Hi Valery,
You should be clearer because the figure shows an ellipsis. It is known to all that the intersection of a plane with a cone is a conic (in this case ellipsis precisely). Therefore I deduce that the catenary is generated by the intersection of a cone and a non-flat surface. the system between the equation of a cone and an unknown surface must give a catenary. Does this surface exist? ......but then, since the catenary is a flat curve, the surface should be a plane, which contradicts the previous deduction.
The cone is ready...........
1. Sorry, it is not a catenary (one plane curve), but a chain.
2. Better use a cylindrical system of coordinates
3. This problem has two boundary cases:
- a circle
- a part line
@Fred_Kohlhepp wrote:
@-MFra- wrote:
Hi FredKohlhepp,
I fear that the chain suspended between the two ends is simply your "invention".
What is your definition of "catenary"?
Sorry - not a catenary but a chain, a round chain.
@ValeryOchkov wrote:
Sorry - not a catenary but a chain, a round chain.
Okay, but you put catenary in the title; and the statement that it's a chain implies a condition about tension in the chain.
I'm not trying to invent anything, just make an observation about the problem. 🙂
One auxiliary problem!
A round ideal chain is fixed without friction in/on/with two points.
We have one Unstable equilibria and two symmetric stable equilibria - see a picture.
Let solve this problem at first with Mathcad!
