Magnetic Flux: Difference between revisions
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== Magnetic Flux == |
== Magnetic Flux == |
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By: Jason Osborne |
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Reviewed By: Will Griffith & Wesley Brown |
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Magnetic Flux is the measure of the strength of a magnetic field over a given area. <ref>http://www.google.com/search?hl=en&safe=off&client=firefox-a&rls=org.mozilla:en-US:official&hs=lBE&defl=en&q=define:magnetic+flux&ei=gsNKS7r4EYuqsgPdmMT_Bg&sa=X&oi=glossary_definition&ct=title&ved=0CAcQkAE</ref>The Greek letter used to represent flux is Φ, phi. The SI unit for magnetic flux is the Weber. The area used must be perpendicular to the |
Magnetic Flux is the measure of the strength of a magnetic field over a given area. <ref>http://www.google.com/search?hl=en&safe=off&client=firefox-a&rls=org.mozilla:en-US:official&hs=lBE&defl=en&q=define:magnetic+flux&ei=gsNKS7r4EYuqsgPdmMT_Bg&sa=X&oi=glossary_definition&ct=title&ved=0CAcQkAE</ref>The Greek letter used to represent flux is Φ, phi. The SI unit for magnetic flux is the Weber. The area used must be perpendicular to the |
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travel of the magnetic lines. The flux can then be determined by how many magnetic lines go |
travel of[[Image:Magnetic_flux.png|right|thumb|300px|Figure 1: '''Magnetic Flux''']] the magnetic lines. The flux can then be determined by how many magnetic lines go |
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through the area surface. The net flux is the number of magnetic lines going through the area surface in one direction minus the number magnetic lines going through the surface area in the opposite direction. The |
through the area surface. The net flux is the number of magnetic lines going through the area surface in one direction minus the number magnetic lines going through the surface area in the opposite direction. The general quantitative expression for finding magnetic flux is: |
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:<math>\Phi_m = \int \!\!\!\! \int_S \mathbf{B} \cdot d\mathbf A</math> |
:<math>\Phi_m = \int \!\!\!\! \int_S \mathbf{B} \cdot d\mathbf A</math> |
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:'''B''' is the magnetic field |
:'''B''' is the magnetic field |
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:'''A''' is the surface area<ref>http://en.wikipedia.org/wiki/Magnetic_flux</ref> |
:'''A''' is the surface area<ref>http://en.wikipedia.org/wiki/Magnetic_flux</ref> |
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If specific situations arise and more variables are known the calculations for magnetic flux can become relatively simple. |
If specific situations arise and more variables are known the calculations for magnetic flux can become relatively simple. There are many ways to determine magnetic flux from a variety of equations. |
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=Using Voltage, Time, and Turns of wire= |
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where |
where |
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:'''V'''= Voltage |
:'''V'''= Voltage |
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:'''N'''= Number of Turns of wire used |
:'''N'''= Number of Turns of wire used |
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= |
=Using Magnetomotive force and the Reluctance= |
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:<math>\Phi_m = \mathbf{F_m} / \mathbf{R_m}</math> |
:<math>\Phi_m = \mathbf{F_m} / \mathbf{R_m}</math> |
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where |
where |
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:'''R_m'''= Reluctance |
:'''R_m'''= Reluctance |
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= |
=Using Ohm's Law= |
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:<math>\Phi_m = \mathbf{I} |
:<math>\Phi_m = \mathbf{I} \cdot \mathbf{L} / \mathbf{N}</math> |
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where |
where |
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:'''I'''= Current |
:'''I'''= Current |
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: '''A'''= Area of surface where density is measured |
: '''A'''= Area of surface where density is measured |
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: '''B_m'''=Magnetic Flux Density |
: '''B_m'''=Magnetic Flux Density<ref>Electric Drives an Integrated Approach,Mohan, Ned,2003</ref> |
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====References==== |
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<references/> |
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====Readers==== |
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[[Lau, Chris|Christopher Garrison Lau I]] |
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Latest revision as of 13:08, 30 April 2014
Magnetic Flux
By: Jason Osborne
Reviewed By: Will Griffith & Wesley Brown
Magnetic Flux is the measure of the strength of a magnetic field over a given area. <ref>http://www.google.com/search?hl=en&safe=off&client=firefox-a&rls=org.mozilla:en-US:official&hs=lBE&defl=en&q=define:magnetic+flux&ei=gsNKS7r4EYuqsgPdmMT_Bg&sa=X&oi=glossary_definition&ct=title&ved=0CAcQkAE</ref>The Greek letter used to represent flux is Φ, phi. The SI unit for magnetic flux is the Weber. The area used must be perpendicular to the
travel of
the magnetic lines. The flux can then be determined by how many magnetic lines go
through the area surface. The net flux is the number of magnetic lines going through the area surface in one direction minus the number magnetic lines going through the surface area in the opposite direction. The general quantitative expression for finding magnetic flux is:
where
- B is the magnetic field
- A is the surface area<ref>http://en.wikipedia.org/wiki/Magnetic_flux</ref>
If specific situations arise and more variables are known the calculations for magnetic flux can become relatively simple. There are many ways to determine magnetic flux from a variety of equations.
Using Voltage, Time, and Turns of wire
where
- V= Voltage
- T= Time
- N= Number of Turns of wire used
Using Magnetomotive force and the Reluctance
where
- F_m= Magnetomotive Force
- R_m= Reluctance
Using Ohm's Law
where
- I= Current
- L= Inductance
- N= Number of Turns of wire used<ref>http://info.ee.surrey.ac.uk/Workshop/advice/coils/terms.html</ref>
Using Area and Magnetic Flux Density
where
- A= Area of surface where density is measured
- B_m=Magnetic Flux Density<ref>Electric Drives an Integrated Approach,Mohan, Ned,2003</ref>
References
<references/>