Maxwell equations/Related Articles

From Citizendium
< Maxwell equations
Revision as of 15:35, 13 April 2009 by imported>Paul Wormer (New page: {{subpages}} {{r|Ampere's equation}} {{r|Ampere's law}} {{r|Ampere's rule}} {{r|Biot-Savart's law}} {{r|Coulomb's law}} {{r|Coulomb's law (magnetic)}} {{r|Faraday's law (electromagnetism)...)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigation Jump to search
This article is developing and not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
A list of Citizendium articles, and planned articles, about Maxwell equations.
See also changes related to Maxwell equations, or pages that link to Maxwell equations or to this page or whose text contains "Maxwell equations".

  • Ampere's equation [r]: An expression for the magnetic force between two electric current-carrying wire segments. [e]
  • Ampere's law [r]: The integral of a magnetic field over a closed path is equal to the conduction current through the surface bounded by the path. [e]
  • Ampere's rule [r]: Is a right-hand rule for the direction of deviation of a compass needle caused by the presence of a straight, electric-current carrying, wire. [e]
  • Biot-Savart's law [r]: Add brief definition or description
  • Coulomb's law [r]: An inverse-square distance law, like Newton's gravitational law, describing the forces acting between electric point charges; also valid for the force between magnetic poles. [e]
  • Coulomb's law (magnetic) [r]: An inverse-square law for the force between two magnetic monopoles. [e]
  • Faraday's law (electromagnetism) [r]: States that a change in magnetic flux generates an electromotive force (EMF). [e]
  • Gauss' law (electrostatics) [r]: Relates the surface integral of the electric displacement through a closed surface to the electric charge enveloped by the closed surface. [e]
  • Gauss' law (magnetism) [r]: States that the total magnetic flux through a closed surface is zero; this means that magnetic monopoles do not exist. [e]
  • Lenz' law [r]: States that a change in magnetic flux gives an induced current that opposes this change. [e]