# Normal Vector to a plane [closed]

I have 3 points P1(x1, y1), P2(x2,y2) & P3(x3, y3). How do I find the vector normal to the plane passing through these 3 points?

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## closed as off topic by Michael Petrotta, Michael J. Barber, AakashM, 6502, Brock AdamsNov 15 '11 at 11:17

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google rocks !!! first rsult : jtaylor1142001.net/calcjat/Solutions/VPlanes/VP3Pts.htm – YAHOOOOO Nov 15 '11 at 11:01
possible duplicate of Given 3 pts, how do I calculate the normal vector? – AakashM Nov 15 '11 at 11:08

Clearly there is a missing coordinate Z in your points...

Assuming

``````p1 = x1, y1, z1
p2 = x2, y2, z2
p3 = x3, y3, z3
``````

then the normal is proportional to

``````nx = (y2 - y1)*(z3 - z1) - (z2 - z1)*(y3 - y1)
ny = (z2 - z1)*(x3 - x1) - (x2 - x1)*(z3 - z1)
nz = (x2 - x1)*(y3 - y1) - (y2 - y1)*(x3 - x1)
``````

This is the method suggested by Kerrek SB, with explicit formulas. In vector notation:

``````n = (p2 - p1) ^ (p3 - p1)
``````
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... although you could argue that given those three points, the plane is simply `z = 0` so the normal is `(0, 0, 1)` :) – AakashM Nov 15 '11 at 11:11

Take one point as the base point, compute the two difference vectors to the other two points (those two span the plane), and take their cross product to get a normal vector. Pay attention to orientation if signs matter.

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