Electricity is most commonly conducted through copper wires.
Copper has a density of and an
atomic weight of , so there are . In one
mole of any element, there are atoms (the
Avogadro number). Therefore, in of copper, there are about atoms (). Copper has one free electron per atom, so is equal to electrons per cubic metre. Assume a current , and a wire of diameter (radius = ). This wire has a cross sectional area of π × ()2 = = . The
elementary charge of an
electron is . The drift velocity therefore can be calculated: \begin{align} u &= {I \over nAe}\\ &= \frac{1 \text{C}/\text{s}}{\left(8.5 \times 10^{28} \text{m}^{-3}\right) \left(3.14 \times 10^{-6} \text{m}^2\right) \left(1.6 \times 10^{-19} \text{C}\right)}\\ &= 2.3 \times 10^{-5} \text{m}/\text{s} \end{align}
Dimensional analysis: [u] = \dfrac{\text{A}}{\dfrac{\text{electron}}{\text{m}^3}{\cdot}\text{m}^2\cdot\dfrac{\text{C}}{\text{electron}}} = \dfrac{\dfrac{\text{C}}{\text{s}}}{\dfrac{1}{\text{m}}{\cdot}\text{C}} = \dfrac{\text{m}}{\text{s}} Therefore, in this wire, the electrons are flowing at the rate of . At 60Hz
alternating current, this means that, within half a cycle (1/120th sec.), on average the electrons drift less than 0.2 μm. In context, at one ampere around electrons will flow across the contact point twice per cycle. But out of around movable electrons per meter of wire, this is an insignificant fraction. By comparison, the Fermi flow velocity of these electrons (which, at
room temperature, can be thought of as their approximate velocity in the absence of electric current) is around . ==See also==