I am trying to calculate the angle between two lines in python. I searched the internet and found the equation on how to do it. But I don't always get accurate result. Some of the results are clearly false when other seems correct. My code is given below:

def angle(pt1,pt2):
    m1 = (pt1.getY() - pt1.getY())/1
    m2 = (pt2.getY() - pt1.getY())/(pt2.getX()-pt1.getX())

    tnAngle = (m1-m2)/(1+(m1*m2))
    return math.atan(tnAngle)

def calculate(pt,ls):
    for x in ls:
        pt2 = point(x,i)
        ang = angle(pt,pt2)*180/math.pi
        ang = ang * (-1)
        print ang

pt = point(3,1)
ls = [1,7,0,4,9,6,150]


the result it produces is :


The problem is that I don't understand why the second result, fifth and the last one are zeroed they intersect since they share a point and the other point in not duplicated since the value in the array is different.

  • The second line is highly suspicious. Is this really what you're trying to do? – Vincent Savard Nov 5 '12 at 4:49

It looks like you are using Python2, where / will do an integer division if both arguments are int. To get the behaviour that Python3 has, you can put this at the top of the file

from __future__ import division
  • Yup. This is the problem. – Calvin Cheng Nov 5 '12 at 4:58

Your angle formula will fail if

pt2.getX() == pt1.getX()

(that is, if pt1 and pt2 lie on a vertical line) because you can not divide by zero. (m2, the slope, would be infinite.)


m1 = (pt1.getY() - pt1.getY())/1

will always be zero. So at the very least, your formula could be simplified to the arctan of the slope. However, I wouldn't bother since the formula does not work for all possible points.

Instead, a more robust method (indeed, the standard method) for calculating the angle between two vectors (directed line segments) is to use the dot product formula:

enter image description here

where if a = (x1, y1), b = (x2, y2), then <a,b> equals x1*x2 + y1*y2, and ||a|| is the length of vector a, i.e. sqrt(x1**2 + y1**2).

import math

def angle(vector1, vector2):
    x1, y1 = vector1
    x2, y2 = vector2
    inner_product = x1*x2 + y1*y2
    len1 = math.hypot(x1, y1)
    len2 = math.hypot(x2, y2)
    return math.acos(inner_product/(len1*len2))

def calculate(pt, ls):
    i = 2
    for x in ls:
        pt2 = (x, i)
        i += 1
        ang = math.degrees(angle(pt, pt2))
        ang = ang * (-1)

pt = (3, 1)
ls = [1,7,0,4,9,6,150]

calculate(pt, ls)
  • math.hypot(x1, y1) is tidier – John La Rooy Nov 5 '12 at 5:14
  • 1
    When len1 or len2 is 0, you get a division by zero error. – Anthony Lozano Jan 18 '14 at 19:17
  • 2
    An exception should be raised because there is no defined angle when either vector has zero length. – unutbu Jan 18 '14 at 21:03
  • I could be wrong but I think there might be a problem with the sign of the result returned by angle(). If the first point is (1.0, 0.0) and the second point is (1.0, -1.0), then shouldn't the sign of the angle be negative (or 315 degrees)? I think this could be accomplished simply by replacing the last line with return math.copysign(math.acos(inner_product/(len1*len2)), y2) – Bill Feb 14 '16 at 5:18
  • @Bill: The function above calculates the angle between two vectors. By definition, that angle is always the smaller angle, between 0 and pi radians. It has the property that the angle between two vectors does not change under rotation. For example, if we rotate both vectors 180 degrees, angle((1,0), (1,-1)) still equals angle((-1,0), (-1,1)). If we were to change it to your formula, then the angle would change signs. Also, angle(A, B) == angle(B, A). Yours is not commutative. That's okay -- it just sounds like you are looking for something different than the angle between two vectors. – unutbu Feb 14 '16 at 12:57

Here is what I ended up using, all using numpy and the range is between -𝛑 to 𝛑

import numpy as np
def get_angle(p0, p1=np.array([0,0]), p2=None):
    ''' compute angle (in degrees) for p0p1p2 corner
        p0,p1,p2 - points in the form of [x,y]
    if p2 is None:
        p2 = p1 + np.array([1, 0])
    v0 = np.array(p0) - np.array(p1)
    v1 = np.array(p2) - np.array(p1)

    angle = np.math.atan2(np.linalg.det([v0,v1]),np.dot(v0,v1))
    return np.degrees(angle)

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.