Wow that's very clever! I love it too

52flyingbicycles moment

Continuous at Uncountably infinite points? Which function is that?

@@p07a most continuous functions lol

The identity, exponential, all polynomials etc. ​@@p07a

@p07a y=x²

Yes, exactly in fact f(x)=1/x is continuous for all x≠0, in other words f is a continuous function. If you define f:IR-->IR with f(x)=1/x for all x≠0 and f(0)=a for some real number a, then f is not continuous at 0 (because the limit of f at 0 does not exist). In an intuitive scene, the property "you can draw the graph without lifting your pen" only holds if f is continuous in a single interval (as one can see for example with f(x)=1/x with x>0 or x

No, if a function f(x) is undefined for a certain x, it is not continuous at that x. A function is continuous in a point if the value at that point equals the limit in its direct vicinity, otherwise it is discontinuous. If the value, the limit, or both don't exist, one can never claim equality. Furthermore, a function is continous on a domain interval if it is continuous on every value of that interval. Would you say that 1/x is continuous on the interval [-1,1]?

If it’s undefined it is definitely discontinuous

@@koenth2359 It really depends on your definition of continuity. If we use the one presented in the video then you need to have f(x_0) so f needs to be defined at x_0. Wikipedia actually has the same example with 1/x. You can find it here: en.wikipedia.org/wiki/Continuous_function. With that definition in the points that f is not defined then we cannot talk continuity. So 1/x is neither continuous nor discontinuous on the interval [-1,1] as it is not defined at 0. Furthermore, I disagree with this: "A function is continuous in a point if the value at that point equals the limit in its direct vicinity, otherwise it is discontinuous." because that means that a function is discontinuous at its isolated points if it has any. For example take sqrt(x^4-x^2) at 0.

A point not in the domain of a function does not satisfy the definition of the function being continuous at that point. Therefore, a function is not continuous at every point not in its domain.

Thank you, glad you enjoyed it!

I feel like our definition of continuous is kinda random, incomplete, and doesn't actually match the stuff we wanted it originally to describe

​@@ZeanIkLaurie the definition of continuity, I assume you mean strictly "continuous" isn't random, is completely by design and led by sound principles with a goal in mind, and is quite robust. It matches the "stuff (then and currently) well enough to get to where we are in differential geometry, topology, and more. Not sure what you mean by "incomplete (sparing talk of Gödel Incompleteness)." Strictly defined depending on what type of continuous you are talking about, really. Continuously differentiable ⊂ Lipschitz continuous ⊂ α-Hölder continuous ⊂ uniformly continuous = continuous A fun pathological example is the Weierstrass function. Continuous everywhere, but nowhere differentiable 🤯 did challenge notions at the time it was published. Stating the concept of continuity being random has no bearing tbh.

Similar background here. I did figure out where he was going before he got there, but I also agree a little bit with the other poster in this thread. Not that the definition is "random", but that the notion of "continuous at an isolated point" represents a case where the delta/epsilon definition leads to a conclusion that is at odds with our intuitive understanding of what continuity means. Of course, there are a lot of mathematical results that are counterintuitive.

@@bobbun9630 I'm in the same boat as you guys; took analysis as an undergrad years ago. I was pretty sure it was going to turn out no, but see what happened. The setup is contrived but clever, and it seems sort of pathological and counterintuitive. I spent some time trying to figure out a definition that wouldn't allow it, but in the end decided I just didn't have the right intuition in the first place and that that was what I needed to change.

@@alexwarner3803 the "stuff" is what should guide our definitions. It's also mental abstractions. In any case what he talks about is a function R to R but that should be distinguished as a projection or 1D version, based on a specific parametrization of what is actually continuity for most. And in this sense now you should see what I mean by incomplete.

Thank you so much!

Is it really worthy of being cringe-inducing or is it just a simple mistake that warrants a small and simple correction?

Are you really afraid, though? It seems like you're rather chuffed at the opportunity to pick a small nit.

@@MichaelRothwell1 Fair point, I wanted to avoid step functions in the beginning, just to make the video more accessible, but yes the example f(x) = 1/x certainly doesn't work with the more rigourous definition of continuity!

