Mathematician REACTS To 'Animation Vs Math' | (Math Explained)

Most people miss Aleph at the end! Finally someone who noticed!

First reaction I've seen that caught the tan-wave gun

20:46 eipi demonstrats his i× "doors" cannot be an exit because if you go through 4 of them, you end up where you started (i^4=1)

Several mathematicians have reacted to this video. But I think you caught more details than anyone else.

"I never thought in my life that I would say a limit integral was BADASS" - The Chill Zone

"he's shooting his terms!" love it!

24:22 for some context, this stickman usually lives in the animator's (Alan) computer.
So it was like bro got sent to the world that only have numbers. He self-taught himself maths and fight e just like people in the past who don't believe in imaginary numbers.
That's why when he put the multiply sign on his foot he run faster, because he multiplied the frame rate number on his foot.

Most of Alan’s creations require other of his creations to be viewed to understand the full picture. Luckily for you mathematician UA-camrs, this is a standalone series that doesn’t necessarily require outside knowledge to fully understand

"Get me back to real numbers"....yeah, that was I was thinking too when I learned about them.

If you see this comment, one tip for these kind of videos is, instead of using your arrow keys to go five seconds backwards and trying to pause on the right frame, you can also use the , (comma) and . (point) keys to go one frame back or forth at a time. For helping you to remind which keys they are, these are the keys that when pressing Shift, they type the < (lesser than) and > (greater than) characters.

I like how when eiπ appears everyone gets jumpscared

Just wanted to let you know he just released "animation vs geometry"! And I think it would be cool to see you check it out.(He also has an "animation vs physics" too)

The black dimension = the real numbers
The white dimension = the imaginary numbers
The portal at the end didn't bring him back to the real numbers, it brought him back to his home dimension (Alan Becker's computer)
Or it brought him to Animation vs Physics (next video), but that's just a theory

I really enjoyed your explanations for this! You clearly enjoyed explaining it and that makes it so fun. You caught some stuff I hadn’t seen other reactors catch yet, I appreciate the new context even if I don’t understand it all myself.

i love how we discovered e^i π bofore division and multiplication

I have thoroughly enjoyed so many mathematicians and math nerds reacting to this animation! I'm so glad someone noticed the tan-wave gun, it took me a second watch to understand it but it's really neat how much they pack into this one animation. It's really easy to miss, but when he's pulling a number out of another, if you go frame-by-frame, you can see that the connecting points is an equal sign! It's a lot more noticeable when he pulls out a 1 since the stickman struggles a bit, but its a really neat easter egg. Also I think what's going on with the square portion with all the ones is that it's connecting back to 1+1+... [on to infinity] and it's just showing those 1+1 equaling the number being squared [in this case, 4], and each 'layer' of 1+1's is another portion of the power, all adding up to equal what that equation would equal. They did this in the multiplication portion too, just a lot easier to understand.

When the tan wave bullet collides with the eipi's, for a preif second you can see the shape |○ flash which represents the **tangent** on the unit circle on point (-1, 0) which would correspond e^ipi on the complex plane. And since f(x) = 9tan(pi*x) the eipis are reduced to 0.

You should check out his “animation vs physics” video and his “animation vs geometry” video that just came out not too long ago

Terkoiz wrote the story for this. They also made a sequel called Animation VS Physics which he also wrote, and has some more obvious errors (lol). There might be more sequels in the future, according to a discussion Alan had. In other videos, this character also has adventures in a digital environment with four other stick figures including Alan's computer, Minecraft, some consoles and more

the part with the gamma function at the end, i think the intent is that the series is a container of circles at higher dimensions, but when i is readded it all cancels out to -1, sending orange who knows where (i mean, i guess we know now with the newest video)

Something to help for future videos, if you're on desktop, you can use , and . to go backwards and forward frame by frame on a video so that you don't pause and start and pause and start hoping you land on the right frame.

cool tip for trying to catch tiny moments in youtube videos, if you press the comma and period buttons on your keyboard, you will move back and forward one frame respectively

a teeny tiny mistake at 4:42 . you have a + where you need to have a - sign :)

I adore the joy as a mathematician watches this!

You can use the "," and "." Keys to go forward and back frame by frame

It was incredibly fun to watch your reaction.

My favourite part is the representation of what a squared number is. It's very intuitive.

We loved this! The context you give is so interesting and really enhanced our enjoyment of the original (incredible!) animation.

This must be what the great minds before imagine in their head

You explained everything perfectly in this video which I have not seen in any of the other reactions by far. Good job!

Maybe you could try to react to another video, where someone made an "over-analysis" of this one, which is also pretty awesome.

At 5:05, it seems that your first two equations are conflicting. You might've missed/added a negative somewhere in there. Great video!

In case you want to pause on "blink and you'll miss it" moments in the future, you can skip one frame backwards/forwards with the comma/dot keys.

A thing that I haven't seen anyone notice - at about 7:35 - Stick man shows his plus sign like it's a cross. This I think is reference the middle age Christian Church's ties to mathematics as a fair number of mathematicians of the time were clergy.

The thing at the background,the big shadow,IS "Alpeh" You are right. (i copied it from a other comment on a other video lololol)

I love the concept of sets. For me, sets link up terms, functions, and all sorts of number theories.

