what 0 divided by 0 really is

Dave!!!!!!!!!! 7:44

e=3, pi=3, 0/0=0
Engineers: *Finally I have them all*

How did you hear me say 17 was my favourite number?

"0 times Pikachu is equal to 0"
Pikachu: "So.....um...uh..."

bprp: _divides by zero_
Universe: **black hole**

1:20 I remember we had a angry teacher in school who sounded funny when he was angrier. There was an incident where a student did something similar to this but it wasn't obvious because the equation was complex. The teacher got angry af and the way he scolded became a meme in the school.

Nah clearly the answer is this:
"Imagine that you have zero cookies and you split them evenly among zero friends. How many cookies does each person get? See? It doesn't make sense. And Cookie Monster is sad that there are no cookies, and you are sad that you have no friends.”

0/0 = 0 really makes sense on practice at least in physics engine programming and similar things, because zero vectors might arise in some cases but common equations require to compute size of the vector

I would argue that 0/0 = 0 makes perfect sense.
Division: How many times a number must be added together to get to another (In other words, how many times a number must be multiplied by to get to another)
So, a/b = How many times you must add b to get to a
You might say that 0/0 could then equal 1 because, for example, 6/6 = 1 because you must add 6 up one time.
However, if you rephrase the above a little:
a/b = How many times you must add b **to 0** to get to a
This is exactly how you first learn to do multiplication.
So, by the above definition for division, 0/0 would equal 0, you already start at 0, you must add 0 to itself no times.
n/0 where n is non 0 would still be undefined, you would keep adding 0 and adding 0 but you will never ever reach n no matter how many times you add zero to itself. (Unless you add 0 to itself a non real number of times, if you assume there is a valid non real number that will get you there)

0/0 should be defined with the symbol %

You knowing I said 17 really caught me off guard omg

Check out this video on why 0^0=1 is seriesly useful The convention 0^0=1 is seriesly useful th-cam.com/video/rJil85GHEyc/w-d-xo.html

My teacher: "so dear students today we'll study Schrödinger's equation. Well, this strange symbol which you see right here is called-
Me: "Fork. It's called fork."

This was really good! Could u do a video on 0⁰ once? I'd love to see you talk about it!

My logic is "division is the amount of times 'b' needs to be taken out of 'a' until it reaches zero (in a/b)"
E.g. "15/5" is "15 -5 -5 -5 = 0", five is repeated three times, therefore 15/5 = 3
Using that logic with 0/0, we get... zero. We don't have to subtract anything because we already reached our objective. AKA the amount of times '0' needs to be taken out of '0' until it reaches zero is... zero times.
Bonus: And using that logic with 1/0 we get:
"1 -0 -0 -0 -0 -0... = unreachable" therefore it's undefinable because it never ends

I love his explanations and videos so much, always informative and attentive, nice video!

There’s another issue with the first example you gave as well. When we multiply both sides by zero, we have zero over zero on the left side which we are trying to define but in the example you just cross it out. We can’t cross it out because when you do that, you assume it even has an answer so #1 uses circular reasoning to define 0/0

How to do summation of a series of factorial ?
Like 1! +2! +3! +.....n!

- Are you sober now?
- Ozzy: **divides by 0**

I think the k not equal to 0 situation would have the same problem you get from say squaring numbers. You always have to be careful when you're dealing with multivalued operations.

What if you integrated 0/0 under an arbitrary function f(x)?
I’ve got another random thought: let the numerator and denominator denote the magnitude of vectors A and B in the z direction respectively. Let vector A extend exclusively in the x dimension, and vector exclusively in the y direction. Hmm, this probably won’t work because you end up with: f(z)=0(x units)/0(y units) but this was a fun thought to trail.
p.s great job with all your content man. Crazy work ethic!

I disagree with the fact that you have to assume 0/0 a constant.
(0/0)×1 = (0/0)×17 means
(Something × 1) = (another something × 17)
That means you can assume that the first 0/0 and the second 0/0 has different values and they can take "any" value.

