# Centimetre‚Äďgram‚Äďsecond system of units

https://en.wikipedia.org/wiki/Centimetre‚Äďgram‚Äďsecond_system_of_units

The centimetre‚Äďgram‚Äďsecond system of units (abbreviated CGS or cgs) is a variant of the metric system based on the centimetre as the unit of length, the gram as the unit of mass, and the second as the unit of time. All CGS mechanical units are unambiguously derived from these three base units, but there are several different ways in which the CGS system was extended to cover electromagnetism.   

The CGS system has been largely supplanted by the MKS system based on the metre, kilogram, and second, which was in turn extended and replaced by the International System of Units (SI). In many fields of science and engineering, SI is the only system of units in use, but there remain certain subfields where CGS is prevalent.

In measurements of purely mechanical systems (involving units of length, mass, force, energy, pressure, and so on), the differences between CGS and SI are straightforward and rather trivial; the unit-conversion factors are all powers of 10 as 100 cm = 1 m and 1000 g = 1 kg. For example, the CGS unit of force is the dyne, which is defined as 1 g‚čÖcm/s2, so the SI unit of force, the newton (1 kg‚čÖm/s2), is equal to 100000 dynes.

On the other hand, in measurements of electromagnetic phenomena (involving units of charge, electric and magnetic fields, voltage, and so on), converting between CGS and SI is more subtle. Formulas for physical laws of electromagnetism (such as Maxwell's equations) take a form that depends on which system of units is being used. This is because the electromagnetic quantities are defined differently in SI and in CGS, whereas mechanical quantities are defined identically. Furthermore, within CGS, there are several plausible ways to define electromagnetic quantities, leading to different "sub-systems", including Gaussian units, "ESU", "EMU", and Lorentz‚ÄďHeaviside units. Among these choices, Gaussian units are the most common today, and "CGS units" often used specifically refers to CGS-Gaussian units.

## History

The CGS system goes back to a proposal in 1832 by the German mathematician Carl Friedrich Gauss to base a system of absolute units on the three fundamental units of length, mass and time.  Gauss chose the units of millimetre, milligram and second.  In 1873, a committee of the British Association for the Advancement of Science, including physicists James Clerk Maxwell and William Thomson recommended the general adoption of centimetre, gram and second as fundamental units, and to express all derived electromagnetic units in these fundamental units, using the prefix "C.G.S. unit of ...". 

The sizes of many CGS units turned out to be inconvenient for practical purposes. For example, many everyday objects are hundreds or thousands of centimetres long, such as humans, rooms and buildings. Thus the CGS system never gained wide general use outside the field of science. Starting in the 1880s, and more significantly by the mid-20th century, CGS was gradually superseded internationally for scientific purposes by the MKS (metre‚Äďkilogram‚Äďsecond) system, which in turn developed into the modern SI standard.

Since the international adoption of the MKS standard in the 1940s and the SI standard in the 1960s, the technical use of CGS units has gradually declined worldwide. SI units are predominantly used in engineering applications and physics education, while Gaussian CGS units are commonly used in theoretical physics, describing microscopic systems, relativistic electrodynamics, and astrophysics.   CGS units are today no longer accepted by the house styles of most scientific journals,[ citation needed] textbook publishers,[ citation needed] or standards bodies, although they are commonly used in astronomical journals such as The Astrophysical Journal. The continued usage of CGS units is prevalent in magnetism and related fields because the B and H fields have the same units in free space and there is a lot of potential for confusion when converting published measurements from CGS to MKS. 

The units gram and centimetre remain useful as noncoherent units within the SI system, as with any other prefixed SI units.

## Definition of CGS units in mechanics

In mechanics, the quantities in the CGS and SI systems are defined identically. The two systems differ only in the scale of the three base units (centimetre versus metre and gram versus kilogram, respectively), with the third unit (second) being the same in both systems.

