Subnumerics
Finding numbers w/geometry and limits
I still need to work on the wording to get this right, but I needed to get this down before I forgot it.
***Also, it is important to note that this is a description of a limit, meaning everything you see is only a description to prove how we get to the last point of the numeric value and the hole (which is not a one sided limit, and can be done from the other side too). The only thing of importnce is the NV and the hole, and the fact that this works as a limit. If the lines as a triangle were real, it would mean that the PH can be a line, which is not possible. The only real time in the description image below is the limit.
I question how I will use this, but it takes the PH and NV and number, and makes them work apart and together at the same time while making sure they are not the same thing, ever, which is the most important part...
By looking at it this way, Ph are not there making this work after the line is created. Therefore, placeholders are not seen as a line, but a concept to get the NV line.
This works with dimensions and ph, because both ph and nv each has a dimension, but at the point they are one dimension, they become one number, and the ph becomes non-existant. Keep in mind, at the point the ph becomes a hole, it is not (zero)PH... that is null... or a hole... on the image below, I wrote it wrong.
The point is NV is alone at that point, and a number is created.
