Difference between revisions of "Forest UCM EnergyIntPart"
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=One potential for Both Particles= | =One potential for Both Particles= |
Revision as of 14:41, 28 September 2014
Energy of Interacting particles
Translational invariance
Consider two particles that interact via a conservative force
Let identify the location of object 1 from an arbitrary reference point and locate the second object.
The vector that points from object 2 to object 1 may be written as
The distance between the two object is given as the length of the above vector
If the force is a central force
- Notice
-
- The interparticle force is independent of the coordinate system's position, only the difference betweenthe positions matters
One potential for Both Particles
Both forces from same potential
just take appropriate derivative
Total work given by one potential
Elastic Collisions
Definition
BOTH Momentum and Energy are conserved in an elastic collision
- Example
Consider two object that collide elastically
- Conservation of Momentum
- Conservation of Energy
When the initial and final states are far away fromthe collision point
- arbitrary constant
Example
Consider an elastic collision between two equal mass objecs one of which is at rest.
- Conservation of momentum
- Conservation of Energy
- Square the conservation of momentum equation
compare the above conservation of momentum equation with the conservation of energy equation
and you conclude that