Animation VS Math gets COMPLICATED!! [Reaction]

what math teachers expect from us:

This really shows how smart the second coming is he went from learning basic math to calculous in a matter of minutes

(this is following the timestamps in the original video btw)
0:07 Numbers
0:11 Equations
0:20 Simple Addition
1:24 Simple Subtraction
1:34 Negative Numbers
1:40 e^i(x)pi = -1, Euler's Identity
2:16 Two Negatives Cancellation
2:24 Multiplication
2:29 The Commutative Property
2:29 Equivalent Multiplications
2:35 Division
2:37 Second Division Symbol
2:49 Division by Zero is Indeterminate
3:05 Indices/Powers
3:39 One of the laws of Indices. Radicals introduced.
3:43 Irrational Numbers
3:50 Imaginary numbers
3:59 i^2 = -1
4:01 1^3 = -i = i (x) -1 = ie^-i(x)pi
4:02 One of Euler's formulas. It equals -1.
5:18 Introduction to the Complex Plane (This sucked to learn)
5:36 Every point with a distance of one from the origin on the complex plane.
5:40 Radians, a unit of measurement for angles in the complex plane.
6:39 Circumference/Diameter = PI
6:49 Sine Wave
6:56 Cosine Wave
7:02 sin^2(θ) + cos^2(θ) = 1
7:19 Euler's Formula
7:35 Another Euler Identity
8:25 Simplifies to 1 + 1/i
8:32 sin (θ) / cos (θ) = tan (θ)
9:29 Infinity.
9:59 Limit as x goes to infinity
10:00 Reduced to an integral
11:27 "The imaginary World" Theorem
13:04 Gamma(x) = (x-1)!
13:36 Zeta, Delta and Phi
13:46 Aleph