If you really want to nitpick, it's easy to define a function continuous at only one point by expressing it as a function in a topology with only 1 point to begin with. Any topology on the set results in the function being continuous. All discussions in the video seem to have implied the idea that we're looking at continuity on the set of all real number under the usual metric, a reasonable thing to have as an unspoken assumption, since this is a youtube video and not an academic paper. It's true that f(x):R/{0}->R=1/x is continuous everywhere as you have pointed out, but f(x):R->R=1/x is discontinuous at x=0, which is the point he was making graphically in the video.

​@@ValentineRoguesorry to interrupt but f(x):R ---> R = 1/x is not well defined. You'd need to choose a point for f(0)

Thank you!

I was trying to disprove it could be done, but this is what i found. Had to search around a bit at some points cause it's been awhile: You can argue that the points of continuity these kinds of functions yield will always be closed. Therefore, the set of points of discontinuity (call it U) must be open. We are also assuming that U must be dense, else there exists some interval containing no discontinuities. Since U is open and dense, it's complement (our set of continuities) must be nowhere dense. So sounding pretty cantor-set-y at that point no matter what. The example I could find was using the function f(x) = d(x,A) / [d(x,A)+d(x,b)] With A some cantor set (or similar) and b a point outside of A. Which like I never would have come up with, but is surprisingly simple and similar to the video's concept. It still feels like one of those things a continuous function shouldn't be able to swing to me, but I guess it can!

@@spineo2387 Great stuff! Quick question: I don't know what d(x,A) and d(x,b) means. I guess it's a distance, but I'm not sure. Could you explain? Thanks!

@@jcsahnwaldt yeah, exactly it's the distance function where d(x,y) is the distance between two points. You can also extend such functions to define the distance between two sets, which we would need to define the "distance to tge cantor set A" in that function

@@spineo2387 If I understand correctly, d(x, A) is the distance from x to the nearest point in A, right?

@@jcsahnwaldt in this case yes, that can be our definition. In general, defining the distance to a set can be just slightly more subtle (what if there is no single nearest point? For example, what should d(0, R+), the distance from zero to the set of positive numbers, be?). But in this particular case, that concern isn't relevant to a closed set A in the real numbers. There will always be nearest point(s) in A that can give us our distance to A.

Same reaction, this video keeps reminding me that the formal definition is the first step to gaining new intuition.

I have to say I didn't watch the video yet...

@@77Chester77 I'd never made that connection, you're right! 😂

Same!

Pick a value of δ that satisfies the definition of continuity at x = 0 for ε = 0.1 in the function f(x) = 1/x If one exists, the function might be continuous. If it doesn’t, the function is discontinuous at x = 0.

A function being continuous as a point means that any "small" change in input from that point gives a "small" change in the function's output

Continuity at a point doesn't describe a property of only that point, instead it relates the point to its neighborhood of an arbitrary size. Because it has to work for any size, you can always still see it at some macroscopic scale that is still larger than the infinitesimal.

@@jellybabiesarecool4657 "Small" in quotes. But in these cases, small implies _any_ shift from that point causes a (large) jump, not a small change in output. Hence my query about it being a misnomer and wondering what "continuous" at a point means.

@@CatholicSatan Why do you say that "any shift from that point [zero here] causes a (large) jump, not a small change in output". In the example presented, any shift from zero produced a change in output no greater than that shift itself (zero for irrationals, the shift itself for rationals). The change in output is bounded by the change in input. But you are right to say that this example is very odd intuitively. Perhaps the best way to think about it is to say that the formal definition captures what we want for "normal" functions, and we just accept somewhat counterintuitive implications (like continuity at a single point) for bizarre ones for the sake of having a nice consistent and homogenous theory. After all bizarre functions like f(x) = x for x in Q, f(x) = 0 for x not in Q are quite counterintuitive already. (I believe it took a long time for mathematicians to become comfortable even accepting such things as functions at all)

At a point vs on an interval The latter is more intuitive

Yay! I wrote the example when I haven't watched the video and now he introduced almost the same idea

I think with this style of construction it should be: I started writing out a longer proof working directly from using limit points of the set of continuity, but all we really need is two things: 1) such functions will be continuous at their zeros (and no where else) 2) the preimage of a closed set is closed Since {0} is closed, that should do it!

it is not. say for example f(x)=0 for all irrational x, and for all x with 0

@@deinauge7894 that's distinct from the videos example in the sense that that original f(x) was discontinuous everywhere on that interval. Clearly it's not true that every function in general is continuous on a closed set. But *if you're starting out with a continuous function* then the set of continuity for that function times our indicator function will be closed by the above argument.

