Math professor: Writes unsolved equation on the board "As you can see class there are many things we still don't understand about math" Student walks to the board and multiplies both sides by 0
As the math major throws all his techniques into the Dirichlet function, he still couldn't manage to integrate the function. He asked the function,"Are you not integrable because you are nowhere continuous, or are you nowhere continuous because you are not integrable?" as he throws more and more different tricks and shortcuts, the function asked him,"It's time to give up, Darboux and Riemann got nothing on me!" He smiled, replying with the ace up his sleeve,"Nah, I'd win." He summons Lebesgue and successfully defeats the function using Lebesgue integration, turning the function into nothing but a mere zero.
The digraph "eu" in German is pronounced "oy". See also: "Freud" ("froyd") [Other side note: Euler was Swiss and Freud was Austrian, but the primary language of both countries is German.]
In that moment, the student could have saved himself, but he didn't know two key things. The first is always bet on e^x, and the second is that x was a function of t, making e^x immune to the damage. In response to the student's Implicit Differentiation, e^x said, "With this Chain Rule, I summon.." the Chain Rule factor, dx/dt, which only made him stronger with more hits from the student's Innate Technique, rendering it useless. "You can see my Implicit Differentiation!!" the student said, to which e^x replied, "Nah, I'd Adapt." Those who inherited the curse of the math teacher, the one who did not fully cover the material... The students would all bear witness to the bare flesh of the one who is transcendental. To the one who left it all behind! and his overwhelming Differentiability!
When you call d/dt you imply an implicit ordinary derivative and so by the chain rule you obtain (dx/dt)*e^x(t) which calls for an explicit definition of x in terms of t. The correct tool to defeat the natural exponential function is the partial derivative δ/δt, who has the power to treat all functions of other variables as arbitrary constants, disregarding the domain of its enemies, and flattening the exponential down to a constant and differentiating to zero.
Thats cool but introducing t is a bit of a deus ex machina move. More suitable ending for lobotomy calculus would be differentiating by e: assuming x is natural, d(e^x)/de = xe^(x-1), repeating the same operation eventually results in 0
What do you think about integrating hard integrals and using different techniques to beat it. In the end, feynman technicke wins bruh. (For example the Integral from 0 - 1, over (x^10-1)/(ln(X)). Pretty famous
or u can suppose if e^x = y then by taking log both sides its gonna be log y = x (log e to the base e =1) then by differentiating both sides you get dy/dx = e^x oh wait noooooooo
Math professor: Writes unsolved equation on the board
"As you can see class there are many things we still don't understand about math"
Student walks to the board and multiplies both sides by 0
Right after saying "Nah, I'd finish"
Incomprehensible technique, crazy maths Domain expansion : e^iπ = −1
We making outta euler formula through complex numbers with this one🗣️🗣️💥💥💯💯🥶🥶
Even the orange stickman struggled with this one🗣🔥💯🥶🥶
Infinity Complexity Technique, Collatz Problem Domain Expansion: 3x+1
Basically hollow purple
@@AiharonYOO TRU
Bro dropped one of the hardest edit and left without any trace
He alone, is the toji'd one.
malevolent differentiation slaps so hard XD
Making Mahoraga e^x is mind blowingly funny to me
Ik bro😭
And then they said "Do not go home until you finish reading the value of e"
PM mentioned, sleeper agent activated
Domain expansion: INFINITE DIGITS!
Domain expansión: DISTORCION
Mili mentioned 🔥‼️‼️‼️‼️
e^x Taylor series infinite domain expansion!
0:17 Bro looking like he hasn't seen Euler's Number since the Heian Era.
