Electric potential
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Electric potential is the potential energy per unit of charge associated with a static (time-invariant) electric field, also called the electrostatic potential, typically measured in volts.
There is also a generalized electric scalar potential that is used in electrodynamics when time-varying electromagnetic fields are present. This generalized electric potential cannot be simply interpreted as a potential energy, however.
Explanation
Electric potential may be conceived of as "electric pressure". Where this "pressure" is uniform, nothing happens, just as we do not feel the atmospheric pressure at sea level. However, where the pressure varies, it produces a force that can push charged objects to different locations.
Mathematically, it is the potential φ (a scalar field) associated with the conservative electric field E (E = −∇φ) that occurs when the magnetic field is time invariant (so that ∇ × E = 0 from Faraday's law of induction).
Like any potential function, only the potential difference (voltage) between two points is physically meaningful (neglecting quantum Aharonov-Bohm effects), since any constant can be added to φ without affecting E.
The electric potential is therefore measured in units of energy per unit of electric charge. In SI units, this is:
The electric potential can also be generalized to handle situations with time-varying potential fields, in which case the electric field is not conservative and a potential function cannot be defined everywhere in space. There, an effective potential drop is included, associated with the inductance of the circuit. This generalized potential difference is also called the electromotive force (emf).
Introduction
Objects may possess a property known as electric charge. An electric field exerts a force on charged objects, accelerating them in the direction of the force. This force has the same direction as the electric field vector, and its magnitude is given by the size of the charge multiplied with the magnitude of the electric field.Classical mechanics explores the concepts such as force, energy, potential etc. in more detail.
Force and potential energy are directly related. As an object moves in the direction that the force accelerates it, its potential energy decreases. For example, the gravitational potential energy of a cannonball at the top of a hill is greater than at the base of the hill. As the object falls, that potential energy decreases and is translated to motion, or inertial energy.
For certain forces, it is possible to define the "potential" of a field such that the potential energy of an object due to a field is dependent only on the position of the object with respect to the field. Those forces must affect objects depending only on the intrinsic properties of the object and the position of the object, and obey certain other mathematical rules.
Two such forces are the gravitational force (gravity) and the electric force in the absence of time-varying magnetic fields. The potential of an electric field is called the electric potential.
The electric potential and the magnetic vector potential together form a four vector, so that the two kinds of potential is mixed under Lorentz transformations.
Mathematical introduction
The concept of electric potential (denoted by: [\phi], [\phi_\mathrm] or V) is closely linked with potential energy, thus:
- [U_ \mathrm = q\phi]
The proper definition of the electric potential uses the electric field E:
- [\phi_ \mathrm = - \int_C \mathbf \cdot \mathrm \mathbf]
- [\mathbf = - \nabla \phi_\mathrm]
- [\nabla \cdot \mathbf = \nabla \cdot \left (- \nabla \phi_\mathrm \right ) = -\nabla^2 \phi_\mathrm = \rho / \varepsilon_0]
Note: these equations cannot be used and if [\nabla\times\mathbf E \ne 0], i.e., in the case of a nonconservative electric field (caused by a changing magnetic field; see Maxwell's equations). The generalization of electric potential to this case is described below.
Generalization to electrodynamics
When time-varying magnetic fields are present (which is true whenever there are time-varying electric fields and vice versa), one cannot describe the electric field simply in terms of a scalar potential φ because the electric field is no longer conservative: [\int \mathbf\cdot d\mathbf] is path-dependent because [\nabla\times\mathbf\neq 0].
Instead, one can still define a scalar potential by also including the magnetic vector potential A. In particular, A is defined by:
- [\mathbf = \nabla \times \mathbf]
- [\mathbf = -\nabla\phi - \frac}]
The electrostatic potential is simply the special case of this definition where A is time-invariant. On the other hand, for time-varying fields, note that [\int_a^b \mathbf \cdot d\mathbf \neq \phi(a) - \phi(b)], unlike electrostatics.
Note that this definition of φ depends on the gauge choice for the vector potential A (the gradient of any scalar field can be added to A without changing B). One choice is the Coulomb gauge, in which we choose [\nabla \cdot \mathbf = 0]. In this case, we obtain [-\nabla^2 \phi = \rho/\varepsilon_0], where ρ is the charge density, just as for electrostatics. Another common choice is the Lorenz gauge, in which we choose A to satisfy [\nabla \cdot \mathbf = - \frac \frac].
Special cases and computational devices
The electric potential at a point [\mathbf] due to a constant electric field [\mathbf] can be shown to be:
- [\phi_\mathrm = - \mathbf \cdot \mathbf]
- [\phi_\mathbf = \frac ]
The electric potential created by a tridimensional spherically symmetric gaussian charge density [ \rho(r) ] given by:
- [ \rho(r) = \frac^3}\,e^},]
- [\nabla^2 \phi_\mathbf = - 4 \pi \rho.]
- [ \phi_\mathbf(r) = \frac\,\mbox\left(\frac\sigma}\right)]
Applications in electronics
This electric potential, typically measured in volts, provides a simple way to analyze electric circuits without requiring detailed knowledge of the circuit shape or the fields within it.The electric potential provides a simple way to analyze electrical networks with the help of Kirchhoff's voltage law, without solving the detailed Maxwell's equations for the fields of the circuit.
Units
The SI unit of electric potential is the volt, which is so widely used that the terms voltage and electric potential are almost synonymous. Older units are rarely used nowadays. Variants of the centimeter gram second system of units (which see for further information) included a number of different units for electric potential, including the abvolt and the statvolt.
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