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Daniel
Mansfield holds the 3700-year-old Babylonian tablet that he and
colleagues used to make their case. UNSW/ANDREW KELLY
This
ancient Babylonian tablet may contain the first evidence of trigonometry
By Ron Cowen
Aug. 24, 2017 , 2:00 PM
Trigonometry, the study of the lengths and
angles of triangles,
sends most modern high schoolers scurrying to their cellphones to look up angles, sines, and cosines. Now, a fresh look at a 3700-year-old clay tablet suggests that
Babylonian mathematicians not only developed the first trig table, beating the Greeks to the punch by more than 1000 years, but that they also figured out an entirely new way to look at the subject.
However, other experts on the clay
tablet, known as Plimpton 322 (P322), say the new work is speculative at best.
Consisting of four columns and 15 rows of numbers inscribed in cuneiform,
the famous P322 tablet was discovered in the early 1900s in what is now southern Iraq
by archaeologist, antiquities dealer, and diplomat Edgar Banks, the inspiration
for the fictional character Indiana Jones.
Now stored at Columbia University, the tablet first garnered attention in the 1940s,
when historians recognized that its cuneiform inscriptions contain a
series of numbers echoing the Pythagorean theorem,
***
In
mathematics, the Pythagorean theorem, or Pythagoras's theorem, is a fundamental
relation in Euclidean geometry among the three sides of a right triangle.
It
states that the area of the square whose side is the hypotenuse (the side
opposite the right angle) is equal to the sum of the areas of the squares on
the other two sides.
This
theorem can be written as an equation relating the lengths of the sides a, b
and c, often called the Pythagorean equation:[1]
{\displaystyle
a^{2}+b^{2}=c^{2},}a^{2}+b^{2}=c^{2},
where c represents the length of the hypotenuse and a and b the lengths of the triangle's other two sides.
The theorem, whose history is the subject of
much debate, is named for the Greek thinker Pythagoras,
born
around 570 BC.
***
which
explains the relationship of the lengths of the sides of a right triangle. (The
theorem: The square of the hypotenuse equals the sum of the square of the other
two sides.) But why ancient scribes generated and sorted these numbers in the
first place has been debated for decades.
The
cuneiform inscriptions on Plimpton 322 suggest the Babylonians used a form of
trigonometry based on the ratios of the sides of a triangle, rather than the
more familiar angles, sines, and cosines. UNSW/ANDREW KELLY
Mathematician Daniel Mansfield of the University of New South Wales (UNSW) in Sydney was developing a course for high school math teachers in Australia when he came across an image of P322. Intrigued, he teamed up with UNSW mathematician Norman Wildberger to study it. “It took me 2 years of looking at this [tablet] and saying ‘I’m sure it’s trig, I’m sure it’s trig, but how?’”
Mansfield says. The
familiar sines, cosines, and angles used by Greek astronomers and modern-day
high schoolers were completely missing. Instead, each entry includes
information on two sides of a right triangle: the ratio of the short side to
the long side and the ratio of the short side to the diagonal, or hypotenuse.
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Mansfield realized that the information he needed was in missing pieces of P322 that had been reconstructed by other researchers. “Those two ratios from the reconstruction really made P322 into a clean and easy-to-use trigonometric table,” he says. He and Wildberger concluded that the Babylonians expressed trigonometry in terms of exact ratios of the lengths of the sides of right triangles, rather than by angles, using their base 60 form of mathematics, they report today in Historia Mathematica.
“This is a whole different way of
looking at trigonometry,” Mansfield says. “We prefer sines and cosines
… but we have to really get outside our own culture to see from their
perspective to be able to understand it.”
If the new interpretation is right, P322 would not only contain the earliest evidence of trigonometry, but it would also represent an exact form of the mathematical discipline, rather than the approximations that estimated
numerical values for sines and cosines provide, notes Mathieu
Ossendrijver, a historian of ancient science at Humboldt University in Berlin.
The
table, he says, contains exact values of the sides for a range of right
triangles. That means that—as for modern trigonometric tables—someone using the
known ratio of two sides can use information in the tablet to find the ratios
of the two other sides.
What’s
still lacking is proof that the Babylonians did in fact use this table, or
others like it, for solving problems in the manner suggested in the new paper,
Ossendrijver says.
And science historian Jöran Friberg, retired from the Chalmers University of Technology in Sweden,
blasts the idea. The Babylonians “knew NOTHING about ratios of sides!”
he wrote in an email to Science.
He maintains that P322 is “a table of parameters needed for the composition of school texts and, [only] incidentally, a table of right triangles with whole numbers as sides.”
But Mansfield and Wildberger contend that the
Babylonians, expert surveyors, could have used their tables to construct palaces,
temples, and canals.
Mathematical historian Christine Proust of the French National Center for Scientific Research in Paris, an expert on the tablet,
calls the team’s hypothesis “a
very seductive idea.” But she points out that no known Babylonian texts
suggest that the tablet was used to solve or understand right triangles.
The
hypothesis is “mathematically robust, but for the time being, it is highly
speculative,” she says. A thorough search of other Babylonian mathematical
tablets may yet prove their hypothesis, Ossendrijver says. “But that is really
an open question at the moment.”
Posted
in: ArchaeologyAsiaMath
doi:10.1126/science.aap7690
Ron
Cowen
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