There is a direct correspondence between the base units of mechanics in CGS and SI. Since the formulae expressing the laws of mechanics are the same in both systems and since both systems are coherent, the definitions of all coherent derived units in terms of the base units are the same in both systems, and there is an unambiguous correspondence of derived units:

$v={\frac {dx}{dt}}$ (definition of velocity)
$F=m{\frac {d^{2}x}{dt^{2}}}$ ( Newton's second law of motion)
$E=\int {\vec {F}}\cdot \mathrm {d\,} {\vec {x}}$ ( energy defined in terms of work)
$p={\frac {F}{L^{2}}}$ ( pressure defined as force per unit area)
$\eta =\tau /{\frac {dv}{dx}}$ (dynamic viscosity defined as shear stress per unit velocity gradient).

Thus, for example, the CGS unit of pressure, barye, is related to the CGS base units of length, mass, and time in the same way as the SI unit of pressure, pascal, is related to the SI base units of length, mass, and time:

1 unit of pressure = 1 unit of force/(1 unit of length)2 = 1 unit of mass/(1 unit of length‚čÖ(1 unit of time)2)
1 Ba = 1 g/(cm‚čÖs2)
1 Pa = 1 kg/(m‚čÖs2).

Expressing a CGS derived unit in terms of the SI base units, or vice versa, requires combining the scale factors that relate the two systems:

1 Ba = 1 g/(cm‚čÖs2) = 10‚ąí3 kg / (10‚ąí2 m‚čÖs2) = 10‚ąí1 kg/(m‚čÖs2) = 10‚ąí1 Pa.

### Definitions and conversion factors of CGS units in mechanics

Quantity Quantity symbol CGS unit name Unit symbol Unit definition In coherent SI units
length, position L, x centimetre cm 1/100 of metre 10‚ąí2 m
mass m gram g 1/1000 of kilogram 10‚ąí3 kg
time t second s 1 second 1 s
velocity v centimetre per second cm/s cm/s 10‚ąí2 m/s
acceleration a gal Gal cm/s2 10‚ąí2 m/s2
force F dyne dyn g‚čÖcm/s2 10‚ąí5  N
energy E erg erg g‚čÖcm2/s2 10‚ąí7  J
power P erg per second erg/s g‚čÖcm2/s3 10‚ąí7  W
pressure p barye Ba g/(cm‚čÖs2) 10‚ąí1  Pa
dynamic viscosity őľ poise P g/(cm‚čÖs) 10‚ąí1  Pa‚čÖs
kinematic viscosity őĹ stokes St cm2/s 10‚ąí4 m2/s
wavenumber k kayser (K) cm‚ąí1  cm‚ąí1 100 m‚ąí1

## Derivation of CGS units in electromagnetism

### CGS approach to electromagnetic units

The conversion factors relating electromagnetic units in the CGS and SI systems are made more complex by the differences in the formulae expressing physical laws of electromagnetism as assumed by each system of units, specifically in the nature of the constants that appear in these formulae. This illustrates the fundamental difference in the ways the two systems are built:

• In SI, the unit of electric current, the ampere (A), was historically defined such that the magnetic force exerted by two infinitely long, thin, parallel wires 1  metre apart and carrying a current of 1  ampere is exactly 2√ó10‚ąí7  N/ m. This definition results in all SI electromagnetic units being numerically consistent (subject to factors of some integer powers of 10) with those of the CGS-EMU system described in further sections. The ampere is a base unit of the SI system, with the same status as the metre, kilogram, and second. Thus the relationship in the definition of the ampere with the metre and newton is disregarded, and the ampere is not treated as dimensionally equivalent to any combination of other base units. As a result, electromagnetic laws in SI require an additional constant of proportionality (see Vacuum permeability) to relate electromagnetic units to kinematic units. (This constant of proportionality is derivable directly from the above definition of the ampere.) All other electric and magnetic units are derived from these four base units using the most basic common definitions: for example, electric charge q is defined as current I multiplied by time t,
$q=I\,t$ ,
resulting in the unit of electric charge, the coulomb (C), being defined as 1 C = 1 A‚čÖs.
• The CGS system variant avoids introducing new base quantities and units, and instead defines all electromagnetic quantities by expressing the physical laws that relate electromagnetic phenomena to mechanics with only dimensionless constants, and hence all units for these quantities are directly derived from the centimetre, gram, and second.

