Theory of coprime graceli numbers. Divisible by it, by 1, is divisible by a whole where the result is an irrational finite.
Example.
3, 5, 7, 11, 13, 15
3/2 = 1.5.
5/2 = 2.5
7/2 = 3.5
11/2 = 5.5
13/2 = 6.5
15/2 = 7.5
17/2 = 8.5
19/2 = 9.5
Theory of co-prime graceli numbers. Divisible by it, by 1, is divisible by a whole where the result is an irrational finite.
Example.
3, 5, 7, 11, 13, 15
3/2 = 1.5.
5/2 = 2.5
7/2 = 3.5
11/2 = 5.5
13/2 = 6.5
15/2 = 7.5
17/2 = 8.5
19/2 = 9.5




graceli system uni -algebra and Geometry n-dimensional complex shapes.


Imagine a spiral movement interlacing system.


τ μ Δ ς d / dt [⇔, ≁], p (t) y + [p / Pp] [R, FODC, cc [cx] π, + [logx / x [n] [R, Fo, DC, cc [cx] π = g (t)



τ μ Δ ς d / d [gt] [⇔, ≁], p (t) y + [p / Pp] [R, Fo, dc, dc [cx] π, + [logx / x [n] = w [T] [R Fo, dc, dc [cx] π = w [t] [n] nth repeat system for sub-functions forms and sub variables with respect to time.



τ μ Δ ς d / d [wt] [⇔, ≁], p (t) y + [w / Pp] [[A, Fo, dc, dc [cx] π dc, dc [cx] + [logx / x [n] [[R, Fo, dc, dc [cx] π dc, dc [cx] π = q [t] [n umpteenth repetition system.


[[R, Fo, dc, dc [cx] = radius, oscillatory flow, increasing dimensions, convex and concave,
for sub-functions forms and sub variables with respect to time.


Or even a flat vine that is interwoven in others.


Or even a growing movement n-dimensional back and forth in which each phase is marked by oscillatory
flows ..



relationship between algebra calculation, volatile geometries with the growth of the whole and parts, and theory of infinitesimal sequences and subsequences.




Graceli shapes and curves.


Imagine a flower that grows with the petals, bastones and other kind of a passion flower, or even a rose, or bromelha flower. In other words, what we have are parts that bloom and grow over time.



And if compared to have a curved sub-channel type system veins that are larger and of themselves other destinations, or random shapes with curves