Really))
did not see d/dt coming, bro was cooking fr 🔥🗿
technically the derivative would be e^x * dx/dt
@@ShamithPrasad25 I didn’t say that d/dt was the derivative, I said that I didn’t think of taking the derivative of e^x with respect to t
@@ShamithPrasad25 then dx/dt = 0 since x does not depend on t 😂
As the math major throws all his techniques into the Dirichlet function, he still couldn't manage to integrate the function. He asked the function,"Are you not integrable because you are nowhere continuous, or are you nowhere continuous because you are not integrable?"
as he throws more and more different tricks and shortcuts, the function asked him,"It's time to give up, Darboux and Riemann got nothing on me!" He smiled, replying with the ace up his sleeve,"Nah, I'd win." He summons Lebesgue and successfully defeats the function using Lebesgue integration, turning the function into nothing but a mere zero.
why is the delivery of 0:50 so fucking good 😭😭
This feels like the result of a failing student asking their calculus teacher for extra credit.
"More commonly referred to as oilers number." was insane like 💀💀💀💀
Euler is a person
It's spelled Eular's Number. Not oiler☠️
It’s pronounced the same as oiler
The digraph "eu" in German is pronounced "oy". See also: "Freud" ("froyd")
[Other side note: Euler was Swiss and Freud was Austrian, but the primary language of both countries is German.]
YESSIR MORE MATH RAAAAAGGGH 🔥🔥🔥🔥🔥🔥🔥🔥
I just saw u in last video I was watching
@@ayushankush7078I'll follow you. Even if you change your profile picture. I'll always be there.
Where you go...I go
Mathraga
Where you go I go@@ayushankush7078
@@ayushankush7078 why can't I reply to you man this is starting to freak me out. Everytime I reply it disappears
math-oraga
Funny guy
English translation is wild.
this might have to be how i study for calculus
I really think you shouldn't learn calculus from a channel that implicitly differentiates a function that's NOT implicit.
@@ohwow512lol, if it works it works
This video is more terror than original jjk
In that moment, the student could have saved himself, but he didn't know two key things. The first is always bet on e^x, and the second is that x was a function of t, making e^x immune to the damage. In response to the student's Implicit Differentiation, e^x said, "With this Chain Rule, I summon.." the Chain Rule factor, dx/dt, which only made him stronger with more hits from the student's Innate Technique, rendering it useless. "You can see my Implicit Differentiation!!" the student said, to which e^x replied, "Nah, I'd Adapt." Those who inherited the curse of the math teacher, the one who did not fully cover the material... The students would all bear witness to the bare flesh of the one who is transcendental. To the one who left it all behind! and his overwhelming Differentiability!
bro i can't i feel addicted to this video i watched it every night for the last 5 days bro i can't send help
Bro needs to bring out more content (I love this shit)
Throughout math and science. I alone always solve.
When you call d/dt you imply an implicit ordinary derivative and so by the chain rule you obtain (dx/dt)*e^x(t)
which calls for an explicit definition of x in terms of t.
The correct tool to defeat the natural exponential function is the partial derivative δ/δt, who has the power to treat all functions of other variables as arbitrary constants, disregarding the domain of its enemies, and flattening the exponential down to a constant and differentiating to zero.
This is great bro it's really well made
do one with the Gaussian Integral
Taylor series reversal integration technique
Easily computable for a infinite integrated Taylor series, your area is no where is hide!
yo that ending was kinda fire like low key good job
What an amazing piece of content I casually found
Next do one with integration by parts, or trigonometry/inverse trig
"NAH I'D E TO THE X!!" at 0:50 was so good😭
"There it was" sounds so cool for no reason 😂🔥
Another banger edit
cant wait for episode 3 this is so intense
Do fourier series "are you an even function because you're symmetrical about the y-axis or... " etc
fast Fourier transform domain expansion!
Never thought I would learn calculus
Funny, the student knows taylor series but not the derivative of e^x by heart
The sine and cosine functions are also funftions which can survive malevelont differentiation, and will never reach 0
Still my fav lobotamy kaisen vidro
I cant wait to see the taylor and maclaurin series domain expansions unfold. Truly hyped
Now do one on biology.
