In
mathematics,
orientation is a geometric notion that in two dimensions allows one to say when a cycle goes around clockwise or counterclockwise, and in three dimensions when a figure is left-handed or right-handed. In
linear algebra, the notion of orientation makes sense in arbitrary finite dimension. In this setting, the orientation of an
ordered basis is a kind of asymmetry that makes a
reflection impossible to replicate by means of a simple
rotation. Thus, in three dimensions, it is impossible to make the left hand of a human figure into the right hand of the figure by applying a rotation alone, but it is possible to do so by reflecting the figure in a mirror. As a result, in the three-dimensional
Euclidean space, the two possible basis orientations are called
right-handed and left-handed (or right-chiral and left-chiral).