A little Quantum Geometry
Quantum science is all about geometry. It is a thing entirely tied to crystallography, which itself is a thing entirely tied to geometry. The universe is defined by crystallography. It is about two-factor light, and it is about percolation. It is about the transfer of momentum across an aether which is itself a lyotropic crystal. All to know about a crystal is its math and geometry. It is a simple universe.
Let’s assume that you have in your body a substance that is of a hexagonal crystal form that responds to the magic angle of percolation. Hexagonal crystals that respond to percolations at the magic angle are superconductors, are supramagnetic, and will initiate so-called “quantum entanglement” circuits. Such a substance might be CRY3 cryptochrome (occurs in the body naturally) - or graphene (does not occur in the body naturally).
The question is, “How likely would it be that any of these crystals have the correct alignment to “connect” as FTL entangled connections, when exposed to quantum percolations coming from an external source?”
First, we assume that the crystals are randomly oriented. Then, we factor into our calculation the fact that the magic angle must be at a maximum only two degrees (it must fall somewhere in the range of .5 - 2.2 degrees (approximately). The optimum angle seems to be 1.1 degrees.
We mentally draw a circle around the outline of your body, and subdivide that circle into two degree arc segments. Thus, there are a maximum of 360/2 = 180 possible arc segments, and our probability of perfect-enough alignment in one plane is one chance out of 180. But, we need alignment in all planes. To do this, we draw another circle around your body, but align it so as to be perpendicular to the first circle. The number of arc-segments in this new plane is also 360/2 = 180. The probability in each plane is 1/180. The intersection of the probabilties of both planes gives us the probability of perfect-enough alignment in all directions, on all axis. Probabilities like this are multiplicative, so the probability of perfect-enough alignment of any one of the random crystals is (1/180) squared. That number is 1/32,400.
So, there is a chance that, at any particular instant of time, 1 out of 32,400 hex crystals could be sufficiently aligned for entanglement to occur.
Note: the author is a writer on technical subjects in some areas, of novels, and of other literature, but does not have any formal credentials related to the medical field, or in physics. Thus, this all constitutes an opinion of what might be possible, based on his own hobby-level knowledge quests