What i feel is that division is just comparing the magnitude of one thing with the magnitude of another. If the magnitudes are equal, (0=0) then the result of division is one.

Good approach at the start. I noticed the same problem where people would multiply both sides by 0 at the start even though that obviously never works to begin with.

Amazing video man! Loved it!

2:55 : bprp forgot the c in contradiction.
Me: happy also bprp forgets to do "+ C" sometimes

It's a huge cultural achievement that university scientists are allowed to think about such questions.

A way to think of rational numbers of p/q is how many times do I need to subtract q from p to get to 0. For example in 15/3 you have to subtract 3 from 15 5 times to get to 0 and thus we say 15/3=5. Therefore, in 0/0, for any number r you pick if you subtract 0 r times from 0 you’ll get 0-0(r)=0-0=0 so any number r would satisfy 0/0 under that way of thinking. In theory we can choose to define it as 0 like in this video but to stay consistent with how fractions work in other situations we say it’s undefined.

As a programmer. *Most* of the time when a division by 0 occurs and we don't want to throw an exception, we actually meant 0 as the result.

Well, someone had to do it. IT'S INDETERMINATE

3:50 wtf that is my favourite number

4:34 This proof you have heavily relies on the commutative property of multiplying with a fraction.
I.e how (x*m)/n = x*(m/n)
because (0*1)/0 = (0*17)/0 if you indeed multiply before you divide.
But you've incidentally shown that this cannot be true if you define 0/0.
because then if you let m and n both be 0 you get:
(x*0)/0 = x*(0/0)
k = k*x
which is not true for all values k and x.
But that fact in of itself is interesting because it means if you allow 0/0 math is no longer commutative in this certain way, unless you define it to be 0.
So what you have really proven is that if k != 0 then (x*n)/m != x*(n/m)

Yes......You guess little bit right...but my favourite number is 1729....

Sir, I have always thought 0/0 should be equal to 0.
This is why. Correct me if I am wrong.
We can consider the quotient when doing division as the number of times the dividend has to subtracted by the divisor for it to become 0. So in the case of 0/0 since the dividend is already 0 there is nothing to do hence the quotient should be 0 right.
We can consider division again as the number of times the divisor has to added by itself to be equal to the dividend. When we consider 0/0 in this perspective we can see that since the divisor is 0 there is nothing to do to make it 0 hence making the quotient 0 again.
Sir, please reply to this has been bugging me up for some time. And every others who are reading this if you have any opinion reply or please try to like this so that he can see this.

The "fork" psi is like the second letter you use after phi when talking about homomorphisms of groups, rings etc., it's not that uncommong

If 0/0 = k, then k must be 0. That's proven by this. However we can't assume that 0/0 actually is equal to any number, and since there are functions, which when you take the limit on them they get a 0/0 but still has a value that isn't zero, I think it should be undefined

the equivalence relation for rationals is defined as (a,b)~(c,d) iff ad=bc, so the first case does hold

In Lean, a/0 is defined to be 0 because
- it has to be something (Lean only supports total functions)
- 0 is already defined in our type (as opposed to 1 which we may never define)
- it makes some results like a/c + b/c = (a + b)/c unconditional (you do not have to assume c != 0)

Division by zero is undefined precisely because the multiplicative inverse of zero does not exist. Why then when you multiply nothing by something nonexistent should you get anything at all? It makes no sense.

