# what is the geometry meaning of 2D cross product?

I have two 2D vectors, like [x1,y1] and [x2,y2]

Some guys define 2d Cross as x1*y2 - y1 * x2

I am wondering what's the meaning of this? Any practical application?

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I am having a hard time understanding what your question is about and how is it related to programming? Isn't this a pure geometry question? –  Lawrence Mar 22 at 0:19
you can find the area of the polygon if you have its vertices coordinates as a list of xi, yi. –  xavigonza Mar 22 at 0:20
Those some guys, aren't they silly? :) –  Lawrence Mar 22 at 0:21
Have you read this: en.wikipedia.org/wiki/Cross_product –  MBo Mar 22 at 3:02
Read, nothing related to 2D cross products –  Adam Lee Mar 22 at 3:19

Codie's answer is a good one. I will also note that the "2D cross product" is also commonly referred to as the "perpendicular dot product" or "perp dot product": the dot product of the CCW perpendicular of A with the (original) B. By "CCW perpendicular", I mean the vector 90 degrees counterclockwise; the CCW perpendicular of (x, y) is (-y, x).

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Cool, never heard that term before. –  Codie CodeMonkey Mar 25 at 16:23
@CodieCodeMonkey There's a fun article in Graphics Gems IV, entitled "The Pleasures of Perp Dot Products". –  Sneftel Mar 25 at 16:30

"2D cross products" are more properly called 2d wedge products. Wedge products generalize to other dimensions, but cross products are always 3d wedge products. The usual operator symbol for a wedge product is `^`.

You can use 2d wedge products to determine if one vector is to the left or the right of another one. If vector A is to the right of vector B, then `A ^ B > 0`, if A is to the left `A ^ B < 0`. If they are parallel or either of them is 0, then `A ^ B = 0`.

``````        | Ax Ay |
A ^ B = | Bx By | = Ax By + Ay Bx
``````

In vector graphics, 2d wedge products can be used to analyze the intersection of 2 parametrized curves, e.g. for removing portions of one curve that lies to the right of another. If you have a region defined by a set of bounding curves oriented counterclockwise around the interior of the region, you can then clip a set of curves to the boundary by trimming off the pieces that are to the right of their intersection with a boundary curve.

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