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centrosymmetric

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Definitions of centrosymmetric in various dictionaries:

adj - having a symmetrical arrangement of radiating parts about a central point

CENTROSYMMETRIC - In crystallography, a point group which contains an inversion center as one of its symmetry elements is centrosymmetric. In such a point group, for e...

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Having a centre of symmetry
having a symmetrical arrangement of radiating parts about a central point
(Of a matrix or other array of numbers) having identical entries in positions that are symmetric about the centre.
(Chiefly Crystallography) of, relating to, or exhibiting centrosymmetry.

Centrosymmetric might refer to
In crystallography, a point group which contains an inversion center as one of its symmetry elements is centrosymmetric. In such a point group, for every point (x, y, z) in the unit cell there is an indistinguishable point (-x, -y, -z). Such point groups are also said to have inversion symmetry. Point reflection is a similar term used in geometry. * Crystals with an inversion center cannot display certain properties, such as the piezoelectric effect. * The following space groups have inversion symmetry: the triclinic space group 2, the monoclinic 10-15, the orthorhombic 47-74, the tetragonal 83-88 and 123-142, the trigonal 147, 148 and 162-167, the hexagonal 175, 176 and 191-194, the cubic 200-206 and 221-230.Point groups lacking an inversion center (non-centrosymmetric) can be polar, chiral , both or neither. * A polar point group is whose symmetry operations leave more than one common point unmoved. A polar point group has no unique origin because each of those unmoved points can be chose

Centrosymmetric might refer to

In crystallography, a point group which contains an inversion center as one of its symmetry elements is centrosymmetric. In such a point group, for every point (x, y, z) in the unit cell there is an indistinguishable point (-x, -y, -z). Such point groups are also said to have inversion symmetry. Point reflection is a similar term used in geometry.
* Crystals with an inversion center cannot display certain properties, such as the piezoelectric effect.
* The following space groups have inversion symmetry: the triclinic space group 2, the monoclinic 10-15, the orthorhombic 47-74, the tetragonal 83-88 and 123-142, the trigonal 147, 148 and 162-167, the hexagonal 175, 176 and 191-194, the cubic 200-206 and 221-230.Point groups lacking an inversion center (non-centrosymmetric) can be polar, chiral , both or neither.
* A polar point group is whose symmetry operations leave more than one common point unmoved. A polar point group has no unique origin because each of those unmoved points can be chose

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