But every element in the continuum of ℝ is perfectly finite. This is because ℝ is a well-ordered field. Let x be any element from ℝ. Then, we can always find a y ∈ ℕ such that x < y.I'm talking about the notion of infinity RIGHT HERE. The continuum element that "cannot be defined" I insist is the VERY thing that is the basis of continuous geometric form.
This is a terribly ignorant statement.The integers are infinite. ℝ is infinite. ℝ is nothing more than fancy concatenated integers.
There is nothing "very simple" about ℝ. Please stop making things up.Consider before "set ℝ" was made and before decimals were created (tabula freaking rasa!). What were there? Countable integers. 1, 2, 3, 4, 5... ad infinitum. From there, another concept was born, and that was to create "fractions" of these very things, that are tagged onto each of those elements to create "hybridized" integers of rational and irrational form. Same things, they just happen to group them into a thing called ℝ. Very simple.