Indeed, if you extend it with a point at infinity, then it's continuous at x = 0 as well.

I don't think so - between any 2 rational points there are infinite irrational points. So you could build a function that is discontinuous there, but not continuous.

No the density works both ways. Between two irrational numbers is a rational one and between two rational ones is a irrational.

🤷

I think it would still be continues whenever x is a multiple of pi though, because you can pick arbitrarily close rational numbers

Well spotted! f(x)=sin(x/π) when x∈ℚ would work a lot better!

With only rational numbers, you can only get arbitrarily close to zero, but you cannot get zero itself You could however choose f(x) to be sin(π*x), and you would have infinite zeroes Edit: I just saw that the original comment suggested the same function >.

@@garyzan6803 The function from the video is defined to be zero for every irrational number x, so f(π) would be zero. Then, for every ε>0, you can pick a range around x, such that the absolute value of the sine of every rational number in that range is smaller than ε (and for irrational numbers the difference is 0 of course).

no, his example does work because the rational sines approach zero, the irrational numbers approach zero, and the exact value of the function is also zero

Well, it turns out that it doesn't change much, and with this type of functions it's actually surprisingly simple. Intuitively, since the rational numbers are numerable, they are a smaller infinity than the irrational numbers, so they count pretty much nothing. This can be formalised in measure theory and it turns out that the measure of a numerable set is 0. Now, if you integrate over a set of measure 0, you get 0 no matter which function you have. So for the integral of that function you can separate it in a sum of two integrals, one over the rationals and one over the irrationals. But the first one is 0, and the second one is also 0 because the function is 0 at the irrationals. So in this case it's just 0

@@moonshine7753 Fascinating. I would love to see a proof of this. Can you reference me one?

@@rescyy2235 well... it's knowledge I got from my course on measure theory, so I don't think there is just a single proof. If you want, my professor used Rudin's "Real and complex analysis" as a base for her lessons (you can probably find a pdf online), but it's a terrible book, very dense. If you want I can give some explanation by not really proving everything. The idea is that you assign a measure to (almost) every set, which represents how big it is. In the real numbers the measure of an interval for example is its length. This is because to create this measure we take as a basis Riemann's integral. So first of all we define an integral with respect to a measure (the Lebesgue integral), then for every function that we can integrate with Riemann we want a measure that makes both integrals coincide. If you have a very simple function, for example one that is 1 in some set and 0 everywhere else, then the Lebesgue integral of that function is just the measure of that set. You can then extend this to every other function basically by doing some limits and using simple functions. The point is that the measure of a single point is 0, because you can see that point like an interval of length 0. Another good property is that if you have a numerable amount of disjoint sets, the measure of their union is just the sum of their measures. So now you have that Q is just a numerable union of single points of measure 0, so the measure of Q is still 0. I'm... really not good at explaining things, but we had to define and prove a lot of things to get to these results. There are a lot of intricacies in how you define rigorously these things. I think if you search measure theory you might find some useful sources, but I honestly don't know.

1/x is a hyperbola, and since all conic sections are closed loops in the projective plane 1/x will be too, as far as I know.

@@ТимурГубаев-ж8ы 😂😂😂

How do you get from "the number of points where the value of the function is 0 is not countable" to "the function is continuous at these points"? The second statement does not follow from the first one, why should it?