### Alternative derivations of CGS units in electromagnetism

Electromagnetic relationships to length, time and mass may be derived by several equally appealing methods. Two of them rely on the forces observed on charges. Two fundamental laws relate (seemingly independently of each other) the electric charge or its rate of change (electric current) to a mechanical quantity such as force. They can be written  in system-independent form as follows:

• The first is Coulomb's law, $F=k_{\rm {C}}{\frac {q\,q^{\prime }}{d^{2}}}$ , which describes the electrostatic force F between electric charges $q$ and $q^{\prime }$ , separated by distance d. Here $k_{\rm {C}}$ is a constant which depends on how exactly the unit of charge is derived from the base units.
• The second is Amp√®re's force law, ${\frac {dF}{dL}}=2k_{\rm {A}}{\frac {I\,I^{\prime }}{d}}$ , which describes the magnetic force F per unit length L between currents I and I′ flowing in two straight parallel wires of infinite length, separated by a distance d that is much greater than the wire diameters. Since $I=q/t\,$ and $I^{\prime }=q^{\prime }/t$ , the constant $k_{\rm {A}}$ also depends on how the unit of charge is derived from the base units.

Maxwell's theory of electromagnetism relates these two laws to each other. It states that the ratio of proportionality constants $k_{\rm {C}}$ and $k_{\rm {A}}$ must obey $k_{\rm {C}}/k_{\rm {A}}=c^{2}$ , where c is the speed of light in vacuum. Therefore, if one derives the unit of charge from the Coulomb's law by setting $k_{\rm {C}}=1$ then Amp√®re's force law will contain a prefactor $2/c^{2}$ . Alternatively, deriving the unit of current, and therefore the unit of charge, from the Amp√®re's force law by setting $k_{\rm {A}}=1$ or $k_{\rm {A}}=1/2$ , will lead to a constant prefactor in the Coulomb's law.

Indeed, both of these mutually exclusive approaches have been practiced by the users of CGS system, leading to the two independent and mutually exclusive branches of CGS, described in the subsections below. However, the freedom of choice in deriving electromagnetic units from the units of length, mass, and time is not limited to the definition of charge. While the electric field can be related to the work performed by it on a moving electric charge, the magnetic force is always perpendicular to the velocity of the moving charge, and thus the work performed by the magnetic field on any charge is always zero. This leads to a choice between two laws of magnetism, each relating magnetic field to mechanical quantities and electric charge:

• The first law describes the Lorentz force produced by a magnetic field B on a charge q moving with velocity v:
$\mathbf {F} =\alpha _{\rm {L}}q\;\mathbf {v} \times \mathbf {B} \;.$ • The second describes the creation of a static magnetic field B by an electric current I of finite length dl at a point displaced by a vector r, known as Biot‚ÄďSavart law:
$d\mathbf {B} =\alpha _{\rm {B}}{\frac {Id\mathbf {l} \times \mathbf {\hat {r}} }{r^{2}}}\;,$ where r and $\mathbf {\hat {r}}$ are the length and the unit vector in the direction of vector r respectively.

These two laws can be used to derive Amp√®re's force law above, resulting in the relationship: $k_{\rm {A}}=\alpha _{\rm {L}}\cdot \alpha _{\rm {B}}\;$ . Therefore, if the unit of charge is based on the Amp√®re's force law such that $k_{\rm {A}}=1$ , it is natural to derive the unit of magnetic field by setting $\alpha _{\rm {L}}=\alpha _{\rm {B}}=1\;$ . However, if it is not the case, a choice has to be made as to which of the two laws above is a more convenient basis for deriving the unit of magnetic field.

