Getting forces from PE in 1D


 Working ContentEnergy: The Quantity of Motion The conservation of mechanical energy 

 

Prerequisites

 

The figure below, (taken from Interpreting Mechanical Energy Graphs) shows the PE function for a mass attached to a light ("massless") spring whose other end is attached to the wall. The position = 0 corresponds to the relaxed (unstretched) position of the spring. 

 

 

What are the directions and relative magnitudes of the forces exerted on the cart when it is at the positions marked by the numbers 2, 1, 0, -1, and -2?

 

In 1D this is straightforward. We can use the analogy of a "ball rolling on a hill. The direction of the force is always "down the hill". The equation that codes this in math is

 

 

where in this case, "type" = spring (even though we have used a gravitational analogy).

 

On the positive side, the PE is growing at an increasing rate, so the slope, dU/dx, is positive. This means that the force is negative -- pointing to the right (downhill), pulling the mass back towards the origin. And it grows as the mass moves farther out, stretching the spring more. 

 

When the object is at the bottom of the curve, where the PE curve is flat (at = 0) the slope is 0 so there is no force. (A ball could rest there without being pushed to one side or another.) Physically, the mass is at the point where the spring is not stretched, so there is no force.

 

As the object moves to the left, the slope of the curve goes increasingly negative (i.e., the tangent line points down to the right). So the force is positive -- points to the right (downhill), again, pulling the mass back towards the origin.  Again, the force grows in magnitude as you go further from the origin, since as the mass moves farther in, it compresses the spring more.

 

So the answers are:

 

Follow ons:

 

 

Joe Redish 11/4/14