Actually the restriction of the function to the rationals - that is, the function considered only as acting on rationals - IS continuous, since it is everywhere 1. (This has nothing to do with countability though: the restriction of the function to the irrationals is also continuous, since it is everywhere 0). But the function as defined is from the reals, and since every real number r (rational or irrational) has both rational and irrational numbers arbitrarily close to it, there will be (given any delta you care to choose, however small) some f(x) = 0 and some f(y) = 1 with both x,y within delta of r. That makes f discontinuous at r. And since r was arbitrary, this shows that it is discontinuous everywhere

​@@bjornfeuerbacher5514these definitions dont work on vibes. you cant just point at two sentences and decide they mean different things because they use different words. in this case the two really are unrelated, but that must be proven, not assumed

the epsilon-delta definition of continuity requires that given any finite non-zero vertical range (epsilon), there must exist a finite non-zero horizontal range (delta) where *all* inputs map to outputs within that vertical range. in this case, you can never pick a delta small enough to exclude the nearby rational points, so the function cant be continuous by that definition

@@jotch_7627 thanks. But this “suggest” to me that R and Q have the same cardinality because any element in R-Q is “surrounded” by an element in Q. I’m perfectly conscious that this is just a wrong deduction, but i can’t see where is the mistake. Another doubt i have: does a definiton like the one choosed for the above function, needs a proof to show that the function actually exists?

But the cardinalities of Q and R-Q are different, Q is countable and R-1 is uncountable

@@gileadedetogni9054 but he just did has a direct consequence that they have the same cardinaly as each irrational number is surrounded only by two rational and vice versa! if there is an irrational surrounded by another irrational (or vice versa) then there is a continuity there and thus this video is garbage

@wydadiyoun ah, got your point, but that not the thing. This property is called being dense, and two subsets of a set can be dense in the bigger set without having the same cardinality

​@@wydadiyounthe real numbers are not discrete. no number is "surrounded" by two other numbers. *any* range that includes more than one number includes an uncountably infinite amount. in the case of rationals, it is only countably infinite, but infinite nonetheless.

It stops looking counterintuitive when you realise that all rationals can be expressed as "a/b". And, since there are as many ordered pairs "(a,b)∈ℤ²" as intergers (you can even check it intuitively by putting all "(a,b)" pairs on a Cartesian plane and matching them all in a spiral shape) and since the set of all irreducible pairs is a subset of "ℤ²", there must be as many rationals as intergers. This is not a rigorous argument, but an intuitive way to think of it.

​@@GabriTellthis can explain why the set of rationals is countably infinite, but it doesnt explain density. after all, the integers are *not* dense in the reals even though they can map 1:1 to rationals

Nope, can’t be continuous in the rigorous sense if it is only defined at one point. f(x) = 0 if x = 0; undefined if x ≠ 0. What is the limit as x approaches 0 of f(x)?

assuming that f(x) = 0 for x ∉ ℚ then yes, here's why: for differentiability at zero we need to look at the limit as x approaches zero of (f(x) - f(0)) / (x-0) and since f(0)=0 that's just f(x) / x now let's plug in the definition of f(x): for x ∈ ℚ we get x^2 / x = x and for x ∉ ℚ we get 0 / x = 0 which is exactly the first example given in the video as shown in the video that function is continuous at zero and it has a value of zero, therefore the limit exists and is zero, meaning f is differentiable at zero and f'(0)=0

@@nobody-sq3nq And if we take x^n n-> infinity it is infinitely differentiable only in one point. Or is it the entire interval ]-1, 1[

@@milasudril depends a bit on what you mean with n -> infty, i haven't checked thoroughly, but I'm pretty sure for a fixed n the function would be n times differentiable at 0 as we are dealing with a sequence of functions, we can look at pointwise and uniform convergence for taking the limit, for |x| > 1 the sequence diverges, so let's only look at [-1, 1] for pointwise convergence we look at the limit for a fixed x, which leads to the function f(1) = f(-1) = 1 and f(x) = 0 for x ∈ (-1,1); this function is constant and therefore infinitely differentiable except for x = 1 and x = -1 where the function is not continuous the sequence x^n does not converge uniformly if x can get arbitrarily close to 1 or -1, so you have to choose a smaller interval than (-1,1); and if you do, the resulting limit is the constant zero function, which again is infinitely differentiable

while there uncountably many irrational numbers and only countably many rationals, there actually exists a rational number between any two irrational numbers, which works because infinities are weird and break intuition specifically the rationals are a dense subset of the reals

there is a prove, that you can get a rational between 2 real numbers. i think the easiest was to understand is, if a real number has a fixed length, and then is only followed by 0, it is rational. if you have 2 real numbers, they have to be different at some point (and assume that they are bigger then 0), then you can use the bigger ine, and replace anything behind the difference with 0. it is lower then the bigger value, because we cut some places, and it's higher then the other one, because it has a higher number at a position before it ends

@@nobody-sq3nq So there is a rational number between any two irrationals, but there are infinitely many irrationals between any two rational numbers?

