when your calculus test has only one problem

Ah yes, a new episode of blackpenredpenbluepenpurplepengreenpen, my favourite!

This is genuinely a very powerful test of someone's calculus skills.
I guess it might be a bit overwhelming to use it during an actual test, but it can definitely be used by students as a self-check.

With this all in one calculus becoming a thing, you are showing again why you are among the top mathematicians in the platform, if not the best

now the society wants you to make even *harder* question including some deadly *definite triple integrals* along with *laplace transforms* and *partial derivatives* just casually floating around in the question as a one million subscriber special
Edit: alrighty here u are, at a million subs
Congrats for that👍
.
.
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now gimme my question
*pweeease*

I cant express how much I love this channel. I am currently studying Soil science and agricultural chemistry and surprisingly enough the math needed for it is extremely advanced.I unfortunately lost some time and almost dropped out but right now I am determined to graduate.I started learning math by myself from the fundamentals to calculus and now I'm trying to study complex analysis by myself,and this channel just keeps me motivated.Thank you Mr. bprp!!!

Even dough I didn’t understand most of the video, I find your channel really interesting and I love to watch your videos. I can clearly see your passion to maths and your happiness during all videos. Keep going man! I really admire people like you!

As someone who’s education didn’t go past 3rd grade. Thank you for your videos, I’m doing my best to learn all the things I missed out on.

With the gaussian integral you can take advantage of the fact that the integrand is an even function and the integral is bounded symmetrically, so you can change the lower bound to zero and double the result of that. That shows right away that our "half-gaussian" integral in the 'u' world is sqrt(π)/2, no worries about convergence.

That little backtrack at 7:46 was funny XD I thought I accidentally rewound the video cuz I spaced out for a single second the first time

For the first bit, I just noticed that it’s the same as the evaluating (1/2)! Via the gamma function, which is sqrt(pi)/2

Seeing this I've really understood the meaning of:
Don't eat the whole cake in one turn, a slice by slice is good 🍰

You should make a playlist about generating function, specail functions and Sturm Liouville Systems

Congrulations for 1 million subscribers !!! Keep it up !

Congrats on the 1M subs!! Well deserved!!

Hey blackpenredpen! You left an outtake in toward the end. That sigh really got me ):

You should do a video on infinite sum renormalization techniques. Been watching some statistical physics lectures and they're always popping up. Very interesting stuff and not at all obvious! (to me at least)

Congratulations on reaching 1 Million Subscribers!

Can you find the radius of a circle which touches Latus rectum , axis and circumference of the parabola Y²=4aX

Congratulations on 1 million!

Congratulations for attaining 1M subs. Keep moving 👍

gotta love those ones!!

Lots of formulas kudos to all your successes and videos !!

Congratulations for 1 million subscribers :)

CONGRATS FOR 1 MILLION BRO

May i request you to make more of these all-in-one questions? I find it very amusing to solve and it was incredibly satisfying when i got the question right. This may just be the right tool for me to do brain exercises during leisure times. I love your work very much. I hope you gain an even greater reach on UA-cam and make more people understand calculus - or even give birth to a whole new generation of masters. God bless you

1 MILLION SUBS!!!! CONGRATS

Gamma Functions of the integral whuch x is aproaching wuld make things easier for those who have done advanced calculus. It's just sqrt(pi)/2...

ONLY 1K LEFT UNTIL 1MIL

Congratulations on 999k subs!

Thank you for promoting interest in mathematics!

Man congrats a Million!!

Wow, thanks!!!
That video is very, very amazing

this was a great problem. loved it

Your videos have saved my grade during my Differential Equations course! I was wondering if you could do a video on how to solve Boundary Value Problems for 4th Order DEs related to deflection of a beam? Thanks again!

Calculus exam in a couple days, just what i needed!

Awesome video! Thank you!

Seriously I love you guys 😊

Congratulations 🎉 100 subscribes

Honestly, your contante is Awesome.

I didn't recognize the power series so I took it to be the integral of x^[2(2n+1)] and turned into a geometric series, then integrated to get the log version hahaha

As i can see, d²/dx² of the whole thing inside is just equal to (x^2(2n+1))/(2n+1).
For the limit we know that x approaches √π/2, don't ask why cuz it's too easy. And also the limit is not undefined when x=√π/2 so we just put x=√π/2 and the thing left is the sum series of 1/4*π^(2n+1)/(2n+1)
Well, i think from here u guys can solve this on your own

You can technically multiply the 2u with the u and use Feynmann integration.

I love this stuff!

I was able to solve everything but the tanh^-1 (x^2) bc my last course never covered that 😮

(turn over the paper)
heart attack

I'm in my final 4 weeks of calc 2. I have never once been taught hyperbolic trig functions so that last part flew right over my head

Congratulations for 1M sir .
Edit-Love from India❤️

1 Million subs. Soon!

Can you find the integral of sin(e^(-x^2)) from negative infinity to positive infinity??🤔🤔

Pretty good question for exploding my head but amazing result 👏

Hello can you please show how t integrate x^5/(1+x^7)?

