Questions about kinetic energy and momentum

In summary, the conversation discusses the relationship between kinetic energy and velocity, and how it differs from the linear relationship between momentum and velocity. The concept of conservation of energy and momentum in elastic collisions is also discussed, as well as the effect of constant force on an object's energy gain. The conversation ends with the request for clarification on how a constant force can result in increasing energy gain for an object.
  • #1
quantumz
2
0
Hi, I am currently in High School physics and we are going over Energy and Momentum. I have some questions about how and why they both work.

*all objects are assumed to have the same mass

Since [Kinetic Energy=1/2mv^2], an objects Kinetic energy is proportional to the square of its velocity, and therefor an object moving at 10 m/s has 4 times the energy as an object moving at 5 m/s.

My confusion comes from the equation for momentum [Momentum=MV]. This would suggest that an object moving at 10 m/s would only have twice the momentum as an object moving at 5 m/s, yet 4 times the amount of Kinetic energy.

If my goal was to stop this object from moving, I could place an identical object in its path and observe an elastic collision. This would maintain conservation of energy and momentum. However, if I placed two objects side by side in its path, assuming that each object was impacted equally and received half of the original objects Kinetic energy, I do not see how Energy and Momentum could be maintained. In order to maintain momentum, each object would have to move away at half the speed of the original object. In order to maintain Kinetic Energy, each object would have to move away at about .7 times the speed of the original object. I'm clearly missing something here, and I would appreciate it if someone could explain how Kinetic energy can have a quadratic relationship and momentum can have a linear relationship to velocity.

Another significant result of E being proportional to V^2 is that the change from 5 to 10 m/s requires more energy than the change from 0 to 5 m/s. However, since f=ma, a constant force will result in a constant acceleration. How is it possible that a constant force can add increasingly high amounts of energy to an object? If I am looking at a spaceship undergoing constant acceleration from burning a constant amount of fuel, I will see it to be gaining kinetic energy at ever increasing rates. How can it be gaining all this extra Kinetic energy if it is only burning through its fuel (chemical energy) at a constant rate?

For those that got this far, thank you for reading and I hope you can help me out!
 
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  • #2
Two thoughts for you:

1) You're assuming that the original object is at rest after the collision. You can find out the answer by solving for the two unknown velocities (after the collision) under the two constraints (momentum and energy).

2) The energy gain under constant force, hence constant acceleration, is [itex]F \cdot d[/itex]. As the object speeds up, applying the constant force for the same amount of time means applying it over a (much) longer distance, hence much more energy gained.
 
  • #3
1)Ok thanks that makes sense. If the initial object is moving backwards it can help balance energy and momentum.

2)I am still a bit confused on this one (edit: thought about it some more, think I get it). I understand an example used with gravity, where an object starts with potential energy and ends with purely kinetic. The faster it falls, the faster it gets kinetic energy, and the faster it loses potential energy.

edit: as for the spaceship example above, I was thinking of the force incorrectly. I had assumed that a constant energy applied over time would speed up at a constant rate, without considering that the same amount of "push" would be spread out over a much larger distance, making its actual force much less.
 

FAQ: Questions about kinetic energy and momentum

1. What is kinetic energy and how is it calculated?

Kinetic energy is the energy an object possesses due to its motion. It is calculated using the formula KE = 1/2 * m * v^2, where m is the mass of the object and v is its velocity.

2. What is the relationship between kinetic energy and momentum?

Kinetic energy and momentum are closely related as both are measures of an object's motion. The momentum of an object is equal to its mass multiplied by its velocity, while kinetic energy is equal to 1/2 * m * v^2. Therefore, momentum can be described as the quantity of motion an object has, while kinetic energy is the measure of the amount of work needed to accelerate an object to its current velocity.

3. Can an object have kinetic energy without momentum?

No, an object cannot have kinetic energy without momentum. This is because kinetic energy is directly proportional to an object's velocity, while momentum is directly proportional to both an object's mass and velocity. Therefore, without momentum, an object would not have any motion, and thus, no kinetic energy.

4. How is kinetic energy and momentum conserved in a closed system?

In a closed system, the total amount of kinetic energy and momentum remains constant. This is known as the law of conservation of energy and momentum. This means that any changes in the kinetic energy or momentum of one object will be equal and opposite to the changes in another object, resulting in the total energy and momentum of the system remaining constant.

5. How does kinetic energy and momentum affect collisions?

In collisions, kinetic energy and momentum are both important factors. The total momentum of a closed system before and after a collision remains constant, while the total kinetic energy may change depending on the type of collision (elastic or inelastic). In an elastic collision, the total kinetic energy remains constant, while in an inelastic collision, some of the kinetic energy is converted into other forms of energy, such as heat. However, the total momentum of the system remains constant in both types of collisions.

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