228000.
227992
This game is pointless. Infinity is not a number, but rather a concept, and thus cannot be counted to. *takes off nerd glasses* *is clueless again*
I need to clear this misunderstanding.
Let us consider a set
S that represents all
Concepts by your definition, and a set
C that represents all
Numbers R + i.
Infinity, as opposed to a "finite" number in the set
C, exists in a set
ɛ including all undefined and indeterminate values that is mutually exclusive with
C. Now, we shall consider a set
B, including all boundaries, conjunct with
ɛ at
Infinity and other nonliteral values. Existence in
B implies the ability to bind a range of values, regardless of finiteness.
C is also a proper subset of
B, and both
B and
ɛ exist in
S, as we can comprehend and analyze them, and thus are concepts. Our purpose is to count to
Infinity, which can be interpreted as generative routine with a continuation predicate
n < Infinity. As long as it is true, we shall keep counting.
tl;dr
Infinity is a concept, but also a value that we can count towards, so our premise isn't flawed. As you learn Precalculus, you will learn limits
as x approaches n, where
Infinity is a possible value of
n.
*takes off need glasses*
sup.