Ohm's law: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Pat Palmer
(adding Engineering category)
mNo edit summary
 
(9 intermediate revisions by 6 users not shown)
Line 1: Line 1:
'''Ohm's law''' is the name of the relationship between [[current density]] and [[electric field]] of some materials (especially metals), discovered by [[Georg Simon Ohm]] in 1826. The law states that at a given temperature and given certain materials, the current density <math>\vec J</math> in a [[conductor]] is almost directly proportional to the electric field <math>\vec E</math>. In addition, the [[ratio]] of the magnitudes <math>E</math> and <math>J</math> is constant.
{{subpages}}


== Resistivity ==
'''Ohm's law''' is the name of the relationship between an electric current (denoted by ''I'') flowing through a conductor and the voltage difference ''V'' between the ends of the conductor causing the current,
:<math>
V = I R,\,
</math>
where ''R'' is the [[resistance]] of the conductor. The law was discovered by [[Georg Simon Ohm]] in 1826. Ohm's equation implies that ''R'' is constant, i.e., independent of ''V''. While a [[resistor]] is an ohmic conductor, a [[semiconductor]] [[diode]] is not, as its resistance varies with the voltage applied.


Ohm's law is used to define the [[resistivity]] of a material or a conductor. The equation for Ohm's law is
Ohm's law was generalized to the proportionality of [[current density]] <math>\vec J</math> and [[electric field]] <math>\vec E</math> that is observed in many materials (especially metals),
:<math>
J_\alpha = \sum_{\beta=x,y,z} \sigma_{\alpha \beta}\, E_\beta, \qquad\alpha=x,y,z .
</math>
The symmetric [[tensor]] '''&sigma;''' is the [[conductivity]] tensor, which in general depends on  temperature and is specific for the material. For homogeneous and isotropic materials  the tensor is a real number &sigma;<sub>0</sub>  times a 3&times;3 [[identity matrix]]. The scalar &sigma;<sub>0</sub> is the [[conductivity coefficient]]  and is the inverse of the [[resistivity]]  &rho; of the (isotropic) material,
:<math>
\rho = \frac{E}{J} = \frac{1}{\sigma_0}.
</math>


 
==Reference==
<math>\rho = \frac{E}{J}</math>
*H.D. Young & R.A. Freedman (2004). ''University Physics 11th Edition. International Edition''. Addison Wesley, ISBN 0-321-20469-7[[Category:Suggestion Bot Tag]]
 
 
where <math>\rho</math> is the resistivity of the material.
 
== Ohm's law in circuit theory ==
 
In circuit theory, Ohm's law often refers to the relationship between [[voltage]], [[current]] and [[resistance]]. This relationship is mathematically expressed as
 
 
<math>R = \frac{V}{I}</math>
 
 
where <math>R</math> is the resistance of the conductor, <math>V</math> is the potential difference between the ends of the conductor and <math>I</math> is the current through the conductor.
 
The validity of the equation requires that the resistance of the conductor is constant, implying that the resistivity is constant. While a [[resistor]] is an ohmic conductor, a [[semiconductor]] [[diode]] is not as its resistance varies with the voltage applied.
 
[[Category:CZ Engineering Workgroup]]
[[Category:CZ Live]]

Latest revision as of 06:01, 28 September 2024

This article is developing and not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

Ohm's law is the name of the relationship between an electric current (denoted by I) flowing through a conductor and the voltage difference V between the ends of the conductor causing the current,

where R is the resistance of the conductor. The law was discovered by Georg Simon Ohm in 1826. Ohm's equation implies that R is constant, i.e., independent of V. While a resistor is an ohmic conductor, a semiconductor diode is not, as its resistance varies with the voltage applied.

Ohm's law was generalized to the proportionality of current density and electric field that is observed in many materials (especially metals),

The symmetric tensor σ is the conductivity tensor, which in general depends on temperature and is specific for the material. For homogeneous and isotropic materials the tensor is a real number σ0 times a 3×3 identity matrix. The scalar σ0 is the conductivity coefficient and is the inverse of the resistivity ρ of the (isotropic) material,

Reference

  • H.D. Young & R.A. Freedman (2004). University Physics 11th Edition. International Edition. Addison Wesley, ISBN 0-321-20469-7