# Why is 0 divided by 0 an error?

I have come across this problem in a calculation I do in my code, where the divisor is 0 if the divident is 0 too. In my code I return 0 for that case. I am wondering, while division by zero is generally undefined, why not make an exception for this case? My understanding why division by zero is undefined is basically that it cannot be reversed. However, I do not see this problem in the case 0/0.

EDIT OK, so this question spawned a lot of discussion. I made the mistake of over-eagerly accepting an answer based on the fact that it received a lot of votes. I now accepted AakashM's answer, because it provides an idea on how to analyze the problem.

• God divided by zero and as a result there are black holes, so do you really want to divide by zero? ^^ – user238801 Jul 13 '10 at 11:15
• Jon Skeet can divide by zero. – Phil.Wheeler Jul 13 '10 at 11:20
• @Brian The goggles, they do nothing! – Mornedhel Jul 13 '10 at 14:58
• To those who want to reopen this: First of all, it is pure mathematics, not programming (i.e. "off-topic"). Secondly, it is a matter of definitions (i.e. "subjective and argumentative"). Finally, it is stupid. sinc(x) = sin(x) / x can be defined to be equal to unity at the origin, because it makes sense. lim sin(x)/x = 1 as x -> 0. But lim x/y does not exist as (x, y) -> (0, 0). You get 1 if x = y, 0 if x = 0, and the limit diverges if y tends to zero faster than x. – Andreas Rejbrand Jul 13 '10 at 18:33
• The wonders of Stack Overflow never cease. Among the upvotes on this trivial thread at the moment are 8 for the question and 48+31+7+… for answers, with the top voted answer being an incorrect one that says meaningless things like "anything divided by 0 is infinity". Wow. – ShreevatsaR Jul 13 '10 at 18:34

This is maths rather than programming, but briefly:

• It's in some sense justifiable to assign a 'value' of positive-infinity to `some-strictly-positive-quantity / 0`, because the limit is well-defined

• However, the limit of `x / y` as `x` and `y` both tend to zero depends on the path they take. For example, `lim (x -> 0) 2x / x` is clearly 2, whereas `lim (x -> 0) x / 5x` is clearly 1/5. The mathematical definition of a limit requires that it is the same whatever path is followed to the limit.

• +1 for the first answer I've seen that explains this in terms of limits – Martin B Jul 13 '10 at 12:50
• It's good to learn the theory behind this, but limits aren't really meaningful in the discrete world. – Larry Wang Jul 14 '10 at 4:11
• @Kaestur: Good point, hadn't considered the rationals when I made that comment. The "x * 0 = 0" argument is probably the most general one and works for any type of field, not just the reals... – Martin B Jul 14 '10 at 10:08
• @Kaestur Hakarl: Actually, limits are meaningful in the discrete world too (in any metric space, not necessarily complete) — it's just that the limit (e.g. of rationals) may not lie within the discrete set. In other words: even if limited to some fixed accuracy, we can still observe things like 0.0000002/0.0000001=2, while 0.0000001/0.0000005=1/5. – ShreevatsaR Jul 14 '10 at 17:54
• @dmckee: It depends on the specific result. To use your example, if you were to tell someone that in the reals, exponential was a bounded function and sine unbounded, do you think they would accept the result because you say "it works in C, and R is part of C?" Some results may still hold, and 0/0 being undefined certainly does, but that doesn't mean the same proofs will all work. – Larry Wang Jul 15 '10 at 2:04

Let's say:

``````0/0 = x
``````

Now, rearranging the equation (multiplying both sides by 0) gives:

``````x * 0 = 0
``````

Now do you see the problem? There are an infinite number of values for x as anything multiplied by 0 is 0.

• Mutliplying by 0 has a clear result... 0. This is the basis of a lot of maths. – Yacoby Jul 19 '10 at 21:19
• @josefx. If you start with 1 = 2, it is possible to prove just about whatever you want. You can't use it as the basis for an argument that you can't multiply by 0. Anyway, take a look at Wikipedia – Yacoby Jul 20 '10 at 9:28
• In summary, multiplying by 0 has a clearly defined result. 0. – Yacoby Jul 20 '10 at 13:57
• @josefx: This is incredible. Multiplying a number by 0 is always well-defined, and has the value 0. This is a basic property of 0 in any ring. x*0 = 0 for any x. I can't believe you're arguing about this. – ShreevatsaR Jul 20 '10 at 23:33
• @josefx: Um, do you realise you're saying the same thing Yacoby's original answer says? x*0 (= y*0) = 0 for any x, which is one reason we don't want to define 0/0 as 0. Multiplying by 0 does not introduce any invalid result; it's your inference that "x*0 = y*0 => x=y" that is false: this faulty inference involves division by 0. – ShreevatsaR Jul 21 '10 at 5:56

(Was inspired by Tony Breyal's rather good answer to post one of my own)

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. 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.

