Trigonometry

Talmudology Redux - Readers Suggest How Rabban Gamliel Did It…

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The Story So Far…

Last time on Talmudology we discussed the mysterious tube that Rabban Gamliel used to estimate the distance of his ship from the shore, described on Eruvin 43b. The tube was likely some kind of protractor which measured the angles between two objects. But how this enabled the calculation of distance was not explained, and trigonometry had not yet been invented. We concluded that it was a mystery.

And so the question of how Rabban Gamliel calculated the distance to the shore on that eve of Shabbat must remain a mystery.

Talmudology Readers to the Rescue

But Talmudology readers don’t like to leave things a mystery. Several wrote in with various solutions, and with their permission we are sharing them with you.

Jeffrey Lubin suggested that the answer might be something to do with making some markings on the glass at the end of the tube (assuming of course that it did indeed contain glass).

If he was familiar with the height of the towers (per the Yerushalmi); Is it possible that he was able to place upper and lower markings (with grease or etches or something else) on the glass at the end of his tube, and if the entire towers fell within those markings he was still too far out and once the towers reached the full distance between the markings he knew he was within 2000 amot?

This same device could be useful if he was on land or on sea and since he knew the heights of the towers, he had likely been to the area before. Perhaps he traveled there regularly. It’s easier than measuring angles and doing complex mathematical calculations in the moments before shabbat came in. (He may even have had multiple Glass attachments for different ports - with the markings in different places on the glass)

Another suggestion was made by Ori Pomorantz:

He [Rabban Gamliel] didn't need a general solution to measure distances. He just needed to know whether the distance is above or below 2000 cubits. On a weekday he could have gone 2000 cubits from the tower and measured the angle the tower appeared to be. Then, Friday afternoon, he could have checked against that particular angle. If the tower appears as a bigger angle, they're within Tchum Shabbat. If it appears smaller, they aren't. 

Shalom Kelman suggested that the key lies with similar triangles.

The ancients were certainly familiar with this area of mathematics. They might not have had tangent tables but using proportions would have been sufficient for the task at hand. See the Hebrew Art Scroll for a worked-out example. So if Rabban Gamliel could measure an angle from his sextant to a tower of known height, the calculation should be straight forward. 

Here is the original note to which Shalom referred in the ArtScroll Hebrew Talmud, together with a free translation. It too relies on a prior measurement of 2,000 amot and securing the tube and the angle subtended when viewing that precise distance.

Hebrew%2BArtscroll%2Bexplanation.jpg

We are discussing a tube attached to the top of a pillar, which is pointing downwards and aligned so that a person looking through it will see a distance of 2,000 amot. This distance is [previously] determined by placing the pillar on flat terrain, measuring out 2,000 amot, and placing an object at that distance. Then the observer points the tube down towards the object until it can be seen through the tube.

With the tube at that angle, a triangle is formed between the pillar, the ground and the hypotenuse, which is the line of sight from the tube to the ground. Then the distance from the base of the pillar to where the line of sight meets the ground must be 2,000 amot. When a person looks through the tube his line of sight is along the hypotenuse and where it meets the ground must be a distance of 2,000 amot from where he is standing, which is the limit of where he may walk on Shabbat.

Marvin Littman, another Talmudology reader, seems to have a very good memory. He sent us a paper published in the American Journal of Ophthalmology, which he chanced upon when he was in a university library “some time in the 1970s.” The paper, A Telemeter without Refractive Optics came from the Vision Research Laboratory at Hadassah University Hospital. It is based on “nonconcentric overlapping monocular fields”, and the author claims that Rabban Gamliel’s tube used this method to measure distances, making it “the earliest telemeter in the world.” Here is the brief paper, for your delight and consideration:

Am J Ophthalmology on Gamliel's tube.jpg

And finally, Avi Grossman wrote to inform us that “even without the fancy calculations and knowledge of tangents, anyone can calculate the distance using some drawn-to-scale sketches and a given angle and length.”

Avi referred us to the American cartoonist Carl Barks (1901-2000), who created and drew the first Donald Duck stories. In one of these stories, Donald Duck, Huey, Dewey and Louie Duck, known as the Junior Woodchucks, face off against the all-female Chickadee Patrol. You can read the full story here, but the bit that suggests an answer to how Rabban Gamliel calculated his distance from the shore is reproduced below:

ChickadeeChallenge 1.jpg
ChickadeeChallenge+2.jpg

In the end, the Woodchucks use a different method to build their bridge, and (spoiler alert) both teams tie. Might Rabban Gamliel have used a similar method to calculate his distance from the shore? And are there any other examples of a passage of Talmud being elucidated by a Donald Duck cartoon?

