First, I disagree that applied forces are nonconservative. Usually they are not specified one way or the other. But an external force could be powered by a spring or gravity or some other conservative power source.sawer said:Frictional or applied forces are nonconservative forces. ...
Is power calculation only valid (or meaningful) for nonconservative systems?
True. But consider this case: We pick a box and attach to its inside wall a spring. Then attach a mass to the other side of the spring. Then we put the box in a time-dependent gravitational field. All forces are conservative, true but what if we have an observer inside the box who is studying only the spring-mass system?DaleSpam said:First, I disagree that applied forces are nonconservative. Usually they are not specified one way or the other. But an external force could be powered by a spring or gravity or some other conservative power source.
Well, again true. But here we meant a system which has no nonconservative forces acting in it.DaleSpam said:Power calculation is valid and meaningful for all systems. I am not sure what you mean by "conservative systems". Usually I have heard of forces as being conservative rather than systems.
The power calculation would still be valid even there. Power is power. It doesn't matter if the forces or systems involved are conservative or not.Shyan said:All forces are conservative, true but what if we have an observer inside the box who is studying only the spring-mass system?
I never said the concept of power is invalid in a given situation. I was saying that a conservative force may appear otherwise to some observers. What I said is that when all forces are conservative and our system is large enough to consider all the effects present, then the power associated to the change of the energy of the system as a whole will be identically zero because the total energy is constant.DaleSpam said:The power calculation would still be valid even there. Power is power. It doesn't matter if the forces or systems involved are conservative or not.
Yeah but the OP asked about it and that's why I explained it that way!russ_watters said:Well I agree with what you said earlier: this isn't a hair that needs to be split. Power/work can be calculated for individual forces in any group of forces and it really doesn't matter if they are conservative or not. I see no reason why this question should matter.
If I apply a force of 1N to an object and it moves 1m in 1 second, I applied 1W of power. Was it conservative? What opposed me? Gavity? Friction? Acceleration? A spring? It doesn't matter: I don't even have to tell you.
But that is exactly what the OP was asking. I just wanted to clearly answer the question asked by the OP.Shyan said:I never said the concept of power is invalid in a given situation.
I did answer that question in post #2. But it doesn't matter anyway. One more post and it becomes more clear.DaleSpam said:But that is exactly what the OP was asking. I just wanted to clearly answer the question asked by the OP.
Power is defined as the rate at which work is done or energy is transferred. It is a measure of how quickly a force can do work.
Power is only defined for nonconservative forces, as these are the forces that can do work without the total energy of the system remaining constant. Examples of nonconservative forces include friction and air resistance.
No, conservative forces do not have power because they do not result in any energy transfer. These forces only change the potential energy of a system, not the kinetic energy.
The unit of power is the watt (W), which is equivalent to one joule per second (J/s). It can also be measured in horsepower (hp) or kilowatts (kW).
Power is a fundamental concept in physics as it allows us to understand how quickly energy is being transferred or work is being done. It is also important in determining the efficiency of machines and understanding the effects of forces on an object's motion.