Furthermore, if we wish to describe the electric displacement field D and the magnetic field H in a medium other than vacuum, we need to also define the constants őĶ0 and őľ0, which are the vacuum permittivity and permeability, respectively. Then we have  (generally) $\mathbf {D} =\epsilon _{0}\mathbf {E} +\lambda \mathbf {P}$ and $\mathbf {H} =\mathbf {B} /\mu _{0}-\lambda ^{\prime }\mathbf {M}$ , where P and M are polarization density and magnetization vectors. The units of P and M are usually so chosen that the factors őĽ and őĽ‚Ä≤ are equal to the "rationalization constants" $4\pi k_{\rm {C}}\epsilon _{0}$ and $4\pi \alpha _{\rm {B}}/(\mu _{0}\alpha _{\rm {L}})$ , respectively. If the rationalization constants are equal, then $c^{2}=1/(\epsilon _{0}\mu _{0}\alpha _{\rm {L}}^{2})$ . If they are equal to one, then the system is said to be "rationalized":  the laws for systems of spherical geometry contain factors of 4ŌÄ (for example, point charges), those of cylindrical geometry ‚Äď factors of 2ŌÄ (for example, wires), and those of planar geometry contain no factors of ŌÄ (for example, parallel-plate capacitors). However, the original CGS system used őĽ = őĽ‚Ä≤ = 4ŌÄ, or, equivalently, $k_{\rm {C}}\epsilon _{0}=\alpha _{\rm {B}}/(\mu _{0}\alpha _{\rm {L}})=1$ . Therefore, Gaussian, ESU, and EMU subsystems of CGS (described below) are not rationalized.

### Various extensions of the CGS system to electromagnetism

The table below shows the values of the above constants used in some common CGS subsystems:

System $k_{\rm {C}}$ $\alpha _{\rm {B}}$ $\epsilon _{0}$ $\mu _{0}$ $k_{\rm {A}}={\frac {k_{\rm {C}}}{c^{2}}}$ $\alpha _{\rm {L}}={\frac {k_{\rm {C}}}{\alpha _{\rm {B}}c^{2}}}$ $\lambda =4\pi k_{\rm {C}}\epsilon _{0}$ $\lambda '={\frac {4\pi \alpha _{\rm {B}}}{\mu _{0}\alpha _{\rm {L}}}}$ Electrostatic  CGS
(ESU, esu, or stat-)
1 c‚ąí2 1 c‚ąí2 c‚ąí2 1 4ŌÄ 4ŌÄ
Electromagnetic  CGS
(EMU, emu, or ab-)
c2 1 c‚ąí2 1 1 1 4ŌÄ 4ŌÄ
Gaussian  CGS 1 c‚ąí1 1 1 c‚ąí2 c‚ąí1 4ŌÄ 4ŌÄ
Lorentz‚ÄďHeaviside  CGS ${\frac {1}{4\pi }}$ ${\frac {1}{4\pi c}}$ 1 1 ${\frac {1}{4\pi c^{2}}}$ c‚ąí1 1 1
SI ${\frac {1}{4\pi \epsilon _{0}}}$ ${\frac {\mu _{0}}{4\pi }}$ $\epsilon _{0}$ $\mu _{0}$ ${\frac {\mu _{0}}{4\pi }}$ 1 1 1

Also, note the following correspondence of the above constants to those in Jackson  and Leung: 

$k_{\rm {C}}=k_{1}=k_{\rm {E}}$ $\alpha _{\rm {B}}=\alpha \cdot k_{2}=k_{\rm {B}}$ $k_{\rm {A}}=k_{2}=k_{\rm {E}}/c^{2}$ $\alpha _{\rm {L}}=k_{3}=k_{\rm {F}}$ Of these variants, only in Gaussian and Heaviside‚ÄďLorentz systems $\alpha _{\rm {L}}$ equals $c^{-1}$ rather than 1. As a result, vectors ${\vec {E}}$ and ${\vec {B}}$ of an electromagnetic wave propagating in vacuum have the same units and are equal in magnitude in these two variants of CGS.