​@@hlvaneedenthere are infinitely many rationals between any two numbers, just as there are infinitely many irrationals. both are infinite, but one is countably infinite and the other is uncountable. countability is not what matters here, *density* is

yep, and the same holds for irrationals. the property is called "density", if you want to look up various proofs for it

@@jotch_7627 I find this amazing

f(x)=x when x 0 and is irrational f(x)=1 when x > 0 and is rational The above function is continuous for positive negative values of x and discontinuous for nonnegative values.

@@ajfernandez216 Oh, you're right. That's pretty simple. I was hoping for something more interesting. 🙂 I'll reword my question.

let's fucking gooooooo

(x-2)/(x-2) is not defined at 2, but still continues (as it is 1 everywhere except at 2)

@@schwingedeshaehers … which is a fundamentally different type of function than 1/x (with a removable discontinuity)

@@nightowl9512 that's true, but it still shows that it doesn't make sense to say, that just because it isn't defined, that it can't be interesting if it is continuous at a point

one has to be careful when comparing singularities, and my original comment was for 1/x especially, ie with an essential singularity (which I could of course have made more clear). Removable singularities constitute a whole different type of singularities ​@@schwingedeshaehers

it's continuous for positive x and for zero if you define 0^0 as 1 I don't know a definition that works for (negative number)^(non-integer) but if you restrict the domain to only allow negative integers then it's still continuous as isolated points are always continuous

delta isnt bounded by epsilon at all, it just has to exist and be non-zero for any possible epsilon value. if you can prove that the value of epsilon itself would work for delta, then you meet that requirement, but it isnt the only way to do it.

@@jotch_7627 Ah of course thank you. Epsilon delta is such a simple concept but I get lost in the weeds of notation all the time, I should sit down and do a few problems.

Don't forget that the stipulation was to apply to the OPEN interval (x0 - d, x0 + d), so x is always < delta away from x0, at which f(x) is therefore < epsilon away from f(x0). So delta = epsilon was legit.

@@RGP_Maths ah I see. Got it cheers :)

It doesn't have a defined slope. The function is continuous at 0, but it isn't differentiable there. Now if he has picked x^2 as the value for X rational, then the derivative at zero would exist and would be equal to 0.

I mean yeah it’s analysis 1 so trivial for trained mathematicians, but even general science doesn’t do analysis, let alone general KZbin which is the audience.

The issue would be that there is no such thing as an "infinitely small number" in the rea number system. The closest we have would be zero, which is rational. In discussing calculus we sometimes appeal to the idea of an infinitely small number to get intuitive arguments more simply stated, but that is best understood as (usually) just an intuition, not a rigorous, literal statement *or* (much, much less often) as us working in a more subtle system than the real numbers that includes objects that can be interpreted that way. In either case, for the real numbers, the construction you describe can't actually be achieved

@@spineo2387 hmm ok, but what I'm trying to convey is that the assumption that rational and irrational numbers intercalate doesn't need to be true, if in any case at all the function has two points with irrational numbers then it'd be continuous also there

@@marcosmerino9369 let me know where i might clarify better, but the point i was making above is that that conclusion you're reaching is faulty because there is no such thing as an infinitely small number. "Intercalate" isn't necessarily the best way to visualize things because there is no such thing as the "next" real number after some specific x. However, if we look at some interval around any x, *no matter how small* there will always be infinitely many irrational and rational numbers. Therefore what you describe is simply impossible within the real number system.

@@spineo2387 ok I’m following, thanks for the clarification. I will do a bit more research on this but I am starting to understand, thanks!

also good to keep in mind that two numbers being irrational does not suggest, let alone guarantee that their sum is also irrational

Differentiability implies continuity but continuity does not imply differentiability. For example, f(x) = |x| is not differentiable at x = 0 but it is continuous at x = 0 because anywhere a function is pointy it isn’t differentiable. Using fractals you can define a continuous function that is pointy everywhere and therefore differentiable nowhere.