# Find intersection points of two ListPlot's in Mathematica

I have two sets of discrete data that I plot as two distinct colors(red and blue) with ListPlot in Mathematica. I want to find the intersection points(of the corresponding continuous curves) between those two, i.e. point A and B as shown.

I have tried 'FindCluster' method and hopping to get subsets of data forming lines but that does not work very well.

Now I always use 'GetCoordinate' property to get the numbers from the graph directly. It would be nice to have a way to do it automatically and more accurate.

I'm not sure whether this will be convenient in your case, but I've sometimes let Mathematica interpolate lists of points and then solved for the intersection:

```   findGuesses[pointsTable1_, pointsTable2_] :=
Block[{interpolatingPolyF1, interpolatingPolyF2},
interpolatingPolyF1 =
Function[{x}, Evaluate[InterpolatingPolynomial[pointsTable1, x]]];
interpolatingPolyF2 =
Function[{x}, Evaluate[InterpolatingPolynomial[pointsTable2, x]]];
(*Print[Plot[{interpolatingPolyF1[x],interpolatingPolyF2[x]},{x,0,2}]];*)
{x, y} /.
NSolve[{y == interpolatingPolyF1[x],
y == interpolatingPolyF2[x]}, {x, y}, Reals]
]
```
• This does not work in my case since it is impossible to interpolate the data I have(they are multivalue functions as seen from the figure). The solution you provided works for single value functions only I suppose. Thank you anyway. – user1746066 Oct 15 '12 at 14:04