There are, to be sure problems with each method; for example, there is no suggestion in the Talmud that Rabban Gamliel had done any prior calculations, or even that he knew the geography of the port into which he sailed that Friday evening (although the Yerushalmi’s note the he knew the height of the towers might suggest a familiarity with the area). But the fact we received these different solutions is a testament to the Talmudology readership. And a reminder that the work of explaining the Talmud does not end with Rashi and the other famous commentaries. It is an ongoing process, and sometimes even involves cartoon ducks.

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Eruvin 43b ~ Rabban Gamliel's Trigonometry

Last time on Talmudology we tried to determine the nature of the special tube that Rabban Gamliel carried with him on a boat, and which allowed him to calculate its distance from the shore. Here is a recap:

עירובין מג, ב

פעם אחת לא נכנסו לנמל עד שחשיכה אמרו לו לרבן גמליאל מה אנו לירד? אמר להם מותרים אתם שכבר הייתי מסתכל והיינו בתוך התחום עד שלא חשיכה

Once a ship did not enter the port until after nightfall on Shabbat eve. The passengers asked Rabban Gamliel, “what is the halakha with regard to alighting from the boat at this time? [In other words, were we already within the city’s limit before Shabbat commenced?] 

He said to them: You are permitted to alight, as I was watching, and I observed that we were already within the city’s limit before nightfall. [The port is therefore within the area on which we may walk on Shabbat.]

Regardless of whether it was a telescope (unlikely) or a protractor of some kind (more likely, but still not certain), the question we will address today is how Rabban Gamliel used the instrument to determine his distance from the shore.

The Jerusalem Talmud Comes to the Rescue

There is nothing in the Babylonian Talmud that would suggest an answer. But the Jerusalem Talmud goes into a little more detail, and in so doing it provides us with an explanation:

תלמוד ירושלמי עירובין כח, ב

מצודות היו לו לרבן גמליאל שהיה משער בה עיניו במישר

Rabban Gamliel knew of the heights of some towers (along the coast) which he estimated with his eyes…

You can only use the trigonometry of a right-angled triangle if you know the length of one of the sides of the triangle, and one of its angles. The Yerushalmi provides the key. Rabban Gamliel knew the height of the towers that he was observing (AB in the diagram below). Here is the explanation provided by W.M. Feldman in his classic work Rabbinical Mathematics and Astronomy, first published in London in 1931.

Triangle.jpg
Trigonometry.jpg

Did the Rabbis of the Talmud know their trigonometry?

So Rabban Gamliel could have used some high-school math to determine his distance from the shore, if he knew the height of the tower (AB) the angle (ACB), and the tan of that angle. So were sines, cosines and tangents known to the talmudic world?

I had no idea. But I asked a friend who is an Associate Professor of Writing and of Mathematics at The George Washington University in Washington DC. He pointed me to this book on the history of mathematics, and made the following observations.

Based on a quick perusal of Boyer's A History of Mathematics, the notions of trigonometric ratios were well known to Aristarchus (and hence, presumably, to Archimedes). Aristarchus was doing more complex calculations than for right-angled triangles; it seems likely that he understood the right-angle case, although I didn't see explicit mention of that.  Also, the Babylonians at the same time had active astronomical investigations going on, and were known to use ratios of sides of triangles in relation to angles.

However, no one had a notion of trigonometric function for more than 1800 years after that. Trigonometric ratios were just that - individual numerical ratios. This was one of the hang-ups that Newton and Leibnitz almost, but didn't quite, work through. Trigonometric results were known, but they weren't necessarily expressed, or interpreted, in the same way as we now do. So, Rabban Gamliel might not have been calculating tan(x), per se…

However, I think it's safe to say that if R"G did a calculation, it didn't look anything like what the book shows. First, there was no "tan" function. Second, fractions hadn't been invented. Third, decimal expansions hadn't been invented. Fourth, calculation of the tangent of that angle would have required a careful and explicit approximation process, and could not have been done so handily.

Which means that while Feldman’s math is correct, it wasn't the math used by Rabban Gamliel. And so the question of how Rabban Gamliel calculated the distance to the shore on that eve of Shabbat must remain a mystery.

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