem in one dimension, the Poincaré inequality is the variational form of the Neumann eigenvalue problem, in any dimension.

The constant पटिरूप:Pi also appears as a critical spectral parameter in the Fourier transform. This is the integral transform, that takes a complex-valued integrable function पटिरूप:Math on the real line to the function defined as: $${\displaystyle \hat{f}(\xi )={\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}f(x)e^{-2\pi ix\xi }dx.}$$

Although there are several different conventions for the Fourier transform and its inverse, any such convention must involve पटिरूप:Pi somewhere. The above is the most canonical definition, however, giving the unique unitary operator on पटिरूप:Math that is also an algebra homomorphism of पटिरूप:Math to पटिरूप:Math.^[११६]

The Heisenberg uncertainty principle also contains the number पटिरूप:Pi. The uncertainty principle gives a sharp lower bound on the extent to which it is possible to localize a function both in space and in frequency: with our conventions for the Fourier transform, $${\displaystyle ({\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}{x}^2|f(x){|}^{2}dx)({\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}{\xi }^2|\hat{f}(\xi ){|}^{2}d\xi )\ge {(\frac{1}{4\pi }{\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}|f(x){|}^{2}dx)}^2.}$$

The physical consequence, about the uncertainty in simultaneous position and momentum observations of a quantum mechanical system, is discussed below. The appearance of पटिरूप:Pi in the formulae of Fourier analysis is ultimately a consequence of the Stone–von Neumann theorem, asserting the uniqueness of the Schrödinger representation of the Heisenberg group.^[११७]

The fields of probability and statistics frequently use the normal distribution as a simple model for complex phenomena; for example, scientists generally assume that the observational error in most experiments follows a normal distribution.^[११८] The Gaussian function, which is the probability density function of the normal distribution with mean पटिरूप:Math and standard deviation पटिरूप:Math, naturally contains पटिरूप:Pi:^[११९] $${\displaystyle f(x)=\frac{1}{\sigma \sqrt{2\pi }}{e}^{-(x-\mu {)}^2/(2{\sigma }^2)}.}$$

The factor of ${\displaystyle \frac{1}{\sqrt{2\pi }}}$ makes the area under the graph of पटिरूप:Math equal to one, as is required for a probability distribution. This follows from a change of variables in the Gaussian integral:^[११९] $${\displaystyle {\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}{e}^{-u^2}du=\sqrt{\pi }}$$ which says that the area under the basic bell curve in the figure is equal to the square root of पटिरूप:Pi.

The central limit theorem explains the central role of normal distributions, and thus of पटिरूप:Pi, in probability and statistics. This theorem is ultimately connected with the spectral characterization of पटिरूप:Pi as the eigenvalue associated with the Heisenberg uncertainty principle, and the fact that equality holds in the uncertainty principle only for the Gaussian function.पटिरूप:Sfn Equivalently, पटिरूप:Pi is the unique constant making the Gaussian normal distribution पटिरूप:Math equal to its own Fourier transform.^[१२०] Indeed, according to पटिरूप:Harvtxt, the "whole business" of establishing the fundamental theorems of Fourier analysis reduces to the Gaussian integral.^[११७]

The constant पटिरूप:Pi appears in the Gauss–Bonnet formula which relates the differential geometry of surfaces to their topology. Specifically, if a compact surface पटिरूप:Math has Gauss curvature K, then $${\displaystyle \underset{\mathrm{\Sigma }}{\int }KdA=2\pi \chi (\mathrm{\Sigma })}$$ where पटिरूप:Math is the Euler characteristic, which is an integer.^[१२१] An example is the surface area of a sphere S of curvature 1 (so that its radius of curvature, which coincides with its radius, is also 1.) The Euler characteristic of a sphere can be computed from its homology groups and is found to be equal to two. Thus we have $${\displaystyle A(S)=\underset{S}{\int }1dA=2\pi \cdot 2=4\pi }$$ reproducing the formula for the surface area of a sphere of radius 1.

