What is Euler's formula actually saying? | Ep. 4 Lockdown live math

Рет қаралды 1,204,629

Күн бұрын

What does it mean to compute e^{pi i}?
Full playlist: • Lockdown math
Home page: www.3blue1brown.com
Brought to you by you: 3b1b.co/ldm-thanks
Beautiful pictorial summary by @ThuyNganVu:
/ 1258220129327800320
/ 1258220541686628353
Not on the "homework" to show that exp(x + y) = exp(x) * exp(y). This gets a little more intricate if you start asking seriously about whether the series really converge, what they converge to, and how exactly you define a product with infinitely many terms. For anyone curious about the technical details, what you would want to show is that the Cauchy Product of the series for exp(x) and exp(y) converges to the product of the values exp(x) and exp(y) for any particular x and y. That requires the Merten's Theorem.
Thanks to these viewers for their contributions to translations
Hebrew: Omer Tuchfeld
------------------
Video Timeline (Thanks to user "Just TIEriffic")
0:00:00 Welcome
0:00:20 Ending Animation Preview
0:01:15 Reminders from previous lecture
0:03:30 Q1: Prompt (Relationship with e^iθ=…)
0:05:40 Q1: Results
0:07:15 WTF, Whats The Function
0:10:00 Exploring exp(x)
0:11:45 Exploring exp(x) in Python
0:14:45 Important exp(x) property
0:15:55 Q2: Prompt (Given f(a+b) = f(a)f(b)…)
0:17:30 Ask: Which is more interesting, special cases or the general case
0:20:00 Q2: Results
0:23:50 Will a zero break Q2?
0:25:40 The e^x convention
0:27:10 Q3: Prompt (i^2 = -1, i^n = -1)
0:27:45 Ask: Zero does not break Q2
0:30:20 Q3: Results
0:31:05 Comparison to Rotation
0:33:00 Visualizing this relationship
0:36:50 The special case of π
0:39:20 Periodic nature of this relationship
0:39:40 Q4: Prompt (e^3i)
0:41:35 Q4: Results
0:43:55 Explaining the celebrity equation
0:45:55 Homework / Things to think about
0:49:15 Ask: Zero does break Q2.
0:50:30 Closing Remarks
------------------
The live question setup with stats on-screen is powered by Itempool.
itempool.com/
Curious about other animations?
www.3blue1brown.com/faq#manim
Music by Vincent Rubinetti.
Download the music on Bandcamp:
vincerubinetti.bandcamp.com/a...
Stream the music on Spotify:
open.spotify.com/album/1dVyjw...
If you want to contribute translated subtitles or to help review those that have already been made by others and need approval, you can click the gear icon in the video and go to subtitles/cc, then "add subtitles/cc". I really appreciate those who do this, as it helps make the lessons accessible to more people.
------------------
3blue1brown is a channel about animating math, in all senses of the word animate. And you know the drill with KZbin, if you want to stay posted on new videos, subscribe: 3b1b.co/subscribe
Various social media stuffs:
Website: www.3blue1brown.com
Twitter: / 3blue1brown
Reddit: / 3blue1brown
Instagram: / 3blue1brown_animations
Patreon: / 3blue1brown
Facebook: / 3blue1brown

Пікірлер: 1 800

@3blue1brown 4 жыл бұрын

Summary of the confusion on problem 2. TL;DR, given the spirit of the question it should have also specified that f(x) > 0 for all x, and I'm clearly prone to deep confusion while trying to juggle the many balls of live broadcasting. The question asks about a function f satisfying f(a + b) = f(a)f(b). The relevant part of the question was whether f(-1) must be 1 / f(1). - It was originally graded in a way to suggest that this _does_ indeed need to be true. - While "explaining" it, I realized that the explanation required that f(0) = 1, and questioned whether this is necessarily true. I even said, "oh, you could just scale it". This thought of scaling is not correct, since (c*f(a))(c*f(b)) = c^2 f(a + b), so the lhs and rhs doesn't scale the same way. - At 27:48, Sam points out that the constant function f(x) = 0 doesn't work, which I misread as asking about whether f(x) = 0 for some x (sorry Sam!). - Crispin points out that f(0) must be 1 because f(x) = f(x + 0) = f(x)*f(0). This is true, as long as f(x) does not equal 0 everywhere, but at that point, I was still weirdly blind to that edge case and enthusiastically accepted this as a reason that the question was originally graded correctly. - At 49:07, more of the discussion that has been happening on twitter is brought to screen, where Eric correctly points out that Crispin's proof doesn't work for the constant function f(x) = 0, which Sam had said all along much earlier and I misread. Thanks for the good discussion, and the tolerance of some live befuddlement.

@oximas 4 жыл бұрын

I have a nice question does all functions that satisfy f(a+b) =f(a)f(b) produces values that are bigger than or equal to zero or can a function with such property have a negative output?

@theloganator13 4 жыл бұрын

@@oximas Let's assume there is a continuous (you can draw it without lifting your pencil) function f(x) such that f(a+b) = f(a)f(b), and that at some place this function is negative, say f(c) < 0. In the spirit of this post, we can see that f(c+0) = f(c) = f(c)f(0), so f(0) = 1. We know that f(0) = 1 and f(c) < 0, which means that there must be a number d between c and 0 such that f(d) = 0. This means that f(1+d) = f(1)f(d) = 0. But also f(2+d) = 0. And f(3+d). In fact, we would find that no matter what number x is input to the function, f(x) = 0. But this contradicts our assumption that f(c) < 0. The contradiction means that the original assumption must be wrong, so there cannot be a continuous function f(x) such that f(a+b) = f(a)f(b) and f(c) < 0 for any number c. Using this same argument, we can show that the only continuous function such that f(a+b) = f(a)f(b) that can take the value 0 is the function f(x) = 0.

@theloganator13 4 жыл бұрын

@3Blue1Brown Thank you so much for taking the time to walk through not only the correct answer, but also your own confusion. So often students (and many teachers) see teachers as infallible sages. It's very encouraging to see teachers demonstrating to students the process of admitting their errors but then persisting towards reaching the correct solution. Keep up the great work!

@tomekczajka 4 жыл бұрын

@@oximas For real-valued functions negative values are not possible, because f(x) = (f(x/2))^2 >= 0. If complex values are allowed then you can get negative values, for instance... f(x) = e^(ix) Then f(pi) is negative.

@oximas 4 жыл бұрын

@@tomekczajka ohh i get it so all "real" functions (aka ones that don't contain imaginary values) only give nonnegative values, that's interesting. thanks for the help

@VadimKudim 2 жыл бұрын

As a non-native English speaker, I'm really grateful that someone finally explained what WTF means.

