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Rule of marteloio

From Wikipedia, the free encyclopedia
The tondo e quadro (circle and square) from Andrea Bianco's 1436 atlas

The rule of marteloio is a medieval technique of navigational computation that uses compass direction, distance and a simple trigonometric table known as the toleta de marteloio. The rule told mariners how to plot the traverse between two different navigation courses by means of resolving triangles with the help of the Toleta and basic arithmetic.

Those uncomfortable with manipulating numbers could resort to the visual tondo e quadro (circle-and-square) and achieve their answer with dividers. The rule of marteloio was commonly used by Mediterranean navigators during the 14th and 15th centuries, before the development of astronomical navigation.

Etymology

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The etymology comes from the Venetian language. In his 1436 atlas, Venetian captain and cartographer Andrea Bianco introduced a table of numbers which he called the toleta de marteloio ("table of marteloio"), and the method of using it as the raxon de marteloio ("reason of marteloio").

The meaning of marteloio itself is uncertain. The most widely accepted hypothesis, first forwarded by A.E. Nordenskiöld, is that marteloio relates to "hammer" ("martelo" in Venetian), referring to the small hammer that was used to hit the on-board ship's bell to mark the passage of time.[1] It has been suggested that the -oio suffix implies that marteloio meant not quite the hammer itself nor the hammerer, but rather "the hammering", intending to indicate "the hammering, the din, the racket" from the change of the watch every four hours. As there were many hands on deck during a change of the watch, it would be an opportune moment for the ship's pilot to order a change in bearing (if necessary).[2]

Alternative hypotheses (not nearly as accepted) are that "marteloio" is a corruption of mari logio (meaning "rule of the sea"),[3] or from mare tela (meaning "sea network"),[4] or that it derives from the Greek homartologium (όμαρτόλογίον, meaning "companion piece"),[5] or from the Greek imeralogium (ήμερόλογίον, meaning "daily calculation")[6] or that it might be from the northern French matelot, which in turn comes from Breton martolod (meaning "sailors").[7]

Purpose

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15th-century mariner consulting a compass aboard ship (from John Mandeville's Travels, 1403)

The "rule of marteloio" was used in European navigation in the Middle Ages, most notably in the Mediterranean Sea between the 14th and 16th centuries, although it may have older roots. It was an integral part of navigation by "compass and chart", before the advent of geographical coordinates and the development of celestial navigation in Europe.[8]

Medieval navigation relied on two parameters, direction and distance. On board ship, direction was determined by the mariner's compass (which emerged around 1300).[9] Distance was measured by dead reckoning, (i.e., distance = speed × time), where time was measured by a half-hour-glass, and speed readings were taken with by some form of a chip log (the archaic method, used in the 14th and 15th centuries, involved heaving a piece of wood or flotsam overboard; the crew engaged in a rhythmic chant to mark the time it took for the chip to float past the length of the ship).[10]

Anonymous Genoese portolan chart from c. 1325 to c. 1350. (Library of Congress, Washington DC)

Plotting a course required knowing the compass direction and distance between point A and point B. Knowledge of where ports lay relative to each other was acquired by navigators by long experience at sea. This information was sometimes collected and written down in a pilot's handbook, known as a portolano ("port book", in Italian, equivalent to the Greek periplus, the Portuguese roteiro and the English rutter). These handbooks were used to construct a class of nautical maps known as portolan charts. Portolan charts began being produced in Genoa in the late 13th century, and soon spread to Venice and Majorca. Portolan charts were not gridded by longitude and latitude lines, but rather by a web of compass rhumb lines, giving mariners an idea of only the distance and direction between places.

32-wind compass rose with traditional names (and traditional color code).

By a handbook or a portolan chart, a navigator could see immediately that, for example, Pisa lay 85 miles southeast ("Scirocco" in the traditional compass rose nomenclature) of Genoa, and so a ship that set out from Genoa to Pisa would simply maintain that bearing for that distance. However, most sailing courses were not nearly that neat. A mariner wishing to sail from Majorca to Naples could tell the latter was due east ("Levante") by some 600 miles – but the island of Sardinia lies in the way, therefore the ship's bearing must be changed along the route. This is easier said than done, as geographical coordinates did not exist during this era. The only way to determine the exact position of the ship at sea would be to calculate via past bearing and distance travelled.[11]

Islands were a predictable obstacle – circumventing Sardinia would be simply a matter of sailing southeast for a set distance then changing the bearing to northeast ("Greco") for the remainder. More problematic is if the ship were blown off its intended route by fitful winds, or had to engage in tacking, changing bearing repeatedly. How does it return to its intended course? This is where the rule of marteloio came in.

The traverse problem

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The rule of marteloio addressed the problem of changing bearing at sea. More specifically, it helped a navigator plot the traverse from one navigational course to another.[12] For example, suppose a ship was to sail from Corsica to Genoa, a course bearing straight north ("Tramontana") for some 130 miles. But the winds are not cooperative, and the ship was forced to sail northwest ("Maestro") for some 70 miles. How does it return to its original route? Re-setting its bearing to northeast ("Greco") seems sensible enough, but how long should it sail on that bearing? How would a navigator know when the ship had reached its old route and should turn north again? How to avoid overshooting or undershooting the old course?