2:17 this allows for 0/0 resulting in NaN

Pls bring back the black pen red pen Yay!!! intro . It's really nice

ive always thought about it this way: dividing something by something is always just figuring out how many times a number fits into the other number, so we need to answer how many times 0 fits into 0. lets say we do this for 5 / 2. now, to figure out how many times 2 fits into 5, we can keep on adding 2s to 0, and however many times we can possibly do that without going over 5 will tell us the answer. so 2 < 5, so add 2: 2 + 2 < 5. it is still less than it so add more. 2 + 2 + 2 > 5. now it is over, so with some calculating you could tell that we could fit 2.5 2s without going over 5, so 5 / 2 = 2.5. Now let's do that with 0/0, or really just any number over 0. keep adding 0's until it goes over 0 to see how many times it fits into 0. guess what, it will keep on going, you can fit 0 into 0 an infinite amount of times. and you could say 0 = -0 so it also fits into it a negative infinite amount of times. so my answer is:
0/0 = ±∞

i have a conter-argument.
that proof is well made and hold for most situations, for example ln(1) because its multivalued and one of his answer is 0, but it does not hold for some specific situations?
consider ln(0) = a, everybody knows 0^2 = 0^3, loging both sides and we have 2*ln(0) = 3*ln(0), 2a = 3a.
if a is real and a=/= 0, then we can divide both sides by a and we have 2=3, but 2 is not 3, so a should be defined as 0
but ln(0) cannot be 0
if we consider ln(0) = 0 and elevate both sides by e, we have e^ln(0) = e^0 and 0 = 1, but 0 is not one, so ln(0) cannot be defined as 0.
with this double proof by contradiction, we can agree that this proof needs more information to hold, without this we cannot be sure if it 0/0 can or cannot be defined as 0.
again, nice video ☺

Outstanding video!!! Thank you for producing and posting!! :) :) :)

I am glad you finally posted this. I am compelled ten times a day to define 0/0. I can finally get some sleep.

i have a conter-argument.
that proof is well made and hold for most situations, for example ln(1) = 0, because its multivalued and one of his answer is 0, but it does not hold for some specific situations.
consider ln(0) = n, everybody knows 0^2 = 0^3, loging both sides and we have 2*ln(0) = 3*ln(0), 2n = 3n.
if n is real and n =/= 0, then we can divide both sides by n, and we have 2 = 3, but 2 is not equal 3, so n should be defined as 0.
but ln(0) cannot be 0 too
if we consider ln(0) = 0 and elevate both sides by e, we have e^ln(0) = e^0 and 0 = 1, but 0 is not equal 1, and then ln(0) cannot be defined as 0.
with this double proof by contradiction, we can agree that it needs more information to hold, without information we cannot be sure if it 0/0 can or cannot be defined as 0.
again, nice video ☺
(editing because im an ape and don't know how to write)

My Intersection Formulas result in 0 ÷ 0 for overlapping equations, meaning that the 0 ÷ 0 might indeed be(Corrected from "by" on 12/25/2021 at 9:17 AM EST) all real numbers.

Asume that 0/0=0 for calcutations with limes:
0=0/0=(0/0)^(-1)=0^(-1)
=>0=0^(-1)=1/0=Lim x→+0 1/x→Infinity
=>0→infinity
This a contradiction .
So If you calculate with limes, then 0/0≠0. So don't define 0/0=0 for calcutations limes.

3:45 Yes, my favorite number is 17.

You are great TH-camr and I am your biggest fan

0/0 cannot be equal to 0 (or something else) in any case.
If you are in the integers then quotient q and remainder r of the division n / m are defined by the equality n = q m + r where 0

The problem about dividing by 0 is that we already assume it is equal to 1 when we cross it out when dividing.

Nice done. Can you show us a contradiction if we assume 0/0=0?

wheel theory: allow me to introduce nullity

I don't know why this was in my recommendations but I watched it and liked it

Thats if you consider 0/0 a 1-1 functional output when it really has an infinite amount of outputs.
I always liked to think of it as the symbol for the set of all numbers.