Are you living because you're made of cells? Or are you made of cells because you're living?
Underrated 💀
Yes Please
Always bet on the Immune system
are you e to the x because you are e to the x or are you e to the x because you are e to the x?
Who let bro cook :skull:
wtf this is exactly the content i need rn
beautiful
kirei
this shit making me want to attend additional mathematics next yr
This makes so much sense lmao
Btw do watch jojos
Thats cool but introducing t is a bit of a deus ex machina move. More suitable ending for lobotomy calculus would be differentiating by e: assuming x is natural, d(e^x)/de = xe^(x-1), repeating the same operation eventually results in 0
Years from now math teachers will actually be using this to teach their students
Bro studying first to cook quantum mechanics saga, that uncertainty will be fire 🟣🫰🏻
i am not kidding. i understand this much better than what my teacher taught me. 💀💀
Bro is so good at math he learned tailor series before e^x
that's pure Art, the only thing is that i really find kinda cringe everytime the voice starts screaming or rises his voice.
do you know where i can get this voice?
We making out of school with this one 🔥🔥🔥🔥🗣🗣🗣🗣💯💯💯💯
why does it go so hard
my humor is broken
I still hold out hope for a return...
Bro cooked up a semester of calculus
"multiplys with zero"
What the fuck am I going to use this for
Meanwhile in mathematics kaisen
The best part is that this could actually be a fight on jujutsu kaisen
This text to speech is fire
WHY IS THIS SO PEAK
What do you think about integrating hard integrals and using different techniques to beat it. In the end, feynman technicke wins bruh.
(For example the Integral from 0 - 1, over (x^10-1)/(ln(X)). Pretty famous
This is art bro make another one
I love this
Nah, id want you to keep posting this stuff
This shit lowkey funny. I subbed
🔥🔥🔥 waiting for ur next video
you won
we will be subbing
Episode 3 on hyperbolic functions when
Infinite maths void domain expansion: f(x) = x*0
With this treasure I summon...
Reimann Hypothesis.
Se ze gambare!
PLS PART THREE
that was beautiful
or u can suppose if e^x = y
then by taking log both sides its gonna be log y = x (log e to the base e =1)
then by differentiating both sides you get dy/dx = e^x
oh wait noooooooo
we need episode 3 🙏🏼🙏🏼
f(x) = 0 is also its own derivative
less shiny
@@TWIlktitbliktvim-ty7td Any function ce^x is its own derivative. Let c = 0 and you get f(x) = 0.
@@Sir_Isaac_Newton_ I'm aware of that but as I said much less shiny
@@Sir_Isaac_Newton_it's still a zero tho, basically represents yuji, no matter how hard it tries it still remains zero
Pls continue, i'm fina understanding
Me rn : e^πi + 1 = 0 DOMAIN EXPONENT-ANTION
Nah id make my students einstein
Please I beg you do laplace transformations next
I don't know what're you saying but i fw this
No way I'm learning calc like this
WHERE IS THE NEXT EPISODE
Please do a distance formula lobotomy kaisen I would love to see it
Can we get lobotomy kaisen geometry arc nah id win
Im gonna need episode 3
Episode 3: Non-elementary Functions
@@maxpopkov1432 Episode 3. Imaginary numbers
What is the name of the song?
yoo wtf wat d/dt for e^x its like multiplication with 0 but in calculus terms
WE ARE LEARNING ABOUT THIS SHIT RN!! WTFFFFF
this is entertaining af
BRO I NEED MORE DERIVATIVES
brainrot is negated by knowledge
someone needs to make a spinoff 2 fan animation of this😂
more math arc please
yall got a mental ilness
That was great
Excellent, now make one on linear algebra
Legit forgot about logarithmic differentiatio😢😢(the brainrot is rea😮l)
make a part 3
it slaps
More pls
Part 3 when?
I just enter in university a month ago but I alredy saw limits so it’s funny that I month ago I would understand this video lol