In each of these systems the quantities called "charge" etc. may be a different quantity; they are distinguished here by a superscript. The corresponding quantities of each system are related through a proportionality constant.

Maxwell's equations can be written in each of these systems as:  

System
CGS-ESU $\nabla \cdot {\vec {E}}^{\text{ESU}}=4\pi \rho ^{\text{ESU}}$ $\nabla \cdot {\vec {B}}^{\text{ESU}}=0$ $\nabla \times {\vec {E}}^{\text{ESU}}=-{\dot {\vec {B}}}^{\text{ESU}}$ $\nabla \times {\vec {B}}^{\text{ESU}}=4\pi c^{-2}{\vec {J}}^{\text{ESU}}+c^{-2}{\dot {\vec {E}}}^{\text{ESU}}$ CGS-EMU $\nabla \cdot {\vec {E}}^{\text{EMU}}=4\pi c^{2}\rho ^{\text{EMU}}$ $\nabla \cdot {\vec {B}}^{\text{EMU}}=0$ $\nabla \times {\vec {E}}^{\text{EMU}}=-{\dot {\vec {B}}}^{\text{EMU}}$ $\nabla \times {\vec {B}}^{\text{EMU}}=4\pi {\vec {J}}^{\text{EMU}}+c^{-2}{\dot {\vec {E}}}^{\text{EMU}}$ CGS- Gaussian $\nabla \cdot {\vec {E}}^{\text{G}}=4\pi \rho ^{\text{G}}$ $\nabla \cdot {\vec {B}}^{\text{G}}=0$ $\nabla \times {\vec {E}}^{\text{G}}=-c^{-1}{\dot {\vec {B}}}^{\text{G}}$ $\nabla \times {\vec {B}}^{\text{G}}=4\pi c^{-1}{\vec {J}}^{\text{G}}+c^{-1}{\dot {\vec {E}}}^{\text{G}}$ CGS- Lorentz‚ÄďHeaviside $\nabla \cdot {\vec {E}}^{\text{LH}}=\rho ^{\text{LH}}$ $\nabla \cdot {\vec {B}}^{\text{LH}}=0$ $\nabla \times {\vec {E}}^{\text{LH}}=-c^{-1}{\dot {\vec {B}}}^{\text{LH}}$ $\nabla \times {\vec {B}}^{\text{LH}}=c^{-1}{\vec {J}}^{\text{LH}}+c^{-1}{\dot {\vec {E}}}^{\text{LH}}$ SI $\nabla \cdot {\vec {E}}^{\text{SI}}=\rho ^{\text{SI}}/\epsilon _{0}$ $\nabla \cdot {\vec {B}}^{\text{SI}}=0$ $\nabla \times {\vec {E}}^{\text{SI}}=-{\dot {\vec {B}}}^{\text{SI}}$ $\nabla \times {\vec {B}}^{\text{SI}}=\mu _{0}{\vec {J}}^{\text{SI}}+\mu _{0}\epsilon _{0}{\dot {\vec {E}}}^{\text{SI}}$ ### Electrostatic units (ESU)

In the electrostatic units variant of the CGS system, (CGS-ESU), charge is defined as the quantity that obeys a form of Coulomb's law without a multiplying constant (and current is then defined as charge per unit time):

$F={q_{1}^{\text{ESU}}q_{2}^{\text{ESU}} \over r^{2}}.$ The ESU unit of charge, franklin (Fr), also known as statcoulomb or esu charge, is therefore defined as follows: 

two equal point charges spaced 1 centimetre apart are said to be of 1 franklin each if the electrostatic force between them is 1 dyne.

