Generally, an object with 'rotational symmetry' also known in biological contexts as 'radial symmetry', is an object that looks the same after a certain amount of rotation. An object may have more than one rotational symmetry; for instance, if reflections or turning it over are not counted. The degree of rotational symmetry is how many degrees the shape has to be turned to look the same on a different side or vertex. It cannot be the same side or vertex.
Contents

Formal treatment 1

nfold rotational symmetry 1.1

Examples 1.2

Multiple symmetry axes through the same point 1.3

Rotational symmetry with respect to any angle 1.4

Rotational symmetry with translational symmetry 1.5

See also 2

References 3

External links 4
Formal treatment
Formally the rotational symmetry is symmetry with respect to some or all rotations in mdimensional Euclidean space. Rotations are direct isometries, i.e., isometries preserving orientation. Therefore a symmetry group of rotational symmetry is a subgroup of E^{+}(m) (see Euclidean group).
Symmetry with respect to all rotations about all points implies translational symmetry with respect to all translations, so space is homogeneous, and the symmetry group is the whole E(m). With the modified notion of symmetry for vector fields the symmetry group can also be E^{+}(m).
For symmetry with respect to rotations about a point we can take that point as origin. These rotations form the special orthogonal group SO(m), the group of m×m orthogonal matrices with determinant 1. For m = 3 this is the rotation group SO(3).
In another meaning of the word, the rotation group of an object is the symmetry group within E^{+}(n), the group of direct isometries; in other words, the intersection of the full symmetry group and the group of direct isometries. For chiral objects it is the same as the full symmetry group.
Laws of physics are SO(3)invariant if they do not distinguish different directions in space. Because of Noether's theorem, rotational symmetry of a physical system is equivalent to the angular momentum conservation law.
nfold rotational symmetry
Rotational symmetry of order n, also called nfold rotational symmetry, or discrete rotational symmetry of the nth order, with respect to a particular point (in 2D) or axis (in 3D) means that rotation by an angle of 360°/n (180°, 120°, 90°, 72°, 60°, 51 ^{3}⁄_{7}°, etc.) does not change the object. Note that "1fold" symmetry is no symmetry, and "2fold" is the simplest symmetry, so it does not mean "more than basic".
The notation for nfold symmetry is C_{n} or simply "n". The actual symmetry group is specified by the point or axis of symmetry, together with the n. For each point or axis of symmetry the abstract group type is cyclic group Z_{n} of order n. Although for the latter also the notation C_{n} is used, the geometric and abstract C_{n} should be distinguished: there are other symmetry groups of the same abstract group type which are geometrically different, see cyclic symmetry groups in 3D.
The fundamental domain is a sector of 360°/n.
Examples without additional reflection symmetry:

n = 2, 180°: the dyad; among the quadrilaterals, the parallelograms, which have this as a fully identifying (necessary and sufficient) feature; letters Z, N, S; the outlines, albeit not the colors, of the yin and yang symbol; the Union Flag (as divided along the flag's diagonal and rotated about the flag's center point)

n = 3, 120°: triad, triskelion, Borromean rings; sometimes the term trilateral symmetry is used;

n = 4, 90°: tetrad, swastika

n = 6, 60°: hexad, Star of David

n = 8, 45°: octad, Octagonal muqarnas, computergenerated (CG), ceiling
C_{n} is the rotation group of a regular nsided polygon in 2D and of a regular nsided pyramid in 3D.
If there is e.g. rotational symmetry with respect to an angle of 100°, then also with respect to one of 20°, the greatest common divisor of 100° and 360°.
A typical 3D object with rotational symmetry (possibly also with perpendicular axes) but no mirror symmetry is a propeller.
Examples
Multiple symmetry axes through the same point
For discrete symmetry with multiple symmetry axes through the same point, there are the following possibilities:

In addition to an nfold axis, n perpendicular 2fold axes: the dihedral groups D_{n} of order 2n (n ≥ 2). This is the rotation group of a regular prism, or regular bipyramid. Although the same notation is used, the geometric and abstract D_{n} should be distinguished: there are other symmetry groups of the same abstract group type which are geometrically different, see dihedral symmetry groups in 3D.

4×3fold and 3×2fold axes: the rotation group T of order 12 of a regular tetrahedron. The group is isomorphic to alternating group A_{4}.

3×4fold, 4×3fold, and 6×2fold axes: the rotation group O of order 24 of a cube and a regular octahedron. The group is isomorphic to symmetric group S_{4}.

