Examples of 'cyclic group' in a sentence
Meaning of "cyclic group"
cyclic group - In mathematics, a cyclic group is a group that can be generated by a single element, where combining the element with itself a certain number of times produces all the elements of the group
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- A group generated by a single element.
How to use "cyclic group" in a sentence
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cyclic group
They form a cyclic group under multiplication.
This can be done with any finite cyclic group.
The cyclic group may be saturated or unsaturated.
And gives the unique cyclic group of order n.
A cyclic group with prime order.
The carbene ligand may be part of a cyclic group.
The girth of a cyclic group equals its order.
I is a divalent organic residual group containing a cyclic group.
See also cyclic group for some characterization.
A specific example of an amine containing cyclic group is piperazine.
May be a cyclic group or an acyclic group.
I is a divalent organic residual group having a cyclic group.
Representations of the cyclic group of order n.
Any cyclic group with n elements is isomorphic to this group.
Prove that every image of a cyclic group is cyclic.
See also
Every cyclic group is abelian.
The organofunctional group may include a cyclic group.
This is a cyclic group of order n.
Cyclic group of order two.
Subgroup of a cyclic group is cyclic.
You can group any fields together in a cyclic group.
A group is called a cyclic group if it can be generated by a single element.
It is called a primary cyclic group.
Order of a cyclic group is equal to the order of its generator.
Any virtually cyclic group.
Every cyclic group is countable.
Identity elements in a cyclic group.
A generator for this cyclic group is a primitive n th root of unity.
Computation of an order in a cyclic group.
Non aromatic cyclic group containing monomers are also preferred.
And subgroups of a cyclic group.
A cyclic group is a group all of whose elements are powers of a particular element a.
The unsaturated and cyclic group can be aromatic or aliphatic.
The set of rotational symmetries of a polygon forms a finite cyclic group.
One example of a combination including a cyclic group is a cyclohexylphenyl group.
A cyclic group is a group that can be generated by just one element.
The group is a cyclic group.
A locally cyclic group is a group in which each finitely generated subgroup is cyclic.
Gp is an infinite cyclic group.
Any endomorphism of a cyclic group is determined by where it sends the generator.
This is because the cyclooctyne group is a particularly stable cyclic group.
A generator for this cyclic group is a primitive nth root of unity.
The isometry group generated by just a glide reflection is an infinite cyclic group.
The cyclic group can be saturated or contain one or two double bonds.
Every subgroup and quotient group of a locally cyclic group is locally cyclic.
At least one cyclic group may be defined in part by quaternary ammonium moieties.
Any group of prime order is isomorphic to a cyclic group and therefore abelian.
A cyclic group may be bonded to another group in more than one way.
Other examples include in which the cyclic group is fully fluorinated and is saturated.
The cyclic group may be saturated or contain one or two double bonds.
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