Difference between revisions of "Maxwell's Equations"

Latest revision as of 02:52, 6 April 2007

In Free Space

These are the Maxwell's Equations we will be using to solve for regions "I" and "II" in our approximation of the Michelson interferometer.

Gauss' Law:	Gauss' Law for Magnetism:
${\boldsymbol {\nabla \cdot E}}=0$	${\boldsymbol {\nabla \cdot B}}=0$

Faradays's Law:	Ampere's Law:
${\boldsymbol {\nabla \times E}}+{\frac {\partial {\boldsymbol {B}}}{\partial t}}=0$	${\boldsymbol {\nabla \times B}}-\mu _{0}\epsilon _{0}{\frac {\partial {\boldsymbol {E}}}{\partial t}}=0$

In the Presence of Charges and Dielectric Media

Gauss' Law:	Gauss' Law for Magnetism:
${\boldsymbol {\nabla \cdot D}}=\rho$	${\boldsymbol {\nabla \cdot B}}=0$

Faradays's Law:	Ampere's Law:
${\boldsymbol {\nabla \times E}}+{\frac {\partial {\boldsymbol {B}}}{\partial t}}=0$	${\boldsymbol {\nabla \times H}}-{\frac {\partial {\boldsymbol {D}}}{\partial t}}={\boldsymbol {j}}$

Where ${\boldsymbol {D}}=\epsilon _{0}{\boldsymbol {E}}$ and ${\boldsymbol {B}}=\mu _{0}{\boldsymbol {H}}$ .

@@ Line 3: / Line 3: @@
 These are the Maxwell's Equations we will be using to solve for regions "I" and "II" in our approximation of the Michelson interferometer.
-Gauss' Law:
+{|align=center
+|Gauss' Law:
+|Gauss' Law for Magnetism:
+|-
+|<math>\boldsymbol{\nabla \cdot E} = 0 </math>
+|<math>\boldsymbol{\nabla \cdot B} = 0</math>
+|-
+|height="20"|&nbsp;||&nbsp;
+|-
+|Faradays's Law:
+|Ampere's Law:
+|-
+|width="400"|<math>\boldsymbol{\nabla \times E} + \frac{\partial \boldsymbol{B}}{\partial t}= 0</math>
+|width="400"|<math>\boldsymbol{\nabla \times B} - \mu_0\epsilon_0\frac{\partial \boldsymbol{E}}{\partial t}= 0 </math>
+|}
-<math>\boldsymbol{\nabla \cdot E} = 0 </math>
+== In the Presence of Charges and Dielectric Media ==
-Gauss' Law for Magnetism:
+{|align=center
+|Gauss' Law:
+|Gauss' Law for Magnetism:
+|-
+|<math>\boldsymbol{\nabla \cdot D} = \rho </math>
+|<math>\boldsymbol{\nabla \cdot B} = 0</math>
+|-
+|height="20"|&nbsp;||&nbsp;
+|-
+|Faradays's Law:
+|Ampere's Law:
+|-
+|width="400"|<math>\boldsymbol{\nabla \times E} + \frac{\partial \boldsymbol{B}}{\partial t}= 0</math>
+|width="400"|<math>\boldsymbol{\nabla \times H} - \frac{\partial \boldsymbol{D}}{\partial t}= \boldsymbol{j} </math>
+|}
-<math>\boldsymbol{\nabla \cdot B} = 0</math>
-Faradays's Law:
+Where <math>\boldsymbol{D} = \epsilon_0 \boldsymbol{E}</math> and <math>\boldsymbol{B} = \mu_0 \boldsymbol{H}</math>.
-<math>\boldsymbol{\nabla \times E} + \frac{\partial \boldsymbol{B}}{\partial t}= 0</math>
-Ampere's Law:
-<math>\boldsymbol{\nabla \times B} - \mu_0\epsilon_0\frac{\partial \boldsymbol{E}}{\partial t}= 0 </math>
-Need to add possibly derivation of wave equation and definitely Maxwell's equation in presence
-Gauss' Law:
-<math>\boldsymbol{\nabla \cdot D} = \rho </math>
-Gauss' Law for Magnetism:
-<math>\boldsymbol{\nabla \cdot B} = 0</math>
-Faradays's Law:
-<math>\boldsymbol{\nabla \times E} + \frac{\partial \boldsymbol{B}}{\partial t}= 0</math>
-Ampere's Law:
-<math>\boldsymbol{\nabla \times B} - \mu_0\epsilon_0\frac{\partial \boldsymbol{E}}{\partial t}= 0 </math>
-Back to [[Mapping diamond surfaces using interference]]

Difference between revisions of "Maxwell's Equations"

Latest revision as of 02:52, 6 April 2007

In Free Space

In the Presence of Charges and Dielectric Media

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