6×5fold, 10×3fold, and 15×2fold axes: the rotation group I of order 60 of a dodecahedron and an icosahedron. The group is isomorphic to alternating group A_{5}. The group contains 10 versions of D_{3} and 6 versions of D_{5} (rotational symmetries like prisms and antiprisms).
In the case of the Platonic solids, the 2fold axes are through the midpoints of opposite edges, the number of them is half the number of edges. The other axes are through opposite vertices and through centers of opposite faces, except in the case of the tetrahedron, where the 3fold axes are each through one vertex and the center of one face.
Rotational symmetry with respect to any angle
Rotational symmetry with respect to any angle is, in two dimensions, circular symmetry. The fundamental domain is a halfline.
In three dimensions we can distinguish cylindrical symmetry and spherical symmetry (no change when rotating about one axis, or for any rotation). That is, no dependence on the angle using cylindrical coordinates and no dependence on either angle using spherical coordinates. The fundamental domain is a halfplane through the axis, and a radial halfline, respectively. Axisymmetric or axisymmetrical are adjectives which refer to an object having cylindrical symmetry, or axisymmetry. An example of approximate spherical symmetry is the Earth (with respect to density and other physical and chemical properties).
In 4D, continuous or discrete rotational symmetry about a plane corresponds to corresponding 2D rotational symmetry in every perpendicular plane, about the point of intersection. An object can also have rotational symmetry about two perpendicular planes, e.g. if it is the Cartesian product of two rotationally symmetry 2D figures, as in the case of e.g. the duocylinder and various regular duoprisms.
Rotational symmetry with translational symmetry
Arrangement within a primitive cell of 2 and 4fold rotocenters. A fundamental domain is indicated in yellow.

Arrangement within a primitive cell of 2, 3, and 6fold rotocenters, alone or in combination (consider the 6fold symbol as a combination of a 2 and a 3fold symbol); in the case of 2fold symmetry only, the shape of the parallelogram can be different. For the case p6, a fundamental domain is indicated in yellow.

2fold rotational symmetry together with single translational symmetry is one of the Frieze groups. There are two rotocenters per primitive cell.
Together with double translational symmetry the rotation groups are the following wallpaper groups, with axes per primitive cell:

p2 (2222): 4×2fold; rotation group of a parallelogrammic, rectangular, and rhombic lattice.

p3 (333): 3×3fold; not the rotation group of any lattice (every lattice is upsidedown the same, but that does not apply for this symmetry); it is e.g. the rotation group of the regular triangular tiling with the equilateral triangles alternatingly colored.

p4 (442): 2×4fold, 2×2fold; rotation group of a square lattice.

p6 (632): 1×6fold, 2×3fold, 3×2fold; rotation group of a hexagonal lattice.

2fold rotocenters (including possible 4fold and 6fold), if present at all, form the translate of a lattice equal to the translational lattice, scaled by a factor 1/2. In the case translational symmetry in one dimension, a similar property applies, though the term "lattice" does not apply.

3fold rotocenters (including possible 6fold), if present at all, form a regular hexagonal lattice equal to the translational lattice, rotated by 30° (or equivalently 90°), and scaled by a factor \frac{1}{3} \sqrt {3}

4fold rotocenters, if present at all, form a regular square lattice equal to the translational lattice, rotated by 45°, and scaled by a factor \frac{1}{2} \sqrt {2}

6fold rotocenters, if present at all, form a regular hexagonal lattice which is the translate of the translational lattice.
Scaling of a lattice divides the number of points per unit area by the square of the scale factor. Therefore the number of 2, 3, 4, and 6fold rotocenters per primitive cell is 4, 3, 2, and 1, respectively, again including 4fold as a special case of 2fold, etc.
3fold rotational symmetry at one point and 2fold at another one (or ditto in 3D with respect to parallel axes) implies rotation group p6, i.e. double translational symmetry and 6fold rotational symmetry at some point (or, in 3D, parallel axis). The translation distance for the symmetry generated by one such pair of rotocenters is 2√3 times their distance.
Euclidean plane

Hyperbolic plane

Hexakis triangular tiling, an example of p6, [6,3]^{+}, (632) (with colors) and p6m, [6,3], (*632) (without colors); the lines are reflection axes if colors are ignored, and a special kind of symmetry axis if colors are not ignored: reflection reverts the colors. Rectangular line grids in three orientations can be distinguished.

Order 37 kisrhombille, an example of [7,3]^{+} (732) symmetry and [7,3], (*732) (without colors)

See also
References
External links

Media related to at Wikimedia Commons

Rotational Symmetry Examples from Math Is Fun
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