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I have a lot of experimental data that I plot as 2 curves using ListLinePlot in mathematica. I want to find the intersection point between those two. Can I do that without making an interpolation function and Solve[]? I really don't think it's necessary to make a polynomial with order of 1000 or whatever it will be in my case. It should be simple, but I can't find a function that does that. I'm perfectly fine with a function that assumes straight lines between each data point as ListLinePlot does (since there are so many of them). I feel like this should be very obvious, but I really can't find out how to do it (except for just using my eyes offcourse)

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up vote 5 down vote accepted

I would actually use Mathematica's Interpolation function to generate the interpolants of the two curves, and then use FindRoot to find the intersection, as follows

curve1 = Interpolation[ data1 ];
curve2 = Interpolation[ data2 ];

FindRoot[ curve1[x] - curve2[x], {x, bestguess} ]

Despite the thousands of points involved, interpolation is a very fast operation, and on my machine there isn't a noticeable delay between pressing shift+enter and Mathematica returning.

There is a caveat to this, though. As this is experimental data, the intersection itself will have an uncertainty, and I suggest you use a fitting method designed to generate that information, such as found here. While not immediately accessible, it should point you in the right direction.

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You can use InterpolationOrder -> 1 to force linear interpolation ("straight lines"). It might make it necessary to use a FindRoot method that does not depend on derivatives though. – Szabolcs Mar 11 '12 at 7:04

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