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Mathematician reveals world’s oldest example of applied geometry

Date:
August 4, 2021
Source:
University of New South Wales
Summary:
A scientist has revealed that an ancient clay tablet could be the oldest and most complete example of applied geometry. The surveyor's field plan from the Old Babylon period shows that ancient mathematics was more advanced than previously thought.
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A UNSW mathematician has revealed the origins of applied geometry on a 3700-year-old clay tablet that has been hiding in plain sight in a museum in Istanbul for over a century.

The tablet -- known as Si.427 -- was discovered in the late 19th century in what is now central Iraq, but its significance was unknown until the UNSW scientist's detective work was revealed today.

Most excitingly, Si.427 is thought to be the oldest known example of applied geometry -- and in the study released today in Foundations of Science, the research also reveals a compelling human story of land surveying.

"Si.427 dates from the Old Babylonian (OB) period -- 1900 to 1600 BCE," says lead researcher Dr Daniel Mansfield from UNSW Science's School of Mathematics and Statistics.

"It's the only known example of a cadastral document from the OB period, which is a plan used by surveyors define land boundaries. In this case, it tells us legal and geometric details about a field that's split after some of it was sold off."

This is a significant object because the surveyor uses what are now known as "Pythagorean triples" to make accurate right angles.

"The discovery and analysis of the tablet have important implications for the history of mathematics," Dr Mansfield says. "For instance, this is over a thousand years before Pythagoras was born."

Hot on the heels of another world-first find

In 2017, Dr Mansfield conjectured that another fascinating artefact from the same period, known as Plimpton 322, was a unique kind of trigonometric table.

"It is generally accepted that trigonometry -- the branch of maths that is concerned with the study of triangles -- was developed by the ancient Greeks studying the night sky in the second century BCE," says Dr Mansfield.

"But the Babylonians developed their own alternative 'proto-trigonometry' to solve problems related to measuring the ground, not the sky."

The tablet revealed today is thought to have existed even before Plimpton 322 -- in fact, surveying problems likely inspired Plimpton 322.

"There is a whole zoo of right triangles with different shapes. But only a very small handful can be used by Babylonian surveyors. Plimpton 322 is a systematic study of this zoo to discover the useful shapes," says Dr Mansfield.

Tablet purpose revealed: surveying land

Back in 2017, the team speculated about the purpose of the Plimpton 322, hypothesizing that it was likely to have had some practical purpose, possibly used to construct palaces and temples, build canals or survey fields.

"With this new tablet, we can actually see for the first time why they were interested in geometry: to lay down precise land boundaries," Dr Mansfield says.

"This is from a period where land is starting to become private -- people started thinking about land in terms of 'my land and your land', wanting to establish a proper boundary to have positive neighbourly relationships. And this is what this tablet immediately says. It's a field being split, and new boundaries are made."

There are even clues hidden on other tablets from that time period about the stories behind these boundaries.

"Another tablet refers to a dispute between Sin-bel-apli -- a prominent individual mentioned on many tablets including Si.427 -- and a wealthy female landowner," Dr Mansfield says.

"The dispute is over valuable date palms on the border between their two properties. The local administrator agrees to send out a surveyor to resolve the dispute. It is easy to see how accuracy was important in resolving disputes between such powerful individuals."

Dr Mansfield says the way these boundaries are made reveals real geometric understanding.

"Nobody expected that the Babylonians were using Pythagorean triples in this way," Dr Mansfield says. "It is more akin to pure mathematics, inspired by the practical problems of the time."

Creating right angles -- easier said than done

One simple way to make an accurate right angle is to make a rectangle with sides 3 and 4, and diagonal 5. These special numbers form the 3-4-5 "Pythagorean triple" and a rectangle with these measurements has mathematically perfect right angles. This is important to ancient surveyors and still used today.

"The ancient surveyors who made Si.427 did something even better: they used a variety of different Pythagorean triples, both as rectangles and right triangles, to construct accurate right angles," Dr Mansfield says.

However, it is difficult to work with prime numbers bigger than 5 in the base 60 Babylonian number system.

"This raises a very particular issue -- their unique base 60 number system means that only some Pythagorean shapes can be used," Dr Mansfield says.

"It seems that the author of Plimpton 322 went through all these Pythagorean shapes to find these useful ones.

"This deep and highly numerical understanding of the practical use of rectangles earns the name 'proto-trigonometry' but it is completely different to our modern trigonometry involving sin, cos, and tan."

Hunting down Si.427

Dr Mansfield first learned about Si.427 when reading about it in excavation records -- the tablet was dug up during the Sippar expedition of 1894, in what's the Baghdad province in Iraq today.

"It was a real challenge to trace the tablet from these records and physically find it -- the report said that the tablet had gone to the Imperial Museum of Constantinople, a place that obviously doesn't exist anymore.

"Using that piece of information, I went on a quest to track it down, speaking to many people at Turkish government ministries and museums, until one day in mid 2018 a photo of Si.427 finally landed in my inbox.

"That's when I learned that it was actually on display at the museum. Even after locating the object it still took months to fully understand just how significant it is, and so it's really satisfying to finally be able to share that story."

Next, Dr Mansfield hopes to find what other applications the Babylonians had for their proto-trigonometry.

There's just one mystery left that Dr Mansfield hasn't unlocked: on the back of the tablet, at the very bottom, it lists the sexagesimal number '25:29' in big font -- think of it as 25 minutes and 29 seconds.

"I can't figure out what these numbers mean -- it's an absolute enigma. I'm keen to discuss any leads with historians or mathematicians who might have a hunch as to what these numbers trying to tell us!"


Story Source:

Materials provided by University of New South Wales. Original written by Isabelle Dubach. Note: Content may be edited for style and length.


Journal Reference:

  1. Daniel F. Mansfield. Plimpton 322: A Study of Rectangles. Foundations of Science, 2021; DOI: 10.1007/s10699-021-09806-0

Cite This Page:

University of New South Wales. "Mathematician reveals world’s oldest example of applied geometry." ScienceDaily. ScienceDaily, 4 August 2021. <www.sciencedaily.com/releases/2021/08/210804123503.htm>.
University of New South Wales. (2021, August 4). Mathematician reveals world’s oldest example of applied geometry. ScienceDaily. Retrieved October 31, 2024 from www.sciencedaily.com/releases/2021/08/210804123503.htm
University of New South Wales. "Mathematician reveals world’s oldest example of applied geometry." ScienceDaily. www.sciencedaily.com/releases/2021/08/210804123503.htm (accessed October 31, 2024).

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