0:20 - 0:33 *0/0 = x 0 = 0·x*
Right off the bat, this is incorrect. Division a/b is actually defined as a·b^(-1), where b^(-1) denotes the unique solution to b·x = 1 IF it exists. IF it does exist, then you can take the equation a·b^(-1) = c, multiply both sides of the equation by b, to get [a·b^(-1)]·b = a·[b·b^(-1)] = a·1 = a = c·b. So a/b = c a = c·b necessarily requires that b^(-1) exists. Since 0^(-1) does not exist, it is not true that 0/0 = x 0 = 0·x. 0/0 is not undefined because it is equal to every number, it is undefined because it is equal to no number at all, since 0/0, by definition, is equal to 0·0^(-1), and 0^(-1) does not exist. If it did exist without contradicting associativity and distributivity, then 0/0 = 1 would be true, though. Also, if 0/0 were equal to every number, then that would make it "multivalued", at least in the naïve sense, not undefined.
4:06 - 4:25 *and now, because we have 0/0 = k, we can legitimately divide both sides by 0, and then when we see 0/0, well, by our assumption, that's equal to k, so on the left hand side, we have k·1, and on the right hand side, we have k·17*
Ignoring the fact that you have not actually a provided an operational definition of division to even make sense of the claim 0/0 = k, and of something like (0·1)/0, or any other manipulations the problem here is that you are assuming a new form associativity, now. You are claiming that you know for sure that (0·17)/0 = (0/0)·17 and not 0·(17/0), and both of these claims are just assumptions themselves.
4:26 - 4:38 *and now, because we said that k is not equal to 0, and again, just imagine that we are saying that 0/0 is equal to 2, right? So if you have 2·1 = 2·17, of course you can divide that on both sides*
But this assumes that k is a real or complex number, and is thus invertible, which again, is just an assumption. Though I can still grant this, since it is still relevant to make this assumption if you want to prove that, if 0/0 is real (complex), then 0/0 = 0, rather than just proving 0/0 = 0.
4:39 - 4:47 *so here, we can just divide by k on both sides*
This runs into the same problem as before. You take (k·1)/k = (k·17)/k without even having given a definition for division by nonzero quantities in the first place, but even if I ignore this, you are still assuming new-associativity, which you are most certainly not warranted to have in this new arithmetic system.
4:52 - 5:07 *1 = 17, after we divide both sides by k. But of course, this is wrong, so I just say, "but you see that 1 is not equal to 17", so this right here is the end of the proof.*
But this only proves that if we assume 0/0 is nonzero AND still a complex number, AND if we assume (a·b)/c = (a/c)·b = a·(b/c) for every triple of elements, then there is a contradiction. It does not prove 0/0 cannot be nonzero complex if you give up the above equality, nor does it prove it cannot just be some other new noncomplex quantity. Which is the crux of my objection.
The rest of the video is just explaining how, therefore, if you ever wanted 0/0 to be defined, then 0/0 = 0 is the only option, because it does not cause any contradictions. But it likely does cause contradictions, and this is because it fails to account for the fact that this does not define what 1/0 is. In fact, since you feel comfortable in claiming that / as a binary operation satisfies (a·b)/c = (a/b)·c, I can say (1·0)/0 = (1/0)·0, but since 0/0 = (1·0)/0, because 0 = 1·0, this means 0/0 = (1/0)·0, which is impossible unless 1/0 is also defined. This is why one cannot actually ignore that / was not defined as an operation in the video to make sufficient sense of 0/0 = k as a definition and of the manipulations being made in the video. In this regard, 0/0 = 0 is just as problematic.

I want to define it ... "Every number"

"0 times pikachu is 0"
now THAT is maths

I am from bangladesh .. your classes are awesome ..very much helpful for me .at first i am scared of differentiation .but now i just love it .❤️ Thanks a lot .

Maybe not from a math perspective but the only time I've ever had to divide by 0 was within programming and within the requirements that I was working with, it actually worked for exactly what we needed to have dividing by 0 equal to 0 as if you had multiplied, because it essentially allowed to turn a value into a boolean within the constraints of that language that we were using. The result was always either 0 or 1. the value was 0 or it was anything other than 0, and we counted it as 1 towards a sum of the total non 0 values.

0/0 should not be defined at all, because 0 has infinite multiplicity.
IE:
0/0 = 0^2 / 0^1 = 0^1 = 0, but also
0/0 = 0^1 / 0^1 = 0^0 = 1, and also
0/0 = 0^1 / 0^2 = 0^-1 = ???
Clearly, 0 = 1 is a contradiction, so 0/0 cannot be defined ever, right?