honesty, imagination and animation can make anything look interesting

Here’s my explanation of the math stuff throughout the video:
0:22 - equals sign. It means both sides are the same
0:28 - the + means addition
1:32 - the - means subtraction
1:48 e^i*pi is known as Euler’s identity, and it does equal -1. This is because if you bring anything to e^ix, it creates a unit circle on the complex plane (explained later), and the x is the angle on the unit circle in radians (also explained later). for Euler’s number, x is pi, which means you create a 180° angle on the unit circle (because pi radians is equal to 180°) which lands at the point -1. Therefore, e^i*pi is -1
1:57 - when the e guy multiplied himself by i, I guess it sent him to the “imaginary world”, which is a pretty cool concept in this story
2:32 - this a cool representation of multiplication
2:45 - cool representation of division
2:57 - this is a good visual to why you can’t divide by zero, because you’ll never be able to subtract anything from 6
4:01 - exponents is to multiplication in the way that multiplication is to addition, in that you multiply the big number for the amount of times the small number says
4:27 - negative exponents give a fraction because subtracting the exponent by 1 basically divides the number by 4. 4^0 is 1 because that’s 4/4, and 4^-1 is 1/4 because you divide 1 by 4
4:47 - this is the introduction to imaginary numbers. The letter i is equal to the square root of -1 because you can’t normally square root negative numbers. To counteract this, mathematicians created i as a way to represent the square root of -1 to not end up in a dead end while doing math
4:58 - as I previously said, i is equal to the square root of -1. This means i x i = -1 = e ^ i x pi
5:09 - the e guy didn’t travel through the door because the i he pulled out multiplied with the one the Second Coming threw to make -1, which is a real number, causing the e guy to stay in the real world
5:13 - this expansion is known as Euler’s formula. It’s created because of the unit circle e ^ i*pi creates in the complex plane, and it uses the sine and cosine functions to separate the real and imaginary values of the number in the unit circle
5:16 - the Second Coming was multiplied by the negative sign, causing him to flip aroundirm that
5:20 this goes with the unit circle thing. the e guy changed his exponent to 0, which is the same as 0i. because it changed from i*pi to 0i, he went from pi radians (180°) to 0 radians (0°) on the complex plane unit circle, causing a 180° arc to the right
5:34 similar to what happened earlier with the Second Coming
5:53 the e guy put the 4 into his exponent, causing him to move to pi/4 radians (45°) on the unit circle
6:04 - when he multiplied himself by i here, he rotated 90° on the unit circle because when you multiply a number by i on the complex plane, the number is rotated 90° on the plane
6:15 - here, the Second Coming learns about the complex plane. It’s like a number line with a horizontal axis containing the real numbers, but it has a vertical axis too that contains the imaginary numbers, forming the two dimensional complex plane
6:33 - the Second Coming creates the complex plane unit circle that that e^i*pi is based from
6:38 - these are radians. A radian is the angle at which its arc length is equal to the radius, which ends up being 180/pi degrees. The little gap shoes that in a full circle, there are 2pi, or about 6.283 radians
6:58 - I’m not sure why these appear to be multiplied, but the r means the radius and the weird 0 with a line is theta, which is the angle (typically in radians)
7:35 - because theta (the angle) is pi radians and the radius is 1, theta/the radius is pi
7:47 - this shows how sine and cosine can be used to separate the horizontal and vertical aspects of a circle
8:07 - here, he multiplied sine by i, which caused the sine wave to rotate 90 degrees
8:15 - he added them together to create Euler’s formula, which as previously stated is equal to e^i*x , and x is pi because the trig functions contain pi. Therefore. Combining them created the e guy
8:26 - more of the unit circle stuff
8:32 - the e guy expanded into his Taylor expansion form. Thee giant E thing is sigma notation, and it basically adds the part after it, replacing it with integers consecutively going up. You can see this with the the bullets it fires
8:46 - volume of a cylinder
9:02 - he pulled the negative trick again
9:22 - the e guy used the formula for himself and the formula for the trig functions to split himself up a lot
9:29 - here, he made a function, which is basically a placeholder for an expression. Unfortunately, I don’t understand the arrow above it is
9:59 - he changed the angle to pi radians (180°)
10:26 - I’m guessing here, but I think when the Second Coming replaced the dot with the infinity symbol, it caused the function to expand to every point on a graph, which also created the tangent lines (since the Second Coming put the tangent function into that function)
10:55 - the blast became an integral symbol with a limit, because the tangent graph was kind of infinitely long, so the limit allowed the tangent graph to converge I guess. The integral symbol means nothing, it just looks like a cool staff
11:14 - he added an imaginary number, which causes things to move vertically in the complex plane
12:23 - now you see the imaginary world
14:01 - I didn’t entirely understand what this is, but looking at other comments, it seems like the e guy expanded into an equation that can find the volume of spheres beyond the third dimension, but i can’t confirm that, though
14:29 - these symbols are zeta, phi, delta, and aleph

It's interesting how bland and forced education is in school to the point where you don't even want to remember it but I think you just need some amazing visuals and it all comes back like a boomerang that hasn't come back for years.

I have a theory. There is a possibility that this is where every stickman that's created ends up before being converted to a symbol as seen in AvA 1, 2 and 3. TSC woke up literally in pitch black. A void of nothingness. A world of nothing but symbols, letters, and numbers. When you code/make something digitally, you would use symbols, letters, and numbers. And since the stick figure is still in the making, it would make sense for there to be just a void of black.
If this is where every stick figure has been before being converted to a symbol, then the evil stick figures such as TCO, (TCO isnt evil anymore though) TDL and Victim most likely caused terror. This explains why Euler's identity (e^ipi) is afraid of TSC when they encounter one another. And it also explains why all the other symbols that appear at the end come out of nowhere. They were probably hiding. They were aware that some of these figures were dangerous, moreso the ones with empty circle heads. It all adds up.
Here's something that can also be connected to this: TSC came alive during his process of creation. He was not converted into a symbol yet, TSC found a way out of the void, which was not supposed to happen. This could lead to why TSC cannot control his power the same way TCO and TDL can, he is not working properly due to the fact he was not finished/converted properly.

