# How to calculate a hanging rope from points of different heights

Does anyone knows how to calculate how far a curve should dip down at a certain point, given the two points it's connected to (and maybe weight but it doesn't matter as much)?
From what I've been looking up, all the formulas involve tension and a few other things, but I only really need to know the coordinates, and can presume these are all constant.

This is the formula I have at the moment, it's very basic so would only work with two points at the same height. One method is from wikipedia and the other I got from somewhere else, they do unfortunately give different results though so I've no idea which is correct

``````import math
x=[-2,2]
a=1.0
for i in range(x[0],x[1]+1):
#method 1
y=a*math.cosh(1/a*i)-a
#method 2 (from wikipedia)
y=(a/2)*(math.exp(i/a)+math.exp(-i/a))
``````

Oh also, it's for maya, so it'd be a huge help if it could be done from the normal python functions without having to install scipy.optimise

Thanks :)

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whats the equation for the curve? –  mbdavis Nov 29 '13 at 11:37
I'd like it so the user can select any two objects in a 3d space, and it'll draw a free hanging curve between them, similar to telegraph wires or fences. The options will allow the user to change the weight (which will either increase weight or rope length to give the same effect) and possibly some other things –  Peter Nov 29 '13 at 11:44
en.wikipedia.org/wiki/Catenary –  Mr E Nov 29 '13 at 11:46
I think you're getting different results simply because you screwed up an offset. The second formula seems to be plotting a catenary a distance of `a` above the first one. –  user2357112 Nov 29 '13 at 11:47
Thanks, I've looked that up, but it goes way over my level of physics by the time it gets to the part I need (but I don't need realism so I'm hoping a simplified version would be a lot more practical) :P And those formulas were just the starting point from two different sources, I unfortunately can't really do anything useful with them, aside from if I disabled the option of using different heights –  Peter Nov 29 '13 at 11:57