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Statcoulomb

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statcoulomb
Unit systemGaussian, CGS-ESU
Unit ofelectric charge
SymbolFr, statC, esu
Derivationdyn1/2⋅cm
Conversions
1 Fr in ...... is equal to ...
   CGS base units   1 cm3/2⋅g1/2⋅s−1
   SI (charge)   ≘ ~ 3.33564×10−10 C
   SI (flux)   ≘ ~ 2.65×10−11 C

The statcoulomb (statC), franklin (Fr), or electrostatic unit of charge (esu) is the unit of measurement for electrical charge used in the centimetre–gram–second electrostatic units variant (CGS-ESU) and Gaussian systems of units. In terms of the Gaussian base units, it is

1 statC = 1 dyn1/2⋅cm = 1 cm3/2⋅g1/2⋅s−1.

That is, it is defined so that the proportionality constant in Coulomb's law using CGS-ESU quantities is a dimensionless quantity equal to 1.

Definition and relation to CGS base units

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Coulomb's law in the CGS-Gaussian system takes the form where F is the force, qG
1
and qG
2
are the two electric charges, and r is the distance between the charges. This serves to define charge as a quantity in the Gaussian system.

The statcoulomb is defined such that if two electric charges of 1 statC each and have a separation of 1 cm, the force of mutual electrical repulsion is 1 dyne. Substituting F = 1 dyn, qG
1
= qG
2
= 1 statC, and r = 1 cm, we get:

1 statC = g1/2⋅cm3/2⋅s−1.

From this it is also evident that the quantity dimension of electric charge as defined in the CGS-ESU and Gaussian systems is M1/2L3/2T−1.

Conversion between systems

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Conversion of a quantity to the corresponding quantity of the International System of Quantities (ISQ) that underlies the International System of Units (SI) by using the defining equations of each system.

The SI uses the coulomb (C) as its unit of electric charge. The conversion factor between corresponding quantities with the units coulomb and statcoulomb depends on which quantity is to be converted. The most common cases are:[1]

  • For electric charge:
    1 C ≘ 1 C × 1/4πε02.99792×109 statC
    1 statC ≘ 1 statC × 4πε03.33564×10−10 C.
  • For electric fluxD):
    1 C ≘ 1 C × 4π/ε03.76730×1010 statC
    1 statC ≘ 1 statC × ε0/4π2.65442×10−11 C.
  • For electric flux density (D):
    1 C/m2 ≘ 1 C/m2 × 4π/ε03.76730×106 statC/cm2
    1 statC/cm2 ≘ 1 statC/cm2 × ε0/4π2.65442×10−7 C/m2.

The symbol "≘" ('corresponds to') is used instead of "=" because the two sides cannot be equated.

Dimensional relation between statcoulomb and coulomb

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Distinct systems of equations

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Coulomb's law as expressed in the Gaussian system and the International System of Quantities that underlies the SI are respectively:

(Gaussian),
(ISQ).

Since ε0, the vacuum permittivity, is not dimensionless, the coulomb is not dimensionally equivalent to M1/2L3/2T−1, unlike the statcoulomb. In fact, it is impossible to express the coulomb in terms of mass, length, and time alone.

Consequently, a conversion equation like "1 C = n statC" is misleading: the units on the two sides are not consistent. One cannot freely switch between coulombs and statcoulombs within a formula or equation, as one would freely switch between centimetres and metres. One can, however, find a correspondence between coulombs and statcoulombs in different contexts. As described below, "1 C corresponds to 3.00×109 statC" when describing the charge of objects. In other words, if a physical object has a charge of 1 C, it also has a charge of 3.00×109 statC. Likewise, "1 C corresponds to 3.77×1010 statC" when describing an electric displacement field flux.

As a unit of charge

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The statcoulomb is defined as follows: If two stationary objects each carry a charge of 1 statC and are 1 cm apart in vacuum, they will electrically repel each other with a force of 1 dyne.[2] From this definition, it is straightforward to find an equivalent charge in coulombs. Using the SI equation

,

and setting F = 1 dyn = 10−5 N and r = 1 cm = 10−2 m, and then solving for q = qSI
1
= qSI
2
, the result is

Therefore, an object with a CGS charge of 1 statC has a charge of approximately 3.34×10−10 C.

References

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  1. ^ Gray, Truman S. (1954). Applied Electronics. New York: John Wiley & Sons, Inc. pp. 830–831, Appendix B.
  2. ^ Jan Gyllenbok (2018), Encyclopaedia of Historical Metrology, Weights, and Measures Volume 1, Birkhauser, p. 29, ISBN 978-3-319-57598-8