Therefore, in CGS-ESU, a franklin is equal to a centimetre times square root of dyne:

$\mathrm {1\,Fr=1\,statcoulomb=1\,esu\;charge=1\,dyne^{1/2}{\cdot }cm=1\,g^{1/2}{\cdot }cm^{3/2}{\cdot }s^{-1}} .$ The unit of current is defined as:

$\mathrm {1\,Fr/s=1\,statampere=1\,esu\;current=1\,dyne^{1/2}{\cdot }cm{\cdot }s^{-1}=1\,g^{1/2}{\cdot }cm^{3/2}{\cdot }s^{-2}} .$ Dimensionally in the CGS-ESU system, charge q is therefore equivalent to M1/2L3/2T‚ąí1.

In CGS-ESU, all electric and magnetic quantities are dimensionally expressible terms of length, mass, and time, and none has an independent dimension. Such a system of units of electromagnetism, in which the dimensions of all electric and magnetic quantities are expressible in terms of the mechanical dimensions of mass, length, and time, is traditionally called an 'absolute system'. : 3

#### ESU notation

All electromagnetic units in ESU CGS system that do not have proper names are denoted by a corresponding SI name with an attached prefix "stat" or with a separate abbreviation "esu". 

### Electromagnetic units (EMU)

In another variant of the CGS system, electromagnetic units (EMUs), current is defined via the force existing between two thin, parallel, infinitely long wires carrying it, and charge is then defined as current multiplied by time. (This approach was eventually used to define the SI unit of ampere as well). In the EMU CGS subsystem, this is done by setting the Ampere force constant $k_{\rm {A}}=1$ , so that Amp√®re's force law simply contains 2 as an explicit prefactor.

The EMU unit of current, biot (Bi), also known as abampere or emu current, is therefore defined as follows: 

The biot is that constant current which, if maintained in two straight parallel conductors of infinite length, of negligible circular cross-section, and placed one centimetre apart in vacuum, would produce between these conductors a force equal to two dynes per centimetre of length.

Therefore, in electromagnetic CGS units, a biot is equal to a square root of dyne:

$\mathrm {1\,Bi=1\,abampere=1\,emu\;current=1\,dyne^{1/2}=1\,g^{1/2}{\cdot }cm^{1/2}{\cdot }s^{-1}}$ .

The unit of charge in CGS EMU is:

$\mathrm {1\,Bi{\cdot }s=1\,abcoulomb=1\,emu\,charge=1\,dyne^{1/2}{\cdot }s=1\,g^{1/2}{\cdot }cm^{1/2}}$ .

Dimensionally in the EMU CGS system, charge q is therefore equivalent to M1/2L1/2. Hence, neither charge nor current is an independent physical quantity in EMU CGS.

#### EMU notation

All electromagnetic units in EMU CGS system that do not have proper names are denoted by a corresponding SI name with an attached prefix "ab" or with a separate abbreviation "emu". 

### Relations between ESU and EMU units

The ESU and EMU subsystems of CGS are connected by the fundamental relationship $k_{\rm {C}}/k_{\rm {A}}=c^{2}$ (see above), where c = 29979245800 ‚Čą 3√ó1010 is the speed of light in vacuum in centimetres per second. Therefore, the ratio of the corresponding "primary" electrical and magnetic units (e.g. current, charge, voltage, etc. ‚Äď quantities proportional to those that enter directly into Coulomb's law or Amp√®re's force law) is equal either to c‚ąí1 or c: 

$\mathrm {\frac {1\,statcoulomb}{1\,abcoulomb}} =\mathrm {\frac {1\,statampere}{1\,abampere}} =c^{-1}$ and

$\mathrm {\frac {1\,statvolt}{1\,abvolt}} =\mathrm {\frac {1\,stattesla}{1\,gauss}} =c$ .

Units derived from these may have ratios equal to higher powers of c, for example:

$\mathrm {\frac {1\,statohm}{1\,abohm}} =\mathrm {\frac {1\,statvolt}{1\,abvolt}} \times \mathrm {\frac {1\,abampere}{1\,statampere}} =c^{2}$ .