The traverse problem: intended course AB (bearing N), actual course AC (bearing NW). Calculating the ritorno (distance on return course CD, bearing NE) and avanzo (distance made good on intended course) is a matter of solving the triangle ACD

This is a mathematical problem of solving a triangle. If a navigator knows how long the ship has sailed on the erroneous course, he can calculate its current distance from its intended course, and estimate how long it must sail back on a new bearing until it recovers its old course. In the Corsica-to-Genoa example, there is an implied triangle ACD, with one side given (AC = 70 miles on actual NW course), a 45° angle at A (angle of difference between actual course NW and intended course N) and another angle of 90° at C (angle of difference between actual course NW and return course NE). The challenge to the navigator is to find how long one must sail on the NE return course (the length of side CD, what is called the ritorno) and how far one has advanced on the intended course by the time one straightens out (the length of the hypotenuse AD, or what is called the total avanzo).

This is elementary trigonometry, solving for two sides given one side (70) and two angles (45° and 90°). This is quickly done by applying the law of sines:

yielding up the solutions ritorno = 70 miles and total avanzo = 98.99 miles. This means that if the ship bears NE from its current position (C), it will reach its original intended course after 70 miles of sailing on the NE bearing. By the time it reaches its junction point (D), it will have covered 98.99 miles of its original intended course. There it can straighten its bearing N and sail the remaining 30 miles or so to Genoa.

Unfortunately, Medieval sailors with the rudimentary educational levels of the 14th and 15th centuries, were not likely to know the Law of Sines or manipulate it with ease.[13] As a result, Medieval navigators needed simpler and more accessible method of calculation.

Rules

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Ramon Llull's "miliaria"

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The scholar-cleric Ramon Llull of Majorca, was the first writer to refer to a rule to solve the traverse problem of navigation. In his Arbor Scientiae (1295), in the section of questions on geometry, Llul writes:

How do mariners measure miles at sea (miliaria in mari)? Mariners consider the four general winds, that is to say the eastern, western, northern and southern, and also another four winds that lie between them, grec (NE), exaloch (SE), lebeg (SW) and maestre (NW). And they look carefully at the center of the circle in which the winds (rhumbs) meet at angles; they consider when a ship travels by the East wind (levant) 100 miles from the center, how many miles it would make on the southeast (exaloch) wind; and for 200 miles, they double the number by multiplying and then they know how many miles there are from the end of each 100 miles in an easterly direction to the corresponding point in a southeasterly direction. And for this they have this instrument [a mathematical table?] and a chart, rutter, needle and the pole star."[14]

What Llull seems to be trying to explain is that a ship actually sailing E, but intending to sail SE, it can figure out how much of its intended southeastward distance it has already made good – what Italians called the "avanzar", but Lull seems to call the "miliaria in mari". Llull does not explain exactly how, but refers only to an "instrument", presumably some sort of trigonometric table. Lull is implying that mariners can calculate the miliaria on the intended course by multiplying the distance actually sailed on the erroneous course by the cosine of the angle between the two routes.[15]

Ramon Lull's miliaria in mari, from his 1295 example.
Miliaria in mari = distance sailed × cos(θ)

where θ is the angle of difference between the two routes.

Using Lull's example, a ship that intended to sail southeast ("Exaloch" is Catalan for "Scirocco") but was instead forced to sail east ("Levant"), then the angle of difference is θ = 45°. After 100 miles on the erroneous route, the miliaria on the intended route is 100 × cos 45° = 70.71. Doubling the sailing on the erroneous route to 200 miles will double the miliaria on the intended route to 141.42 miles (= 200 cos 45°).

(Diagramatically, Lull's miliaria in mari is measured by constructing a right-angled triangle by running a cord from the distance sailed on the actual course to the intended course, meeting the latter at a 90° angle).

Llull is a little more explicit in his Ars magna generalis et ultima (written c. 1305).[16] Reversing his example, with a ship actually sailing Southeast but intending to sail East, Llull notes that for every four miles on the southeast bearing, it "gains three miles" (2.83 actually) on the intended eastward route. Thus, Lull notes, the ship "loses 25 miles" (29 actually) of its intended course for every 100 miles it sails on the current course.

Notice that in his passages, Ramon Lull is not recommending the rule, but reporting it, insinuating that this rule was already known and used by contemporary sailors in practice.[17] This is perhaps unsurprising – although trigonometry was only in its infancy in Christian Europe, sine and cosine tables were already known in Arab mathematics.[18] The Kingdom of Majorca, under Muslim rule until the 1230s, remained a multicultural center in Lull's time, with flourishing Jewish communities, many of whom dabbled in mathematics and astronomy, and whose seafarers had extensive contact across the Mediterranean Sea.[19] That Majorcan navigators had some sort of trigonometric table at hand is not improbable. Nonetheless, the exact content and layout of this table implied by Ramon Llull in 1295 is uncertain.