The constant appears in many other integral formulae in topology, in particular, those involving characteristic classes via the Chern–Weil homomorphism.^[१२२]

One of the key tools in complex analysis is contour integration of a function over a positively oriented (rectifiable) Jordan curve पटिरूप:Math. A form of Cauchy's integral formula states that if a point पटिरूप:Math is interior to पटिरूप:Math, then^[१२३] $${\displaystyle {{\displaystyle \oint }}_{\gamma }\frac{dz}{z-z_0}=2\pi i.}$$

Although the curve पटिरूप:Math is not a circle, and hence does not have any obvious connection to the constant पटिरूप:Pi, a standard proof of this result uses Morera's theorem, which implies that the integral is invariant under homotopy of the curve, so that it can be deformed to a circle and then integrated explicitly in polar coordinates. More generally, it is true that if a rectifiable closed curve पटिरूप:Math does not contain पटिरूप:Math, then the above integral is पटिरूप:Math times the winding number of the curve.

The general form of Cauchy's integral formula establishes the relationship between the values of a complex analytic function पटिरूप:Math on the Jordan curve पटिरूप:Math and the value of पटिरूप:Math at any interior point पटिरूप:Math of पटिरूप:Math:^[१२४] $${\displaystyle {{\displaystyle \oint }}_{\gamma }\frac{f(z)}{z-z_0}dz=2\pi if(z_0)}$$ provided पटिरूप:Math is analytic in the region enclosed by पटिरूप:Math and extends continuously to पटिरूप:Math. Cauchy's integral formula is a special case of the residue theorem, that if पटिरूप:Math is a meromorphic function the region enclosed by पटिरूप:Math and is continuous in a neighbourhood of पटिरूप:Math, then $${\displaystyle {{\displaystyle \oint }}_{\gamma }g(z)dz=2\pi i\sum \mathrm{Res}(g,a_k)}$$ where the sum is of the residues at the poles of पटिरूप:Math.

The constant पटिरूप:Pi is ubiquitous in vector calculus and potential theory, for example in Coulomb's law,^[१२५] Gauss's law, Maxwell's equations, and even the Einstein field equations.^{[१२६][१२७]} Perhaps the simplest example of this is the two-dimensional Newtonian potential, representing the potential of a point source at the origin, whose associated field has unit outward flux through any smooth and oriented closed surface enclosing the source: $${\displaystyle \mathrm{\Phi }(𝐱)=\frac{1}{2\pi }\log |𝐱|.}$$ The factor of ${\displaystyle 1/2\pi }$ is necessary to ensure that ${\displaystyle \mathrm{\Phi }}$ is the fundamental solution of the Poisson equation in ${\displaystyle {ℝ}^2}$:^[१२८] $${\displaystyle \mathrm{\Delta }\mathrm{\Phi }=\delta }$$ where ${\displaystyle \delta }$ is the Dirac delta function.

In higher dimensions, factors of पटिरूप:Pi are present because of a normalization by the n-dimensional volume of the unit n sphere. For example, in three dimensions, the Newtonian potential is:^[१२८] $${\displaystyle \mathrm{\Phi }(𝐱)=-\frac{1}{4\pi |𝐱|},}$$ which has the 2-dimensional volume (i.e., the area) of the unit 2-sphere in the denominator.

पटिरूप:Excerpt

The factorial function ${\displaystyle n!}$ is the product of all of the positive integers through पटिरूप:Math. The gamma function extends the concept of factorial (normally defined only for non-negative integers) to all complex numbers, except the negative real integers, with the identity ${\displaystyle \mathrm{\Gamma }(n)=(n-1)!}$. When the gamma function is evaluated at half-integers, the result contains पटिरूप:Pi. For example, ${\displaystyle \mathrm{\Gamma }(1/2)=\sqrt{\pi }}$ and $\mathrm{\Gamma }(5/2)=\frac{3\sqrt{\pi }}{4}$.^[१२९]

The gamma function is defined by its Weierstrass product development:^[१३०] $${\displaystyle \mathrm{\Gamma }(z)=\frac{e^{-\gamma z}}{z}{\displaystyle \prod _{n=1}^{\mathrm{\infty }}}\frac{e^{z/n}}{1+z/n}}$$ where पटिरूप:Math is the Euler–Mascheroni constant. Evaluated at पटिरूप:Math and squared, the equation पटिरूप:Math reduces to the Wallis product formula. The gamma function is also connected to the Riemann zeta function and identities for the functional determinant, in which the constant पटिरूप:Pi plays an important role.