@orang1921 10 ай бұрын

i keep asking my friends what "idk" and "idc" means but they just respond that they don't know and don't care :(

@boonga585 10 ай бұрын

@@orang1921this deserves more credit

@nikos4677 10 ай бұрын

@@orang1921lol nice joke

@cmgeolo 6 ай бұрын

😮

@aliatack19 6 ай бұрын

@@orang1921 I don't know you and I don't care to know you

@microhoarray 4 жыл бұрын

When he wrote Wtf = Whats the function I waited for him to laugh (cause i did) bu he didn’t. This guy is good on camera

@indianjitsingh8838 4 жыл бұрын

That made me giggle too much

@knightwik 4 жыл бұрын

@@indianjitsingh8838 my nigga!

@andreykol13 4 жыл бұрын

Dr Peyam reference (i guess)

@sahilsagwekar 4 жыл бұрын

I'm glad that he didn't say anything about it. I was watching this

@StarNumbers 4 жыл бұрын

Maybe didn't spend much time in the bar

@hal6yon 4 жыл бұрын

37:22 Grant: π² is same as g Me: satisfied engineer noises

@JNCressey 4 жыл бұрын

mathematician: π² = g engineer: 3² = 10

@JM-us3fr 3 жыл бұрын

Heresy!

@alonsovm2880 3 жыл бұрын

@@JM-us3fr g = 10

@ammyvl1 3 жыл бұрын

@@JNCressey Cosmologist: e² = 1+- 10^4

@ganondorfchampin 3 жыл бұрын

@@JNCressey Mathematicians don't believe in g, surely you mean a physicist.

@peeyushkelkar 4 жыл бұрын

Grant: *drinks water Me: Write that down!

@vincentpelletier57 4 жыл бұрын

Will it be on the test?

@itays7774 4 жыл бұрын

I remember a couple years ago, during a particularly boring physics lesson, I messed around with my calculator and typed the sum over the factorials to see what i would get. To my surprise, i found out that the answer was 2.718... so i thought to myself "wait, it can't be", i took the ln of it and sure enough it was 1. I was blown away, and i thought i found a secret way to calculate e. Later I took calc 1 and discovered that i discovered nothing new, but still, that feeling when I accidentally stumbled upon this formula for e was really something else, and throughout the last 2 years of my bachelor's math degree, I only ever felt that way once again, the feeling of pride that i discovered something new and beautiful.

@macronencer 4 жыл бұрын

Oh yes, I love epiphanies like this! Aren't they great? I think when you've stumbled upon something in this way you simply can't ever forget it. If only we could learn everything through personal discovery, we'd probably retain it all a lot better.

@vivekpanchagnula815 4 жыл бұрын

@Rayan I remember finding the same thing but by counting tiles when i was younger. I realized I could find the next square and made a formula for (x+1)^2 until i realized that there was an (a+b)^2 formula, which was equivalent.

@tyrannicalthesaurus4672 4 жыл бұрын

For me, my search for the function equal to the sum of the factorials lead me down the rabbithole of calc. Little did I know that there was no elementary function describing the sum of factorials. It all stemmed from me discovering a neat formula, that the sum of the first n natural numbers is n(n+1)/2. That was really the start of my journey.

@ganondorfchampin 3 жыл бұрын

Mine was finding a formula for calculating pi based on the limit of regular polygons.

@jimannothe 2 жыл бұрын

What was it he second time?

@davidgustavsson4000 4 жыл бұрын

The memory rule I learned for the digits of e is {Everyone knows how it starts}{Ibsen's birth year}{Again}{The angles of a right isosceles triangle} 2.7 1828 1828 459045

@stearin1978 4 жыл бұрын

Leo Tolstoy birth year... etc.

@xyz39808 4 жыл бұрын

how did I go this long without noticing that there's two 1828s in there

@davidgustavsson4000 4 жыл бұрын

@@xyz39808 you could have gotten four extra digits for free.

@Jehannum2000 4 жыл бұрын

@@xyz39808 When I first came across e I assumed the 1828 was recurring.

@davidgustavsson4000 4 жыл бұрын

@@Jehannum2000 762 digits into pi, there are six nines in a row, which is an excellent point to stop memorizing and just say "et cetera".

@OAmus 4 жыл бұрын

PLEASE KEEP THESE LECTURES COMING! They're wonderful and are demistifying a lot for me - way past highschool :)

@rockefellersavage4122 3 жыл бұрын

13:15 is where I left off

@TechToppers 3 жыл бұрын

It's over. At least for now...

@ca-ke9493 3 жыл бұрын

In all my years of highschool and engineering undergrad, the taylor series of e^x being the way to understand exp(x) was never emphasized like in the way here. Euler's formula was just the way to convert between polar and real/Im form of imaginary numbers and do some convenient maths that was noted down and refered to in a formula sheet. Closest was a professor explaining that defining trait of e^x is the function where its differential was the same as its integral, was the same as the value of e^x.

@ruutjormun2262 3 жыл бұрын

@@ca-ke9493 now that one threw me off in integration. every damn time a question asking integral of e^x, id be relieved, and id put e^x. so many missed marks

@ishworshrestha3559 3 жыл бұрын

@JustTIEriffic 4 жыл бұрын

Video Timeline 0:00:00 Welcome 0:00:20 Ending Animation Preview 0:01:15 Reminders from previous lecture 0:03:30 Q1: Prompt (Relationship with e^iθ=…) 0:05:40 Q1: Results 0:07:15 WTF, Whats The Function 0:10:00 Exploring exp(x) 0:11:45 Exploring exp(x) in Python 0:14:45 Important exp(x) property 0:15:55 Q2: Prompt (Given f(a+b) = f(a)f(b)…) 0:17:30 Ask: Which is more interesting, special cases or the general case 0:20:00 Q2: Results 0:23:50 Will a zero break Q2? 0:25:40 The e^x convention 0:27:10 Q3: Prompt (i^2 = -1, i^n = -1) 0:27:45 Ask: Zero does not break Q2 0:30:20 Q3: Results 0:31:05 Comparison to Rotation 0:33:00 Visualizing this relationship 0:36:50 The special case of π 0:39:20 Periodic nature of this relationship 0:39:40 Q4: Prompt (e^3i) 0:41:35 Q4: Results 0:43:55 Explaining the celebrity equation 0:45:55 Homework / Things to think about 0:49:15 Ask: Zero does break Q2. 0:50:30 Closing Remarks Water drinks at 0:17:10 & 0:27:45 & 0:40:05 Edits: Moved water drinks to the bottom, spelling errors, these timestamps should be for after the video is trimmed at "Welcome!"