Andrea Bianco's "toleta"

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The toleta de marteloio from Andrea Bianco's 1436 atlas

We get our first glimpse of a mariner's trigonometric table more than a century after Llull. In the first folio of his 1436 portolan atlas, the Venetian captain Andrea Bianco explains the raxon de marteloio, how to calculate the traverse and recover the course. He lays out a simple trigonometric table he calls the toleta de marteloio and recommends that mariners commit the table to memory.[20]

The toleta de marteloio is set out as follows:[21]

Quarter
(Angle of deviation)
Alargar
(Distance from course)
Avanzar
(Advance on true course)
Quarter
(Angle of return)
Ritorno
(Return to course)
Avanzo di ritorno
(Advance during return)
1 20 98 1 51 50
2 38 92 2 26 24
3 55 83 3 18 15
4 71 71 4 14 10
5 83 55 5 12 6 12
6 92 38 6 11 4
7 98 20 7 1015 2 15
8 100 0 8 10 0
For every 100 miles For every 10 miles alargar

The numbers in the Toleta can be approximated by the modern formulas:[22]

  • Alargar = 100 × sin (q × 11.25)
  • Avanzar = 100 × cos (q × 11.25)
  • Ritorno = 10 / sin (q × 11.25)
  • Avanzo di ritorno = 10 / tan (q × 11.25)

where q = number of quarter winds (angle of difference expressed in number of quarter winds). The numbers work with quarter-winds set at 11.25° intervals, or 11°15', the usual definition of a quarter wind.

The Toleta is a simple table with several columns of numbers. In the first column is the angle of difference between the actual and intended courses, expressed by number of quarter-winds. Once that difference is determined, the second column gives the Alargar (the "Widening", the current distance the ship is from the intended course) while the third column tells the Avanzar (the "Advance", how much of the distance on the intended course has already been covered by sailing on the current bearing – this is equivalent of Ramon Llull's miliaria di mari). The Alargar and Avanzar numbers are shown on the Bianco's table for 100 miles of sailing on the current course.

Calculating alargar and avanzar from Bianco's Toleta.

Example: suppose a ship intended to sail bearing east ("Levante") from point A to point B. But suppose that winds forced it to sail on a southeast-by-east course (SEbE, "Quarto di Scirocco verso Levante"). Southeast-by-east is three quarter winds (or 33.75°) away from east (on a 32-point compass, in order of quarter-winds away from east, 1 quarter is east-by-south, 2 quarters is East-southeast, 3 quarters is southeast-by-east). That means that the navigator should consult the third row, q = 3, on the toleta.

Suppose the ship sailed 100 miles on the SE-by-E bearing. To check his distance from the intended eastward course, the mariner will read the corresponding entry on the alargar column and immediately see he is 55 miles away from the intended course. The avanzar column informs him that having sailed 100 miles on the current SEbE course, he has covered 83 miles of the intended E course.

The next step is to determine how to return to the intended course. Continuing the example, to get back to the intended Eastward course, our mariner has to re-orient the ship's bearing in a northeasterly direction. But there are various northeasterly angles – NbE, NNE, NE, ENE, etc. The mariner has a choose the bearing – if he returns by a sharp angle (e.g. North by east), he will return to the intended course faster than at a more gentle gradient (e.g. East by north). Whichever angle he chooses, he must deduce exactly how long he must sail on that bearing in order to reach his old course. If he sails too long, he risks overshooting it.

Calculating the ritorno and avanzo di ritorno

Calculating the return course is what the last three columns of the toleta are for. In the fourth column, the return angles are expressed as quarters from the intended course bearing (not the current course bearing). In our example, the mariner intended to go east, but has been sailing southeast-by-east for 100 miles. Given the winds, he decides it is best to return to the original course by re-orienting the ship east-northeast (ENE, "Greco-Levante"). ENE is two quarter-winds above the intended bearing, East, so now he looks at second row ("quarters = 2") on the fourth column of the table.

The fifth column is the ritorno, the distance he must travel on the chosen return angle to recover the original course. Given he has chosen to return by ENE bearing (q = 2), then he must read the second row of the ritorno column, which shows the number 26. This represents the required number of miles he must travel on ENE bearing for every 10 miles he deviated. Remember, his alargar (distance from intended course) was 55 miles. So in order to return to his intended course he must travel 5.5 × 26 = 143 miles on ENE. In other words, he needs to hold his ENE bearing for 143 miles; once that distance is traveled, he should straighten his ship east, and he will be exactly back on the intended course.

The sixth and final column (avanzo di ritorno) gives the length on the intended course he has made good by his return travel. This is also expressed in terms per 10 miles alargar. His alargar was 55, and his angle of return was ENE (thus q = 2), that means his avanzo di ritorno is 5.5 × 24 = 132. In other words, if everything goes right, and our mariner holds his ENE bearing for 143 miles (ritorno), then during that return, he will have covered an additional 132 miles on his intended eastward course (avanzo di ritorno).

