Dioptra
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A dioptra (sometimes also named dioptre or diopter, from ) is a classical astronomical and surveying instrument, dating from the 3rd century BC. The dioptra was a sighting tube or, alternatively, a rod with a sight at both ends, attached to a stand. If fitted with protractors, it could be used to measure
angle In Euclidean geometry, an angle can refer to a number of concepts relating to the intersection of two straight Line (geometry), lines at a Point (geometry), point. Formally, an angle is a figure lying in a Euclidean plane, plane formed by two R ...
s.


Use

Greek astronomers used the dioptra to measure the positions of stars; both
Euclid Euclid (; ; BC) was an ancient Greek mathematician active as a geometer and logician. Considered the "father of geometry", he is chiefly known for the '' Elements'' treatise, which established the foundations of geometry that largely domina ...
and
Geminus Geminus of Rhodes (), was a Greek astronomer and mathematician, who flourished in the 1st century BC. An astronomy work of his, the ''Introduction to the Phenomena'', still survives; it was intended as an introductory astronomy book for students ...
refer to the dioptra in their astronomical works. It continued in use as an effective
surveying Surveying or land surveying is the technique, profession, art, and science of determining the land, terrestrial Plane (mathematics), two-dimensional or Three-dimensional space#In Euclidean geometry, three-dimensional positions of Point (geom ...
tool. Adapted to surveying, the dioptra is similar to the
theodolite A theodolite () is a precision optical instrument for measuring angles between designated visible points in the horizontal and vertical planes. The traditional use has been for land surveying, but it is also used extensively for building and ...
, or surveyor's transit, which dates to the sixteenth century. It is a more accurate version of the groma. There is some speculation that it may have been used to build the Eupalinian aqueduct. Called "one of the greatest engineering achievements of ancient times," it is a tunnel long, excavated through a mountain on the Greek island of Samos during the reign of Polycrates in the sixth century BC. Scholars disagree, however, whether the dioptra was available that early. An entire book about the construction and surveying usage of the dioptra is credited to Hero of Alexandria (also known as Heron; a brief description of the book is available online; see Lahanas link, below). Hero was "one of history’s most ingenious
engineer Engineers, as practitioners of engineering, are professionals who Invention, invent, design, build, maintain and test machines, complex systems, structures, gadgets and materials. They aim to fulfill functional objectives and requirements while ...
s and applied
mathematician A mathematician is someone who uses an extensive knowledge of mathematics in their work, typically to solve mathematical problems. Mathematicians are concerned with numbers, data, quantity, mathematical structure, structure, space, Mathematica ...
s." The dioptra was used extensively on aqueduct building projects. Screw turns on several different parts of the instrument made it easy to calibrate for very precise measurements. The dioptra was replaced as a surveying instrument by the
theodolite A theodolite () is a precision optical instrument for measuring angles between designated visible points in the horizontal and vertical planes. The traditional use has been for land surveying, but it is also used extensively for building and ...
.


How it works

The dioptra consists of a sighting tube or rod fitted with sights at both ends and mounted on a stable stand. The stand usually includes adjustable screw turns that allow the instrument to be precisely calibrated. When used for astronomical purposes, the user would align the sights with a specific star or celestial object, and then measure the angle using protractors attached to the instrument. In surveying, the dioptra was used to measure angles and distances by sighting along the rod and taking readings from graduated scales.


Advantages and disadvantages

The dioptra offered several advantages over other contemporary instruments. Its ability to measure both vertical and horizontal angles with high precision made it a versatile tool for both astronomy and surveying. The screw turns allowed for fine adjustments, improving accuracy. The instrument's simplicity and robustness made it reliable and easy to use in the field. However, the dioptra also had its limitations. The accuracy of measurements depended on the user's skill and the quality of the instrument's construction. The sighting tube or rod could be affected by environmental factors such as wind or temperature changes, which could introduce errors. Additionally, the dioptra required careful calibration before each use, which could be time-consuming. Compared to later instruments like the
theodolite A theodolite () is a precision optical instrument for measuring angles between designated visible points in the horizontal and vertical planes. The traditional use has been for land surveying, but it is also used extensively for building and ...
, the dioptra was less advanced and lacked some of the refinements and improvements that made theodolites more accurate and easier to use. The theodolite eventually replaced the dioptra as the primary instrument for surveying due to its superior performance and reliability.


History and development

The dioptra's origins trace back to the Hellenistic period when Greek scientists and engineers sought to improve observational accuracy in astronomy and surveying. Over time, the instrument underwent several modifications, incorporating advancements in material science and geometric principles. Notably, Hero of Alexandria's detailed work on the dioptra exemplifies the pinnacle of Hellenistic engineering prowess, showcasing the instrument's versatility and precision.


Applications in ancient engineering

Beyond its use in astronomy, the dioptra played a crucial role in various engineering projects in ancient Greece and Rome. It was instrumental in constructing aqueducts, roads, and buildings. The instrument's ability to measure angles with high precision allowed engineers to plan and execute large-scale infrastructure projects with greater accuracy and efficiency. For example, its use in the Eupalinian aqueduct's construction demonstrated the dioptra's significance in solving complex engineering challenges of the time.


Comparison with other instruments

The dioptra's design and functionality can be compared to other contemporary instruments such as the groma, the alidade, and the later theodolite. While the groma was primarily used for laying out straight lines and right angles, the dioptra offered greater versatility in measuring angles in both vertical and horizontal planes. The alidade, another important surveying instrument, was used to measure angles and determine directions. It typically consisted of a straightedge with sights at either end. The alidade was often mounted on a plane table, which allowed for direct plotting of survey data. The theodolite, which emerged in the sixteenth century, eventually surpassed the dioptra in accuracy and ease of use due to technological advancements and refinements in optical and mechanical components.


See also

* Alidade * Groma *
Theodolite A theodolite () is a precision optical instrument for measuring angles between designated visible points in the horizontal and vertical planes. The traditional use has been for land surveying, but it is also used extensively for building and ...


References


Further reading

* Isaac Moreno Gallo (2006
The Dioptra
Tesis and reconstruction of the Dioptra. * Michael Jonathan Taunton Lewis (2001), ''Surveying Instruments of Greece and Rome'', Cambridge University Press, * Lucio Russo (2004), ''The Forgotten Revolution: How Science Was Born in 300 BC and Why It Had To Be Reborn'', Berlin: Springer. . *Evans, J., (1998) ''The History and Practice of Ancient Astronomy'', pages 34–35. Oxford University Press.


External links

* Michael Lahanas
Heron of Alexandria, Inventions, Biography, Science
* Nathan Sidoli (2005)
Heron's Dioptra 35 and Analemma Methods: An Astronomical Determination of the Distance between Two Cities
''Centaurus'', 47(3), 236-258 * Bamber Gascoigne
History of Measurement
historyworld.net * Tom M. Apostol (2004)
The Tunnel of Samos
''Engineering and Science'', 64(4), 30-40 * Olshausen, Eckart and Sauer, Werner (2002),
Dioptra
, in: Brill’s New Pauly, Antiquity volumes edited by: Hubert Cancik and Helmuth Schneider, English Edition by: Christine F. Salazar, Classical Tradition volumes edited by: Manfred Landfester, English Edition by: Francis G. Gentry. {{Use dmy dates, date=August 2019 Ancient Greek astronomy Astrometry Astronomical instruments Historical scientific instruments Angle measuring instruments Surveying instruments Greek inventions Greek engineers Hellenistic engineering