The gamma function is used to calculate the volume पटिरूप:Math of the n-dimensional ball of radius r in Euclidean n-dimensional space, and the surface area पटिरूप:Math of its boundary, the (n−1)-dimensional sphere:^[१३१] $${\displaystyle V_n(r)=\frac{{\pi }^{n/2}}{\mathrm{\Gamma }(\frac{n}{2}+1)}{r}^n,}$$ $${\displaystyle S_{n-1}(r)=\frac{n{\pi }^{n/2}}{\mathrm{\Gamma }(\frac{n}{2}+1)}{r}^{n-1}.}$$

Further, it follows from the functional equation that $${\displaystyle 2\pi r=\frac{S_{n+1}(r)}{V_n(r)}.}$$

The gamma function can be used to create a simple approximation to the factorial function पटिरूप:Math for large पटिरूप:Math: $n!\sim \sqrt{2\pi n}{\left(\frac{n}{e}\right)}^n$ which is known as Stirling's approximation.^[१३२] Equivalently, $${\displaystyle \pi =\underset{n\to \mathrm{\infty }}{\lim }\frac{e^{2n}n{!}^2}{2n^{2n+1}}.}$$

As a geometrical application of Stirling's approximation, let पटिरूप:Math denote the standard simplex in n-dimensional Euclidean space, and पटिरूप:Math denote the simplex having all of its sides scaled up by a factor of पटिरूप:Math. Then $${\displaystyle \mathrm{Vol}((n+1){\mathrm{\Delta }}_n)=\frac{(n+1{)}^n}{n!}\sim \frac{e^{n+1}}{\sqrt{2\pi n}}.}$$

Ehrhart's volume conjecture is that this is the (optimal) upper bound on the volume of a convex body containing only one lattice point.^[१३३]

The Riemann zeta function पटिरूप:Math is used in many areas of mathematics. When evaluated at पटिरूप:Math it can be written as $${\displaystyle \zeta (2)=\frac{1}{1^2}+\frac{1}{2^2}+\frac{1}{3^2}+\cdots }$$

Finding a simple solution for this infinite series was a famous problem in mathematics called the Basel problem. Leonhard Euler solved it in 1735 when he showed it was equal to पटिरूप:Math.^[५९] Euler's result leads to the number theory result that the probability of two random numbers being relatively prime (that is, having no shared factors) is equal to पटिरूप:Math.^{[१३४][१३५]} This probability is based on the observation that the probability that any number is divisible by a prime पटिरूप:Math is पटिरूप:Math (for example, every 7th integer is divisible by 7.) Hence the probability that two numbers are both divisible by this prime is पटिरूप:Math, and the probability that at least one of them is not is पटिरूप:Math. For distinct primes, these divisibility events are mutually independent; so the probability that two numbers are relatively prime is given by a product over all primes:^[१३६] $${\displaystyle \begin{array}{cc}{\displaystyle \prod _p^{\mathrm{\infty }}}(1-\frac{1}{p^2})& ={\left({\displaystyle \prod _p^{\mathrm{\infty }}}\frac{1}{1-p^{-2}}\right)}^{-1}\\ & =\frac{1}{1+\frac{1}{2^2}+\frac{1}{3^2}+\cdots }\\ & =\frac{1}{\zeta (2)}=\frac{6}{{\pi }^2}\approx 61\mathrm{\%}.\end{array}}$$

This probability can be used in conjunction with a random number generator to approximate पटिरूप:Pi using a Monte Carlo approach.^[१३७]