Finally, to calculate the total distance made good (total avanzo) on the eastward bearing by his whole adventure, he must add the avanzar during the deviation (83 miles) plus the avanzo di ritorno (132 miles). Thus on the whole, he has covered 83 + 132 = 215 miles on the intended course. Measuring that distance on the map from the starting point (A), the mariner can figure out his exact current position.

This is the simplest use of the toleta de marteloio. It is, at root, a trigonometric table. However, it does not tackle the traverse problem in one go, like the Law of Sines, but rather splits the problem into two right-angled triangles which it proceeds to solve successively. Modern trigonometry would dispense with the step of calculating the alargar, and calculate the ritorno directly – but for that, one needs to be armed with a full sine table. The toleta is a rather simple table, easy to consult and perform calculations with, and sufficiently compact to be memorized by navigators (as Bianco recommends).

Rule of three

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The toleta de marteloio is expressed for nice round numbers, 100 and 10. But, in practice, a ship would not usually sail 100 miles before trying to return, but some other distance, say 65 miles. To calculate this is a simple problem of solving ratios. For example, if the ship had sailed 65 miles on southeast-by-east, then calculating the alargar from the intended Eastward course is simply a matter of solving the following for x:

where 55 is the alargar for 100 miles (as given in the second column of the table at q = 3). This is easily done by the simple "Rule of Three", a method of cross-multiplication, using three numbers to solve for the fourth by successive multiplication and division:

x = 65 × 55 ÷ 100

So, sailing for 65 miles on SE by E implies alargar = x = 35.75 miles. The avanzar, etc. can be figured out analogously.

While the "rule of three" was already known in the 14th century, skill in executing multiplication and division could be elusive for Medieval sailors drawn from what was a largely illiterate society. Nonetheless, it was not inaccessible. As Andrea Bianco urged, navigators should "know how to multiply well and divide well" ("saver ben moltiplichar e ben partir")[23] It is here where we see the important interface of commerce and navigation. The mathematics of commerce – Arabic numerals, multiplication, division, fractions, the tools needed to calculate purchases and sales of goods and other commercial transactions – was essentially the same as the mathematics of navigation.[24] And this kind of mathematics was taught at the abacus schools which were set up in the 13th century in the commercial centers of northern Italy to train the sons of merchants, the very same class where Italian navigators were drawn from. As historian E.G.R. Taylor notes, "sailors were the first professional group to use mathematics in their everyday work"[25]

Circle and square

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Reproduction of the basic features of the tondo e quadro

For those troubled by the high art of manipulating numbers, there was an alternative. This was the visual device known as the "circle and square" (tondo e quadro), also supplied by Andrea Bianco in his 1436 atlas.[26]

The circle was a 32-wind compass rose (or gathering of rhumb-lines). The circle was inscribed with an 8 × 8 square grid.

The compass rose in the center can be overlooked – indeed, the circle itself can be ignored, as it seems to have no other purpose than the construction of the rays that run across the grid.[27] The rose of interest is in the upper left corner of the square grid. From that corner, emanate a series of compass rhumb lines. In his original 1436 tondo e quadro, Bianco has sixteen emanating rays – that is, Bianco includes half-quarter winds, or eighth-winds (otava), so that the emanating rays are at intervals of 5.625 degrees. Other constructions of the circle-and-square, e.g. the Cornaro Atlas, use only eight rays emanating at quarter-wind distances (11.25 degrees). Visually, these rays replicate the bottom right quarter of a 32-wind compass rose: East (0q), E by S (1q), ESE (2q), SE by E (3q), SE (4q), SE by S (5q), SSE (6q), S by E (7q) and South (8q).

Reproduction of the bar scale of Bianco's tondo e quadro

Above the grid is a distance bar scale, notched with sub-units. There are two sets of numbers on the scale, one for measuring each grid square by 20 miles, another for measuring each grid square by 100 miles (see diagram).[28] The top bar is the 20m-per-square scale, with every black dot denoting one mile. The bottom bar is the 100m-per-square scale, where the length of a unit square is divided into two equal 50m sub-squares, and a set of dots and red lines break it down further into lengths of 10 miles. So depending on which scale one chooses, the length of the side of the entire grid (eight squares) could be measured up to 160 miles (using the 20 m-per-square scale) or up to 800 miles (using the 100m-per-square scale).

Detail of Bianco's tondo e quadro

The cherub with the dividers suggests how a navigator is supposed to use the grid to calculate alargar and avanzar by visual measurement rather than manipulating numbers.

Solving a triangle with the tondo e quadro

Example: suppose the ship has travelled 120 miles at two quarter-winds below the intended course (e.g. traveled at ESE, when the intended course is East). Using the dividers and the 20m scale, the navigator can measure out 120 miles with his dividers. Then setting one end at the top left corner (A), he lays out the dividers along the ESE ray (= two quarter-winds below the East ray, or horizontal top of the grid) and marks the spot (point B on the diagram). Then using a straightedge ruler draws a line up to the East ray, and marks the corresponding spot C.

