| General | |
|---|---|
| Symbol | 56Fe |
| Names | iron-56, Fe-56 |
| Protons | 26 |
| Neutrons | 30 |
| Nuclide data | |
| Natural abundance | 91.754% |
| Isotope mass | 55.9349375(7)u |
| Spin | 0+ |
| Excess energy | −60601.003± 1.354 keV |
| Binding energy | 492253.892± 1.356 keV |
| Isotopes of iron Complete table of nuclides | |
Iron-56 (56Fe) is the most common isotope of iron. About 91.754% of all iron is iron-56.
Atomic Mass Of Fe-56
Iron-56 (56 Fe) is the most common isotope of iron.About 91.754% of all iron is iron-56. Of all nuclides, iron-56 has the lowest mass per nucleon.With 8.8 MeV binding energy per nucleon, iron-56 is one of the most tightly bound nuclei. 26: Iron - Ferrum Fe Group: 8 Period: 4 Atomic number: 26 Atomic mass: 55.845 Configuration: Ar 3d 6 4s 2 Atomic radius: 156 pm Covalent radius: 132 pm Electron affinity: 15.7 eV Ionization energy: 7.9024 eV Electronic term: 5 D 4 Mass fraction in the earth crust: 0.063 Mass fraction in the earth space: 0.0011 Electronegativity: 1.83.
Of all nuclides, iron-56 has the lowest mass per nucleon. With 8.8 MeVbinding energy per nucleon, iron-56 is one of the most tightly bound nuclei.[1]
Nickel-62, a relatively rare isotope of nickel, has a higher nuclear binding energy per nucleon; this is consistent with having a higher mass-per-nucleon because nickel-62 has a greater proportion of neutrons, which are slightly more massive than protons. (See the nickel-62 article for more). Light elements undergoing nuclear fusion and heavy elements undergoing nuclear fission release energy as their nucleons bind more tightly, so 62Ni might be expected to be common. However, during nucleosynthesis in stars the competition between photodisintegration and alpha capturing causes more 56Ni to be produced than 62Ni (56Fe is produced later in the star's ejection shell as 56Ni decays).
Production of these elements has decreased considerably from what it was at the beginning of the stelliferous era.[citation needed]
Nonetheless, 28 atoms of nickel-62 fusing into 31 atoms of iron-56 releases 0.011 u of energy. As the Universe ages, matter will slowly convert to ever more tightly bound nuclei, approaching 56Fe, ultimately leading to the formation of iron stars over ≈101500 years in an expanding universe without proton decay.[2]
See also[edit]
.svg/1200px-CIAAW_2013_-_Standard_atomic_weight_for_cupper_(29%2C_Cu).svg.png "Atomic mass of fe2")
References[edit]
- ^Nuclear Binding Energy
- ^Dyson, Freeman J. (1979). 'Time without end: Physics and biology in an open universe'. Reviews of Modern Physics. 51 (3): 447–460. Bibcode:1979RvMP..51.447D. doi:10.1103/RevModPhys.51.447.
- de Laeter, John Robert; Böhlke, John Karl; De Bièvre, Paul; Hidaka, Hiroshi; Peiser, H. Steffen; Rosman, Kevin J. R.; Taylor, Philip D. P. (2003). 'Atomic weights of the elements. Review 2000 (IUPAC Technical Report)'. Pure and Applied Chemistry. 75 (6): 683–800. doi:10.1351/pac200375060683.
| Lighter: iron-55 | Iron-56 is an isotope of iron | Heavier: iron-57 |
| Decay product of: manganese-56 cobalt-56 | Decay chain of iron-56 | Decays to: Stable |
As we have seen in a previous article, 56Fe is among the nuclides with one of the highest binding energy per nucleon (The highest is 62Ni which was not on the chart, see note below) but How was it determined?
First, from this table of nuclides, we found that the stable isotope of iron (Iron/Fe-56) has 26 protons and 30 neutrons.
Isotopes are atoms of the same element having same atomic number (same number of protons) but different mass number. The atomic number of all the isotopes of iron is 26. But their masses are different. Naturally occurring iron (Fe) consists of 4 isotopes: 5.845% of radioactive 54Fe, 91.754% of stable 56Fe, 2.119% of stable 57Fe and 0.282% of stable 58Fe. Of which, 56Fe is the more common because it is the more common endpoint of fusion chains inside extremely massive stars.
The mass of nuclides are measured with among other methods, mass spectroscopy. Mass spectroscopy is based on producing ions of the substance to analyze, accelerate the charged particles inside a magnetic field with a magnet and detect them with a detector, then the analyzer sort the ions by their mass-to-charge ratio. Of course, isotopes have different masses and because of F=ma, were a is constant inside the magnet, they will follow different trajectories.
The most common unit of mass at the nuclear level is not the kilogram, it is the atomic mass unit or dalton Da (u): defined as 1/12 of the mass of an unbound neutral atom of carbon/C-12 in its nuclear and electronic ground state.
Expressing atomic mass unit in terms of electronvolts or eV, requires the use of .
The mass of Iron/Fe-56 from the table of nuclides(1):
NOTE: This value if for the whole atom, not just the nucleus, that is, it also includes the electron masses (and less significantly their binding energies). One can use the mass of hydrogen, which thus includes the mass of one electron, instead of the mass of a proton when calculating the binding energy of the nucleus in order to get the correct result.
The mass of a proton:
The mass of a hydrogen atom:
Photoshop plugins for mac.
The mass of a neutron:
The mass of an electron (it has a mass that is approximately 1/1836 that of the proton):
Average Atomic Mass Of Fe
Converting this into energy:
Atomic Mass Of Fecl3
And thus, the binding energy per nucleon:
NOTES:
* If you use the mass of the proton instead, you get which is not the correct value obviously
Atomic Mass Of Fe(no3)3
* The isotope 56Fe is the isotope with the lowest mass per nucleon (M(56Fe) in u/56 = 930.412 MeV/c2), though not the isotope with the highest nuclear binding energy per nucleon, which is nickel-62. However, because of the details of how nucleosynthesis works, 56Fe is a more common endpoint of fusion chains inside extremely massive stars and is therefore more common in the universe, relative to other metals which have a very high binding energy