The solution to the Basel problem implies that the geometrically derived quantity पटिरूप:Pi is connected in a deep way to the distribution of prime numbers. This is a special case of Weil's conjecture on Tamagawa numbers, which asserts the equality of similar such infinite products of arithmetic quantities, localized at each prime p, and a geometrical quantity: the reciprocal of the volume of a certain locally symmetric space. In the case of the Basel problem, it is the hyperbolic 3-manifold पटिरूप:Math.^[१३८]

The zeta function also satisfies Riemann's functional equation, which involves पटिरूप:Pi as well as the gamma function: $${\displaystyle \zeta (s)=2^s{\pi }^{s-1}\sin \left(\frac{\pi s}{2}\right)\mathrm{\Gamma }(1-s)\zeta (1-s).}$$

Furthermore, the derivative of the zeta function satisfies $${\displaystyle \exp (-{\zeta }^{\prime }(0))=\sqrt{2\pi }.}$$

A consequence is that पटिरूप:Pi can be obtained from the functional determinant of the harmonic oscillator. This functional determinant can be computed via a product expansion, and is equivalent to the Wallis product formula.^[१३९] The calculation can be recast in quantum mechanics, specifically the variational approach to the spectrum of the hydrogen atom.^[१४०]

The constant पटिरूप:Pi also appears naturally in Fourier series of periodic functions. Periodic functions are functions on the group पटिरूप:Math of fractional parts of real numbers. The Fourier decomposition shows that a complex-valued function पटिरूप:Math on पटिरूप:Math can be written as an infinite linear superposition of unitary characters of पटिरूप:Math. That is, continuous group homomorphisms from पटिरूप:Math to the circle group पटिरूप:Math of unit modulus complex numbers. It is a theorem that every character of पटिरूप:Math is one of the complex exponentials ${\displaystyle e_n(x)=e^{2\pi inx}}$.

There is a unique character on पटिरूप:Math, up to complex conjugation, that is a group isomorphism. Using the Haar measure on the circle group, the constant पटिरूप:Pi is half the magnitude of the Radon–Nikodym derivative of this character. The other characters have derivatives whose magnitudes are positive integral multiples of 2पटिरूप:Pi.^[१५] As a result, the constant पटिरूप:Pi is the unique number such that the group T, equipped with its Haar measure, is Pontrjagin dual to the lattice of integral multiples of 2पटिरूप:Pi.पटिरूप:Sfn This is a version of the one-dimensional Poisson summation formula.

पटिमा:Lattice with tau.svg

The constant पटिरूप:Pi is connected in a deep way with the theory of modular forms and theta functions. For example, the Chudnovsky algorithm involves in an essential way the j-invariant of an elliptic curve.

Modular forms are holomorphic functions in the upper half plane characterized by their transformation properties under the modular group ${\displaystyle {\mathrm{S}\mathrm{L}}_2(\mathbb{Z})}$ (or its various subgroups), a lattice in the group ${\displaystyle {\mathrm{S}\mathrm{L}}_2(ℝ)}$. An example is the Jacobi theta function $${\displaystyle \theta (z,\tau )={\displaystyle \sum _{n=-\mathrm{\infty }}^{\mathrm{\infty }}}{e}^{2\pi inz+i\pi n^2\tau }}$$ which is a kind of modular form called a Jacobi form.^[१४२] This is sometimes written in terms of the nome ${\displaystyle q=e^{\pi i\tau }}$.

The constant पटिरूप:Pi is the unique constant making the Jacobi theta function an automorphic form, which means that it transforms in a specific way. Certain identities hold for all automorphic forms. An example is $${\displaystyle \theta (z+\tau ,\tau )=e^{-\pi i\tau -2\pi iz}\theta (z,\tau ),}$$ which implies that पटिरूप:Math transforms as a representation under the discrete Heisenberg group. General modular forms and other theta functions also involve पटिरूप:Pi, once again because of the Stone–von Neumann theorem.^[१४२]

The Cauchy distribution $${\displaystyle g(x)=\frac{1}{\pi }\cdot \frac{1}{x^2+1}}$$ is a probability density function. The total probability is equal to one, owing to the integral: $${\displaystyle {\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}\frac{1}{x^2+1}dx=\pi .}$$

The Shannon entropy of the Cauchy distribution is equal to पटिरूप:Math, which also involves पटिरूप:Pi.