It is easy to see immediately that a right-angled triangle ABC has been created. The length BC is the alargar (distance from intended course), which can be measured as 46 miles (this can be visually seen as two grid squares plus a bit, that is 20m + 20m and a little bit which can be assessed as 6m by using the dividers and the 20m bar scale). The length AC is the avanzar (distance made good), which is 111 miles – visually, five grid squares and a bit, or (20 × 5) + 11, measured by dividers and scale again.

This is how the "circle and square" dispenses manipulating numbers by multiplication and division or the rule of three. The navigator can assess the avanzar and alargar visually, by measurement alone.

This method can be used for any intended bearing and deviation, as the only purpose is to solve the triangle by dividers and scale. e.g. using our first Corsica-to-Genoa example, where intended bearing was North but the ship actually sailed Northwest, the navigator would set the dividers at length 70 miles and lay it along the fourth quarter wind (= SE ray in the tondo e quadro, as NW is four quarter winds away from North). He would calculate the alargar and avanzar in exactly the same way – draw a line to the horizontal top of the grid, measure the squares, etc.

The tondo e quadro device is very similar to the Arab sine quadrant (Rubul mujayyab), with the corner rays replicating the role of the adjustable plumb line.[29]

Other applications

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While the toleta de marteloio (and its visual counterpart, the tondo e quadro) are designed for the explicit task of recovering an intended course, they can be used in more ways, for many classes of navigational problems, e.g. plotting out a course with multiple-bearing changes, etc.[30]

Triangulation

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One of the interesting applications of the rule of marteloio is for triangulation, e.g. determining the distance of the ship from shore landmark. (This was the final exercise attempted in the notebook of the Venetian navigator Michael of Rhodes, which we replicate here.)[31]

Example: Suppose a ship sailing NW ("Maestro") spots a landmark due West ("Ponente") one evening, but distance unknown. Suppose the ship continues sailing on the NW route overnight, and the next morning, 40 miles later, it notices that landmark is now west-southwest (WSW, "Ponente-Libeccio") of its current position. Finding the distance of the landmark from the ship is just an application of the rule of marteloio.

Application of the rule of marteloio to estimate the distance between the ship and a shore landmark.

To solve the problem, start from the evening position (A on the map) and treat the distance between the ship and the landmark (length AB) as the intended course, and the actual route of the ship (NW) as a deviation. To figure out the distance of the landmark from the ship's position in the morning (C) is a matter of treating the distance BC as the calculated ritorno. Since we need to know the alargar to calculate the ritorno, this is a two-step procedure.

First, notice that NW is four quarter-winds above W, so looking up on the toleta, in the q = 4 row, the alargar is 71 miles for every 100 miles on the NW course. But the ship only sailed 40 miles overnight, so we have to solve the ratio 71/100 = x/40, which by the rule of three means x = alargar = 28.4 miles. In other words, by the overnight sailing NW by 40 miles from A to C, the ship is now 28.4 miles away from its "intended" Westward course.

Now for the ritorno. The landmark, as noted, is WSW of the ship's morning position (C). So to "return" to the landmark, the ship must change its bearing from its current NW bearing to a WSW bearing – that is, 6 quarter-winds below NW. However, the toleta specifies quarter winds in terms of "intended" direction (in this case, West), and WSW is two quarter winds below West, so we need to look at the q = 2 row. This means the ritorno is 26 miles for every 10 miles alargar. Since the alargar is 28.4, that means the ritorno is 26 × 2.84 = 73.84. And there we have it. The landmark is 73.84 miles away from the ship's morning position.

(To complete the story, we might wish to find out the distance that landmark was the evening before (i.e. from point A to landmark B). That is simply a matter of adding the avanzar and the avanzo in ritorno. Quick calculations show the avanzar (@ q = 4, for 40 miles) is 28.4 miles (= 71 × 40/100) and the avanzo di ritorno (@ q = 2 for 28.4 miles alargar), is 2.84 × 24 = 68.16. So total avanzo = 28.4 + 68.16 = 96.56 miles. That was the distance between the landmark and the ship the evening before.)

Finding locations

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The rule of marteloio can also be used with the avanzar as a target, e.g. suppose a ship sets out with the intention of finding the Tordesillas Line, the meridian legally set in a 1494 treaty at 370 leagues west of Cape Verde. The ship need not set out from Cape Verde and set sail constantly at West bearing to find it. Rather, it can sail out at a more convenient bearing (e.g. SW), and treat West as an "intended" course. So using the marteloio rule, it can sail on until the avanzar on the "intended" West course reaches 370 leagues.

Indeed, it need not even set out from Cape Verde, but can set out from another place, say, Seville, and use the known distance and bearing of Cape Verde (viz. Seville) and the rule of marteloio to calculate when it has finally reached the Tordesillas meridian. This takes a couple of steps. Suppose Cape Verde (B on map) is 400 leagues Southwest of Seville (A on map), but the ship intends to go straight West from Seville to reach the Tordesillas meridian in the open sea. How long does it need to sail?

