The " improper rotation" term refers to isometries that reverse (flip) the orientation. But a (proper) rotation also has to preserve the orientation structure. See the article below for details.ĭefinitions and representations In Euclidean geometry įurther information: Euclidean space § Rotations and reflections, and Special orthogonal group A plane rotation around a point followed by another rotation around a different point results in a total motion which is either a rotation (as in this picture), or a translation.Ī motion of a Euclidean space is the same as its isometry: it leaves the distance between any two points unchanged after the transformation. The former are sometimes referred to as affine rotations (although the term is misleading), whereas the latter are vector rotations. Rotations of (affine) spaces of points and of respective vector spaces are not always clearly distinguished. This meaning is somehow inverse to the meaning in the group theory. The axis (where present) and the plane of a rotation are orthogonal.Ī representation of rotations is a particular formalism, either algebraic or geometric, used to parametrize a rotation map. Unlike the axis, its points are not fixed themselves. The plane of rotation is a plane that is invariant under the rotation.The axis of rotation is a line of its fixed points.The rotation group is a point stabilizer in a broader group of (orientation-preserving) motions. This (common) fixed point or center is called the center of rotation and is usually identified with the origin. The rotation group is a Lie group of rotations about a fixed point. These two types of rotation are called active and passive transformations. For example, in two dimensions rotating a body clockwise about a point keeping the axes fixed is equivalent to rotating the axes counterclockwise about the same point while the body is kept fixed. But in mechanics and, more generally, in physics, this concept is frequently understood as a coordinate transformation (importantly, a transformation of an orthonormal basis), because for any motion of a body there is an inverse transformation which if applied to the frame of reference results in the body being at the same coordinates. All rotations about a fixed point form a group under composition called the rotation group (of a particular space). Rotation can have a sign (as in the sign of an angle): a clockwise rotation is a negative magnitude so a counterclockwise turn has a positive magnitude.Ī rotation is different from other types of motions: translations, which have no fixed points, and (hyperplane) reflections, each of them having an entire ( n − 1)-dimensional flat of fixed points in a n- dimensional space. It can describe, for example, the motion of a rigid body around a fixed point. Any rotation is a motion of a certain space that preserves at least one point. Rotation in mathematics is a concept originating in geometry. Rotation of an object in two dimensions around a point O. JSTOR ( February 2014) ( Learn how and when to remove this template message).Unsourced material may be challenged and removed.įind sources: "Rotation" mathematics – news Please help improve this article by adding citations to reliable sources. This article needs additional citations for verification.
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