List of formulae involving π

(Redirected from List of formula for pi)

The following is a list of significant formulae involving the mathematical constant π. Many of these formulae can be found in the article Pi, or the article Approximations of π.

Euclidean geometry

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where C is the circumference of a circle, d is the diameter, and r is the radius. More generally,

 

where L and w are, respectively, the perimeter and the width of any curve of constant width.

 

where A is the area of a circle. More generally,

 

where A is the area enclosed by an ellipse with semi-major axis a and semi-minor axis b.

 

where C is the circumference of an ellipse with semi-major axis a and semi-minor axis b and   are the arithmetic and geometric iterations of  , the arithmetic-geometric mean of a and b with the initial values   and  .

 

where A is the area between the witch of Agnesi and its asymptotic line; r is the radius of the defining circle.

 

where A is the area of a squircle with minor radius r,   is the gamma function.

 

where A is the area of an epicycloid with the smaller circle of radius r and the larger circle of radius kr ( ), assuming the initial point lies on the larger circle.

 

where A is the area of a rose with angular frequency k ( ) and amplitude a.

 

where L is the perimeter of the lemniscate of Bernoulli with focal distance c.

 

where V is the volume of a sphere and r is the radius.

 

where SA is the surface area of a sphere and r is the radius.

 

where H is the hypervolume of a 3-sphere and r is the radius.

 

where SV is the surface volume of a 3-sphere and r is the radius.

Regular convex polygons

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Sum S of internal angles of a regular convex polygon with n sides:

 

Area A of a regular convex polygon with n sides and side length s:

 

Inradius r of a regular convex polygon with n sides and side length s:

 

Circumradius R of a regular convex polygon with n sides and side length s:

 

Physics

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  • The cosmological constant:
     
  • Einstein's field equation of general relativity:
     
  • Coulomb's law for the electric force in vacuum:
     
  • Approximate period of a simple pendulum with small amplitude:
     
  • Exact period of a simple pendulum with amplitude   (  is the arithmetic–geometric mean):
     
  • Period of a spring-mass system with spring constant   and mass  :
     
  • The buckling formula:
     

A puzzle involving "colliding billiard balls":

 

is the number of collisions made (in ideal conditions, perfectly elastic with no friction) by an object of mass m initially at rest between a fixed wall and another object of mass b2Nm, when struck by the other object.[1] (This gives the digits of π in base b up to N digits past the radix point.)

Formulae yielding π

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Integrals

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  (integrating two halves   to obtain the area of the unit circle)
 
 
 
 [2][note 2] (see also Cauchy distribution)
  (see Dirichlet integral)
  (see Gaussian integral).
  (when the path of integration winds once counterclockwise around 0. See also Cauchy's integral formula).
 [3]
  (see also Proof that 22/7 exceeds π).
 
 
  (where   is the arithmetic–geometric mean;[4] see also elliptic integral)

Note that with symmetric integrands  , formulas of the form   can also be translated to formulas  .

Efficient infinite series

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  (see also Double factorial)
 
 
  (see Chudnovsky algorithm)
  (see Srinivasa Ramanujan, Ramanujan–Sato series)

The following are efficient for calculating arbitrary binary digits of π:

 [5]
  (see Bailey–Borwein–Plouffe formula)
 
 

Plouffe's series for calculating arbitrary decimal digits of π:[6]

 

Other infinite series

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  (see also Basel problem and Riemann zeta function)
 
  , where B2n is a Bernoulli number.
 [7]
 
 
 
  (see Leibniz formula for pi)
  (Newton, Second Letter to Oldenburg, 1676)[8]
  (Madhava series)
 
 
 
 
 
 
 

In general,

 

where   is the  th Euler number.[9]

 
 
  (see Gregory coefficients)
  (where   is the rising factorial)[10]
  (Nilakantha series)
  (where   is the n-th Fibonacci number)
  (where   is the n-th Lucas number)
  (where   is the sum-of-divisors function)
    (where   is the number of prime factors of the form   of  )[11][12]
    (where   is the number of prime factors of the form   of  )[13]
 
 [14]

The last two formulas are special cases of

 

which generate infinitely many analogous formulas for   when  

Some formulas relating π and harmonic numbers are given here. Further infinite series involving π are:[15]

   
   
   
   
   
   
   
   
   
   
   
   
   
   
   
   
   

where   is the Pochhammer symbol for the rising factorial. See also Ramanujan–Sato series.