My phone lagged for a long time when he asked for my favorite color, so I thought he was legitimately waiting for the viewer’s response

0:57 i love this

Doesn’t this only apply if k is a complex number? We could alternatively define k as some non-zero non-complex number which has the property that 1/k = k and k != 1. After all, the inverse of 0/0 is still 0/0

From math he evolved to mongolian warrior so he can meet both stereotypes

Please do a video about Quaternions

Somehow I watched this whole video without realising that he had a pokeball in his hand the whole time

Can you make a Video about the "Wheel-theory"? This Topic is really intresting and also about the 0/0 Problem.

A division operation expresses the idea that the numerator is being segmented (denominator - 1) times resulting in denominator portions. If the denominator is zero and one refuses to accept this as undefined then it seems to me this could be interpreted as the segmenting operation being performed -1 times, resulting in zero equal portions. We may either interpret this as a negation of the division operation itself, leaving us with the original value, or interpret the negative of an operation as it's inverse, thus x/0 becomes another way of writing x*0. So, depending on which interpretation is applied, x/0 is either x or zero. Operation transformation must be accounted for before processing can begin.

Is that symbol used as End of Contraction (oppositely pointed arrows) ?

46 is my favorite nummmbeerrrrr!!!!

3/3=1
2/2=1
1/1=1
-1/-1=1
0.5/0.5=1
So 0/0=1 no?
To add when we have some equations with x/x inside , we simplify it by 1 without making the case that x=0; so we already define 0/0 as 1 ,no?
We have :
x=0
x+1=1
x+x/x=1
but x=0 so
0+0/0=1
0/0=1

Great topic for discussion

Hmm, I just looked at it from the perspective of electrical engineering, take the voltage, current and resistance formula, V = I x R or V / R = I
Now just apply 0 / 0 = 0. Ez. I don't get why people find this hard

If we assume that 0/0 is any number it is not a single umber of our choice but all universe of numbers at the same time. In case of equation 1*0/0=17*0/0 as 0/0 can be any numer at the same time we just need to prove that there exist 2 numbers let's say p and q which satisfies the eqation 1*p=17*q. Solving for this is easy. Solution is p=17*r and q=1*r where r is any number.

What about the inverse of 0/0?
1/(0/0) = 0/0
1/k = k
Which implies k = 1 or -1
But there is nothing special about 1 so let’s call a number n.
n/(0/0) = n*0/0 = 0/0
n/k = k

1=17, for some belief systems.

So it's bad enough that 0/0 is a headache, but this man is here dividing entire equations by 0/0 and, in the eyes of mathematics and substitution rules, succeeding... somehow...

I just realized that I had put 0/0=0 into software several times independently. It always was a case-by-case decision, but it also always was 0/0=0.

“What’s your favorite number?”
“0”

0/0 = 1: Say 0 = 0*z if and only if z = 1, so 0 ≠ 2*0 since if you divide both sides by 0, you get 2 ≠ 1. And we can define 0/0 to be 1 with the following axiom: z/z = 1. This WILL the table of 0.
0/0 = 0: Say 0/0 = 0 since when you divide by a number z, it's the same as multiplying by it's reciprocal, so your just multiplying 0 by 1/z is, and anything multiplied by 0 is 0, so just say z = 0 and you have it. And your proof.

i believe if we were to define 0/0, it should not be 0, but a number that acts identical to 0. x=0/0, x≠0, y is any number, xy=x
as for how 0*x should behave, idk
this would of course require a new number, but we did that with sqrt(-1) and i

Amazing. Could you plz also give some STEP 3 questions a go. They are quite a lot more difficult and are more beautiful than the STEP 2 question than you attempted as well. There are some very beautiful one such as proving the irrationality of e etc.

At 4:15 How can you divide both sides of an equation by 0. I don't think that's a correct way.

