Formulae

By definition, 36 AWG is 0.005 inches in diameter, and 0000 AWG is 0.46 inches in diameter. The ratio of these diameters is 1:92, and there are 40 gauge sizes from 36 to 0000, or 39 steps. Because each successive gauge number increases cross sectional area by a constant multiple, diameters vary geometrically. Any two successive gauges (e.g., A and B) have diameters whose ratio (dia. B ÷ dia. A) is ${\displaystyle {\sqrt[{39}]{92}}}$ (approximately 1.12293), while for gauges two steps apart (e.g., A, B, and C), the ratio of the C to A is about 1.12293² ≈ 1.26098. Similarly for gauges n steps apart the ratio of the first to last gauges is about 1.12293ⁿ.

The diameter of an AWG wire is determined according to the following formula:

${\displaystyle d_{n}=0.005~\mathrm {inch} \times 92^{(36-n)/39}=0.127~\mathrm {mm} \times 92^{(36-n)/39}}$

(where n is the AWG size for gauges from 36 to 0, n = −1 for 00, n = −2 for 000, and n = −3 for 0000. See below for rule.)

or equivalently:

${\displaystyle d_{n}=e^{-1.12436-0.11594n}\ \mathrm {inch} =e^{2.1104-0.11594n}\ \mathrm {mm} }$

The gauge can be calculated from the diameter using ^[2]

${\displaystyle n=-39\log _{92}\left({\frac {d_{n}}{0.005~\mathrm {inch} }}\right)+36=-39\log _{92}\left({\frac {d_{n}}{0.127~\mathrm {mm} }}\right)+36}$

and the cross-section area is

${\displaystyle A_{n}={\frac {\pi }{4}}d_{n}^{2}\approx 0.000019635~\mathrm {inch} ^{2}\times 92^{(36-n)/19.5}\approx 0.012668~\mathrm {mm} ^{2}\times 92^{(36-n)/19.5}}$.

The standard ASTM B258-02 (2008), Standard Specification for Standard Nominal Diameters and Cross-Sectional Areas of AWG Sizes of Solid Round Wires Used as Electrical Conductors, defines the ratio between successive sizes to be the 39th root of 92, or approximately 1.1229322.^[3] ASTM B258-02 also dictates that wire diameters should be tabulated with no more than 4 significant figures, with a resolution of no more than 0.0001 inches (0.1 mils) for wires thicker than 44 AWG, and 0.00001 inches (0.01 mils) for wires 45 AWG and thinner.

Sizes with multiple zeros are successively thicker than 0 AWG and can be denoted using "number of zeros/0", for example 4/0 AWG for 0000 AWG. For an m/0 AWG wire, use n = −(m − 1) = 1 − m in the above formulas. For instance, for 0000 AWG or 4/0 AWG, use n = −3.

Pronunciation

AWG is colloquially referred to as gauge and the zeros in thick wire sizes are referred to as aught /ˈɔːt/. Wire sized 1 AWG is referred to as "one gauge" or "No. 1" wire; similarly, thinner sizes are pronounced "x gauge" or "No. x" wire, where x is the positive-integer AWG number. Consecutive AWG wire sizes thicker than No. 1 wire are designated by the number of zeros:

• No. 0, often written 1/0 and referred to as "one aught" wire
• No. 00, often written 2/0 and referred to as "two aught" wire
• No. 000, often written 3/0 and referred to as "three aught" wire

and so on.