### Practical CGS units

The practical CGS system is a hybrid system that uses the volt and the ampere as the unit of voltage and current respectively. Doing this avoids the inconveniently large and small quantities that arise for electromagnetic units in the esu and emu systems. This system was at one time widely used by electrical engineers because the volt and ampere had been adopted as international standard units by the International Electrical Congress of 1881.  As well as the volt and amp, the farad (capacitance), ohm (resistance), coulomb (electric charge), and henry are consequently also used in the practical system and are the same as the SI units. 

### Other variants

There were at various points in time about half a dozen systems of electromagnetic units in use, most based on the CGS system.  These include the Gaussian units and the Heaviside‚ÄďLorentz units.

## Electromagnetic units in various CGS systems

Conversion of SI units in electromagnetism to ESU, EMU, and Gaussian subsystems of CGS 
c = 29979245800
Quantity Symbol SI unit ESU unit Gaussian unit EMU unit
electric charge q 1 C ‚Čė (10‚ąí1 c) statC (Franklin) ‚Čė (10‚ąí1) abC
electric flux ő¶E 1 V‚čÖ m ‚Čė (4ŌÄ √ó 10‚ąí1 c) statC (Franklin) ‚Čė (10‚ąí1) abC
electric current I 1 A ‚Čė (10‚ąí1 c) statA (Fr‚čÖs‚ąí1) ‚Čė (10‚ąí1) Bi
electric potential / voltage ŌÜ / V, U 1 V ‚Čė (108 c‚ąí1) statV ‚Čė (108) abV
electric field E 1 V/ m ‚Čė (106 c‚ąí1) statV/ cm ‚Čė (106) abV/ cm
electric displacement field D 1 C/ m2 ‚Čė (10‚ąí5 c) statC/ cm2 (Fr/cm2) ‚Čė (10‚ąí5) abC/ cm2
electric dipole moment p 1 C‚čÖ m ‚Čė (10 c) statC‚čÖ cm ‚Čė (10) abC‚čÖ cm
magnetic dipole moment őľ 1 A‚čÖ m2 ‚Čė (103 c) statC‚čÖ cm2 ‚Čė (103) Bi‚čÖ cm2 = (103) erg/ G
magnetic B field B 1 T ‚Čė (104 c‚ąí1) statT ‚Čė (104) G
magnetic H field H 1 A/ m ‚Čė (4ŌÄ √ó 10‚ąí3 c) statA/ cm ‚Čė (4ŌÄ √ó 10‚ąí3) Oe
magnetic flux ő¶m 1 Wb ‚Čė (108 c‚ąí1) statWb ‚Čė (108) Mx
resistance R 1 ő© ‚Čė (109 c‚ąí2) s/ cm ‚Čė (109) abő©
resistivity ŌĀ 1 ő©‚čÖ m ‚Čė (1011 c‚ąí2) s ‚Čė (1011) abő©‚čÖ cm
capacitance C 1 F ‚Čė (10‚ąí9 c2) cm ‚Čė (10‚ąí9) abF
inductance L 1 H ‚Čė (109 c‚ąí2) cm‚ąí1‚čÖ s2 ‚Čė (109) abH

In this table, c = 29979245800 is the dimensionless numeric value of the speed of light in vacuum when expressed in units of centimetres per second. The symbol "‚Čė" is used instead of "=" as a reminder that the quantities are corresponding but not in general equal, even between CGS variants. For example, according to the next-to-last row of the table, if a capacitor has a capacitance of 1 F in SI, then it has a capacitance of (10‚ąí9 c2) cm in ESU; but it is incorrect to replace "1 F" with "(10‚ąí9 c2) cm" within an equation or formula. (This warning is a special aspect of electromagnetism units in CGS. By contrast, for example, it is always correct to replace "1 m" with "100 cm" within an equation or formula.)

