The quest to push the upper boundary of pi helps scientists test supercomputers and develop algorithms that can be used in advanced data analysis. The previous record of 50 trillion digits was set by Timothy Mullican from the US, who achieved the feat after eight months of processing in January 2020. The number π (pi) is a constant in mathematics that is roughly equal to 3.14159, and is the ratio of a circle's circumference to its diameter. Researchers haven't revealed the exact numbers involved in the extra 12.8 trillion digits, as they are waiting on the Guinness Book of Records to certify their achievement, but say the final 10 digits they discovered are '7817924262'.
The previous record was calculated to 50 trillion figures, and was set in 2020, said experts from Graubuenden University of Applied Sciences in Chur, Switzerland. Collection of the Musée d’Art Roger-Quilliot Museum, City of Clermont-Ferrand, France.Pi has been calculated to an astonishing 62.8 trillion figures by a team of Swiss scientists who spent 108 days working it up - 3.5 times as fast as the previous record. Shown: Thomas Degeorge (1786–1854), The Death of Archimedes (detail), 1815. You can try it yourself at the Exploratorium's Pi Toss exhibit.
Introduced by William Jones in 1706, use of the symbol was popularized by Leonhard Euler, who adopted it in 1737.Īn eighteenth-century French mathematician named Georges Buffon devised a way to calculate π based on probability. Mathematicians began using the Greek letter π in the 1700s. To compute this accuracy for π, he must have started with an inscribed regular 24,576-gon and performed lengthy calculations involving hundreds of square roots carried out to 9 decimal places. He calculated the value of the ratio of the circumference of a circle to its diameter to be 355/113. Zu Chongzhi would not have been familiar with Archimedes’ method-but because his book has been lost, little is known of his work. In this way, Archimedes showed that π is between 3 1/7 and 3 10/71.Ī similar approach was used by Zu Chongzhi (429–501), a brilliant Chinese mathematician and astronomer. Archimedes knew that he had not found the value of π but only an approximation within those limits. Since the actual area of the circle lies between the areas of the inscribed and circumscribed polygons, the areas of the polygons gave upper and lower bounds for the area of the circle. Archimedes approximated the area of a circle by using the Pythagorean Theorem to find the areas of two regular polygons: the polygon inscribed within the circle and the polygon within which the circle was circumscribed. The first calculation of π was done by Archimedes of Syracuse (287–212 BC), one of the greatest mathematicians of the ancient world. The Egyptians calculated the area of a circle by a formula that gave the approximate value of 3.1605 for π.
The Rhind Papyrus (ca.1650 BC) gives us insight into the mathematics of ancient Egypt. 1900–1680 BC) indicates a value of 3.125 for π, which is a closer approximation. The ancient Babylonians calculated the area of a circle by taking 3 times the square of its radius, which gave a value of pi = 3. Pi ( π) has been known for almost 4000 years-but even if we calculated the number of seconds in those 4000 years and calculated π to that number of places, we would still only be approximating its actual value.