# Distance between point and a line (from two points)

I'm using Python+Numpy (can maybe also use Scipy) and have three 2D points

``````(P1, P2, P3);
``````

I am trying to get the distance from P3 perpendicular to a line drawn between P1 and P2. Let `P1=(x1,y1)`, `P2=(x2,y2)` and `P3=(x3,y3)`

In vector notation this would be pretty easy, but I'm fairly new to python/numpy and can't get anythng that works (or even close).

Any tips appreciated, thanks!

Try using the norm function from `numpy.linalg`

``````d = norm(np.cross(p2-p1, p1-p3))/norm(p2-p1)
``````
• Should be `np.abs(np.cross(p2-p1, p1-p3)) / norm(p2-p1))`? – nn0p Apr 27 '18 at 18:34
• unsupported operand type(s) for -: 'tuple' and 'tuple'? What's this? – Frank Sep 10 '18 at 7:21
• you need to convert the points to numpy arrays. This can be done like so: `p1 = np.asarray(p1)` – brad Oct 15 '18 at 18:02
• `abs((x2-x1)*(y1-y0) - (x1-x0)*(y2-y1)) / np.sqrt(np.square(x2-x1) + np.square(y2-y1))` I used it this way, and it gave me the same answer in python – id101112 Oct 23 '18 at 19:34
• Does this assume the line extends to infinity, or the distance it generates become larger as points `P3` grow farther away from the endpoints of the line segment generated by `P1,P2`? – DevNull Feb 19 at 15:49

`np.cross` returns the z-coordinate of the cross product only for 2D vectors. So the first `norm` in the accepted answer is not needed, and is actually dangerous if `p3` is an array of vectors rather than a single vector. Best just to use

``````d=np.cross(p2-p1,p3-p1)/norm(p2-p1)
``````

which for an array of points `p3` will give you an array of distances from the line.

• could you explain how `norm` in the numerator is dangerous if `p3` is an array? – dinosaur Jan 17 '18 at 19:44
• @dinosaur because `norm` will treat the 1D array returned by `np.cross` as one big vector and return its "size". – Martin Hardcastle Jan 17 '18 at 21:36
• I only got a signed distance after removing the first norm, that is, a distance that tells me if the point is at the right or left side of the line, according to some convention. – heltonbiker Jun 26 '18 at 22:38

For the above-mentioned answers to work, the points need to be numpy arrays, here's a working example:

``````import numpy as np
p1=np.array([0,0])
p2=np.array([10,10])
p3=np.array([5,7])
d=np.cross(p2-p1,p3-p1)/np.linalg.norm(p2-p1)
``````
``````abs((x2-x1)*(y1-y0) - (x1-x0)*(y2-y1)) / np.sqrt(np.square(x2-x1) + np.square(y2-y1))
``````

Can be used directly through the formula, just have to plug in the values and boom it will work.

To find distance to line from point if you have slope and intercept you can use formula from wiki https://en.wikipedia.org/wiki/Distance_from_a_point_to_a_line Python:

``````def distance(point,coef):
return abs((coef[0]*point[0])-point[1]+coef[1])/math.sqrt((coef[0]*coef[0])+1)
``````

coef is a tuple with slope and intercept