Ver"sor (?), n. [NL., fr. L. vertere,
versus, to turn. See Version.] (Geom.) The
turning factor of a quaternion.
&fist; The change of one vector into another is considered in
quaternions as made up of two operations; 1st, the rotation of the first
vector so that it shall be parallel to the second; 2d, the change of length
so that the first vector shall be equal to the second. That which expresses
in amount and kind the first operation is a versor, and is denoted
geometrically by a line at right angles to the plane in which the rotation
takes place, the length of this line being proportioned to the amount of
rotation. That which expresses the second operation is a tensor. The
product of the versor and tensor expresses the total operation, and is
called a quaternion. See Quaternion.
Quadrantal versor. See under
Quadrantal.
Ver"sor (?), n. [NL., fr. L. vertere,
versus, to turn. See Version.] (Geom.) The
turning factor of a quaternion.
&fist; The change of one vector into another is considered in
quaternions as made up of two operations; 1st, the rotation of the first
vector so that it shall be parallel to the second; 2d, the change of length
so that the first vector shall be equal to the second. That which expresses
in amount and kind the first operation is a versor, and is denoted
geometrically by a line at right angles to the plane in which the rotation
takes place, the length of this line being proportioned to the amount of
rotation. That which expresses the second operation is a tensor. The
product of the versor and tensor expresses the total operation, and is
called a quaternion. See Quaternion.
Quadrantal versor. See under
Quadrantal.