The Cauchy distribution plays an important role in potential theory because it is the simplest Furstenberg measure, the classical Poisson kernel associated with a Brownian motion in a half-plane.^[१४३] Conjugate harmonic functions and so also the Hilbert transform are associated with the asymptotics of the Poisson kernel. The Hilbert transform H is the integral transform given by the Cauchy principal value of the singular integral $${\displaystyle Hf(t)=\frac{1}{\pi }{\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}\frac{f(x)dx}{x-t}.}$$

The constant पटिरूप:Pi is the unique (positive) normalizing factor such that H defines a linear complex structure on the Hilbert space of square-integrable real-valued functions on the real line.^[१४४] The Hilbert transform, like the Fourier transform, can be characterized purely in terms of its transformation properties on the Hilbert space पटिरूप:Math: up to a normalization factor, it is the unique bounded linear operator that commutes with positive dilations and anti-commutes with all reflections of the real line.^[१४५] The constant पटिरूप:Pi is the unique normalizing factor that makes this transformation unitary.

An occurrence of पटिरूप:Pi in the fractal called the Mandelbrot set was discovered by David Boll in 1991.^[१४६] He examined the behaviour of the Mandelbrot set near the "neck" at पटिरूप:Math. When the number of iterations until divergence for the point पटिरूप:Math is multiplied by पटिरूप:Mvar, the result approaches पटिरूप:Pi as पटिरूप:Mvar approaches zero. The point पटिरूप:Math at the cusp of the large "valley" on the right side of the Mandelbrot set behaves similarly: the number of iterations until divergence multiplied by the square root of पटिरूप:Mvar tends to पटिरूप:Pi.^{[१४६][१४७]}

Let पटिरूप:Math be the set of all twice differentiable real functions ${\displaystyle f:ℝ\to ℝ}$ that satisfy the ordinary differential equation ${\displaystyle f^{″}(x)+f(x)=0}$. Then पटिरूप:Math is a two-dimensional real vector space, with two parameters corresponding to a pair of initial conditions for the differential equation. For any ${\displaystyle t\in ℝ}$, let ${\displaystyle e_t:V\to ℝ}$ be the evaluation functional, which associates to each ${\displaystyle f\in V}$ the value ${\displaystyle e_t(f)=f(t)}$ of the function पटिरूप:Math at the real point पटिरूप:Math. Then, for each t, the kernel of ${\displaystyle e_t}$ is a one-dimensional linear subspace of पटिरूप:Math. Hence ${\displaystyle t\mapsto \ker e_t}$ defines a function from ${\displaystyle ℝ\to \mathbb{P}(V)}$ from the real line to the real projective line. This function is periodic, and the quantity पटिरूप:Pi can be characterized as the period of this map.^[१४८] This is notable in that the constant पटिरूप:Pi, rather than 2पटिरूप:Pi, appears naturally in this context.

Although not a physical constant, पटिरूप:Pi appears routinely in equations describing fundamental principles of the universe, often because of पटिरूप:Pi's relationship to the circle and to spherical coordinate systems. A simple formula from the field of classical mechanics gives the approximate period पटिरूप:Math of a simple pendulum of length पटिरूप:Math, swinging with a small amplitude (पटिरूप:Math is the earth's gravitational acceleration):^[१४९] $${\displaystyle T\approx 2\pi \sqrt{\frac{L}{g}}.}$$

One of the key formulae of quantum mechanics is Heisenberg's uncertainty principle, which shows that the uncertainty in the measurement of a particle's position (Δपटिरूप:Math) and momentum (Δपटिरूप:Math) cannot both be arbitrarily small at the same time (where पटिरूप:Math is the Planck constant):^[१५०] $${\displaystyle \mathrm{\Delta }x\mathrm{\Delta }p\ge \frac{h}{4\pi }.}$$

The fact that पटिरूप:Pi is approximately equal to 3 plays a role in the relatively long lifetime of orthopositronium. The inverse lifetime to lowest order in the fine-structure constant पटिरूप:Math is^[१५१] $${\displaystyle \frac{1}{\tau }=2\frac{{\pi }^2-9}{9\pi }{m}_{\text{e}}{\alpha }^6,}$$ where पटिरूप:Math is the mass of the electron.

