User:John R. Brews/Sample: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>John R. Brews
imported>John R. Brews
Line 16: Line 16:
:<math>\mathbf F = -e \left( \mathbf {v \times B} \right) \ , </math>
:<math>\mathbf F = -e \left( \mathbf {v \times B} \right) \ , </math>


where ''e'' is the [[Elementary charge|electron charge]] and '''v''' is the electron velocity. This force upon the electrons is communicated to the wire loop because the electrons cannot escape the wire, and so exert a force upon it. The electrons at the top of the loop move oppositely to those at the bottom, so the force at the top is opposite in direction to that at the bottom. If the magnetic field is in the plane of the loop, the forces are normal to this plane, causing a torque upon the loop tending to turn the loop about the direction of the field.<ref name=motor>
where ''e'' is the [[Elementary charge|electron charge]] and '''v''' is the electron velocity. This force upon the electrons is communicated to the wire loop because the electrons cannot escape the wire, and so exert a force upon it. The electrons at the top of the loop move oppositely to those at the bottom, so the force at the top is opposite in direction to that at the bottom. If the magnetic field is in the plane of the loop, the forces are normal to this plane, causing a torque upon the loop tending to turn the loop about an axis along the direction of the field.<ref name=motor>


For a discussion of the operation of a motor based upon the Lorentz force, see for example, {{cite book |title=Drives and Control for Industrial Automation |author=Kok Kiong Tan, Andi Sudjana Putra |url=http://books.google.com/books?id=auGLxYZlvX4C&pg=PA48 |pages=pp. 48 ''ff'' |isbn=1848824246 |year=2010 |publisher=Springer}}
For a discussion of the operation of a motor based upon the Lorentz force, see for example, {{cite book |title=Drives and Control for Industrial Automation |author=Kok Kiong Tan, Andi Sudjana Putra |url=http://books.google.com/books?id=auGLxYZlvX4C&pg=PA48 |pages=pp. 48 ''ff'' |isbn=1848824246 |year=2010 |publisher=Springer}}

Revision as of 18:22, 18 December 2010


Magnetic moment

In physics, the magnetic moment of an object is a vector property, denoted here as m, that determines the torque, denoted here by τ, it experiences in a magnetic flux density B, namely τ = m × B (where × denotes the vector cross product). As such, it also determines the change in potential energy of the object, denoted here by U, when it is introduced to this flux, namely U = −m·B.[1]

Origin

A magnetic moment may have a macroscopic origin in a bar magnet or a current loop, for example, or microscopic origin in the spin of an elementary particle like an electron, or in the angular momentum of an atom.

Macroscopic examples

The electric motor is based upon the torque experienced by a current loop in a magnetic field. The basic idea is that the current in the loop is made up of moving electrons, which are subect to the Lorentz force F in a magnetic field:

where e is the electron charge and v is the electron velocity. This force upon the electrons is communicated to the wire loop because the electrons cannot escape the wire, and so exert a force upon it. The electrons at the top of the loop move oppositely to those at the bottom, so the force at the top is opposite in direction to that at the bottom. If the magnetic field is in the plane of the loop, the forces are normal to this plane, causing a torque upon the loop tending to turn the loop about an axis along the direction of the field.[2]

Microscopic examples

At a fundamental level, magnetic moment is related to the angular momentum of fundamental particles. In this discussion, focus is upon the electron and the atom.

Notes

  1. V. P. Bhatnagar (1997). A Complete Course in ISC Physics. Pitambar Publishing, p. 246. ISBN 8120902025. 
  2. For a discussion of the operation of a motor based upon the Lorentz force, see for example, Kok Kiong Tan, Andi Sudjana Putra (2010). Drives and Control for Industrial Automation. Springer, pp. 48 ff. ISBN 1848824246.