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?

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). 


"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
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. 

