- Circular symmetry
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Circular symmetry in mathematical physics applies to a 2-dimensional field which can be expressed as a function of distance from a central point only.[citation needed] This means that all points on each circle take the same value.
An example would be magnetic field intensity in a plane perpendicular to a current-carrying wire. A pattern with circular symmetry would consist of concentric circles.
The 3-dimensional equivalent term is spherical symmetry. A scalar field has spherical symmetry if it depends on the distance to the origin only, such as the potential of a central force. A vector field has spherical symmetry if it is in radially inward or outward direction with a magnitude and orientation (inward/outward)[citation needed] depending on the distance to the origin only, such as a central force.
See also
- Rotational symmetry
- Particle in a spherically symmetric potential
- Gauss's theorem
Categories:- Symmetry
- Rotation (geometry)
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