Stefan–Boltzmann constant

Since the 2019 redefinition of the SI base units, the Stefan–Boltzmann constant is given exactly rather than in experimental values. The value is given in SI units by

In cgs units the Stefan–Boltzmann constant is

In thermochemistry the Stefan–Boltzmann constant is often expressed in cal⋅cm⁻²⋅day⁻¹⋅K⁻⁴:

In US customary units the Stefan–Boltzmann constant is[6]

The Stefan–Boltzmann constant is defined in terms of other fundamental constants as

$${\displaystyle \sigma ={\frac {2\pi ^{5}k_{\rm {B}}^{4}}{15h^{3}c^{2}}}={\frac {\pi ^{2}k_{\rm {B}}^{4}}{60\hbar ^{3}c^{2}}}\,,}$$

where

• k_B is the Boltzmann constant,
• h is the Planck constant,
• ħ is the reduced Planck constant, and
• c is the speed of light in vacuum,

giving

$${\displaystyle \sigma ={\frac {5\,454\,781\,984\,210\,512\,994\,952\,000\,000\pi ^{5}}{29\,438\,455\,734\,650\,141\,042\,413\,712\,126\,365\,436\,049}}\,\mathrm {J} \cdot \mathrm {m} ^{-2}\cdot \mathrm {s} ^{-1}\cdot \mathrm {K} ^{-4}}$$

The CODATA recommended value[7] prior to 20 May 2019 (2018 CODATA) was calculated from the measured value of the gas constant:

$${\displaystyle \sigma ={\frac {2\pi ^{5}R^{4}}{15h^{3}c^{2}N_{\rm {A}}^{4}}}={\frac {32\pi ^{5}hR^{4}R_{\infty }^{4}}{15A_{\rm {r}}({\rm {e}})^{4}M_{\rm {u}}^{4}c^{6}\alpha ^{8}}},}$$

where

• R is the universal gas constant
• N_A is the Avogadro constant
• R_∞ is the Rydberg constant
• A_r(e) is the "relative atomic mass" of the electron
• M_u is the molar mass constant (1 g/mol by definition)
• α is the fine-structure constant.

Dimensional formula: M¹T⁻³Θ⁻⁴

A related constant is the radiation constant (or radiation density constant) ${\displaystyle a}$, which is given by[8]

$${\displaystyle a={\frac {4\sigma }{c}}=7.5657\times 10^{-15}\mathrm {erg\cdot cm^{-3}\cdot K^{-4}} =7.5657\times 10^{-16}\mathrm {J\cdot m^{-3}\cdot K^{-4}} .}$$

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