@jadenchen8921 4 жыл бұрын

My favorite is 0:07:15

@mazajee 4 жыл бұрын

doing gods work

@JustTIEriffic 4 жыл бұрын

Had a problem where last video's comment became unpinned after updating timestamps for trimmed video. These timestamps are for the trimmed video (assumed it was trimmed at 5:10) if you wish to use it before the video is trimmed, add 5 minutes and 10 seconds to the displayed timestamp.

@coolguy284_2 4 жыл бұрын

I lolled at the WTF = what's the function part. I guess he's really prepared, with 69 and WTF.

@thguzzo17 4 жыл бұрын

Great

@Harsh-Words 4 жыл бұрын

I think " Maths for the Curious " is a better title for this series than 'Highschool maths'. As I don't know if this lecture would specifically help in highschool exams etc. But I think it is for anyone who is curious and wants to learn math with a little more intuition and creativity. For example: I work in theoretical physics, and have already learnt lots of Maths. Still going back and understanding math fundamentals in this beautiful way accentuates my understanding. Which is why I believe that " Maths for the Curious " is a better title, age no bar.

@3blue1brown 4 жыл бұрын

Interesting perspective! And probably true :)

@Harsh-Words 4 жыл бұрын

@@3blue1brown Hey, Thanx for the reply! Would love it if something similar was implemented in the next lecture onwards. While highschool maths reminds most people of dull problems and unnecessary competition, this on the other hand is truly magical. Love this series and infact for that matter all your material is brilliant, especially the " essence of " series. Keep up the great work!

@jennacook2505 4 жыл бұрын

@dramwertz4833 4 жыл бұрын

I am also in High School and i agree. I for example wont have complex numbers in school before uni. Atm tho i think the lessons are in a perfect difficulty. Its quite challenging but if one invests a few hrs most should be able to manage iy

@fmjs5146 4 жыл бұрын

I think it depends where you go to high school. This is in the syllabus of high schoolers in certain parts of Europe and Asia 😅 But regardless of what's in school syllabus, I feel that an appreciation of math like this is all the more important for people in their early to mid teens. So reaching out to high schoolers is a great thing.

@raedinsmore7732 3 жыл бұрын

His excitement is contagious. And seeing him get flustered because he was live and didn't want to say the wrong thing makes me feel better about how I freeze up or get flustered. We're all human!

@nobodysfool2232 3 жыл бұрын

I’m a middle-aged financial engineer and learn from your lectures- and I was definitely paying attention to math classes in high school. Watching your videos and the beautiful new perspective you cast on sometimes elementary topics is like re-watching a classic movie or re-reading a classic novel and getting whole new appreciation for the material as if you were reading it for the very first time.

@stewartmoore5158 4 жыл бұрын

Genuine question: Why aren't we taught this concept intuitively at institutions we literally pay thousands for each year? Why is it that we have to come to a free source to learn these things deeply?

@ccgarciab 4 жыл бұрын

Pedagogy is a field that deserves to be studied and improved in it's own right. Unfortunately some institutions just look for teachers with dexterity in the branch of knowledge being taught but not in the knowledge of how to teach.

@jeffjiang5272 4 жыл бұрын

Schools have to make it "hard" to distinguish "good" students

@amatya.rakshasa 4 жыл бұрын

Being a great teacher and being a great mathematician are different skills and hard to find in the same person. Also, being a great teacher is not particularly valued by society so great communicators who deeply understand a subject frequently find other jobs. Ideally a University should hire mathematicians to do research and not force them to teach and hire teachers to teach.. but that would be too expensive. High schools only hire teachers but there aren't enough talented individuals in the world who deeply understand math, love teaching, and love students. Grant is like the LeBron James of math education and by definition every highschool in the world cant have their own LeBron James.

@hexa3389 4 жыл бұрын

@@jeffjiang5272 I disagree. Those "good" students usually can't care less about what the teacher is saying as they are probably way ahead of the class. Or atleast that's how it is in high school. The way they teach math is bad because math teachers dont design the curriculum but education specialists who barely know any math.

@alekisighl7599 4 жыл бұрын

Because of time.... I can't believe people don't understand this simple thing... This video takes an hour to deeply and beautifully explain the Euler's formula which is one part of complex numbers... While school teachers get about 30 minutes a class to do so

@3blue1brown 4 жыл бұрын

For those of you who haven't seen it, Mathologer has a wonderful video on Euler's formula: kzbin.info/www/bejne/Y5XLeaWdYrCVgJI A worthy question is to ask what the connection is between the limit he writes and the polynomial here. Perhaps good fodder for the next lecture :)

@ayyoubfatene3768 4 жыл бұрын

Please can you tell me which tool is used to make such a great video ?!

@judsongordy8872 4 жыл бұрын

Sam was saying that f(x)=0 satisfies f(a)f(b)=f(a+b), but does not satisfy condition 3, and therefore, only answer 1 and 2 are necessarily correct.

@karkaroff1617 4 жыл бұрын

23:48 f(0) must be 1, because f(n) = f(n+0) = f(n)f(0) = f(n).1 = f(n) edit: just when f(n) =/= 0.

@judsongordy8872 4 жыл бұрын

@@karkaroff1617 If f(n)=0 then we have 0*f(0)=0. And f(0) could 1 or 0 or any other constant. Therefore, if f(n)=0, then equation 3 isn't satisfied. The problem should have stated that f(n) is not 0.

@EebstertheGreat 4 жыл бұрын

One topic I had always wondered about was a more direct (but challenging) way of defining a^x (a,x∈R, a>0) in terms of Cauchy sequences (a^qₙ) where rational every qₙ is rational and qₙ→x. It would require proving that every such sequence was Cauchy, so by completeness they converge to some real y, and in particular that they converge to the same y. Then (using whatever is your favorite definition of e), exp(x) = e^x, and log(x) = exp⁻¹(x). This makes it a direct extension of exponentiation with rational exponents, which are essentially defined by the requirements that a^x * a^y=a^(x+y) and a^1 = a, along with the convention that a^x > 0. It feels a little more motivated than the backdoor method of, for instance, defining log(x) in terms of an antiderivative, then defining and extending its inverse, and finally proving that the resulting function corresponds with the usual definition for rational arguments. Since it is continuous by construction, these two approaches are equivalent, but it feels kind of . . . slippery.

