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Seeking elegant proof why 0 divided by 0 does not equal 1 1 Here is my theory: if anything times zero is zero, than zero divided by anything is zero, and zero divided by zero is anything When I say "anything" I mean, any number that exists, even an imaginary number 0*anything=0, so that should mean 0 anything=0, and 0 0=anything
A thorough explanation on why division by zero is undefined? Division by zero (an operation on finite operands gives an exact infinite result, e g , $\frac {1} {0}$ or $\log {0}$) (returns ± $\infty$ by default) Now, this got me thinking about basic arithmetic and how to prove each operation, and I created a mental inconsistency between multiplication and division
divisibility - Does zero divide zero - Mathematics Stack Exchange Then zero is certainly divisible by zero as every integer follows that definition If your notion of divisibility actually means to be able to divide those two and get some definite value then it is not divisible But according to what I think it is
Can you show why zero divided by zero does not equal zero? I was talking about division by zero with my discrete math instructor, and it was explained to me that dividing can be broken down into simpler terms, i e: Consider 6 divided by 3 To reach the ans
python - How to return 0 with divide by zero - Stack Overflow Divide by zero (confusingly, since it's incorrect!) gives inf in numpy, not undefined or nan So this will set divide by zero to a very large number, not 0 as one might expect and the OP asks You can get around this by setting posinf=0
Division by zero - Mathematics Stack Exchange Dividing a nonzero number by zero, violates the multiplicative property of zero and therefore the properties of the real numbers upon which it is proven, as shown above Dividing zero by zero, which does not violate the multiplicative property of zero, but multiplication by zero is an operation that results in zero for every real number
Reasons why division by zero is not infinity or it is infinity. So we can say, ok, substracting zero from eight will never reach zero so division by zero is not defined, or we can go crazy and count the number of times we can keep doing this and the result is infinity, so could we say that 8 0 is infinity with a remainder of 8?
math - Why is 0 divided by 0 an error? - Stack Overflow Zero is a tricky and subtle beast - it does not conform to the usual laws of algebra as we know them Zero divided by any number (except zero itself) is zero Put more mathematically: 0 n = 0 for all non-zero numbers n You get into the tricky realms when you try to divide by zero itself