# Viète's formula

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Viète's formula, as printed in Viète's Variorum de rebus mathematicis responsorum, liber VIII (1593)

In mathematics, Viète's formula is the following infinite product of nested radicals representing the mathematical constant π:

${\displaystyle {\frac {2}{\pi }}={\frac {\sqrt {2}}{2}}\cdot {\frac {\sqrt {2+{\sqrt {2}}}}{2}}\cdot {\frac {\sqrt {2+{\sqrt {2+{\sqrt {2}}}}}}{2}}\cdots }$

It is named after François Viète (1540–1603), who published it in 1593 in his work Variorum de rebus mathematicis responsorum, liber VIII.[1]

## Significance

At the time Viète published his formula, methods for approximating π to (in principle) arbitrary accuracy had long been known. Viète's own method can be interpreted as a variation of an idea of Archimedes of approximating the area of a circle by that of a many-sided polygon,[1] used by Archimedes to find the approximation

${\displaystyle {\frac {223}{71}}<\pi <{\frac {22}{7}}.}$

However, by publishing his method as a mathematical formula, Viète formulated the first instance of an infinite product known in mathematics,[2][3] and the first example of an explicit formula for the exact value of π.[4][5] As the first formula representing a number as the result of an infinite process rather than of a finite calculation, Viète's formula has been noted as the beginning of mathematical analysis[6] and even more broadly as "the dawn of modern mathematics".[7]

Using his formula, Viète calculated π to an accuracy of nine decimal digits.[8] However, this was not the most accurate approximation to π known at the time, as the Persian mathematician Jamshīd al-Kāshī had calculated π to an accuracy of nine sexagesimal digits and 16 decimal digits in 1424.[7] Not long after Viète published his formula, Ludolph van Ceulen used a closely related method to calculate 35 digits of π, which were published only after van Ceulen's death in 1610.[7]

## Interpretation and convergence

Viète's formula may be rewritten and understood as a limit expression

${\displaystyle \lim _{n\rightarrow \infty }\prod _{i=1}^{n}{\frac {a_{i}}{2}}={\frac {2}{\pi }}}$

where an = ‹The template Sqrt is being considered for merging.› 2 + an − 1, with initial condition a1 = ‹The template Sqrt is being considered for merging.› 2.[9] Viète did his work long before the concepts of limits and rigorous proofs of convergence were developed in mathematics; the first proof that this limit exists was not given until the work of Ferdinand Rudio in 1891.[1][10]

Comparison of the convergence of Viète's formula (×) and several historical infinite series for π. Sn is the approximation after taking n terms. Each subsequent subplot magnifies the shaded area horizontally by 10 times. (click for detail)

The rate of convergence of a limit governs the number of terms of the expression needed to achieve a given number of digits of accuracy. In the case of Viète's formula, there is a linear relation between the number of terms and the number of digits: the product of the first n terms in the limit gives an expression for π that is accurate to approximately 0.6n digits.[8][11] This convergence rate compares very favorably with the Wallis product, a later infinite product formula for π. Although Viète himself only used his formula to calculate π with nine-digit accuracy, an accelerated version of his formula has been used to calculate π to hundreds of thousands of digits.[8]

## Related formulas

Viète's formula may be obtained as a special case of a formula given more than a century later by Leonhard Euler. Euler discovered that:

${\displaystyle {\frac {\sin x}{x}}=\cos {\frac {x}{2}}\cdot \cos {\frac {x}{4}}\cdot \cos {\frac {x}{8}}\cdots }$

Substituting x = π/2, and expressing each term of the product as a function of earlier terms using the half-angle formula

${\displaystyle \cos {\frac {x}{2}}={\sqrt {\frac {1+\cos x}{2}}}}$

gives Viète's formula.[1]

It is also possible to derive from Viète's formula a related formula for π that still involves nested square roots of two, but uses only one multiplication:[12]

${\displaystyle \pi =\lim _{k\to \infty }2^{k}\underbrace {\sqrt {2-{\sqrt {2+{\sqrt {2+{\sqrt {2+{\sqrt {2+\cdots +{\sqrt {2}}}}}}}}}}}} _{k\ \mathrm {square} \ \mathrm {roots} }}$

By now many formulas similar to Viète's involving either nested radicals or infinite products of trigonometric functions are known for π, as well as for other constants such as the golden ratio.[12][13][14][15][16][17][18][19]

## Derivation

A sequence of regular polygons with numbers of sides equal to powers of two, inscribed in a circle. The ratios between areas or perimeters of consecutive polygons in the sequence give the terms of Viète's formula.

