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Does anyone know a fast way to find a line closest to a set a points in python? (but the line should always cross the origin, in other words f(0) = 0)

Given the equation of the line y = mx + 0 I want to find the m that optimizes this distance to every point in the set.

enter image description here

The image above is an example, the line should be closest to all the points. I tried doing this using scipy.optimize.minimize_scalar but the performance was not good enough, I wonder if there is a faster algorithm or a analytical way of doing this.

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  • @Padderby least squares will not do.
    – Tarik
    Nov 23 '21 at 1:41
  • @Padserby The least square regression does not minimize the distances between the points and the line. It minimizes the difference between the sum of the square of the differences of the y coordinates of the data points and the y coordinates of the line.
    – Tarik
    Nov 23 '21 at 1:49
  • @Passerby Read carefully the first answer in the link you provided.
    – Tarik
    Nov 23 '21 at 1:54
  • I found numpy.org/doc/stable/reference/generated/… but the result line does not always crosses the origin. Nov 23 '21 at 1:55
  • @left_brain numpy.linalg.lstsq will give you a value of the parameter m for a line that crosses the origin. This line will minimize the sum of squares of distances to the given points. I am not sure how you are getting a line that does not cross the origin without purposefully modifying the data.
    – bb1
    Nov 23 '21 at 2:38
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The distance formula can be found here: https://en.wikipedia.org/wiki/Distance_from_a_point_to_a_line. You want to minimize the sum of the distances but the distance formula contains an absolute value which will created a discontinuity in the first derivative which will prevent numerical solvers from finding the solution. Alternatively you could minimize the square of the sum of the distances. However, it's not the same as minimizing the sum of the distances.

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  • Is minimizing the square of the sum of the distances faster than minimizing the sum of the distances? Nov 23 '21 at 1:57
  • As stated minimizing sum of distances will not work. Minimizing sum of squares will and I bet an analytical solution can be found. Post in math stackexchange.
    – Tarik
    Nov 23 '21 at 2:00

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