# Distance from a point to a line segment in 3d (Python)

I am looking for Python function that would compute distance from a point in 3D (x_0,y_0,z_0) to a line segment defined by its endpoints (x_1,y_1,z_1) and (x_2,y_2,z_2).

I have only found solution for 2D for this problem.

There are solutions to finding a distance from a point to a line in 3d, but not to a line segment, like here: (picture taken from Calculate distance point to line segment with special cases)

• @meowgoesthedog the question you referred to is about a line, not a line segment. – Sanya Pushkar Jun 5 at 15:33
• @meowgoesthedog this is in 2D, I need 3D – Sanya Pushkar Jun 5 at 15:56
• @âńōŋŷXmoůŜ that question addresses the question for a line, not for a segment. – Sanya Pushkar Jun 5 at 15:57
• For future reference always be more specific about problems than "it returns an error" or "it doesn't work". In this instance I believe changing `np.zeros(...)` to `0` would do the trick (the solution in that answer deals with an arbitrary number of tests in parallel, so `s` and `t` are arrays of scalars instead of single scalars). – meowgoesthedog Jun 5 at 16:28

This answer is adapted from here: Calculate the euclidian distance between an array of points to a line segment in Python without for loop.

Function `lineseg_dist` returns the distance the distance from point p to line segment [a,b]. `p`, `a` and `b` are np.arrays.

``````import numpy as np

def lineseg_dist(p, a, b):

# normalized tangent vector
d = np.divide(b - a, np.linalg.norm(b - a))

# signed parallel distance components
s = np.dot(a - p, d)
t = np.dot(p - b, d)

# clamped parallel distance
h = np.maximum.reduce([s, t, 0])

# perpendicular distance component
c = np.cross(p - a, d)

return np.hypot(h, np.linalg.norm(c))
``````
• Beware that `p, a, b` are arrays of arrays (i.e. arrays of points). For your problem you probably want to work with a single set of points, in which case `s` and `t` will be scalars - thus `np.zeros(len(p))` will need to be placed with `0`. And yes if you can guarantee that `a` is never equal to `b` then the "`np.all`" check is unnecessary – meowgoesthedog Jun 5 at 20:56
• @meowgoesthedog yeah, forgot to make that edit about s and t. also, np.all as far as I understood checks if a and b are along the same axis, I am not sure if you need to substitute for np.array_equal – Sanya Pushkar Jun 5 at 21:01