Itofazpath subtraction mathematics extra
More actions
Template: Itofazpath subtraction mathematics
There are many different ways to represent an itofazpath mathermatically. Thus there are many different ways to represent removing parts of itofazpaths mathematically. There can be many different reasons to remove parts of itofazpaths either actually or theoretically. Itofazpoints, itofazmoments, itofazsections, itofazparts, can be removed from itofazpaths. Since an itofazpath can be broken down into many different types itofazparts for many different purposes the subtraction mathematics of itofazparts is much more complex than for the subtraction mathematics for itofazpaths. The subtraction of itofazsections from an itofazpath requires two itofazpoints where the intervening lenght is removed. There can be many itofazmoments and itofazsections removed from a itofazpath. A subtraction process can contain many itofazpoints that represent the starting point and ending point of each subtraction.
A subtraction process can be concept based. This means for a specific purpose or set of purposes.
An itofazpath can contain many complete or nearly complete itofazpaths. This means that one or more itofazpath can be subtracted from an itofazpath and still have a complete itofazpath.
An itofazpath subtraction process can make an otherwise undesirable itofazpath acceptable by subtracting the undesirable parts or sections.
An infinitely long itofazpath can have any finite number of finite lenght itofazpaths removed or subtracted and still be infinitely long.
Some ending results of itofazpath subtraction have a more important meaning or significance than others. A different itofazpaths can have different ixpepaths. This means that a specific itofazpath does not have to have an unvarying ixperiencitness. An example is where the structure and functioning of an itobody over times changes so much that it no longer produces the same ixperiencitness that it had at the beginning or at an earlier stage of its existence. So itofazpath can change from one ixperiencitness to another and then back to the first ixperiencitness once or numerous times depending on the itofazpath. Depending on the subtraction process or subtraction equation that the parts of the itofazpath that does not have the same ixperiencitness can be removed and or regrouped into groupings with the same ixperiencitness.
This subtraction process can be used as proof or supporting evidence of awaretheory ideas and predictions. Subtraction mathematics arguments for awaretheory
Itofazpath subtraction principles:
1. If an itofazpath is about (itoepipath), has (itoawarepath), (itomentapath), or makes (itophysipath), (itophysapath), (itoneuropath), the same ixperiencitness for its entire length then after any subtraction of contained itofazpoints, itofazmoments, itofazsections, and or itofazpaths, from the original itofazpath, the resulting itofazpath will still have the same ixperiencitness.
2. Given an itofazpath that contains one or more itofazpoints, itofazmoments, itofazsections, and or itofazpaths with different ixperiencitnesses, a resulting itofazpath can be formed that has only one ixperiencitness by removing the sections that have the unwanted ixperiencitnesses.
See also: Template: Itofazpath addition mathematics, Template: Itofazpath subtraction mathematics, Template: Itofazpath multiplication mathematics, Template: Itofazpath division mathematics, Itofazpath addition principles, Itofazpath subtraction principles, Itofazpath multiplication principles, Itofazpath division principles,
Itofazpath subtraction mathematics is the grouping name for: