The power of the continuum is the non-local property that gathers objects into a one form called collection.
No amount of objects has this power, exactly because any given gathered object is local w.r.t to the non-local property that has the power of the continuum.
Your definition of "the power of the continuum" -- a substitute for |R| or aleph1 -- remains, like anything else you've come up with, unwrapped. How far do you think it gets when it encounters real enemy tanks?
Obviously, you don't get a bit of the essence of anything that is connected with "=". That's why you hate "traditional math," coz it supports it's statements with that particular symbol, and here is the evidence:
You are not aware of the fact that a set can divide a real number. Any math software returns a result to
m/{a, b, c, d}, for example. Using some constants,
8/{1, 2, 3, 4} = {8, 4, 8/3, 2}.
That means m/A = B, where m is a real number and A and B are sets with the same size, or cardinality. When the dividing sets are finite, things are boring. The fun starts when the dividing set is the continuum, or set R.
m/R = ?
The expression on the left side divides m, which can be the length of a line segment, with the set of real numbers. R has a membership, but that cannot be put in 1 to 1 correspondence with the set of natural numbers. That's why the size of R is hypothetical aleph1 and not aleph0, which is the cardinality of the set of natural numbers and holds the set countably infinite. But that doesn't prevent you to indicate the intended . . .
m/R: m/{pi, √2, 9/8, e, Log(5), Sin(pi/7), ...}
If the cardinality of the denominator R is aleph1, then the result of the division must be set S which has the same cardinality as R, namely aleph1. It follows that
|m/R| = |n/R| where m≠n.
That means if m=2 and n=pi, for example, there is a 1 to 1 correspondence between all points on m and all points on n, which can be seen below through a consistent vertical mapping.
And that concludes the non-rigorous proof that the number of all points, which satisfy the definition of the real number and which are positioned alongside a 1-dim object, is independent of the magnitude of such an object.
Btw, how does OM find the magnitude of finite curves? Care to demonstrate the essence of the "power of the continuum?" How does OM figure the length of this object?
