The Largest Number is 1
Posted: Mon Aug 17, 2020 2:03 am
The largest integer is that which is observed.
As observed the largest integer is continually changing with the observation.
As continually changing the largest integer is a number approaching infinity: (n --> inf)
As approaching infinity the number is a number plus that which is approaching infinity considering that which is observed is always a finite number which is fixed: x+(n --> inf)
Each largest integer is not only a that which is plus a fixed number but a series of fixed numbers thus necessitating not only one continuum but a continuum inside a continuum:
y+((x+inf)+(n-->inf))
This necessitates each finite number as not only fundamentally changing but unfixed except as cycling back to the original equation of (n --> inf). To observe a finite number is to observe a point of change from one number into another thus when observing a continuum each number exists as a continuum in itself. This continuum can be reflected in the series of 1's which compose the number. Each number is a series of 1's as 1 in itself.
1 is a series of changing numbers thus is void in an of itself. Each number as a series of numbers is each series as a center point of change from one series into another. For example the series of 1-->2-->3 observes the series as composed of series of 1 as 1 --> 1+1 --> 1+1+1. This series exists as a single series in itself. However in approaching a number of infinity the series as composed of 1 is in itself approaching 1 perpetually.
Each finite number is thus a series of change as a point of change itself. Finiteness is a point of change, to observe an ever changing continuum is to observe sub continuums which form it.
As observed the largest integer is continually changing with the observation.
As continually changing the largest integer is a number approaching infinity: (n --> inf)
As approaching infinity the number is a number plus that which is approaching infinity considering that which is observed is always a finite number which is fixed: x+(n --> inf)
Each largest integer is not only a that which is plus a fixed number but a series of fixed numbers thus necessitating not only one continuum but a continuum inside a continuum:
y+((x+inf)+(n-->inf))
This necessitates each finite number as not only fundamentally changing but unfixed except as cycling back to the original equation of (n --> inf). To observe a finite number is to observe a point of change from one number into another thus when observing a continuum each number exists as a continuum in itself. This continuum can be reflected in the series of 1's which compose the number. Each number is a series of 1's as 1 in itself.
1 is a series of changing numbers thus is void in an of itself. Each number as a series of numbers is each series as a center point of change from one series into another. For example the series of 1-->2-->3 observes the series as composed of series of 1 as 1 --> 1+1 --> 1+1+1. This series exists as a single series in itself. However in approaching a number of infinity the series as composed of 1 is in itself approaching 1 perpetually.
Each finite number is thus a series of change as a point of change itself. Finiteness is a point of change, to observe an ever changing continuum is to observe sub continuums which form it.