Hey! I have a somewhat different opinion on 0. I personally think of it as less of a number, and more of a concept. The closest analogy I have to 0 is infinity. For most practical purposes, they function the same way. Ex: multiply both sides of an equation by either 0 or infinity, it ruins the equation. “Divide” by either, you are doing sketchy math. Neither really fit in most mathematical groups. Maybe this is a dumb take, but it makes sense to me.

Interestingly I saw a different version of the 1=17 contradiction a while ago. It stumped me at first:
a=b
a^2 - b^2 = ab - b^2
(a+b)(a-b) = b(a-b)
a+b = b
2b=b
2=1
Usually this is quite rightly refuted by arguing that step between lines 3 and 4, a division by zero, is a nonsense operation and everything after is invalid. But if we define 0/0 = 0, line 4 would instead be written 0=0, which ‘fixes’ this.

But wouldn't there also be some equation that'd lead to contradiction if you assume 0/0=0?

Seems appropriate to use Psi for both 0/0 and the wave function

I figured it was like a fifth root. A fifth root has 5 potential answers, but that doesn't mean they're equal, just that they hold an equal property when based off of that function. √5≠-√5, but (√5)^2=(-√5)^2.
This means that 0/0 should have a principle value, namely 0, just like √2 means 1.414... not -1.414..., but if one is to divide zero by zero, it can be anything within (-∞,∞) or i (-∞,∞).

If you define the result of division a / b = c as such number c that b * c = a, then any is quite a good answer, yo don't really have to multiply both sides by zero. But it should be noted, that in practical situation, that "any" does not mean "it can be anything you want", but rather "it could be anything, but we don't know what will work here just from seeing 0/0. We need more information". You should see every zero as a result of some limit or function and then you can divide it better. If you ever come to a parametric formula which can result in a division by zero, or even division of zero by zero, it kind of seems to me like trying to go to the next room through a wall, because it's the shortest path. Maybe you can just go around and not divide by zero. Maybe you can say what you want in a nicer way. It's more like 0/0 is not as much undefined, but rather impolite.

**Bprp uploads**
People who haven't studied calculus : Ahh shit! Here we go again.

Si asumimos que 0/0 = 0, existe una contradicción en la construcción del conjunto de los números racionales conjunto cociente de ZxZ/~ donde:
(a,b) ~ (c,d) si y solo si ad = bc.
El elemento (0,0), que representaría a 0/0, estaría en todas las clases de equivalencia, lo cual no es posible.

The conclusion I've come to about this problem is that I really hate doing math...

From what I've been told- anything divided by 0 is + or - infinity (because as x decreases, the value of 17/x increases and the value of -17/x decreases) but 0/0 is undefined.
Why can't 0/0 be defined as + or - infinity, instead of 0?

proof for 0/0=1
Assuming 0/0 has a solution, we will value that as "k"
0/0 = k
divide both sides by k to get
0/(0*k) = 1
0*k = 0 for any k, therefore
0/0 = 1
Therefore, (assuming there is a solution) at least one solution to 0/0 is 1.
Note: I am not saying 0/0 is always equal to 1. In actuality, the value of 0/0 depends on the context. Either that or there is no solution to begin with.

It’s like dividing fractions;
Example:
10/35 = 10 * 1/35 = 10/35
Therefore
0/0 = 0 * 1/0 = 0
Idk if that’s true or not

But if you have any number n divided by itself, you can write it as n^0. And n^0=1. So 0/0 must equal 1.

What if I make 0/0 = 0^0? I saw this done in a video on another channel in the past:
0/0 = 0^1/0^1 = 0^(1-1) = 0^0 and vice-versa.

If 0/0 = 0 = k by you than k*1=k*17 => k/k=1/17 or 17/1 which simply simplify from above k=0 as 0/0=1/17 or 17/1 not 0/0=0
So 0/0 is not zero either
I strongly still believes many times 0/0 =1 unless told as 2*0/0=2 or 0/0*6=1/6