Examples of normals,
0.r9+1=2
12+4.r9=17
X+4.r9=5x
0.9→∞+0.0→∞1=1.0→∞1

Examples of specials in the same examples as normals,
0.r9+1=1.r9
12+4.r9=16.r9
X+4.r9=4.r9(x)
0.9→∞+0.0→∞1=1

Again, there is no technical use flr this nor mathematical, physical use for this. But I'm sure we will find one.

These 2 categories are as follows-

Normals : numbers that follow the principal, 0.r9=1. (Which means the number scale remains as we understand it)

Specials : numbers that don't follow the rule 0.r9=1 but rather the opposite. 0.r9≠1

Although there is no use for specials, it can be used in maths

This can potentially ruin the number scale because of equations like-
10=10+(0.9→∞×10)=19
Basically, 10=19 if 0.r9=1.
Although these equations can have potential in physics, maybe even chemistry. It is mathematically true. But this does is create two new categories of numbers

Why is it useless?
X×2=2x=2x
Y×2=2y=2x
There is no useful executive equation in relation with this problem. But according to mathematics,
0.9→∞ is a infinitely small gap between 1 and 0.9 Making it 1. But what if 0.9≠1?
Well. If that's the case, then the number scale could be affected.

i LOVE astronomy. So much to the fact that I'm choosing it as a career option

Isn't that the helix nebula?

(2/4)

Let's take a example. Imagine that the two black holes are on the same coordinates in their respective fabrics. Logically these fabrics may intervene making a phenomenon as shown in fig-2. This can allow transmission of mass via quantum tunneling, and antigravity phenomenon

What is the science behind it?