पटिरूप:Pi is present in some structural engineering formulae, such as the buckling formula derived by Euler, which gives the maximum axial load पटिरूप:Math that a long, slender column of length पटिरूप:Math, modulus of elasticity पटिरूप:Math, and area moment of inertia पटिरूप:Math can carry without buckling:^[१५२] $${\displaystyle F=\frac{{\pi }^{2}EI}{L^2}.}$$

The field of fluid dynamics contains पटिरूप:Pi in Stokes' law, which approximates the frictional force पटिरूप:Math exerted on small, spherical objects of radius पटिरूप:Math, moving with velocity पटिरूप:Math in a fluid with dynamic viscosity पटिरूप:Math:^[१५३] $${\displaystyle F=6\pi \eta Rv.}$$

In electromagnetics, the vacuum permeability constant μ₀ appears in Maxwell's equations, which describe the properties of electric and magnetic fields and electromagnetic radiation. Before 20 May 2019, it was defined as exactly $${\displaystyle {\mu }_0=4\pi \times 10^{-7}\text{ H/m}\approx 1.2566370614\dots \times 10^{-6}{\text{ N/A}}^2.}$$

पटिरूप:Main Piphilology is the practice of memorizing large numbers of digits of पटिरूप:Pi,^[१५४] and world-records are kept by the Guinness World Records. The record for memorizing digits of पटिरूप:Pi, certified by Guinness World Records, is 70,000 digits, recited in India by Rajveer Meena in 9 hours and 27 minutes on 21 March 2015.^[१५५] In 2006, Akira Haraguchi, a retired Japanese engineer, claimed to have recited 100,000 decimal places, but the claim was not verified by Guinness World Records.^[१५६]

One common technique is to memorize a story or poem in which the word lengths represent the digits of पटिरूप:Pi: The first word has three letters, the second word has one, the third has four, the fourth has one, the fifth has five, and so on. Such memorization aids are called mnemonics. An early example of a mnemonic for pi, originally devised by English scientist James Jeans, is "How I want a drink, alcoholic of course, after the heavy lectures involving quantum mechanics."^[१५४] When a poem is used, it is sometimes referred to as a piem.^[१५७] Poems for memorizing पटिरूप:Pi have been composed in several languages in addition to English.^[१५४] Record-setting पटिरूप:Pi memorizers typically do not rely on poems, but instead use methods such as remembering number patterns and the method of loci.^[१५८]

A few authors have used the digits of पटिरूप:Pi to establish a new form of constrained writing, where the word lengths are required to represent the digits of पटिरूप:Pi. The Cadaeic Cadenza contains the first 3835 digits of पटिरूप:Pi in this manner,^[१५९] and the full-length book Not a Wake contains 10,000 words, each representing one digit of पटिरूप:Pi.^[१६०]

Perhaps because of the simplicity of its definition and its ubiquitous presence in formulae, पटिरूप:Pi has been represented in popular culture more than other mathematical constructs.^[१६१]

In the Palais de la Découverte (a science museum in Paris) there is a circular room known as the pi room. On its wall are inscribed 707 digits of पटिरूप:Pi. The digits are large wooden characters attached to the dome-like ceiling. The digits were based on an 1873 calculation by English mathematician William Shanks, which included an error beginning at the 528th digit. The error was detected in 1946 and corrected in 1949.^[१६२]

