Gemma Frisius

Summary

Gemma Frisius (/ˈfrɪziəs/; born Jemme Reinerszoon;[1] December 9, 1508 – May 25, 1555) was a Dutch physician, mathematician, cartographer, philosopher, and instrument maker. He created important globes, improved the mathematical instruments of his day and applied mathematics in new ways to surveying and navigation. Gemma's rings, an astronomical instrument, are named after him. Along with Gerardus Mercator and Abraham Ortelius, Frisius is often considered one of the founders of the Netherlandish school of cartography, and significantly helped lay the foundations for the school's golden age (approximately 1570s–1670s).

Gemma Frisius, (Maarten van Heemskerck, c. 1540–1545)

Biography edit

Frisius was born in Dokkum, Friesland (present-day Netherlands), of poor parents who died when he was young. He moved to Groningen and later studied at the University of Leuven (Louvain), Belgium, beginning in 1525. He received the degree of MD in 1536 and remained on the faculty of medicine of Leuven for the rest of his life where, in addition to teaching medicine, he also taught mathematics, astronomy and geography. His oldest son, Cornelius Gemma, edited a posthumous volume of his work and continued to work with Ptolemaic astronomical models.

 
Gemma Frisius's famous 1536 terrestrial globe

One of his most influential teachers at Leuven was Franciscus Monachus who, circa 1527, had constructed a famous globe in collaboration with the Leuven goldsmith Gaspar van der Heyden[2] Under the guidance of Monachus and the technical assistance of Van der Heyden, Frisius set up a workshop to produce globes and mathematical instruments which were praised for their quality and accuracy by contemporary astronomers such as Tycho Brahe. Of particular fame were the terrestrial globe of 1536 and the celestial globe of 1537. On the first of these Frisius is described as the author with technical assistance from Van der Heyden and engraving by Gerardus Mercator who was a pupil of Frisius at the time. On the second globe Mercator is promoted to co-author.

 
Gemma Frisius's 1533 diagram introducing triangulation into the science of surveying

In 1533, he described for the first time the method of triangulation still used today in surveying (see diagram). Having established a baseline, e.g., in this case, the cities of Brussels and Antwerp, the location of other cities, e.g. Middelburg, Ghent etc., can be found by taking a compass direction from each end of the baseline, and plotting where the two directions cross. This was only a theoretical presentation of the concept — due to topographical restrictions, it is impossible to see Middelburg from either Brussels or Antwerp. Nevertheless, the figure soon became well known all across Europe.

Twenty years later, in about 1553, he was the first to describe how an accurate clock could be used to determine longitude.[3] Jean-Baptiste Morin (1583–1656) did not believe that Frisius' method for calculating longitude would work, remarking, "I do not know if the Devil will succeed in making a longitude timekeeper but it is folly for man to try."[4] It took two centuries before John Harrison produced a sufficiently accurate clock.

 
Gemma's rings

Frisius created or improved many instruments, including the cross-staff, the astrolabe, and the astronomical rings (also known as "Gemma's rings"). His students included Gerardus Mercator (who became his collaborator), Johannes Stadius, John Dee, Andreas Vesalius and Rembert Dodoens.

Frisius died in Leuven at the age of 46. According to an account by his son, Cornelius, Gemma died from kidney stones, which he had suffered from for a minimum of 7 years.[5]

A lunar crater has been named after him. Gualterus Arsenius, the 16th-century scientific instrument maker, was his nephew.

Works edit

  • Cosmographia (1529) von Petrus Apianus, annotated by Gemma Frisius
  • De principiis astronomiae et cosmographiae (1530)
  • De usu globi (1530)
  • Libellus de locorum describendorum ratione (1533)
  • Arithmeticae practicae methodus facilis (Antwerp,[6] 1540)
  • De annuli astronomici usu[7] (1540)
  • De radio astronomico et geometrico (1545)
  • De principiis astronomiae et cosmographiae (in Latin). Paris. 1547.
  • De astrolabio catholico (1556)

Honours edit

Frisius Point in the South Shetland Islands in Antarctica is named after Gemma Frisius.

See also edit

Notes edit

  1. ^ He was cited as Jemme Reinersz in the 1533 edition of Peter Apian's Cosmographia.
  2. ^ There is no English biography of Van der Heyden (or Gaspar a Myrica c1496—c1549) but he has an entry in the Dutch Nationaal Biografisch Woordenboek.
  3. ^ Pogo, A. (1935-02-01). "Gemma Frisius, His Method of Determining Differences of Longitude by Transporting Timepieces (1530), and His Treatise on Triangulation (1533)". Isis. 22 (2): 469–506. doi:10.1086/346920. ISSN 0021-1753. S2CID 143585356.
  4. ^ "Longitude1". Groups.dcs.st-and.ac.uk. Archived from the original on 2016-11-05. Retrieved 2013-03-19.
  5. ^ Gemma Frisius, Tycho Brahe & Snellius & Their Triangulations, N.D. Haasbroek, Rijkscommissie Voor Geodesie, Delft, Netherlands, 1968, p. 10 Archived 2011-07-22 at the Wayback Machine
  6. ^ Smith, David Eugene (July 1, 1917). "Medicine and Mathematics in the Sixteenth Century". Ann Med Hist. 1 (2): 125–140. OCLC 12650954. PMC 7927718. PMID 33943138. (here cited p. 130).
  7. ^ Usus annuli astronomici - Rainer Gemma Frisius. 1548. Retrieved 2013-03-19 – via Internet Archive. annuli astronomici.

Further reading edit

  • N. Haasbroek: Gemma Frisius, Tycho Brahe and Snellius and their triangulations. Delft 1968.
  • Robert Haardt: The globe of Gemma Frisius. Imago mundi, Bd. 9, 1952.
  • W. Karrow: Mapmakers of the Sixteenth Century and Their Maps. Chicago 1993.
  • G. Kish: Medicina, mensura, mathematica: The Life and Works of Gemma Frisius. Minneapolis 1967, sowie sein Artikel in Dictionary of Scientific Biography
  • A. Pogo: Gemma Frisius, his method of determining longitude. In: Isis. Bd. 22, 1935, S. 469–485.
  • Moritz Cantor (1878), "Gemma-Frisius, Rainer", Allgemeine Deutsche Biographie (in German), vol. 8, Leipzig: Duncker & Humblot, pp. 555–556

External links edit