Machin-like formulae

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  (the original Machin's formula)
 
 
 
 

Infinite products

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  (Euler)

where the numerators are the odd primes; each denominator is the multiple of four nearest to the numerator.

 
  (see also Wallis product)
  (another form of Wallis product)

Viète's formula:

 

A double infinite product formula involving the Thue–Morse sequence:

 

where   and   is the Thue–Morse sequence (Tóth 2020).

Infinite product representation from a limit:

 [16]

Arctangent formulas

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where   such that  .

 

where   is the k-th Fibonacci number.

 

whenever   and  ,  ,   are positive real numbers (see List of trigonometric identities). A special case is

 

Complex functions

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  (Euler's identity)

The following equivalences are true for any complex  :

 
 [17]

Also

 

Suppose a lattice   is generated by two periods  . We define the quasi-periods of this lattice by   and   where   is the Weierstrass zeta function (  and   are in fact independent of  ). Then the periods and quasi-periods are related by the Legendre identity:

 
 [18]
  (Ramanujan,   is the lemniscate constant)[19]
 [18]
 
 
 

For more on the fourth identity, see Euler's continued fraction formula.

Iterative algorithms

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  (closely related to Viète's formula)
  (where   is the h+1-th entry of m-bit Gray code,  )[20]
  (quadratic convergence)[21]
  (cubic convergence)[22]
  (Archimedes' algorithm, see also harmonic mean and geometric mean)[23]

For more iterative algorithms, see the Gauss–Legendre algorithm and Borwein's algorithm.

Asymptotics

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  (asymptotic growth rate of the central binomial coefficients)
  (asymptotic growth rate of the Catalan numbers)
  (Stirling's approximation)
 
  (where   is Euler's totient function)
 

The symbol   means that the ratio of the left-hand side and the right-hand side tends to one as  .

The symbol   means that the difference between the left-hand side and the right-hand side tends to zero as  .

Hypergeometric inversions

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With   being the hypergeometric function:

 

where

 

and   is the sum of two squares function.

Similarly,

 

where

 

and   is a divisor function.

More formulas of this nature can be given, as explained by Ramanujan's theory of elliptic functions to alternative bases.

Perhaps the most notable hypergeometric inversions are the following two examples, involving the Ramanujan tau function   and the Fourier coefficients   of the J-invariant (OEISA000521):

 
 

where in both cases

 

Furthermore, by expanding the last expression as a power series in

 

and setting  , we obtain a rapidly convergent series for  :[note 3]

 

Miscellaneous

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  (Euler's reflection formula, see Gamma function)
  (the functional equation of the Riemann zeta function)
 
  (where   is the Hurwitz zeta function and the derivative is taken with respect to the first variable)
  (see also Beta function)
  (where agm is the arithmetic–geometric mean)
  (where   and   are the Jacobi theta functions[24])
  (due to Gauss,[25]   is the lemniscate constant)
  (where   is the Gauss N-function)
  (where   is the principal value of the complex logarithm)[note 4]
  (where   is the remainder upon division of n by k)
  (summing a circle's area)
  (Riemann sum to evaluate the area of the unit circle)
  (by combining Stirling's approximation with Wallis product)
  (where   is the modular lambda function)[26][note 5]
  (where   and   are Ramanujan's class invariants)[27][note 6]

See also

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References

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Notes

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  1. ^ The relation   was valid until the 2019 revision of the SI.
  2. ^ (integral form of arctan over its entire domain, giving the period of tan)
  3. ^ The coefficients can be obtained by reversing the Puiseux series of
     
    at  .
  4. ^ The  th root with the smallest positive principal argument is chosen.
  5. ^ When  , this gives algebraic approximations to Gelfond's constant  .
  6. ^ When  , this gives algebraic approximations to Gelfond's constant  .