Finding the Tordesillas Line via the rule of marteloio

The way to solve this by the rule of marteloio is to pose the problem in reverse: treat West as intended bearing and SW as the actual course. SW is four quarter-winds below W, so looking up the toleta for q = 4, the avanzar is 71 for every 100 miles sailed. So if a ship sailed 400 leagues on the "actual" SW course to Cape Verde, it would achieve an avanzar of 284 leagues (= 71 × 4) on the "intended" Westward course. Of course, the ship is not actually sailing SW to Cape Verde, but sailing W into the open sea. In other words, when the ship sets sail West from Seville, it knows it needs to sail 284 leagues on the West bearing before it reaches the implied Cape Verde meridian (point C on map), and should only start counting the 370 leagues to the Tordesillas line thereafter. In other words, it needs to sail a total of 284 + 370 = 654 leagues West of Seville to reach the Tordesillas line (point D on map).

While this particular example shows the flexibility of the rule of marteloio, it also shows one of its principal drawbacks: the result completely ignores the curvature of the Earth, i.e. the fact that the longitude meridian lines converge on the North Pole, and thus narrow at higher latitudes. Contrary to what the marteloio suggests, 370 leagues West of Cape Verde is not on the same longitude meridian as 654 leagues West of Seville. Because Seville is well north of Cape Verde, the meridians are clustered closer together at Seville's latitude than at Cape Verde's latitude. A ship sailing west of Seville will, in fact, reach the real Tordesillas meridian (point T on map) well before 654 leagues are sailed (point D).

The rule of marteloio has sailors plot routes by drawing plane triangles on a chart, as if the world's surface were flat. While this might be practical enough for sailing confined to the compact latitudes of the Mediterranean Sea, it is quite misleading on a grander scale.

Relation to later rules

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Relation to the "regiment of the leagues"

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In the late 15th and 16th centuries, the improvement of nautical astronomy and the introduction of latitude parallels allowed navigators to determine their position at sea by celestial readings, rather than relying on estimation of distance sailed.[32] The successor of the rule of marteloio was the "Regiment of the Leagues" (regimento das léguas), that was used by Portuguese navigators sailing in the Atlantic Ocean. Or, to use the term introduced by William Bourne (1571), the "Rule to Raise or Lay a Degree", also known as the "Table of Leagues" or the "Rule for Raising the Pole".[33] It was first written down in the Portuguese navigation manual Regimento do astrolabio e do quadrante (published in Lisbon c. 1509, but written c. 1480)[34] It was popularized by Martín Cortés de Albacar in his 1551 Breve compendio la esfera y del arte de navegar.

The "Regiment of the Leagues" is not very different from the rule of marteloio. The Regiment of the Leagues always considers the west-east bearing as the "intended course" and measures set deviations from it. More specifically, the league table considers a fixed value of alargar – set at 1 latitude degree (or, in the measurements of the time, 17.5 (Portuguese) leagues, or equivalently 70 (Italian) miles).[35] It then gives for every different quarter wind of sailing direction (always designated as quarters away from the north-south axis, rather than away from the intended course), the relevar and the afastar. The relevar is the number of leagues on the actual course that a ship must sail in order to cover the pre-set 1 degree of latitude (17.5 leagues of alargar from the starting parallel). The afastar is merely the corresponding avanzar on the west-east bearing.

Illustration of the "Regiment of the Leagues"

Example: Suppose a ship sets out on an East-southeast (ESE) bearing. That is six quarter-winds above South (remember: unlike the marteloio, the Regiment of the Leagues always measures quarter-winds away from the north–south meridian). Looking at any regiment of the leagues table (e.g. Martín Cortés de Albacar, 1551),[36] for q = 6, the table gives the relevar as 451115 leagues and the afastar as 4214 leagues. This means that a ship sailing on the ESE bearing will have to sail 45.73 leagues to cover one degree of latitude (17.5 leagues of alargar from the east bearing, to use the marteloio language), and the corresponding afastar (avanzar in marteloio terms) will be 42.25 leagues.

If, instead, the ship had set out on a SE bearing, that is four quarter-winds above South, the corresponding values of the Regiment of the Leagues table at q = 4 are relevar = 2434 and the afastar = 17 12.

Notice that the SE bearing reaches the 1 degree alargar faster (i.e. smaller relevar) than that the ESE bearing, and will have less afastar (closer to the N–S meridian).

Mathematically,

relevar = 17.5/cos θ
afastar = 17.5 × tan θ

where θ = 11.25 × number of quarters-winds away from the north-south axis.

Despite the difference in terminology, notably the use of latitude degrees, the rule of marteloio and the Regiment of the Leagues are very similar – they are both about solving triangles on a plane chart. The advantage of the regiment over the marteloio is the introduction of latitude parallels in the table, so that the position can be checked by astronomical observation (via quadrant, astrolabe, etc.), and not have to rely wholly on sailor estimations of distance and direction.