@chandrikadevib1100 4 жыл бұрын

What I admire about you, is how you try to teach from a perspective of someone who doesn't know it. Most often, teachers forget how they felt while learning it and it becomes harder for them to explain than it was to learn.

@itchy7879 4 жыл бұрын

These are really fascinating - I'm a curious high school student and I'm loving seeing these things I just learned in a new way. Thanks for being awesome :) I had actually never seen the Euler Formula, but the connection to the unit circle makes it easier to digest

@bayleev7494 4 жыл бұрын

In the proof of the necessity that f(0) = 1, the hole in the logic was after the step f(0)f(x) = f(x). This results in f(0) = 1 if and only if f(x) is not zero (so that we don't have to divide by 0). This means that, while true that f(x) = 0 is an exception, it's also the only exception. Also at 24:03, where you say that you could scale the function to get a different result for f(0), that wouldn't work because it would no longer satisfy f(x+y)=f(x)f(y). Multiplying the two outputs would result in your scaling factor squared on the right hand side, while the left hand side would only have a single scaling factor. With that said, I really enjoyed this lecture! Can't wait for the next one :)

@rossigu3006 4 жыл бұрын

This is what I'm looking for. Nicely done

@capilover1023 4 жыл бұрын

Grant: "so you see this weird formula, I think the healthy question to ask is WTF..." Me: :) Grant: "... - whats the function?" Me: :O

@cerbahsamir5119 4 жыл бұрын

omg same

@N0Xa880iUL 4 жыл бұрын

@ali PMPAINT yeah lmao... It's even funnier that way to me.

@imanabu5862 4 жыл бұрын

I stopped the video and went down the comments to see If it was only me with dirty head hhhh

@ishworshrestha3559 4 жыл бұрын

@onafets38 4 жыл бұрын

AHHAHAHAHA

@onlycheeseextracheese8718 4 жыл бұрын

I'm a mechanical engineering graduate who's in the midst of studying for my math subject GRE in the hopes of pursuing academia and go back to grad school for pure mathematics. Your videos have not only helped me throughout the last year with grasping abstract ideas conceptually, but you've also helped me gain a whole new appreciation for mathematics as a whole. Thank you sir. You are a treasure to this world.

@George_Varvoutis 4 жыл бұрын

This is some serious educational content, your professionalism and passion to share math knowledge is astonishing. Keep up the good work!

@capilover1023 4 жыл бұрын

I don't know why, but this lecture seemed too short to me, even though it was only 10 minutes shorter than the previous ones. Apparently, I've become addicted to your awesome videos, Grant! Well done!

@randomguy263 4 жыл бұрын

Well, really a lot of the pther lectures were about 70 minutes, but, yeah, this lecture felt very shirt.

@hexa3389 4 жыл бұрын

Me too. It felt like half of the regular ones.

@spb1179 4 жыл бұрын

Lol my watch time this last week has been like 60% 3b1b and that says a lot because I’m predominantly watching yt

@Ultiminati 4 жыл бұрын

It's first 5 or 10 minutes were afk, it is a short one

@spb1179 4 жыл бұрын

Grant I really hope that there are a good 20-30 more of these lectures in the future, they are so much more insightful that high school math and they have really given me an interest in diving into more complex math, keep up the good work and please don’t stop these lectures once we end lockdown

@blownuppumpkin95 4 жыл бұрын

Man your lessons are incredibly good. It's people like you who change the world. Looking forward for other videos !

@g.wilcken7992 3 жыл бұрын

The animation of the vector interpretation of the terms of the power series... such beauty. Absolutely beautiful.

@gladiusilluminatus3720 4 жыл бұрын

I just want to say that this series is absolutely awesome. I never thought of myself as a math person much less a math nerd and yet I just sat here for hours and have learned and understood so many things I never grasped before so Thank you! I really wish for this to become a regular thing even after the world returns to "normal". Would I not already be a Patreon this series would have definitely earned it. As a student of I often struggle to understand math and as of now firmly belong in the category of didn't understand it but just went along with it as well as I could but you are really changing my perspective on maths and are showing me that instead of frustrating it can be fun and interesting. EDIT: Okay it seems I accidentally canceled my Patreon subscription last time I cleared up my payments! This grave mistake has been remedied. So in a way this video DID earn my subscription (again).

@elfuego7572 4 жыл бұрын

I laughed so hard when he said WTF "What's the function ofc" !

@oximas 4 жыл бұрын

lol

@professoreggplant9985 4 жыл бұрын

Note well the citation source ;)

@technoultimategaming2999 4 жыл бұрын

Well That's Fantastic!

@dylanrambow2704 4 жыл бұрын

All mathematicians know that WTF stands for "Want To Find." lol

@pinklady7184 4 жыл бұрын

WFT I saw that!

@kxfin 2 жыл бұрын

I always struggled with the intuition of this connection in my university math lectures. Nobody was able to communicate the absolute beauty of this formula the way you just did. Bravo

@LydellAaron 3 жыл бұрын

Fantastic job--I mean the whole experience you created for us. The experience, and your energy made for an engaging live stream in mathematics. What I like most, that I didn't get in high school or college, is the ability to pause, rewind, re-listen and absorb--I always felt rushed. Thank you.

@CraigNull 4 жыл бұрын

Fun observation: when you plug in a positive integer N into Maclaurin series form of exp(x) the individual terms are increasing until you get to the Nth term, the N+1th term equals the Nth term (using indexing that calls x^k/k! the k+1th term), and the culmulative sum of the terms passes the halfway point exp(N)/2 of the total sum between the adding on of the Nth and the N+1th terms. You can ask, if you summed up to the Nth term, what fraction of the N+1th term do you need to add on to get to exactly exp(N)/2. The answer appears to be very close to one-third in the limit of large N, but not quite. It's also close to the square of the Euler-Mascheroni constant.

@staplerelite8711 4 жыл бұрын

Ho ho ho ho, le Poisson !

@nerdsgalore5223 4 жыл бұрын

Oily Macaroni constant

@RobertLeyland 4 жыл бұрын

Thanks for doing this. Today I was unable to attend live, but I’d pause and figure out some of the answers at each step. I truly appreciate the simplicity of the expansion series, and the resulting connection to the rotation. As others have mentioned, I do wish this is how the teachers had explained this in math class.

@josephfrancis4326 4 жыл бұрын

Thank you so much! It took a while, but at 37:21, the idea of how rotation connects with the definition of i and the complex plane just finally clicked, seeing the exp(i*theta). Your animations are wildly helpful!

