Q: What is cyclic voltametery?

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Yes, every subgroup of a cyclic group is cyclic because every subgroup is a group.

every abelian group is not cyclic. e.g, set of (Q,+) it is an abelian group but not cyclic.

No. In fact, a rhombus cannot be cyclic - unless it is a square.

A cyclic quadrilateral is one that has concyclic vertices (its corners all fit on the same circle) and, for a simple cyclic quadrilateral, opposite angles are supplementary.

A cyclic group, by definition, has only one generator. An example of an infinite cyclic group is the integers with addition. This group is generated by 1.

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Yes, every subgroup of a cyclic group is cyclic because every subgroup is a group.

Meiosis is not cyclic; rather it is a linear process. It does not cycle.

The word 'cyclic' is the adjective form of the noun cycle.

every abelian group is not cyclic. e.g, set of (Q,+) it is an abelian group but not cyclic.

If a coordinate is cyclic in the Lagrangian, then the corresponding momentum is conserved. In the Hamiltonian formalism, the momentum associated with a cyclic coordinate becomes the generalized coordinate's conjugate momentum, which also remains constant. Therefore, if a coordinate is cyclic in the Lagrangian, it will also be cyclic in the Hamiltonian.

the cyclic integral of this is zero

Cyclic and non-cyclic photophosphorylation.

Cyclic.... Sources: A basic Science Class.....

A cyclic change is a change that happens in an orderly way and where the events repeat constantly. Cyclic changes include seasonal events and tides.

No Q is not cyclic under addition.

No. In fact, a rhombus cannot be cyclic - unless it is a square.

Cyclic neutropenia is a condition of recurring shortages of white blood cells.