5:29 I only got through third year of college calculus so bear with me. TSC is playing around with Euler formula aka the “e” which is like one of the most important numbers in math cause it’s the base for ALL natural logarithms which in short meats it kinda shows up everywhere. Hence why it’s so powerful here. Plus a cool thing about the “i” is that it represents imaginary numbers. a general rule is i x i = -1 and e^(ipi) is also equal to -1 it’s just another way of writing it. What’s cool about e^(x) is that it’s the only number that’s the derivative of itself so when you find the derivative of e^(8x) for example you get 8e^(8x). i and e together have this power that when it’s multiplied to stuff it kinda “switch dimensions” so when TSC threw an i at ie^(i pi) it was forced back here as iei^(ipi) or -e^(ipi) pretty cool way to show that imo. Also while sin(a) = y coordinate and cos(b) = x coordinate. The two waves when forces next to each other due to i “switching dimensions” don’t exactly line up. The fact that they can look like a helix when applied in a 3d scope surprised even me. I love how Alan’s team displayed that! And they essentially turned it into a rail gun.😂

I stopped watching a few years ago and came back to her being over 1 million??? Damn that's awesome

Math teacher here. I’d like to explain what i and e^(iπ) mean, but first I need to lay some background.
When math gets more complicated, that’s because you *want to do more things.* For example, suppose you’ve been doing subtraction on whole numbers. You know that 2 − 1 = 1 and 7 − 3 = 4. But then you want to calculate 3 − 7. Well, to solve this problem, you must invent negative numbers. Now you can *do more* (you can subtract anything from anything), but you have introduced more numbers - thereby *adding complexity.*
You can see The Second Coming grapple with this repeatedly in the video as he encounters negative numbers, irrationals, fractions, and exponents.
*The letter i stands for the square root of negative 1.* Multiples of i are called *imaginary numbers,* and numbers of the form x + iy such as 3+2i or 7−12i are called *complex numbers.* Just like negative numbers, i was invented to *do more things.* It turns out that when you introduce a square root of -1, every polynomial equation has a solution. Thus, i is like the ultimate cheat code for a mathematician who wants to *do more things.*
Complex numbers can be graphed, as well. The number x + iy corresponds to the point (x, y). So 7−12i corresponds to the point (7, −12).
To explain e^(iπ), I need to talk about Euler’s formula. Suppose you have an angle, θ (“theta”). Euler’s formula says that e^(iθ) = cos(θ) + i sin(θ). In English, this means both e^(iθ) and cos(θ) + i sin(θ) are ways of writing *the point on the unit circle with angle θ.* This is why you see so much action with circles in this video.
One more thing: θ must be in _radians._ Radians are another way of writing angles. You can even see TSC discover radians at 6:31 in the video!
Let’s try putting π in for θ. Well, π radians means 180° - a half-turn around the circle. Conventionally, 0° on the unit circle means (1, 0), so 180° must mean (−1, 0). And remember, we can turn a point into a complex number, so (−1, 0) ↦ -1 + 0i, which is just a fancy way of writing -1.
Thus, e^(iπ) = -1. This is called *Euler’s identity.* Sometimes it is written as e^(iπ) + 1 = 0, and it is often praised as one of the most beautiful equations in all of mathematics.
I believe that, when e^(iπ) sticks an i on itself in the video, it is multiplying itself by i to enter the imaginary realm. That’s why you see a door open when it does that. You can also see it turn itself into cos(π) + i sin(π) to punch TSC at times 🤭

During the episode it should be noted that The Second Coming is also considered a number by the rules of the dimension, it can be speculated that his number is his "Frames Per Second" which is how fast his animation runs (e.g being around 20 frames a second). This number is probably the only reason any of the mathematical things had any impact on him (such as being effected by the multiplication and subtraction symbols)
I don't understand much of the maths stuff itself though so for anyone who wants to learn more about the intricate details, i'd recommend watching "A Complete Over-Analysis of Animation vs Math" made by someone a lot smarter than I am.

its funny seeing how different the reactions from mathematicians to normal reaction youtubers are

When you don’t know your math, Alen Becker can help😎

This video is mostly about "Euler's Identity", which is an incredibly elegant formula that unites 5 of the most fundamental numbers in all of mathematics. e^iπ + 1 = 0
where e = Euler's number (2.7812...)
i = The square root of negative one (this is referred to as an 'imaginary' number).
π = Pi (3.1415...)
1 (one)
and
0 (zero).
Many mathematicians think this formula contains some incredibly fundamental truths about the universe. It's supposed to be the most beautiful equation in all of mathematics. Both e and π are referred to as 'transcendental' numbers, but my math knowledge isn't good enough to explain why. This video probably does though.

