Difference between revisions of "Forest UCM EnergyIntPart"
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If the above force is conservative then a potential exists such that | If the above force is conservative then a potential exists such that | ||
− | :<math>\vec{F}_{12} = - \vec{\nabla}_1 U(\vec{r}_1) = - \left( \hat i \frac{\partial}{\partial x_1} + \hat j \frac{\partial}{\partial y_1} + \hat k \frac{\partial}{\partial z_1} \right ) U(\vec{r}_1)</math> | + | :<math>\vec{F}_{12} = - \vec{\nabla}_1 U(\vec{r}_1) </math> |
+ | ::<math> = - \vec{\nabla}_1 U(\vec{r}_1) = - \left( \hat i \frac{\partial}{\partial x_1} + \hat j \frac{\partial}{\partial y_1} + \hat k \frac{\partial}{\partial z_1} \right ) U(\vec{r}_1)</math> | ||
+ | :<math>= - \vec{\nabla}_1 U(\vec{r}_1 - \vec{r}_2) </math> | ||
just take appropriate derivative | just take appropriate derivative |
Revision as of 14:52, 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
If object 2 was fixed so it is not accelerating and we place the origin of the coordinate system on object 2
Then the force is that of a single object
One potential for Both Particles
Both forces from same potential
If the above force is conservative then a potential exists such that
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