Quote:
Posted by DoYouKnow
1. Let the elements of a set S = {r_1,r_2} exist completely independently of each other.
2. Impose a metric, ds^2 = x^2 + y^2
3. Define a guassian probability function on these points
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Hello
DoYouKnow would this be like a tangent at any given point of a circle?
Or since my math is not much beyond when I left school at 17 a description of directions from all points within as well?
It certainly looks like it could hold positions near opposite to allow discussion and yet take it a vast array of similarities to the point of unity. Could you describe the shape the way you see it please.
I am assuming since the derivative is to a power that it is three dimensional much like the space metric. So co-ordinates could describe basically any starting point in the structure.