Inelastic flexible chain is thrown over two nails. There is no friction, no lock. How two parts of the chain are sagging. This system has one unstable equilibrium, when the length of the sagging sections of the chain are equal - see the Mathcad 15 sheet in attach. How to calculate two other stable equilibria, when one section of the chain approaches a straight line, but remains in the form of a catenary (see the picture).
One solution - an animation and a Mathcad 15 sheet in attach!
Do you know more interesting solution&
And second!
I have searched tis task in Internet - now results!
May be I have done something wrong!
Very nice!
Anywhere the slope of your energy curve is zero is a "stable" point. But some are points to which the system will return while others are "saddle points." If a stable point is "perturbed" (move slightly off of the exact point) the system will return to the stable point. If a saddle point is perturbed, the system will move away from the saddle point. (The second derivative of energy tells the tale!)
@Fred_Kohlhepp wrote:
Very nice!
Anywhere the slope of your energy curve is zero is a "stable" point. But some are points to which the system will return while others are "saddle points." If a stable point is "perturbed" (move slightly off of the exact point) the system will return to the stable point. If a saddle point is perturbed, the system will move away from the saddle point. (The second derivative of energy tells the tale!)
There is not one but two case with the PE
@-MFra- wrote:
An animation closer to reality would be that of the following system .....
No, closer to reality is that the tension in the two chains AT THE PULLEYS are equal, not at the same vertical points.