With the regiment, geographical coordinates can also be used to guide navigation. For instance, the search for the Todesillas line (meridian 370 leagues west of Cape Verde) is much simplified by reference to a precise latitude. For instance, suppose two ships depart from Cape Verde (17° N), one on a West by North bearing (WbN, that is one quarter above West, or q = 7 from North axis), the other by a west-northwest bearing (WNW, two quarters above west, or q = 6 from the North axis). Using the Regiment of the Leagues, it is possible to calculate the precise latitudes when they will cross the Tordesillas meridian – simply divide 370 leagues west by the implied afastar at the different bearings. The WbN ship will reach the meridian when it achieves latitude 21° 21' N, while the WNW ship will reach it when it achieves latitude 29° N.[37] So rather than counting leagues with hourglass and speed readings, the ships can just maintain bearing, and take periodic astronomical observations to assess their latitude.

Relation to "traverse sailing"

[edit]

The toleta de marteloio is ancestral to the modern "traverse table" used in more modern navigation.[38] In the modern nomenclature, the traverse is the "crooked path made by a ship when she sails in several successive directions" and resolving the traverse is "the method of finding a single course and distance which would bring a ship to the same place as two or more courses and distances".[39] In marteloio language, when "resolving the traverse", the known information given is the "actual course" and the "ritorno", while the unknowns are the "intended bearing" and "total avanzo".

Traverse tables use three values for each of the crooked course segments – the Distance (Dist.), Difference of Latitude (D.Lat., movement along N–S axis) and the Departure (Dep., movement along E–W axis), the latter two calculated by the formulas:

Difference of latitude = distance × cos θ
Departure = distance × sin θ

where θ is the angular difference of the course from the N–S axis if the values of θ are less than 45°; if, however, the angle exceeds 45°, then θ is expressed as the angle of difference from the E–W axis, and the formulas are flipped, i.e. the Difference of Latitude formula becomes the Departure, and the Departure formula is the Difference of Latitude). Or, even more simply, calculate θ as the angle of difference from the nearest principal wind (N, S, E, W), run the formulas and then place the larger number in the appropriate column (D.Lat. or Dep.).

For each course segment, the navigator inserts the relevant trio (Dist., D.Lat., Dep.) and can calculate the implied bearing from the beginning to the endpoint and the distance made good on that bearing. He then combines, by addition and subtraction, all the differences of latitude and departure, to get the overall difference of latitude and departure, and converts that back to overall bearing and distance made good.[40]

Manuscript sources

[edit]

Ramon Llull's suggestive 1295 remarks aside, the earliest known reference to marteloio is dated 1390, in the inventory of the estate of the mother of a certain Oberto Foglieto of Genoa, where an entry reads unum martelogium....item carta una pro navegando.[41] The first clear appearance and explanation is the 1436 atlas of Venetian captain Andrea Bianco. Other early manuscripts have since been found relating the rule of marteloio, include:[42]

Toleta de marteloio and an eight-wind tondo e quadro, from p. 47 of the Cornaro Atlas (c. 1489)

