Rotation in the plane can be concisely described in the complex plane using multiplication of complex numbers with unit modulus such that the resulting angle is given by . For example, multiplication by represents a rotation to the right by and by represents rotation to the left by . So starting with and rotating left twice gives , which is the same as rotating right twice, , and . For multiplication by multiples of , the possible positions are then concisely represented by , , , and .
The rotation symmetry operation for rotation by is denoted "." For periodic arrangements of points ("crystals"), the crystallography restriction gives the only allowable rotations as 1, 2, 3, 4, and 6.
. For example, multiplication by 
represents a rotation to the right by 
and by 
represents rotation to the left by 
. So starting with 
and rotating left twice gives 
, which is the same as rotating right twice, 
, and 
. For multiplication by multiples of 
, the possible positions are then concisely represented by 
, 
, 
, and 
. 
is denoted "
." For periodic arrangements of points ("crystals"), the crystallography restriction gives the only allowable rotations as 1, 2, 3, 4, and 6. 