Does Kinetic Energy Apply to Bullets in Ballistics?

AI Thread Summary
Kinetic energy applies to bullets as they possess both mass and velocity, which can be calculated using the formula K=1/2 * m * v^2. The discussion highlights the distinction between translational and rotational kinetic energy, clarifying that bullets can exhibit both types of motion. Concerns were raised about whether kinetic energy applies to rotating objects, but it was confirmed that bullets in flight do indeed have kinetic energy due to their translational motion. The conversation reflects a learning process regarding the principles of classical mechanics. Understanding these concepts is essential for grasping ballistics and the behavior of projectiles.
Guapa
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Homework Statement


Just a simple question, does Kinnetic enrgy applies to a bullet that has being shot?

Homework Equations


K=1/2 * m * v^2

The Attempt at a Solution


N/A
 
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What are your thoughts on the matter? Does the bullet have mass? Does it have velocity?
 
Yes it has mass, and it has velocity.
I was reading about Kinetic energy not applies to rotating objects so then I thought it does not apply to flying rotating objects, therefore it does not apply to bullets traveling on our space.
 
Guapa said:
Yes it has mass, and it has velocity.
I was reading about Kinetic energy not applies to rotating objects so then I thought it does not apply to flying rotating objects, therefore it does not apply to bullets traveling on our space.
There is a distinction between translational kinetic energy and rotational kinetic energy. Perhaps that is what you read about? An object can have both if it is both translating (moving) and rotating.
 
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Now that enlighten me, I just scanned through the initial part of this article and did not went through all, I got a bit disturbed by the initial statement:
In classical mechanics, the kinetic energy of a non-rotating object of massm traveling at a speedv is $$ \frac {1}{2} \cdot m \cdot v^2 $$ . From wikipedia.
This is what little knowledge does to me o:), complete embarrassment.
Thank you Sir.:biggrin:
 

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