One can think of the SI value of the Coulomb constant kC as:

$k_{\rm {C}}={\frac {1}{4\pi \epsilon _{0}}}={\frac {\mu _{0}(c/100)^{2}}{4\pi }}=10^{-7}{\rm {N}}/{\rm {A}}^{2}\cdot 10^{-4}\cdot c^{2}=10^{-11}{\rm {N}}\cdot c^{2}/{\rm {A}}^{2}.$ This explains why SI to ESU conversions involving factors of c2 lead to significant simplifications of the ESU units, such as 1 statF = 1 cm and 1 statő© = 1 s/cm: this is the consequence of the fact that in ESU system kC = 1. For example, a centimetre of capacitance is the capacitance of a sphere of radius 1 cm in vacuum. The capacitance C between two concentric spheres of radii R and r in ESU CGS system is:

${\frac {1}{{\frac {1}{r}}-{\frac {1}{R}}}}$ .

By taking the limit as R goes to infinity we see C equals r.

## Physical constants in CGS units

Commonly used physical constants in CGS units 
Constant Symbol Value
Atomic mass constant mu 1.660539066√ó10‚ąí24  g
Bohr magneton őľB 9.274010078√ó10‚ąí21  erg/ G (EMU, Gaussian)
2.780 278 00 √ó 10‚ąí10 statA‚čÖcm2 (ESU)
Boltzmann constant k 1.380649√ó10‚ąí16  erg/ K
Electron mass me 9.10938370√ó10‚ąí28  g
Elementary charge e 4.803 204 27 √ó 10‚ąí10  Fr (ESU, Gaussian)
1.602176634√ó10‚ąí20  abC (EMU)
Fine-structure constant őĪ 7.297352569√ó10‚ąí3
Gravitational constant G 6.67430√ó10‚ąí8  dyn‚čÖ cm2/ g2
Planck constant h 6.62607015√ó10‚ąí27  erg‚čÖ s
reduced Planck constant ńß 1.054571817√ó10‚ąí27  erg‚čÖ s
Speed of light in vacuum c 2.99792458√ó1010  cm/ s

While the absence of constant coefficients in the formulae expressing some relation between the quantities in some CGS subsystems simplifies some calculations, it has the disadvantage that sometimes the units in CGS are hard to define through experiment. Also, lack of unique unit names leads to a great confusion: thus "15 emu" may mean either 15 abvolts, or 15 emu units of electric dipole moment, or 15 emu units of magnetic susceptibility, sometimes (but not always) per gram, or per mole. On the other hand, SI starts with a unit of current, the ampere, that is easier to determine through experiment, but which requires extra coefficients in the electromagnetic equations. With its system of uniquely named units, the SI also removes any confusion in usage: 1 ampere is a fixed value of a specified quantity, and so are 1 henry, 1 ohm, and 1 volt.

An advantage of the Gaussian CGS system is that electric and magnetic fields have the same units, 4ŌÄőĶ0 is replaced by 1, and the only dimensional constant appearing in the Maxwell equations is c, the speed of light. The Heaviside‚ÄďLorentz system has these properties as well (with őĶ0 equaling 1), but it is a "rationalized" system (as is SI) in which the charges and fields are defined in such a way that there are fewer factors of 4ŌÄ appearing in the formulas, and it is in Heaviside‚ÄďLorentz units that the Maxwell equations take their simplest form.

In SI, and other rationalized systems (for example, Heaviside‚ÄďLorentz), the unit of current was chosen such that electromagnetic equations concerning charged spheres contain 4ŌÄ, those concerning coils of current and straight wires contain 2ŌÄ and those dealing with charged surfaces lack ŌÄ entirely, which was the most convenient choice for applications in electrical engineering. However, modern hand calculators and personal computers have eliminated this "advantage". In some fields where formulas concerning spheres are common (for example, in astrophysics), it has been argued[ by whom?] that the nonrationalized CGS system can be somewhat more convenient notationally.

Specialized unit systems are used to simplify formulas even further than either SI or CGS, by eliminating constants through some system of natural units. For example, in particle physics a system is in use where every quantity is expressed by only one unit of energy, the electronvolt, with lengths, times, and so on all converted into electronvolts by inserting factors of speed of light c and the reduced Planck constant ńß. This unit system is convenient for calculations in particle physics, but it would be considered impractical in other contexts.

## References and notes

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