Say we have two functions, f(x) and g(x). If you take their quotient, f(x)/g(x), you get another function. Let's call this h(x).

You can also take limits of functions. For example, the limit of a function f(x) as x goes to 2 is the value that the function gets closest to as it takes on x's that approach 2. We would write this limit as:

`````` lim{x->2} f(x)
``````

This is a pretty intuitive notion. Just draw a graph of your function, and move your pencil along it. As the x values approach 2, see where the function goes.

Now for our example. Let:

`````` f(x) = 2x - 2
g(x) = x - 1
``````

and consider their quotient:

`````` h(x) = f(x)/g(x)
``````

What if we want the lim{x->1} h(x)? There are theorems that say that

`````` lim{x->1} h(x) = lim{x->1} f(x) / g(x)
= (lim{x->1} f(x)) / (lim{x->1} g(x))
= (lim{x->1} 2x-2) / (lim{x->1} x-1)
=~ [2*(1) - 2] / [(1) - 1]  # informally speaking...
= 0 / 0
(!!!)
``````

So we now have:

`````` lim{x->1} h(x) = 0/0
``````

But I can employ another theorem, called l'Hopital's rule, that tells me that this limit is also equal to 2. So in this case, 0/0 = 2 (didn't I tell you it was a strange beast?)

Here's another bit of weirdness with 0. Let's say that 0/0 followed that old algebraic rule that anything divided by itself is 1. Then you can do the following proof:

We're given that:

`````` 0/0 = 1
``````

Now multiply both sides by any number n.

`````` n * (0/0) = n * 1
``````

Simplify both sides:

`````` (n*0)/0 = n
(0/0) = n
``````

Again, use the assumption that 0/0 = 1:

`````` 1 = n
``````

So we just proved that all other numbers n are equal to 1! So 0/0 can't be equal to 1.

walks on back to her home over at mathoverflow.com

• From l'Hopital's rule (taking first derivatives): f(x)/g(x) = f'(x)/g'(x) Therefore: (2x-2)/(x - 1) = 2/1 = 2 ...I always thought this was cool. – Tony Breyal Jul 14 '10 at 10:30
• I'll give you a point for bringing up l'Hopital, I love l'Hopital! – El Guapo Jul 20 '10 at 18:56
• It's called l'Hopital's rule in English? You always learn something! I always assumed in English you would say "de l'Hopital's rule"... why do you guys truncate poor Guillaume's surname ? :) en.wikipedia.org/wiki/Guillaume_de_l%27H%C3%B4pital – nico Jul 23 '10 at 6:47
• @nico it is also known as Bernoulli's rule :) – Clair Crossupton Jul 23 '10 at 21:32
• @nico you say règle de L'Hôpital in French as well, so it's probably by analogy. For reference, the "Règle de trois" was not created by a frenchman called de Trois as far as I can tell. – user14554 Sep 2 '12 at 4:24

Here's a full explanation:

http://en.wikipedia.org/wiki/Division_by_zero

( Including the proof that 1 = 2 :-) )

You normally deal with this in programming by using an if statement to get the desired behaviour for your application.

The problem is with the denominator. The numerator is effectively irrelevant.

``````10 / n
10 / 1 = 10
10 / 0.1 = 100
10 / 0.001 = 1,000
10 / 0.0001 = 10,000
Therefore: 10 / 0 = infinity (in the limit as n reaches 0)
``````

The Pattern is that as n gets smaller, the results gets bigger. At n = 0, the result is infinity, which is a unstable or non-fixed point. You can't write infinity down as a number, because it isn't, it's a concept of an ever increasing number.

Otherwise, you could think of it mathematically using the laws on logarithms and thus take division out of the equation altogther:

``````    log(0/0) = log(0) - log(0)
``````

BUT

``````    log(0) = -infinity
``````

Again, the problem is the the result is undefined because it's a concept and not a numerical number you can input.

Having said all this, if you're interested in how to turn an indeterminate form into a determinate form, look up l'Hopital's rule, which effectively says:

``````f(x) / g(x) = f'(x) / g'(x)
``````

assuming the limit exists, and therefore you can get a result which is a fixed point instead of a unstable point.