@petarkasapinov7324 4 жыл бұрын

You sir are a legendary wizard! I wish all of my math teachers taught like you do. Very insightful and satisfying. Keep up the good wizardry!

@williammclaughlin2247 4 жыл бұрын

I’ve just finished year 11 in the UK (16 years old) and I’ve never come across these topics before but they are incredibly well explained and very interesting. I’m happy to be enjoying maths more than I usually would and learn some topics which I’m sure I will come across next year in A-Levels.

@AdityaKumar-ij5ok 4 жыл бұрын

William McLaughlin hey i am interested what your maths syllabus include cause these topics are actually in my normal math syllabus in India although no Euler formula is shown, it's a plus to know in competitive exams

@ASLUHLUHCE 4 жыл бұрын

And do further maths. Normal maths has no linear algebra, no complex numbers

@pizzahut3001 4 жыл бұрын

Wish I had seen these videos during my education, you have a massive advantage!

@user-rv9vk8by5i 3 жыл бұрын

@@AdityaKumar-ij5ok Another UK student here, just finished with year 11 And I can confirm, the topics are massively disappointing. At the end of the year we did like, 1 lesson on vectors, and that was just how to add them. And in one of the exams we did, the only question about vectors was the very last question. It's mostly just relatively basic geometric proofs, quadratics, and.. that's pretty much it, actually. That is for the higher tier test, by the way - the foundation test is mostly comprised of addition, multiplication, ratios, etc Just like the original comment, I'm also going to take A-Level maths, and _hopefully_ it'll be at least half as interesting as these videos.

@MichelleMaia 4 жыл бұрын

I just got my mind blown!! I'm engineer and it's the first time I've seen such explanation about exp(iθ)! Great lesson! Thank you Grant!!

@alighasemian7118 3 жыл бұрын

I really cannot show in words how much I enjoy your lectures. Whenever I see your videos I end up, "WOW, what an amazing way to look at this problem."

@clamr6122 2 жыл бұрын

It's like someone built the perfect teacher in a lab. Thank you so much.

@tkeooudom 3 жыл бұрын

This video is simply beautiful. I am one those engineers who just accepted euler's formula and used it without ever deeply, intuitively understanding it. This is the best explanation of the formula. Thank you so much. Please keep making more of these videos.

@user-od5pz6im9s 2 жыл бұрын

you can easily prove the equality if you derive

@gamewarrior348 4 жыл бұрын

Grant, I just want to say how much joy these bring me every Tuesday and Friday. Is it possible/feasible for you to keep doing this in the long term? Or at least longer than quarantine may last, as it is helping to give a much better understanding of the math concepts that end up getting used in my classes.

@andrewalker3660 2 жыл бұрын

By far one of the best videos in terms of giving a great intuition! Keep up the great work!

@1loshvitalik 4 жыл бұрын

Videos like these are useful not just for highschool students. For them, sure, they may be helpful in leaming these topics. For people like me, who has studied maths not that long ago and still remembers most of the ideas, watching these videos is very pleasing because I can focus specifically on logical, intuitive details of your explanations without having to struggle memorizing all of this new info from scratch. Yes, we've been taught all these topics, I know how to do all of that mathematically, but it is extremely satisfying to get an intuitive look on things that you already know in the form that is usually taught, re-think them, make the information in my head more organised and open possibilities to use this knowledge in real life.

@Jahus 4 жыл бұрын

0:45 That animation says it all! And that's why 3Blue1Brown is the best! You taught me what 7 years of Calculus at University didn't. Thank you!

@The300Trolls 4 жыл бұрын

You tricked me into listening to a full math lecture by explaining it in an interesting way.

@DanielMaidment 4 жыл бұрын

I'm watching this, and I think I know it well, but your videos are so good and insightful that it's probably worth watching anyway. I think you've shown me how to love math again, and how much insight can be gained with geometric interpretations.

@thomase5374 2 жыл бұрын

Hi! Please do more of these with homework! I'm currently trying to teach myself math as a hobby and practice sets would be a fantastic resource. I've loved this lockdown live math series and more would be amazing even as covid etc. finally clears up

@patinho5589 4 жыл бұрын

I did A-level maths and and A-level further maths in 1996 at age 18 (high school). We did some complex numbers stuff in further maths.. but you know it’s all learnt to pas an exam then forgotten after the exam. I got an A grade in each. This series is giving me a proper understanding of trig, and the other topics that I never had so firmly ever before. And even little things I never got round to getting comfortable with (- simplifying square roots!) So this level is totally perfect for me ! It’s like I’m taking off from where I was! I did economics at uni and didn’t really learn any maths so I’m loving taking my learning forwards from where I was 24 years ago.

@shawon265 4 жыл бұрын

Hey Grant, I signed up for twitter just to answer that f(a+b)=f(a)f(b) question. But couldn't properly figure out how twitter works :| However, f(0) could either be 0 or 1. Here's the proof. If a=b=0, f(0+0)=f(0)*f(0) => f(0)=f(0)² => f(0) = 0 or 1 if f(0)=0, f(x+0)=f(x)*f(0)=0 So, f(x)=0 is a valid solution. And f(0)=1 gives the exponential solution.

@wewladstbh 4 жыл бұрын

f(x) = 0 is a really boring solution though, "yeah lets have the kernel be the reals LOL what a trolllllllllllllllll"

@3blue1brown 4 жыл бұрын

Perfect, thanks!

@samuelheidenreich373 4 жыл бұрын

Really nice proof. For those confused on the jump from step f(0)=f(0)^2 to f(0) = 0 or 1, you can substitute f(0) = x, and now x = x^2, and x^2 - x = 0, which is a quadratic with solutions 0 and 1. And just to emphasize that this proof means that either f(x) must be the constant function f(x)=0, or f(0) must =1. EDIT: I just realized that if there is any c such that f(c)=0, then f(x)=0 is true for all x, since there is a number a where x = a + c. f(x) = f(a+c) f(a+c)=f(a)*f(c) f(x)=0 So to sum it all up, if there is any number c such that f(c)=0, then f(0)=0 and f(x)=0 for all x. Otherwise, f(0)=1 and f(x) is never 0.

@matanshtepel1230 4 жыл бұрын

Yes :) when doing this and getting the less boring answer we must assume that f(any real)=0 is not the case (such as for the exp(x) function.

@parthibanpalani6490 3 жыл бұрын

Thank you. Wonderful video, finally understood this important concept. We need more people like you with such a level of understanding and interest teaching in the schools and colleges. Thanks to KZbin, now every person can access such quality education.

