If (0*a)/(0*b) may equal a/b for any real or complex number...
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Jan 25, 2023
0
#3
Mark12291229 wrote:
Right.
But it can be defined as any number. While 1/0 is defined as NAN [Not A Number].
Jan 25, 2023
0
#4
Saying 0 isn’t the same thing as undefined. That excludes all the other possibilities. That’s like saying the square root of 4 is 2. While that is a root, so is -2. Depending on what grade you’re in just including one of the roots could be counted as wrong
Jan 25, 2023
0
#5
1/0 is Infinity as a limit, when x approaches from the right side, 1/x shall then be Infinity as a limit.
But what makes it NAN is that as x approaches 0 from the left side, then 1/x shall approach -infinity.
You're wasting my time again!
Jan 25, 2023
0
#6
Mark12291229 wrote:
Saying 0 isn’t the same thing as undefined. That excludes all the other possibilities. That’s like saying the square root of 4 is 2. While that is a root, so is -2. Depending on what grade you’re in just including one of the roots could be counted as wrong
If x^2 equals 4, then x shall equal 2, and -2.
But it's Principle Root is 2.
I don't understand what you are attempting to relay, Sir.
But if we deduce that ((0^infinity)*(a^b))/(0^infinity)*c^d))
Still equals 0^infinity. Then we can conclude that 0/0 is therefore just 0.