THE POWER OF MATH IS UNSTOPPABLE

TSC is like a little kid who is fantasised by Math until he discovers harder sums 😂

I love this animation so much.
Also nice reaction!

This taught me more math than school

I remember seeing a lot of math in class but i honnestly gave up trying to understand it all
felt like that would be something i'd never understand and leave it to those who actually did.

Yeah this one was really cool and interesting.🎉🎉

Alrighty, for starters-
We can see at the start of the vid that TSC is learning on addition and subtraction, and the euler formula came to exist, which is e^iπ . I'll explain a bit more later on.
Then it's followed up by multiplication and divisions and in turn, the powers and power roots of numbers. This is summed as in the Arithmetic level, which I mentioned above.
Once the √-1 is made, the i is formed. i literally stands as "imaginary", due to it's nature being an imaginary number that *does not exist*, and this plays an important role in the whole story of this video, as today's math formulas play around rational(real) numbers along with imaginary and complex(being real + imaginary) numbers for scientific and mathematic purposes. Anyhow, the circle, radians and the sin cos graphs represents graphic applications, and the f(•) function is a part of the tangent function in trigonometry. Advanced Algebra, I could say.
e^iπ multiplying and creating an integration spear with the limit nearing infinity approaches the Calculus region of math. The f(•) ray was absorbed by the spear because the limit approaches infinity and it was f(∞) anyways, but I don't know much so simply said, I need more research.
The white void is where the fundamentals of mathematics breaks down. The countless √- numbers truly are imaginary on their own, and doesn't exist, as I said before. Multiplying e^iπ with i^2 transforms it into a real number, while e^iπ with i to an imaginary one, hence how it can travel freely from the dimensions.
The last part was the climax for me personally, as I saw δ(small change), Φ(golden ratio) and a few other ones, along with the biggest one blending in the background, the ℵ(aleph)
ℵ is by far the most fascinating concept personally. It is known as the set of real numbers, proving that its value reaches a total of infinity. Yet again, it is *the smallest known* infinity, as there are ones involving imaginary or complex numbers, and maybe even both. Hard to get your head around it.
Do correct me, I'm still learning.

This is so good even tho ive saw it like 5 times already BUT I LOVE IT

i is Euler’s number. you can add i to anything that can’t be done in one system, but can in another one.
example: square root of -25 can’t be done with the system that we grew up with. so, we use another system, i.
square root of -25 equals 5i.

The mechanics here would make an awesome and educational puzzle game.

And what have we learned today?
Math is to powerful 😊

why is this more simple than what my school teaches me?

Honestly watching you nerd out was so adorable

Fun fact!In 5:39,SC hold the "+" sign like the cross,It is mentioned in AvG reacts

Im 11 and i know most of these equations easily it's probably because of the hard teaching my teachers used on me back in Africa

Me with math: math is really complicated
Alan Becker makes this animation
Me: YAY MATH IS FUN TO WATCH

If teacher's taught math like this math would be everyone's favorite subject.

I nearly had an aneurysm when I saw the sigma symbol and the factorials. Thank you, Calculus II, for making me afraid of those.

the second coming went from adding, subtraction to pi, circles = radius, cos and sin, square roots, square, cubes

1 + 1 is obviously 11 what was Alan Becker thinking!

Best way to learn math:
Step 1: get stuck in a blackroom which only math exists and get out using the power of math

Nena yool is now available on cold island combination:congle + thumpies btw this was a great vid🎉

The emotional journey of this animation, from TSC's perspective, is so relatable. Math felt like a mysterious enemy for a very long time, but I slowly came to appreciate it more and more. The power of understanding things that it can bring is really exciting, and now, I feel like math is my best friend. I think TSC is better friends with math, though, by the end of this, than I am, as evidently he made peace with complex numbers. All things considered, I think if you found any parts you may not have understood gratifying to watch, it's with taking some time to understand those topics on your own terms rather than being locked into a particular curriculum. Math is so much more fun that way.

e^i•π is called Euler's number. Hope this helps!
The • symbol is another way of using the multiplcation sign.
Edit: Also, the ^ symbol is called a caret. Example:
10^4=10,000
10⁴=10,000
Heres how it works:
10^4=10×10×10×10
10×10=100
10×10×10=1,000
10×10×10×10=10,000
Edit 2: IM ONLY 10

I am just surprised that Alan Becker can do this whole mini fight scene in my brain its liquidity and anime fight scene

Animation vs Math shows how Orange successfully made the death star out of math

the upside down/white dimension are impossible equations. the 'e' always pulls out an 'i' to open the portal because 'i' times 'e' is impossible.
This is proven by how it's full of impossible equations, including square root of negative numbers (it's impossible to find the square root of any negative number)

Hey forever nenaa I started watching you 3 days ago and I've been on the grind since I'm proud to declare you one of the best UA-camrs❤

I love Alan and it is great to see that you are enjoying his work also!!