@williamweatherall8333 2 жыл бұрын

this is incredible. One of the most worthwhile math videos I've ever seen.

@moskthinks9801 4 жыл бұрын

Solutions to this lesson's homework. 1. To show that the terms of exp(x)*exp(y) have the form x^k*y^m/(k!*m!), one can write the expression as (1+x+x^2/2+...+x^k/k!+...)(1+y+y^2/2+...+y^m/m!+...) By expansion, we can choose one term from the first bracket and another from the second bracket, and the power of x and y would be unique, so the term is just x^k/k!*y^m/m! or x^k*y^m/(k!*m!) 2. To show that exp(x+y) have terms of the form 1/n!*(n choose k) x^k*y^(n-k) Just write exp(x+y)=sum_{n=0}^{infty} (x+y)^n/n! Use (x+y)^n = sum_{k=0}^{n} (n choose k) x^k*y^(n-k) Again, the powers of x and y are always unique. Hence, the coefficient of x^k*y^(n-k) is (n choose k)/n! (remember division by n! from the exp function). Thus, proven. 3. To show that (1) and (2) imply that exp(x)*exp(y)=exp(x+y), see (2). Let n-k=m. We can always pick n=m+k such that we have powers x^k*y^m in the expansion. Additionally, we have the coefficient is (n choose k)/n!=((n!)/(k!*(n-k)!))/(n!) =1/(k!*m!), which is the same as 1. Hence, each term of exp(x+y) corresponds with a term of exp(x)exp(y). Thus, they are equal. 4. For real numbers, this is evidently okay. For complex numbers, we can easily justify that (1) and (2) work because of commutativity, associativity, and distributivity, because then we can do the algebra quite well like with the real numbers. As of matrices, we can define power of matrices and division by scalars, and so exp(A) is defined, given A is a square matrix. However, the property exp(X+Y)=exp(X)exp(Y) holds usually when XY=YX (they commute), such that the binomial theorem can hold (terms in the binomial expansion are stuff like XY and YX, which we could add together if they commuted, but that's not always the case for matrices) Consequently, exp((a+b)X)=exp(aX)exp(bX), where X is a square matrix, and a and b are scalars. Moreover, exp(X)exp(-X)=I, where I is the identity matrix that behaves like 1 in sense of multiplication (behaves like exp(0)). So yes, we can extend the definition for many different objects if we need to, like complex numbers and matrices, and these can benefit us in electric engineering or differential equations. Great homework, great lesson 3b1b! See you in the next lecture!

@aypleckduminecraft 4 жыл бұрын

thanks a lot !

@JaredHaertel 4 жыл бұрын

The proof f(x + 0) = f(x) * f(0) => f(0) = 1 only needs the condition f(x) does not equal 0 to be valid. Whether or not f(-1) = 1 / f(1) should count as a valid answer is up for debate.

@rhitamdutta1996 4 жыл бұрын

Yeah, so if for f(a+b)=f(a)*f(b) you put a and b as 0, you get two solutions for f(0), ie, 0 and 1. Whichever you take is up to you. Usually, in math questions like this, the question usually has the assumption that f(0) is not equal to zero. Funny how that was the first thing that popped into my mind, from years of solving objective questions.

@chaosredefined3834 4 жыл бұрын

There are also undefined values. Technically, the following can work: f(x) = 0 if x >= 0 f(x) = undefined if x < 0 If undefined * 0 = 0 is a valid output (e.g. f(-1)*f(2)=f(1)). Because it also ends up giving undefined * 0 = undefined (e.g. f(-2)*f(1)=f(-1))

@esquilax5563 4 жыл бұрын

@@chaosredefined3834 he said that the given property holds for all real numbers, which implies that the function is defined for all real numbers

@wewladstbh 4 жыл бұрын

@@rhitamdutta1996 homomorphism moment

@jons2cool1 4 жыл бұрын

Rhitam Dutta In all of the math classes I’ve taken any number to the power of 0 has been 1. Does the possibility of 0 come from that it can be any function that has this property? What’s an example. The last question f(-1)= 1/f(1); I reasoned that a^(-1)=1/a. Assuming f(x) to be a^(x) based on the fact that this function has the given property. Is this correct reasoning?

@xkcd000 4 жыл бұрын

I am loving these classes. Thanks for arranging them.

@henrybash2285 Жыл бұрын

Great math lessons make me learn something new... but the greatest ones completely recontextualize things I thought I understood beforehand. This video was such an awesome walkthrough and, most importantly, made me understand WHY e^ipi works. Great job!

@TheViolaBuddy 4 жыл бұрын

That's actually a really interesting point of view that I haven't seen before, that writing e^i is arguably an abuse of notation for exp(i), and in general the fact that e^x and exp(x) are two different functions that just happen to have the same value everywhere that e^x is defined, e^x meaning "multiply e by itself x times" and exp(x) meaning "do this infinite sum on x." The strict e^x would be undefined on imaginary numbers, but because it's equal to exp(x) whenever it does exist, we just write e^ix to mean exp(ix) without much confusion once you understand the convention. It's pretty similar to the relationship between factorial and the gamma function, which you actually allude to here. x! and Gamma(x+1) are two different functions that just happen to have the same value everywhere that x! is defined (though there is the +1 that makes it annoying). In a strict sense, (1/2)! is undefined; how could you take every integer starting from 1/2 and going down to 1 and multiply them all together? But because Gamma(x), defined by a funny integral, is the same as the factorial where they do exist (offset by 1), we often will write (1/2)! to actually mean Gamma(3/2), and there isn't really any confusion there.

@N0Xa880iUL Жыл бұрын

Analytic continuation?

@sailor5853 4 жыл бұрын

That was the first time I felt really confident to try and go for the question and I am really happy to see I could find the correct answer. (around min 20) That may be silly but I feel like that is my first step to really understand math.

@astronomy-channel 10 ай бұрын

Best lecture series on You Tube, period! I’m continually amazed…bravo

@dustinsnodgress8026 2 жыл бұрын

Please do more of these live vids. They are awesome! No need for lockdown, just do it!

@xicodomingues 4 жыл бұрын

I have a bachelors in math and I think this is the first time I actually fully understood the e^(pi*i) = -1. Thank you!

@uhgs 4 жыл бұрын

OMG you just answered me a question wich confused me for 2 years now and I already gave up to understand why e^i*pi should make sense. It's because it's actually not e^i*pi but exp(i*pi) where exp(x) not necesseraly is equal to the thing we have in mind when we see e^x. THANK YOU!

@marcmengel1 4 жыл бұрын

See, *this* is the confusion caused by the presentation. exp(x) (the infinite one, not the python approximation) *is exactly* e^x ; the Taylor series *is exactly* equal to the function it's derived from, even in the complex plane... It ends up informing our understanding of what exponentiation to a complex value means.

@cathyfalk6839 3 жыл бұрын

As a calculus teacher, your graphics with the unit circle were outstanding and very insightful. I will definitely use that when I teach this topic this spring!

@locomate23 4 жыл бұрын

You are amazing Grant! Never stop doing this please!!

@user-on9rs3yx3s 4 жыл бұрын

I have an engineering degree and I genuinely thought that e^i.theta was referring to the exponential function, ie multiplying the number e by itself theta (or x) amount of times. Showing that it was the exp function (which is totally different) really opened it up for me.

@carultch 2 жыл бұрын

It ultimately is the same function. Just a different perspective of it.

@lindap.5921 4 жыл бұрын

I'm 3 hours late due to a scheduled physics lab but I am very grateful for this 'Lockdown' series !!

@jsmunroe 4 жыл бұрын

I love your normal videos, but I really love these as well. I hope you do more of this style in the future. I've been an amateur mathematician for along time, so this is just a refresher for me, but it is still fun as hell. I think that is what is key in becoming good at math or anything really. That is actually enjoying going over stuff you already know. ;)

@jonathanclark5240 4 жыл бұрын

What a great class! Thank you for doing this! I love the positive energy and the love of learning that you bring to each video. =)

@illustriouschin 4 жыл бұрын

The question song at the beginning is nice.

@swaree 4 жыл бұрын

Vincent Rubinetti --- Grant's New Etude

@NovaWarrior77 4 жыл бұрын

@@swaree you people make the world great.

@noahtaul 4 жыл бұрын

The exponential formula only works if x and y multiplicatively commute. So for real and complex numbers it’s ok, but if x and y are matrices, if you try to expand out (x+y)^2 for example, you get x^2+xy+yx+y^2, which is not equal to x^2+2xy+y^2 which is what you need.

@EebstertheGreat 4 жыл бұрын

Implicitly, the function f is from R to R. I guess he could have stated it explicitly, though. He also missed the special case of f(x) = 0, which satisfies the condition but does not satisfy property (3).

@Kaepsele337 4 жыл бұрын

For anyone that wonders, if there is a corresponding equation for noncommuting matrices, it's called the Baker-Campbell-Hausdorff formula.

@noahtaul 4 жыл бұрын

EebstertheGreat oh I guess I should point out that I was answering the homework question number (4*). Sorry!

@howardOKC 3 жыл бұрын

Grant, I am watching these videos after the lockdown is over. And it's such enjoyable.

@ryanmarshall2503 Жыл бұрын

I have been wondering this forever, and asked many math teachers to explain, to no avail. Thank you!

@Green_Eclipse 4 жыл бұрын

Another great connection is that we can plug ix into exp and split that into the real and imaginary parts to get the Taylor polynomials for cos and sin.

@poojaupadhyay3326 4 жыл бұрын

Hey Grant, please make WTF T-shirts !

@hexa3389 4 жыл бұрын

Yes please. I won't buy one cause I'd be bullied to death at school but it'll be cool.

@a.fleischbender7681 4 жыл бұрын

I'd buy it.

@Jared7873 4 жыл бұрын

Buyer beware!

@cookie_n_Kurimu 4 жыл бұрын

yeah "WTF?" on the front and "What's the Function?" on the back!

@user-ss3oz7by1g 3 жыл бұрын

Should be something like this: WTF: What's the Function?

@KidNapPingNo1 2 жыл бұрын

A typical video where I wished that I could give more than one like. Thx for the mind blowing content ! Keep up the good work

@Thepiecat 2 жыл бұрын

Seeing the vectors forming e^πi was mind blowing. Brought me from a "decent understanding" to "complete intuition" You're a God in math, Grant. We love you!!

@ethanfaust8513 3 жыл бұрын

43:05 python has a built in round function, no need to import numpy. great video, thank a lot!!

@Gold161803 4 жыл бұрын

My takeaway: exp(x) is very hard to introduce intuitively without the use of calculus. A valiant effort all the same, as always! Well done!

@ganondorfchampin 3 жыл бұрын

The real significance of the function is that it's the function (well, it and any constant multiply of it, but it's the only of those that also has the algebraic property discussed in the video) whose derivative is itself, and the definition inherently entails calculus.

@Gold161803 3 жыл бұрын

@@ganondorfchampin my point exactly!

@ganondorfchampin 3 жыл бұрын

@@Gold161803 Slight correction to what I said, the constant function 0 ALSO has the algebraic property mentioned in the video AND is it's own derivative, but exp is more interesting for obvious reasons.

@72go5vq 2 жыл бұрын

this episode was a life-saver for me as i was stuck trying to understand the Quantum Fourier Transform (QFT) in my "Intro to quantum computation" course. It involved matrix-vector multiplication where the matrix's entries were n-th (complex) roots of unity & the vector's entries were complex numbers (i.e. qubits' superposition). Now i can finally go ahead & understand period finding & then after that: shor's algorithm!! Thank you Grant!!!!

@SashaTownsendTulsa 3 жыл бұрын

Grant, this is wonderful. I’m preparing to teach synchronous online classes, and I wanted to see how you conducted a live class. I love this beautiful formula, and the way you shared it with the world in this wonderful, interactive way. Thank you for giving me some ideas, for your lovely personality, your musical taste, and the beautiful math!

@denny141196 4 жыл бұрын

37:30 Ah, you’ve stumbled across the fundamental theorem of engineering. pi=e=3=sqrt(g)

@gileee 4 жыл бұрын

As an engineer, I see no problems here

@renchen282 4 жыл бұрын

As a math nerd, I need to bleach my eyes

@anishnaabehistorypodcast7215 3 жыл бұрын

Is this a fuzzy math joke?

@user-nf6jl9cg1t 4 жыл бұрын

WTF LOL also I loved that you used python and showed it to us

@seheyt 4 жыл бұрын

I had actually been pausing the video to do exactly the same thing. I was pretty pleased to find I had beaten him to showing me the exact same thing. I stumbled a bit more along the way, but (!!!) I realized that you do not have to clumsily type `complex(3,2)` - you can simply say 3+2j

@z.e....3175 3 жыл бұрын

WHAT'S THE FUNCTION LOL.

