In crystallography , the triclinic (or anorthic ) crystal system is one of the seven crystal systems . A crystal system is described by three basis vectors . In the triclinic system, the crystal is described by vectors of unequal length, as in the orthorhombic system. In addition, the angles between these vectors must all be different and may not include 90°.
3-406: Pedion may refer to: Pedion, a triclinic crystal form having a single face Mitsubishi Pedion , a subnotebook released in 1998 Topics referred to by the same term [REDACTED] This disambiguation page lists articles associated with the title Pedion . If an internal link led you here, you may wish to change the link to point directly to
6-451: The intended article. Retrieved from " https://en.wikipedia.org/w/index.php?title=Pedion&oldid=1230819232 " Category : Disambiguation pages Hidden categories: Short description is different from Wikidata All article disambiguation pages All disambiguation pages Triclinic crystal system The triclinic lattice is the least symmetric of the 14 three-dimensional Bravais lattices . It has (itself)
9-491: The minimum symmetry all lattices have: points of inversion at each lattice point and at 7 more points for each lattice point: at the midpoints of the edges and the faces, and at the center points. It is the only lattice type that itself has no mirror planes. The triclinic crystal system class names, examples, Schönflies notation , Hermann-Mauguin notation , point groups, International Tables for Crystallography space group number, orbifold , type, and space groups are listed in
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