Subnumerics
Finding numbers w/geometry
I think this might work because it is not a real idea, but figurative just to have a way to further understand how this might work. In reality, PH can not be represented by distance... Only location.
The location where the ph and the NV on the line are the same, creating the line, does not exist. The ph becomes null (which is always the reality)... This is starting to sound like what is learned in beginning calculus, but it is more conceptual since we are seeing the ph as growing to be the same number type as NV. At that point and only this point (like limits), ph becomes non existent, creating a number. Something is not kosher here.
We know this to be true, like with limits, because, as we approach it on either side, only that point is left over. So even though it does not exist, it is that point we are looking for to be the exact point we need to be the same as the NV to get a number.
remember,Â
x ph>==<x nv creates the x number
it also interesting to note that if the ph and the nv are the same number types, and it is a right angle between them, various precalculus rules work. The question is, how do limits effect this, and how do PH verses NV effect this...
