Subnumerics
Graphs
The value of the NV depicts distance only so it does not matter where on the graph it is as long as it is the proper amount.
The location of the placeholder only matters on a one dimensional field. Therefore, on the graph, since it is showing two dimensions, the location of the hole can go anywhere vertically. And since the location of the NV is irrelevant, it can be pieced back together on either side of the hole to create a number as long as the amount on the distance created of the NV in the same as the location of the hole/PH. For example, if the NV is 4nv and the PH/hole is located at 4ph, then they can be combined to create the number 4.... 4nv<==>4ph ₵ 4number
The two dimensional graph is just to understand the real information, which is the lines next to it. For this reason, if this is true, I'm wondering if you can place two holes (ph) on the graph, or more. That said, only one placeholder can go on each placeholder line (there is only one here, on this page)
by doing this, one or more NV lines can be created, and more than one PH line can be created, but only one PH can be created on each PH line.
By looking at the graph in the middle with all the NV and PH in it, you can separate the NV out to fulfill all the placeholders to create numbers (See next page)
Here, you can see the image created. It looks like a caterpillar. You will know it because there is always a hole and nv surrounding or following it. The nv can always bemoved around to attempt to create a number. However, the hole of the ph is stuck there for eternity, at least until it meets with its equal NV and becomes a number.