I have so much fun watching your videos ❤

This was actually so cool

I have waited for this and I am amazed that your watching stickmam you are a legendary

1:47 This, is Euler's Number.
It is the number e, it is a mathematical constant approximately equal to 2.71828 that can be characterized in many ways. It is the base of natural logarithms. It is the limit of (1 + 1/n)n as n approaches infinity, an expression that arises in the study of compound interest. It can also be calculated as the sum of the infinite series

When orange becomes a hacker:

Came back from my child hood to this channel ❤

11:28 my man is about to take math to a whole new level

funfact:
the symbol e is a mathematical constant approximately equal to 2.71828183.Prism switches to scientific notation when the values are very large or very short, thats all i know-
edit: i changed the big into large because it doesnt suit for e

If math was like this,math would be everyone's favorite subject.

What teachers expect you to answer in math problems

Thank you for making my day VERY GOOOD

Ive watched this animation 5 times and its still cool

Great video nenna keep the good content up i'm a big fan of your channel and hope you have a great day

It’s raining or windy hard here…… but I do reallylike these animations and your videos A LOT!!!!!

Forever Nenaa + Alan Becker + Reaction = My Favourite!

Yay you did react to it Im so happy yay!

At this time it’s actually eight million, just a solid:YAY!🎉

You always entertain us we like your vids 🍻🥳👍🏻 and congratulations for hitting 100k

I actually learn some things today. Thanks anination lol

My guy learned this in minutes while I struggle doing basic math

This video is like a teacher. The comment section is all the students.

This looks so cool

im gonna download this and watch while traveling

equation shows the square root of negative 1 = i
2 seconds later: i WoNdEr WhAt ThAt StAnDs FoR

The teacher: What! You learned this in Kindegarten..

Can We Appriciate That We Got Nenna To 1.30M?

They really need to make a animation vs nenaa reacting to animation vs math

If only math was as entertaining as this.

Math class at the beginning of the day V.S math class at the end of the day be like this.

Bro This Is Litarly What Teachers Expect Us To Do

What I like about your reactions is that YOU DONT PAUSE EVERY 0.3 SECONDS

Teacher: Okay… and show us your work on how you got your answer?
TSC:

9:00 my man just did the pac-man strat

theorically, Those symbols are immortal in the number void, since they can multiply and recreate themselves over and over again. btw, did anyone else notice somehing huge at the ending. Its like really faint, but there are huge legs surrounding the symbols at the end

If yall didn't know yet the second coming is inside a scientific calculator the black represents the void where numbers pop up when you type and the white is where the buttons are.This is my theory about the episode since it makes alot of sense I hope this theory will further expand others theories

Yes! I learned so much from this!

When pie disappears the second coming is like no! I want to learn math😂

NENNA BECAMING SMART!

I want to see a animation vs real life

Bro is more entertaining than the math teacher

Bro went from 1 to infinity in 10 minutes

I fall asleep while watching ur vid at night so I have to rewatch it 🥲

if math was like this it would be fun

Second coming must be super big brain now

The Second Coming is a frikin genius

now the second coming is big brain

My brain is like Oh I'm very confushed😂

Me with my friends in math class be like:

Nah Alan Becker taught us and showed what we’re gonna expect in collage and he thought faster then my dad came back with the milk

if only math was like this it would be everyone fav subject

11:00 math be like when I'm in 9th grade:

Lol this was hilarious

The math teachers teaching us:

I was waiting u to react to this finally.

His Bow is made out of: 2 2 X = Which is 2X2= The answer is 4 which is why he shot 4s

Very true. Math hurts... MY BRAIN!

If school had everything math be like: