Are Limits in Calculus Just Predictions or Mathematically Certain Truths?
Why do we say 1/0=undefined instead of 1/0=infinity?
Why there can be no smallest positive value (in any # system).
Why 'infinith' terms can't exist in an 'infinite sequence.'
Are there really more ℝ's than ℤ's?
In the reals, although 'Infinity' is not reachable, is it approachable?
Not assuming the LOPS 'limit of partial sums' to be the 'sum' of an 'Infinite Series' (Instead, 'S' = an 'applied pattern').
Are the positive reals (R+) a subset of the positive hyperreals (*R+)?