Viète obtained his formula by comparing the areas of regular polygons with 2n and 2n + 1 sides inscribed in a circle.[1][6] The first term in the product, ‹The template Sqrt is being considered for merging.› 2/2, is the ratio of areas of a square and an octagon, the second term is the ratio of areas of an octagon and a hexadecagon, etc. Thus, the product telescopes to give the ratio of areas of a square (the initial polygon in the sequence) to a circle (the limiting case of a 2n-gon). Alternatively, the terms in the product may be instead interpreted as ratios of perimeters of the same sequence of polygons, starting with the ratio of perimeters of a digon (the diameter of the circle, counted twice) and a square, the ratio of perimeters of a square and an octagon, etc.[20]

Another derivation is possible based on trigonometric identities and Euler's formula. By repeatedly applying the double-angle formula

${\displaystyle \sin x=2\sin {\frac {x}{2}}\cos {\frac {x}{2}},}$

one may prove by mathematical induction that, for all positive integers n,

${\displaystyle \sin x=2^{n}\sin {\frac {x}{2^{n}}}\left(\prod _{i=1}^{n}\cos {\frac {x}{2^{i}}}\right).}$

The term 2n sin x/2n goes to x in the limit as n goes to infinity, from which Euler's formula follows. Viète's formula may be obtained from this formula by the substitution x = π/2.[4]

## References

1. Beckmann, Petr (1971). A history of π (2nd ed.). Boulder, CO: The Golem Press. pp. 94–95. ISBN 978-0-88029-418-8. MR 0449960.
2. ^ De Smith, Michael J. (2006). Maths for the Mystified: An Exploration of the History of Mathematics and Its Relationship to Modern-day Science and Computing. Troubador Publishing Ltd. p. 165. ISBN 9781905237814.
3. ^ Moreno, Samuel G.; García-Caballero, Esther M. (2013). "On Viète-like formulas". Journal of Approximation Theory. 174: 90–112. MR 3090772. doi:10.1016/j.jat.2013.06.006.
4. ^ a b Morrison, Kent E. (1995). "Cosine products, Fourier transforms, and random sums". The American Mathematical Monthly. 102 (8): 716–724. MR 1357488. doi:10.2307/2974641.
5. ^ Oldham, Keith B.; Myland, Jan C.; Spanier, Jerome (2010). An Atlas of Functions: with Equator, the Atlas Function Calculator. Springer. p. 15. ISBN 9780387488073.
6. ^ a b Maor, Eli (2011). Trigonometric Delights. Princeton University Press. pp. 50, 140. ISBN 9781400842827.
7. ^ a b c Borwein, Jonathan M. (2013). "The Life of Pi: From Archimedes to ENIAC and Beyond". From Alexandria, Through Baghdad: Surveys and Studies in the Ancient Greek and Medieval Islamic Mathematical Sciences in Honor of J.L. Berggren (PDF). Springer. ISBN 9783642367359.
8. ^ a b c Kreminski, Rick (2008). "π to Thousands of Digits from Vieta's Formula". Mathematics Magazine. 81 (3): 201–207. JSTOR 27643107.
9. ^ Eymard, Pierre; Lafon, Jean Pierre (2004). "2.1 Viète's infinite product". The Number π. American Mathematical Society. pp. 44–46. ISBN 9780821832462.
10. ^ Rudio, F. (1891). "Über die Konvergenz einer von Vieta herrührenden eigentümlichen Produktentwicklung". Z. Math. Phys. 36: 139–140.
11. ^ Osler, T. J. (2007). "A simple geometric method of estimating the error in using Vieta's product for π". International Journal of Mathematical Education in Science and Technology. 38 (1): 136–142. doi:10.1080/00207390601002799.
12. ^ a b Servi, L. D. (2003). "Nested square roots of 2". The American Mathematical Monthly. 110 (4): 326–330. MR 1984573. doi:10.2307/3647881.
13. ^ Nyblom, M. A. (2012). "Some closed-form evaluations of infinite products involving nested radicals". The Rocky Mountain Journal of Mathematics. 42 (2): 751–758. MR 2915517. doi:10.1216/RMJ-2012-42-2-751.
14. ^ Moreno, Samuel G.; García-Caballero, Esther M. (2013). "On Viète-like formulas". Journal of Approximation Theory. 174: 90–112. MR 3090772. doi:10.1016/j.jat.2013.06.006.
15. ^ Levin, Aaron (2006). "A geometric interpretation of an infinite product for the lemniscate constant". American Mathematical Monthly. 113 (6): 510–520. MR 2231136. doi:10.2307/27641976.
16. ^ Levin, Aaron (2005). "A new class of infinite products generalizing Viète's product formula for π". Ramanujan Journal. 10 (3): 305–324. MR 2193382. doi:10.1007/s11139-005-4852-z.
17. ^ Osler, Thomas J. (2007). "Vieta-like products of nested radicals with Fibonacci and Lucas numbers". The Fibonacci Quarterly. 45 (3): 202–204. MR 2437033.
18. ^ Stolarsky, Kenneth B. (1980). "Mapping properties, growth, and uniqueness of Vieta (infinite cosine) products". Pacific Journal of Mathematics. 89 (1): 209–227. MR 596932. doi:10.2140/pjm.1980.89.209.
19. ^ Allen, Edward J. (1985). "Continued radicals". Mathematical Gazette. 69 (450): 261–263. JSTOR 3617569.
20. ^ Rummler, Hansklaus (1993). "Squaring the circle with holes". The American Mathematical Monthly. 100 (9): 858–860. MR 1247533. doi:10.2307/2324662.