Qu'est-ce (qui) est L ring - définition
L ring
The L-ring of the bacterial flagellum is the ring in the lipid outer cell membrane through which the axial filament (rod, hook, and flagellum) passes. that l ring stands for lipopolysaccharide.
Bague
 h. Nałęcz ring 2.png?width=200 "120px")
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![The fictional [[One Ring]]](https://commons.wikimedia.org/wiki/Special:FilePath/One Ring Blender Render.png?width=200 "The fictional [[One Ring]]")
![bezel]], and 4) stone or gem in setting or mounting](https://commons.wikimedia.org/wiki/Special:FilePath/Ring parts.svg?width=200 "bezel]], and 4) stone or gem in setting or mounting")
CIRCULAR BAND WORN AS A TYPE OF ORNAMENTAL JEWELLERY AROUND THE FINGER
Jewelry ring; Dinner ring; Finger ring; Bague; Finger-ring; Cocktail ring; Piece of jewelry ring; Ring (finger); Finger rings; 💍; Ring (jewelry); Penannular ring
·noun The annular molding or group of moldings dividing a long shaft or clustered column into two or more parts.
Ring (mathematics)
![[[Richard Dedekind]], one of the founders of [[ring theory]].](https://commons.wikimedia.org/wiki/Special:FilePath/Dedekind.jpeg?width=200 "[[Richard Dedekind]], one of the founders of [[ring theory]].")
![The [[integer]]s, along with the two operations of [[addition]] and [[multiplication]], form the prototypical example of a ring.](https://commons.wikimedia.org/wiki/Special:FilePath/Number-line.svg?width=200 "The [[integer]]s, along with the two operations of [[addition]] and [[multiplication]], form the prototypical example of a ring.")
ALGEBRAIC STRUCTURE IN MATHEMATICS, NOT NECESSARILY WITH MULTIPLICATIVE IDENTITY
Ring (algebra); Associative rings; Unit ring; Ring with a unit; Unital ring; Associative ring; Unitary ring; Ring (abstract algebra); Ring with unity; Ring with identity; Ring unit; Ring (math); Ring (maths); Ring mathematics; Ring maths; Ring math; Mathematical ring; Algebraic ring; Arithmetic properties; Ring with Unity; Unitary algebra; Ring axioms; Ring object; Ring of functions
In mathematics, rings are algebraic structures that generalize fields: multiplication need not be commutative and multiplicative inverses need not exist. In other words, a ring is a set equipped with two binary operations satisfying properties analogous to those of addition and multiplication of integers.