Hope that helps a little,

Tony Breyal

P.S. using the rules of logs is often a good computational way to get around the problems of performing operations which result in numbers which are so infinitesimal small that given the precision of a machine’s floating point values, is indistinguishable from zero. Practical programming example is 'maximum likelihood' which generally has to make use of logs in order to keep solutions stable

• If n/0 = ∞, then n = 0 * ∞ = 0. If what you write is true then all numbers are equal to 0. – Yacoby Jul 14 '10 at 9:34
• @Yacoby - Infinity is a concept, not a number and therefore you can not multiply it by anything and still expect to get a meaningful result. I think you're interpreting infinity to be a quantitative metric number in the equation you give, when instead it is in fact a qualitative descriptive concept. Hope that makes sense :-) – Tony Breyal Jul 14 '10 at 10:04
• I would suppose it is going to be how you treat infinity. Using limits and defining infinity as a infinite limit, the result z/0 = ∞ would be correct. To my very limited knowledge this isn't true outside things like complex analysis. shrugs – Yacoby Jul 14 '10 at 10:19
• @Yacoby Asymptomatically speaking that's true that it equals infinity in the limit. I don't see where that wouldn't be true to be honest... – Tony Breyal Jul 14 '10 at 10:44

Look at division in reverse: if a/b = c then c*b = a. Now, if you substitute a=b=0, you end up with c*0 = 0. But ANYTHING multiplied by zero equals zero, so the result can be anything at all. You would like 0/0 to be 0, someone else might like it to be 1 (for example, the limiting value of sin(x)/x is 1 when x approaches 0). So the best solution is to leave it undefined and report an error.

The structure of modern math is set by mathematicians who think in terms of axioms. Having additional axioms that aren't productive and don't really allow one to do more stuff is against the ideal of having clear math.

You may want to look at Dr. James Anderson's work on Transarithmetic. It isn't widely accepted.

Transarithmetic introduces the term/number 'Nullity' to take the value of 0/0, which James likens to the introduction 'i' and 'j'.

How many times does 0 go into 0? 5. Yes - 5 * 0 = 0, 11. Yes - 11 * 0 = 0, 43. Yes - 43 * 0 = 0. Perhaps you can see why it's undefined now? :)

Since `x/y=z` should be equivalent to `x=yz`, and any `z` would satisfy `0=0z`, how useful would such an 'exception' be?

• Normally, I tend to ignore downvotes, especially on questions which are borderline offtopic to SO, but I must say I'm curious: do you consider the answer wrong, misleading, unhelpful, irrelevant -- or do you just hate maths? – Pontus Gagge Jul 14 '10 at 7:56

Another explanation of why `0/0` is undefined is that you could write:

``````0/0 = (4 - 4)/0 = 4/0 - 4/0
``````

And `4/0` is undefined.

If a/b = c, then a = b * c. In the case of a=0 and b=0, c can be anything because 0 * c = 0 will be true for all possible values of c. Therefore, 0/0 is undefined.

This is only a Logical answer not a mathamatical one, imagine Zero as empty how can you Divide an empty by an empty this is the case in division by zero also how can you divide by something which is empty.

0 means nothing, so if you have nothing, it does not imply towards anything to distribute to anything. Some Transit Facilities when they list out the number of trips of a particular line, trip number 0 is usually the special route that is routed in a different way. Typically, a good example would be in the Torrance Transit Systems where Line 2 has a trip before the first trip known as trip number 0 that operates on weekdays only, that trip in particular is trip number 0 because it is a specialized route that is routed differently from all the other routes.

See the following web pages for details: http://transit.torrnet.com/PDF/Line-2_MAP.pdf http://transit.torrnet.com/PDF/Line-2_Time_PDF.pdf

On the map, trip number 0 is the trip that is mapped in dotted line, the solid line maps the regular routing.

Sometimes 0 can be used on numbering the trips a route takes where it is considered the "Express Service" route.

why not make an exception for this case?

Because:

• as others said, it's not that easy;)
• there's no application for defining 0/0 - adding exception would complicate mathematics for no gains.

This is what I'd do:

``````function div(a, b) {
if(b === 0 && a !== 0) {
return undefined;
}
if(b === 0 && a === 0) {
return Math.random;
}
return a/b;
}
``````

When you type in zero divided by zero, there's an error because whatever you multiply zero from will be zero so it could be any number.

• Are you sure this adds something new to the numerous existing answers? – Benjamin W. Mar 15 '16 at 0:01

As Andrzej Doyle said:

Anything dived by zero is infinity. 0/0 is also infinity. You can't get 0/0 = 1. That's the basic principle of maths. That's how the whole world goes round. But you can sure edit a program to say "0/0 is not possible" or "Cannot divide by zero" as they say in cell phones.

• It is possible to turn an indeterminate form into a determinate form using derivatives in order to evaluate the limit of an equation. See "L'Hôpital's rule" for further information. – Tony Breyal Jul 13 '10 at 12:03