# Normalise and Perpendicular Function in python

I was going through a blog on Creating Lightning effect in 2D game.I wanted to implement the same in python. However I am stuck at a place.

Lets say startpoint and endPoint are co-ordinates in 2D plane , representing extreme points of a line segment.

Lets look at following Code Snippet from the blog:

``````midPoint = Average(startpoint, endPoint);
// Offset the midpoint by a random amount along the normal.
midPoint += Perpendicular(Normalize(endPoint-startPoint))*RandomFloat(-offsetAmount,offsetAmount);
``````

.

``````Normalize(endPoint-startPoint):
``````

That line gets a unit vector (vector of length 1) from startPoint to endPoint

``````Perpendicular(Normalize(endPoint-startPoint))
``````

then gets a vector perpendicular to that (i.e. at right angles to the line)

I am not a regular python coder. Is there any in-built Normalise and Perpendicular Function in python that would help me in implementing the above code in python.

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I don't know of built-in or third-party methods, but they are really simple:

``````import numpy as np

def perpendicular( a ) :
b = np.empty_like(a)
b[0] = -a[1]
b[1] = a[0]
return b

def normalize(a):
a = np.array(a)
return a/np.linalg.norm(a)

if __name__ == "__main__":
a = [1,2]
print perpendicular(normalize(a))
b = (4,-6)
print perpendicular(normalize(b))
``````

This will print

``````[-0.89442719  0.4472136 ]
[ 0.83205029  0.5547002 ]
``````

You can call these functions with

• a two-tuple
• a list of length two
• an 1d-array of length 2

or similar types.

Be aware that `normalize` will raise an Exception if the vector a has length zero.

I decided to name my functions lower-case according to PEP 8, Python style guide.

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How would you call `normalize` method? I mean, what is argument `a`? Can you please add a calling statement too. Lets say Starting point - (x1,y1): x1=p,y1=q . End point(x2,y2): x2=r and y2=s , where p,q,r,s are variables. Thanks a lot:) –  ritesh_NITW Jun 3 '13 at 6:14
I extended my example to reflect your wishes. –  Thorsten Kranz Jun 3 '13 at 7:23

I recommend taking a look at the numpy package. It has many built-in fast math operations. You can use norm and cross as starting points for `Normalize` and `Perpendicular`, respectively.

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As @SethMMorton and @ThoestenKranz indicated, numpy has a lot of support for vector manipulation. I don't think there is built-in support in Python to get what you want. However using simple trigonometric functions you can calculate normalize and perpendicular pretty easily using the built-in math module.

``````import math
class Coord(object):
def __init__(self,x,y):
self.x = x
self.y = y

def __sub__(self,other):
# This allows you to substract vectors
return Coord(self.x-other.x,self.y-other.y)

def __repr__(self):
# Used to get human readable coordinates when printing
return "Coord(%f,%f)"%(self.x,self.y)

def length(self):
# Returns the length of the vector
return math.sqrt(self.x**2 + self.y**2)

def angle(self):
# Returns the vector's angle
return math.atan2(self.y,self.x)

def normalize(coord):
return Coord(
coord.x/coord.length(),
coord.y/coord.length()
)

def perpendicular(coord):
# Shifts the angle by pi/2 and calculate the coordinates
# using the original vector length
return Coord(
coord.length()*math.cos(coord.angle()+math.pi/2),
coord.length()*math.sin(coord.angle()+math.pi/2)
)

a = Coord(2,12)
b = Coord(7,5)
print perpendicular(normalize(a-b))
``````
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