In doing what most people call algebra, the rules fail if we allow division by zero and by consequence 0/0 is undefined. This is what I was attempting to demonstrate.But it's not undefined.
And sometimes we need to know the answer as WBahn asked in post# 9
The rest of your post is based upon not understanding number systems sufficiently.
Edit
Most people are quite relaxed with the idea that there is more than one solution to
√2 = ?
So why does there have to be only one solution to 0/0 = ?
In fact there can be infinitely many solutions or no solutions, depending upon the circumstances and number system. That is the difficulty that elementary theory seeks to avoid by discounting it.
For the pedants amongst us, we are doing algebra on the field of real or complex numbers. It doesn't matter, in any field division by zero is undefined.
What seems to have happened in this thread is that what was a question of algebra morphed strangely to a question of analysis and limits of functions.
Of course for f(x) = x/x,
f(x) = 1 almost everywhere,
and for x=0 the limit is 1, but this is not the question.
f(x) as given is undefined at x=0.
Would you argue that for the function
g(x) = x/x for x ≠ 0
g(x) = 3 for x = 0
that g(0) is 1 or 3?