Would love to see your reaction and explanation on Animation vs. physics as well please 🙏🏼

This is about the fourth time I have seen this animation - each commented by someone else. And although within this comment was quite a few things others didn't see (like the Aleph function and the explanation abour group of well ordered...) I am sure there is even more hidden that nobody but the creator thought of. 😊

A thing you can do to progress time better if you want to catch a particular frame you wanted to see type "," (comma) and "." (period) to progress or rewind a youtube video one frame at a time (or think of it as using < and >). Hope this helps!

Alan Becker just released Animation vs Geometry, you should watch that too

so this is why i did university level calculus... not for grocery price calculation but to be entertained by stick man

Just for future videos, you can move the video forward and backward frame by frame by using the period and the comma keys on your keyboard.

The big aleph in the back is absolutely a shadowy ghost of a behemoth.

U r the first reactor talk about that when he use gamma function to send stickman to a realworld

Just a few days ago, a newly released video came out called "Animation vs Geometry"! Looking forward for your reaction to that 😊

That was really sum monster

Really hope you'll also take a look at the physics and geometry videos from Alan Becker

at 4:59 i saw that apparently a^2+b^2+2ab is (a+b)^2 and a^2+b^2-ab being the same as (a+b)^2, that would mean 2ab=-2ab which is only true if a or b is 0 but a or b can be any numbers which would mean every number is equal to it's negative so that's a mistake (a-b)^2=a^2+b^2-2ab

The Functor gun is so awesome.

nice! this one is actually the most entertaining one I've seen!

they should have made the ending where the stickman multiplies everything by 0, shows how everything is tied down to real numbers and destroying the entire universe including himself

3:50 is what i am learning in class 8 right now! Well explained but! It was wonderful to see so many big numbers and errr the errr eulers theory? Welp i guess i will learn it in a couple years😀

Wait I finally understand everything of Animation VS. Math? Oh wow thanks
I didn't notice tan-wave gun until this time
Perfect reaction video 🎉

6:57 this should be -(cos(pi)+isin(pi)) or -cos(pi)-isin(pi)

I just happen to finish Math at B level and happy to understand 80-85% of this video :D

Bro you missed that multiplying by -1 sent e^iπ towards him instead of away him and multiplying himself sent him to the other side of the circle in the complex "graph".

you can use the dot and comma on the keyboard to go back or forward frame by frame when you want to find any details in the video that youve missed out! 6:46

5:48 A cool thing here is that the 5th dimensional matrix of 1s makes a matrix of larger 1s

4:24 - It's not even infinity. "X/0 = infinity" only exists in limits theory, where zero is actually a number that is infinitely close to real zero and could be negative

This may have already been mentioned, but you can go forward or back in a youtube video frame by frame with , and .

Underrated Channel! How Do You Have 774 Subscribers, You Need More!

I’m not even interested neither knowledgeable in maths but your video was still really fun to watch so thank you👍

Why is it that when the infinity tan is shot at eiπ, and he uses a limit, it becomes an integral from 0 to infinity?

Amazing commentary

Awesome video!

10:39 its refering to the parametric equations for a circle

Nobody noticed Ω huh? Absolute infinity

NOW, GEOMETRY

Could you clearly explain why there is no solution to the given equation? Why can't real numbers or complex numbers satisfy the equation?
The equation: 1/(x-2) = 3/(x+2) - 6x/(x-2)(x+2)
Or, {1/(x-2)} = {3/(x+2)} - [{6x}/{(x-2)(x+2)}]

Instead of rapidly pausing and unpausing, you can use the , and . keys to advance the video by 1 frame +/- ^w^

There are no "hidden meanings". Its just algebra with a sprinkle of calculus. Either you know it your you don't

People are complex. Maybe the stickman data represent humanity. That shows; it becomes dangerous to see people as numbers.

This whole time I thought Aleph was the Nth dimension.
Kinda looks like a big N.

Hey there! Alan becker posted another one like this but its about Geometry! Hope you check it out.

Question, would you want to see a software that lets you interact with numbers and equations as shown in the animation?

i think i know y students are sacred of math💀

It is definitely Aleph, in the back

I think you would like the animation vs. geometry.

how does he do complex numbers BEFORE multiplication? seems odd

21:35 you I’m talking to the creator of this video he gone to alens computer with his friends and alen

Stickman leaving = -1

sshooting EM waves

Most people don't notice that programmer 6/0 doesn't result in an error

tsc has friends that increase the circle R i Pi

* sigh *
If math was actually related to the everyday like this was maybe I would've cared about higher math...

Interesting video ❤

5:08 excuse me? Why the first two lines aren't equal?

its the imaginary universe

_Please_ don't break maths, stick man.

∞
Σ(iπ)"
n = 0 n!

I understood up to 1+1

you explain us nothing!

waiting for animation vs geometry

Second to finals scene R 10 x 10 = 100r = the death-star from star wars ❤❤❤❤❤❤ ♾️➕➖➗✖️🟰🔟🔢5️⃣0️⃣1️⃣6️⃣7️⃣2️⃣3️⃣8️⃣9️⃣4️⃣