In Carl Sagan's 1985 novel Contact it is suggested that the creator of the universe buried a message deep within the digits of पटिरूप:Pi. This part of the story was omitted from the film adaptation of the novel.^{[१६३][१६४]} The digits of पटिरूप:Pi have also been incorporated into the lyrics of the song "Pi" from the 2005 album Aerial by Kate Bush.^[१६५] In the 1967 Star Trek episode "Wolf in the Fold", an out-of-control computer is contained by being instructed to "Compute to the last digit the value of पटिरूप:Pi".^[३२]

In the United States, Pi Day falls on 14 March (written 3/14 in the US style), and is popular among students.^[३२] पटिरूप:Pi and its digital representation are often used by self-described "math geeks" for inside jokes among mathematically and technologically minded groups. A college cheer variously attributed to the Massachusetts Institute of Technology or the Rensselaer Polytechnic Institute includes "3.14159".^{[१६६][१६७]} Pi Day in 2015 was particularly significant because the date and time 3/14/15 9:26:53 reflected many more digits of pi.^{[१६८][१६९]} In parts of the world where dates are commonly noted in day/month/year format, 22 July represents "Pi Approximation Day", as 22/7 = 3.142857.^[१७०]

पटिरूप:Anchor Some have proposed replacing पटिरूप:Pi by [[Tau (mathematical constant)|पटिरूप:Math]],^[१७१] arguing that पटिरूप:Mvar, as the number of radians in one turn or the ratio of a circle's circumference to its radius, is more natural than पटिरूप:Pi and simplifies many formulae.^{[१७२][१७३]} This use of पटिरूप:Math has not made its way into mainstream mathematics,^[१७४] but since 2010 this has led to people celebrating Two Pi Day or Tau Day on June 28.^[१७५]

In 1897, an amateur mathematician attempted to persuade the Indiana legislature to pass the Indiana Pi Bill, which described a method to square the circle and contained text that implied various incorrect values for पटिरूप:Pi, including 3.2. The bill is notorious as an attempt to establish a value of mathematical constant by legislative fiat. The bill was passed by the Indiana House of Representatives, but rejected by the Senate, and thus it did not become a law.^[१७६]

In contemporary internet culture, individuals and organizations frequently pay homage to the number पटिरूप:Pi. For instance, the computer scientist Donald Knuth let the version numbers of his program TeX approach पटिरूप:Pi. The versions are 3, 3.1, 3.14, and so forth.^[१७७]

Many programming languages include पटिरूप:Pi for use in programs. Similarly, पटिरूप:Mvar has been added to several programming languages as a predefined constant.^{[१७८][१७९]}

• [[Approximations of π|Approximations of पटिरूप:Pi]]
• [[Chronology of computation of π|Chronology of computation of पटिरूप:Pi]]
• List of mathematical constants

पटिरूप:Notelist

पटिरूप:Reflist

पटिरूप:Refbegin

• पटिरूप:Cite book
• पटिरूप:Cite book
• पटिरूप:Cite book English translation by Catriona and David Lischka.
• पटिरूप:Cite book
• पटिरूप:Cite book
• पटिरूप:Cite book
• पटिरूप:Cite book
• पटिरूप:Wikicite
• पटिरूप:Cite book
• पटिरूप:Cite book

पटिरूप:Refend

पटिरूप:Refbegin

• पटिरूप:Cite book
• पटिरूप:Cite book

पटिरूप:Refend

पटिरूप:Commons category

• पटिरूप:Mathworld
• Demonstration by Lambert (1761) of irrationality of पटिरूप:Pi, online पटिरूप:Webarchive and analysed BibNum पटिरूप:Webarchive (PDF).
• [१]पटिरूप:Pi Search Engine 2 billion searchable digits of पटिरूप:Pi, पटिरूप:Mvar and पटिरूप:Radic
• approximation von π by lattice points and approximation of π with rectangles and trapezoids (interactive illustrations)

पटिरूप:Irrational number पटिरूप:Authority control

All digits of pi are 3.1415926535897932384626433832795028841971693993751051209749445923078164062862089986280348253421170679821480865132823066470930844609550582231725352841027019385211055596446229489549303819