Other

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  1. ^ Galperin, G. (2003). "Playing pool with π (the number π from a billiard point of view)" (PDF). Regular and Chaotic Dynamics. 8 (4): 375–394. doi:10.1070/RD2003v008n04ABEH000252.
  2. ^ Rudin, Walter (1987). Real and Complex Analysis (Third ed.). McGraw-Hill Book Company. ISBN 0-07-100276-6. p. 4
  3. ^ A000796 – OEIS
  4. ^ Carson, B. C. (2010), "Elliptic Integrals", in Olver, Frank W. J.; Lozier, Daniel M.; Boisvert, Ronald F.; Clark, Charles W. (eds.), NIST Handbook of Mathematical Functions, Cambridge University Press, ISBN 978-0-521-19225-5, MR 2723248.
  5. ^ Arndt, Jörg; Haenel, Christoph (2001). π Unleashed. Springer-Verlag Berlin Heidelberg. ISBN 978-3-540-66572-4. page 126
  6. ^ Gourdon, Xavier. "Computation of the n-th decimal digit of π with low memory" (PDF). Numbers, constants and computation. p. 1.
  7. ^ Weisstein, Eric W. "Pi Formulas", MathWorld
  8. ^ Chrystal, G. (1900). Algebra, an Elementary Text-book: Part II. p. 335.
  9. ^ Eymard, Pierre; Lafon, Jean-Pierre (2004). The Number Pi. American Mathematical Society. ISBN 0-8218-3246-8. p. 112
  10. ^ Cooper, Shaun (2017). Ramanujan's Theta Functions (First ed.). Springer. ISBN 978-3-319-56171-4. (page 647)
  11. ^ Euler, Leonhard (1748). Introductio in analysin infinitorum (in Latin). Vol. 1. p. 245
  12. ^ Carl B. Boyer, A History of Mathematics, Chapter 21., pp. 488–489
  13. ^ Euler, Leonhard (1748). Introductio in analysin infinitorum (in Latin). Vol. 1. p. 244
  14. ^ Wästlund, Johan. "Summing inverse squares by euclidean geometry" (PDF). The paper gives the formula with a minus sign instead, but these results are equivalent.
  15. ^ Simon Plouffe / David Bailey. "The world of Pi". Pi314.net. Retrieved 2011-01-29.
    "Collection of series for π". Numbers.computation.free.fr. Retrieved 2011-01-29.
  16. ^ A. G. Llorente, Shifting Constants Through Infinite Product Transformations, preprint, 2024.
  17. ^ Rudin, Walter (1987). Real and Complex Analysis (Third ed.). McGraw-Hill Book Company. ISBN 0-07-100276-6. p. 3
  18. ^ a b Loya, Paul (2017). Amazing and Aesthetic Aspects of Analysis. Springer. p. 589. ISBN 978-1-4939-6793-3.
  19. ^ Perron, Oskar (1957). Die Lehre von den Kettenbrüchen: Band II (in German) (Third ed.). B. G. Teubner. p. 36, eq. 24
  20. ^ Vellucci, Pierluigi; Bersani, Alberto Maria (2019-12-01). "$$\pi $$-Formulas and Gray code". Ricerche di Matematica. 68 (2): 551–569. arXiv:1606.09597. doi:10.1007/s11587-018-0426-4. ISSN 1827-3491. S2CID 119578297.
  21. ^ Abrarov, Sanjar M.; Siddiqui, Rehan; Jagpal, Rajinder K.; Quine, Brendan M. (2021-09-04). "Algorithmic Determination of a Large Integer in the Two-Term Machin-like Formula for π". Mathematics. 9 (17): 2162. arXiv:2107.01027. doi:10.3390/math9172162.
  22. ^ Arndt, Jörg; Haenel, Christoph (2001). π Unleashed. Springer-Verlag Berlin Heidelberg. ISBN 978-3-540-66572-4. page 49
  23. ^ Eymard, Pierre; Lafon, Jean-Pierre (2004). The Number Pi. American Mathematical Society. ISBN 0-8218-3246-8. p. 2
  24. ^ Borwein, Jonathan M.; Borwein, Peter B. (1987). Pi and the AGM: A Study in Analytic Number Theory and Computational Complexity (First ed.). Wiley-Interscience. ISBN 0-471-83138-7. page 225
  25. ^ Gilmore, Tomack. "The Arithmetic-Geometric Mean of Gauss" (PDF). Universität Wien. p. 13.
  26. ^ Borwein, J.; Borwein, P. (2000). "Ramanujan and Pi". Pi: A Source Book. Springer Link. pp. 588–595. doi:10.1007/978-1-4757-3240-5_62. ISBN 978-1-4757-3242-9.
  27. ^ Eymard, Pierre; Lafon, Jean-Pierre (2004). The Number Pi. American Mathematical Society. ISBN 0-8218-3246-8. p. 248

Further reading

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  • Borwein, Peter (2000). "The amazing number π" (PDF). Nieuw Archief voor Wiskunde. 5th series. 1 (3): 254–258. Zbl 1173.01300.
  • Kazuya Kato, Nobushige Kurokawa, Saito Takeshi: Number Theory 1: Fermat's Dream. American Mathematical Society, Providence 1993, ISBN 0-8218-0863-X.