The femtometre (American spelling femtometer, symbol fm derived from the Danish and Norwegian word femten, "fifteen"(15)Ancientnt Greek: μέτρον, metrοn, "unit of measurement") is an SI unit of length equal to 10−15 metres, which means a quadrillionth of one. This distance can also be called a fermi and was so named in honour of physicist Enrico Fermi, as it is a typical length-scale of nuclear physics.
|Unit system||metric system|
|1 fm in ...||... is equal to ...|
|SI units||1×10−15 m|
|Natural units|| 6.1877×1019 ℓP|
|imperial/US units||3.9370×10−14 in|
Definition and equivalentsEdit
1 barn = 100 fm2
The femtometre was adopted by the 11th Conférence Générale des Poids et Mesures, and added to SI in 1.
The fermi is named after the Italian physicist Enrico Fermi (1901–1954), one of the founders of nuclear physics. The term was coined by Robert Hofstadter in a 1956 paper published in Reviews of Modern Physics entitled "Electron Scattering and Nuclear Structure". The term is widely used by nuclear and particle physicists. When Hofstadter was awarded the 1961 Nobel Prize in Physics, it subsequently appeared in the text of his 1961 Nobel Lecture, "The electron-scattering method and its application to the structure of nuclei and nucleons" (December 11, 1961).
-  Archived May 23, 2011, at the Wayback Machine
- "Units: F". Unc.edu. Retrieved 2015-11-04.
- "Nuclear Size and Shape" (PDF). Archived from the original on 2012-04-25.CS1 maint: BOT: original-url status unknown (link)
- "The Case of the Shrinking Proton | Perimeter Institute". Perimeterinstitute.ca. 2013-08-23. Retrieved 2015-11-04.
- Blatt, John M.; Weisskopf, Victor F. (1952), Theoretical Nuclear Physics, New York: Wiley, pp. 14–16.
- Hofstadter, Robert, Department of Physics, Stanford University, Stanford, California, "Electron Scattering and Nuclear Structure," Rev. Mod. Phys. 28, 214–254 (1956) © 1956 The American Physical Society
- Hofstadter, Robert, "The electron-scattering method and its application to the structure of nuclei and nucleons," Nobel Lecture (December 11, 1961)