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What else can I help you with?
What is the suns path among the stars?
an ecliptic
Can water only take one path in the water cycle?
Water is bidirectional process. It is cyclic in nature.
How does the Suns apparent path change over the year?
it gives planets sun
What is the value of internal energy in a cyclic process in thermodynamics?
Since internal energy is a state function and a cyclic process always returns to the same state (that's how you define a cyclic process), the value of the the internal energy will remain constant. That is not to say that it doesn't change along the cyclic path during the process - just that it always returns to the same value when the cycle is complete.
Do you become reincarnated in Buddhism?
The Buddha taught that all beings are reincarnated untill they exist cyclic existance, which is one of the goals of the Buddhist path.
Every subgroup of a cyclic group is cyclic?
Yes, every subgroup of a cyclic group is cyclic because every subgroup is a group.
Is meiosis cyclic or non cyclic?
Meiosis is not cyclic; rather it is a linear process. It does not cycle.
What is the noun for cyclic?
The word 'cyclic' is the adjective form of the noun cycle.
Is every abelian group is cyclic or not and why?
every abelian group is not cyclic. e.g, set of (Q,+) it is an abelian group but not cyclic.
Prove that coordinate is cyclic in Lagrangian then it is also cyclic in Hamiltonian?
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.
How cyclic integral of a point function is zero?
the cyclic integral of this is zero
Any movement that follows the same path repeatedly?
A cyclic movement, such as a pendulum swinging back and forth or a wheel turning in a circle, follows the same path repeatedly. These movements can be regular and predictable, making them useful in various mechanical, biological, and physical systems.