Notes

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  1. ^ Nordenskiöld (1897: p.51ff); Ruge (1900: p.177).
  2. ^ Kelley (1995: p. 2)
  3. ^ This was forwarded by Giuseppe Toaldo (1782: p. 44)
  4. ^ This was proposed by Desimoni (1888: p. 15)
  5. ^ Morelli (1810: p.42). Morelli's interpretation is cited already by Formaleoni (1783: p.28).
  6. ^ This was proposed by Fincati, as reported by Albertis (1893)
  7. ^ This is proposed by Breusing (1881: p. 130)
  8. ^ Taylor (1956); Parry (1974)
  9. ^ Aczel (2001: p.76)
  10. ^ Kelley (1995: p.12). This is slightly different from the later chip log, where the wood was tied to a rope with regularly spaced knots; the rope was allowed to unspool freely until a sandglass ran out, and the "knots" counted up in the aftermath. The chip log was first mentioned by William Bourne in 1574.
  11. ^ Taylor (1956: p.123, 159, 167); Parry (1974: p.37)
  12. ^ Taylor (1956: p.116ff.) Taylor (1960: p.10)
  13. ^ Van Brunnelen (2010, p.67)
  14. ^ Llull Arbor Scientiae (1295, (1635 Latin ed.):p.570 See also Edson (2007: p.51) and Cotter (1978:p.5)
  15. ^ This interpretation is originally due to Taylor (1956: pp. 117–19). See also Cortesão (1969: v. 1, pp. 206–7), Cotter (1978: pp. 6–7) and Campbell (1987: pp. 441–42).
  16. ^ Ramom Llull, 1517 ed., Part 10, "De Navigatione", fo. 93, p. 213. See also Cotter (1978: p. 7)
  17. ^ "To a mathematician familiar with contemporary mathematical knowledge and practice, it is quite clear that Lull did not fully understand what he was writing about. He used his shipboard observations during his travels to support transcendental ideas about the circle, triangle and square. His value is as a witness to late-thirteenth century mariners doing vector navigations with chart or plotting board." (Kelley, 1995: p. 3)
  18. ^ Taylor (1960: p. 10)
  19. ^ Taylor (1956: p. 114); Kelley (1995: p. 3); Vernet (2008)
  20. ^ For a transcription of Bianco's 1436 instructions, see Formaleoni (1783: p.30) or Gelgich (1892: p.73)
  21. ^ The Toleta we replicate here is the version of Michael of Rhodes (McGee et al., p.48b). Bianco's original table contains some small errors – specifically in the ritorno column, Bianco mistakenly inserts 14 rather than 12 in the fifth row (q = 5); in the avanzo di ritorno column, Bianco gives 5110 instead of 215 in the seventh row and 8 instead of 10 in the eighth row. Gelgich (1892: p.74). It is possible that by the "5110" entry, Bianco meant to write "1/5th of 10" = 2 (the number often given in modern reproductions of the toleta, e.g. Vernet, 2008)). The 215 is given only in the toleta version of Michael of Rhodes. The version in the Foscarini letter, that entry is given as 1910 9/10 (Toaldo, 1782: p.43).
  22. ^ Vernet (2008)
  23. ^ As quoted in Gelgich (1892: p.73)
  24. ^ This is clearly shown in the book of Michael of Rhodes, where commercial and navigational calculations follow one another. See the Michael of Rhodes website.
  25. ^ Taylor (1960: p.12)
  26. ^ Formaleoni (1783: p. 35), Cotter (1978: (p. 10)
  27. ^ Kelley (1995)
  28. ^ Taylor (1956: p. 116; 1960: p. 14)
  29. ^ Kelley (1995: p. 3)
  30. ^ The Michael of Rhodes website shows various sort of problems Michael considered.
  31. ^ See Michael of Rhodes p.48a and 48b
  32. ^ Taylor (1956), Albuquerque (1970), Parry (1974), Randles (1998)
  33. ^ Taylor (1956: pp. 163–4); Cotter (1978: p.11)
  34. ^ Diffie and Winius (1977: p.141); Parry (1974: p.149)
  35. ^ Parry (pp. 149–50). One Portuguese league was four Italian miles. In modern nautical measures, one degree is 20 leagues, and one league is three nautical miles, thus 60 nautical miles to the degree.
  36. ^ See Cotter (1978: p.13)
  37. ^ Albuquerque (1973:p. 231)
  38. ^ For an example of a traverse table, see Gunmere (1822) Mathematical Tables, online.
  39. ^ Merrifield (1883: p. 58)
  40. ^ For applications, see Merrifield (1883: p. 61)
  41. ^ This is reproduced in Albertis (1893: p. 118). See also Cortesão (1969: p.209
  42. ^ This list is based on Rossi (2009: p.11)
  43. ^ It is described by Abbot Giuseppe Toaldo (1782: p.44); the date is definitely after 1428, since it contains a tract by Venetian captain-general Andrea Mocenigo from that time. Toaldo (p.60) tentatively speculates it may have been introduced as late as 1463 by Regiomontanus, but that is inconsistent with all other earlier manuscript dates. However, Toaldo, writing in 1782, would not have been aware of them (although he does make a note that an "interesting" 1436 atlas (Andrea Bianco's) was just discovered that year by Formaleoni).
  44. ^ The manuscript is reproduced in Long, P.I., D. McGee and A.M. Stahl (2009). It can also be found online at the Michael of Rhodes website hosted by the Museo Galileo. Rossi (2009: p.xxxii–iii) suggests 1434–6 as the dating of the writing of the mathematical section, which includes the marteloio, although the rest of the book would continue to be written through the 1440s.
  45. ^ Kretschmer (1909: pp. 358–9)
  46. ^ This is described by Jacopo Morelli (1810: p.41). Rossi (2009) claims this was actually written by Michael of Rhodes, not Pietro di Versi.
  47. ^ The Vienna portolano manuscript 3345* (note asterisk) has a section entitled ""De arte navigandi dicta Martiloro" on pp. 37–38, according to description of 3345* in 1868 Tabulae codicum manuscriptorum praeter Graecos et orientales in Bibliotheca Palatina Vindobonensi asservatorum, vol. 2, p. 264. See entry at manuscripta.at and entry at Verzeichnis der italienischsprachigen Handschriften in der Österreichischen Nationalbibliothek (here)

External Resources

[edit]
  • Altante Bianco, 1436 at Internetculturale.it; Higher resolution at Geoweb.sbn.venezia.it.
  • McGee, D. et al. (2003 onwards) Michael of Rhodes: A medieval mariner and his manuscript website (accessed July 20, 2011). (originally hosted by Dibner Institute for the History of Science and Technology at M.I.T., now hosted by Museo Galileo Institute and Museum of the History of Science in Florence, Italy)

References

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