@leoyang1.618 4 жыл бұрын

This channel is the best channel out here on mathematics. Although I still don't understand some of the harder content, it provides me with a deep intuition of various math topics. I feel like younger students like middle schoolers are also able to understand most of the content, since it is so well explained.

@hazelgalban3566 4 жыл бұрын

I think that watching videos of mathematics that are complex, I get brighter everyday :) Thanks Grant for the cool lectures!

@cbrock21 4 жыл бұрын

these lectures are just gems. thanks for what you do. and yeah-- not just high school students--- 39 year old physician with a part-time math interest here.

@surajvkothari 4 жыл бұрын

~~~ HOMEWORK ~~~ Time-stamp: 45:56 1. Fully expand exp(x) * exp(y). 2. Expand exp(x + y). Hint: Binomial Formula. 3. Compare the two expansions above. **4**. Show the properties for complex numbers and matrices.

@caspgin 3 жыл бұрын

this lockdown math live series is awesome. The information, your presentation are all top notch. \you are a god send.

@TheDarrenJones 4 жыл бұрын

Thanks so much for these lectures. I'm 48, and have a patchy engineering / programming / maths history... I wish you'd been my maths* teacher either when I was at school or at college as you've made previously difficult areas seem approachable and actually interesting, and not been afraid to mention areas which you don't find intuitive or agree with the convention. Also seeing you write things out by hand is helpful as I've always had untidy handwriting and got a hard time for it at school, so it's nice to see someone who hasn't got perfect penmanship but is still hyper-intelligent. * Yes, I'm a Brit!

@babycankles297 4 жыл бұрын

I gotta start seeing these live, they are so well done and better then most actual math lectures

@NadellaVasishta 4 жыл бұрын

Grant: WTF= what's the function? Dr.Peyam: WTF= want to find Us: WTF.. = We're thy fans!

@davidliu323 4 жыл бұрын

WOW I took Dr. Peyam's last class at UCI this past winter on multivariable calculus and "want to find" was the first thing that came to my mind too. I didn't think anybody else knew of him!

@jdmxxx38 4 жыл бұрын

This video was very, very helpful to me. It lifted the veil of confusion from the meaning of e^x which plagued me forever. Thanks

@pia31415 4 жыл бұрын

I'm a Physics teacher and so like your voice! It is a great teacher voice!! (The explanations are spot on too)

@azpcox 4 жыл бұрын

The beauty of seeing e^x written as exp(x) and the series expansion is that it becomes immediately obvious why the derivative of e^x is simply e^x. Thanks again for making these series! Pointing every high school kid I know this way to learn in maybe a different way to cement ideas and concepts in their heads.

@ster2600 4 жыл бұрын

This is not an obvious fact! It's pretty hard to prove that you can differentiate power series in a term by term fashion within their radius of convergence

@vincentandrieu5429 4 жыл бұрын

@@ster2600 you're wrong. It does make it obvious. exp(x) is the sum of x^n/n! terms, plus a constant (1). So the derivative of exp(x) is the sum of the derivative of those terms. The derivative of x^n/n! is nx^(n-1)/n! which is x^(n-1)/(n-1)! Let's call N=n-1 The derivative of x^n/n! is x^N/N! So basically the derivative of each term is the previous term in the series. As it's an infinite series, that makes no difference as n grows. And on the other side, the lower n side, you get the derivative of x which is 1, so you get all your terms back from the original.

@ster2600 4 жыл бұрын

@@vincentandrieu5429 that's only true for finitely many terms, while exp is an infinite series

@vincentandrieu5429 4 жыл бұрын

@@ster2600 What I wrote is not valid for finite series. It's only valid for infinite series, and exp is an infinite series.

@Mathhead2000 4 жыл бұрын

@@vincentandrieu5429 I think what Ster Chez was trying to say was that what's true in the finite world isn't always true in the infinite world. Just because the derivative of a finite sum is the sum of each terms' derivative (i.e. the additive property of derivatives), doesn't mean that the derivative of an infinite sum is also the sum of each of it's terms' derivatives. You would have to prove that this is a general property of derivatives (hint: it's not).

@ollerich32 4 жыл бұрын

I hope that lockdown never ends. Learning so much these days!

@Ultiminati 4 жыл бұрын

i enjoy that too but bruh, i don't want to stay at home forever. :D

@SoumilSahu 4 жыл бұрын

I understand your sentiment, but you do realise there are people starving to death because they have no jobs?

@Ultiminati 4 жыл бұрын

@@SoumilSahu I think you get the point of the comment, he didn't mean that ofc

@Trucmuch 4 жыл бұрын

You realize that you can watch educational YT videos even when there is no lockdown right?

@Ultiminati 4 жыл бұрын

@@Trucmuch but there is no time to think through things

@chillfiltr528 3 жыл бұрын

The quality of this channel continues to blow my mind.

@123mailashish 4 жыл бұрын

@3Blue1Brown: U take math to a whole new level. The way you unwaveringly try to find the subtle points in explaining a concept is beyond description. IMO ur channel is loved by most is because u r (very very clear)^2 in your head what to prsent and how to present.

@AlexKing-tg9hl 4 жыл бұрын

0:35 it’s so satisfying that the 3b1b logo perfectly aligns right with the down count of the rhythm.

@spb1179 4 жыл бұрын

Alex King this part got cut off :(

@ASLUHLUHCE 4 жыл бұрын

So the main takeaway of this lecture is: "e" does not literally represent the number 2.71828, whereby e^x means 2.71828 being multiplied by itself x amount of times. Rather, *e^x = (1+x/n)^n as n approaches infinity*

@davidlixenberg5999 2 жыл бұрын

I commented that at lecture close the WTF was completely unclear to me. I believe that you have helped me get to grips with this central point. Many, many thanks. David Lixenberg

@laurv8370 4 жыл бұрын

Man, we totally love you! In spite of the fact that you can't draw circles and vertical lines... :D This is the best educational math channel on youtube, by far (trust me! I know!)

@bellzgoose9040 4 жыл бұрын

thanks so much grant ! your lectures make math easy to fall in love with

@OmarChida 4 жыл бұрын

Very lovely lecture, I wish I had learned things like this when I was in high school

@joshuakahky6867 4 жыл бұрын

4:56 is so satisfying!

@patriciamartinez7986 2 жыл бұрын

This was a great, informative video, and I just adore your personality. :)

@htchtc203 3 жыл бұрын

Gotta love this lecture. For me the Eulers equation has been just nice way to write Fourier transform in a neat form. Now, this lecture explains very nicely this e^i business. Thank you, Sir.