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Given a curve represented by two arrays with the elements not equally spaced:

x = np.array([ 1.54, 0.73, 0.45, 0.25, 0.18, 0.14, 0.11, 0.10, 0.11, 0.15, 0.37, 0.74 ])
y = np.array([-1., -0.60, -0.39, -0.19, -0.10, 0.01, 0.11, 0.21, 0.31, 0.41, 0.72, 1.])

And the graphic representation:

enter image description here

I want to find the coordinates xi and yi that correspond to the points at position 0.25, 0.50, 0.75.

Is there a straingthforward way to find them in numpyor in matplotlib?

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closed as unclear what you're asking by tcaswell, tom10, brettdj, Liam, Graviton Jul 2 '13 at 4:56

Please clarify your specific problem or add additional details to highlight exactly what you need. As it's currently written, it’s hard to tell exactly what you're asking. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.

What exactly do you mean by ratio? I can't figure it out from your example. –  Jaime Jun 23 '13 at 13:27
I mean the normalized position along the curve. 0 is the beginning and 1 the end... –  Saullo Castro Jun 23 '13 at 14:53
voted to close. Question is too vague. There is a partial answer from tcaswell, but because OP doesn't follow-up to clarify, question is still to vague to get a meaningful answer (even though I initially upvoted this question). –  tom10 Jun 25 '13 at 17:58
@tom10 Please, don't close it because this represents a real problem. The idea came from this answer here where I am passing to function rtext() the data coordinates x,y where I want the text to be placed. It would be better passing this normalized coordinate from 0 to 1... –  Saullo Castro Jun 25 '13 at 18:19

1 Answer 1

You have to pick some method to interpolate your data. If you have a model to fit your data to, use that, if not scipy has a bunch of tools for interpolating.

This is sort of a non-answer because the best way to do interpolation depends very much on your data and what you want to do with it.

In one sense, your question is ill-defined because say I have a function f(t) -> (x,y) for t in [0, 1), then if I compose f with g(s) -> [0, 1), where g is any monotonic function, then f(g(s)) -> (x,y) is also a valid parameterization of (x,y), but f(0.5) != f(g(0.5)).

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