Search results
23 kwi 2019 · Division by zero (an operation on finite operands gives an exact infinite result, e.g., 1 0 or log0) (returns ± ∞ 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.
Dividing by Zero is undefined. To see why, let us look at what is meant by "division": Division is splitting into equal parts or groups. It is the result of "fair sharing". Example: there are 12 chocolates, and 3 friends want to share them, how do they divide the chocolates? So they get 4 each: 12/3 = 4. Dividing by Zero.
A NaN (not a number) value represents undefined results. In IEEE arithmetic, division of 0/0 or ∞/∞ results in NaN, but otherwise division always produces a well-defined result. Dividing any non-zero number by positive zero (+0) results in an infinity of the same sign as the dividend.
10 gru 2018 · 0/n = 0 for all non-zero numbers n. You get into the tricky realms when you try to divide by zero itself. It's not true that a number divided by 0 is always undefined. It depends on the problem. I'm going to give you an example from calculus where the number 0/0 is defined.
23 cze 2012 · Start practicing—and saving your progress—now: https://www.khanacademy.org/math/alge... Multiple arguments for what we could get when we divide zero by zero. We will later see that this can...
10 sty 2018 · As we are all told, n = 1/0 is undefined, since no number n exists that, when multiplied by 0, gives the result 1 (i.e., n*0 = 1). However, drawing an example from the theory of complex numbers, there also exists no obvious number i that, when squared, gives the result -1.
Why some people say it's 0: Zero divided by any number is 0. Why some people say it's 1: A number divided by itself is 1. Only one of these explanations is valid, and choosing the other explanations can lead to serious contradictions. Reveal the correct answer.
