The word 'cyclic' is the adjective form of the noun cycle.
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 product of cyclic photophosphorylation is ATP. In this process, light energy is used to generate ATP from ADP and inorganic phosphate within the thylakoid membrane of chloroplasts.
Cyclic motions can be predictable because they follow a pattern or sequence that repeats over time based on underlying dynamics or principles. By understanding these patterns, we can make predictions about when certain events or phases will occur within the cycle. Additionally, factors such as feedback mechanisms and external influences can help maintain the predictability of cyclic motions.
Non-cyclic photophosphorylation, which occurs in the light-dependent reactions of photosynthesis, produces ATP and NADPH. These molecules serve as energy carriers that are used in the Calvin cycle to produce sugars.
Cyclic motion refers to a repetitive pattern or sequence of movements that return to the same starting point. In physics, it often describes the periodic motion of an object or system that repeats itself over a specific interval of time. This type of motion can be found in activities such as swinging, rotating, or orbiting.
"Cyclic" (adj.) means that something repeats in cycles. A cycle is basically a repetition. The 'cyclic' (noun) is also the attitude control in the hand of a helicopter pilot during flight.
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.
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.
Cyclic neutropenia is a condition of recurring shortages of white blood cells.
No. In fact, a rhombus cannot be cyclic - unless it is a square.