I think that you can also express the summation as 2tanh¯¹(x)

It's just 1/2Y(1/2) the result of integral. Gamma functions

Congrats 1 million subscriptions！

Sir I've seen some of your videos I'm interested in learning calculus where can I find your calculus lessons by you in the channel

Given is the function f(x) = -x² + 5. Find the tangent, that crosses the point P(3|10), of that function.

Plz pick up more this type problem mix all math concepts

Hey man i have a question is that really important to understand all math proofs or practical problem like that is better ?

There's a way to find exactly (1+(2+(3+(4+..)^1/4)^1/3)^1/2)^1/1 [The sum of n n-roots of n plus the next root]

congrats for 1M subs , im here since 327 k subs

So I’ve just finished real analysis and we didn’t learn about the hyperbolic inverse tangent being that sum. What module would that be taught in?

For the last part I didn't know the power series of inverse hyperbolic functions so I took the derivative again to get 2x/(1-x^4) and then integrated to get (1/2)(log(x^2+1)-log(1-x^2)). Probably could have also gotten this just remembering the power series for log(1+x).

I have a question.
What's greater?
e/pi or e/(pi^9)

Can show the solution for the integral from 0 to 1 of ((x^2)-1)/(ln(x))? Somehow the answer equals ln(3), but any online source gives the answer in terms of the Exponential Integral, and uses numerical approximation to get a value that visually looks equal to ln(3), but it doesn’t show how to plug in the bounds to get that answer. I get that you can substitute u = ln(x) and dx = (e^u)du and so the expression becomes integral from -infinity to 0 of (e^3u - e^u)/u du. This seems to not be directly solvable in terms of real valued closed form/elementary functions. The question was on our advanced calculus quiz, and somehow the correct answer (multiple choice) was ln(3).

i havent taken any calculus classes so i dont understand anything at all, but i still like to watch

Very interesting problem, with a lot of concepts rolled into one! The only gripe I have, though, is that this seems to rely very heavily on the student remembering the solutions to past problems. Recognizing the Gaussian integral is pretty reasonable, but would the student be screwed if they didn’t have the Taylor series for the inverse hyperbolic tangent memorized and be able to recognize it…?

When he smiles and scoughs it is so cute

Youmare very good at calculus,pls teach basic of calculus

I would love to see your reaction of one of your students finishing this problem (the exam) in ten minutes

lim 1/pow(n, n) = 1
n -> inf
can you tell me why it equal 1
thanks

hey could you or anyone in the comments show why when you find the area between the two curves y=x⅔ + √(1-x²) and y=x⅔ - √(1-x²) [the two curves which gives a heart shape when you graph them together] the area is = to pi??

I want your t shirt where can i get 💕

Lesgooooo 1 million!!

I may not know what you are doing right now and may get frustrated while trying to understand it, but I'm telling you, I WILL be back in a month and I WILL get it. Cya in 1 month, or 4 weeks, or 30 days, or 1800 hours, or 108000 minutes, or 6480000 seconds. I'll be back.

Integrats of log2dx?
Answer please
Thank you:-)

this just makes me realize how much math I forgot over the last 25 years

SinQ/CosQ a 10^6

Can you try the integral from -infinity to infinity of e^(-x)^2 * sin(x-t)dx and solve for a function of t? I have no idea of wolfram alpha is able to do this

I am doing IB math aa hl, will I learn how to do this amazing math, I'm in year 12 ?

2:29 I think that should be a minus sign. It will give you the same answer at the end tho cause you square it

This challenge is for you!🔥
Solve:
a³ + b² = 1 ;
a² + b³ = -1
Note: The solutions of these equations are real integers.

Nailed it!

Could you perhaps try to solve lim x -> infinity of x/(tan((pi/2)-pi/x)) in one of your upcoming videos, I think the result will be surprising to you but I wouldn't know how to solve this using classical calculus techniques

i like watching these even though i have no idea what is even happening

Here's a question for you:
Imagine two curves, 1/x and another like cos(x). What constant would you have to add to the cosine curve to make it be tangent to 1/x.
So, given the function cos(x) + a, determine a such that the function becomes tangent to 1/x (obviously using graphs to decide it is cheating, they should be used only to decide what's reasonable)

Se puede poner todo el problema en alpha matemática?

That was so funny. I really enjoy it 🥺❤️‍🔥

My chemistry 2 professor used to do this.

That integral can be solved by using the gamma function as well....ig it's easier to solve by using it..... great one btw!

Can you please do this integral in 2 different ways...
1/ {cos(x-a)cos(x-b)}

Is there a function that fits this criteria?
f(a)*f(b)=f(ab)+ab
Can't quite get my head around it

Whats the equation on your shirt?

What do need I to do to be your student???

前幾個步驟我有抓出來，不過後續的一些特殊函數值，需要記的，就算不了了

Thanks ✨

Find the absolute maxima of y= (arcsin(x))^(arccos(x))
I tried to input this in a graphing calculator and there is an absolute maxima but i dont know how to solve for it

Appreciating the stock of markers in that shelf 😂😂😂

The markers!

When I saw this thumbnail I immediately remembered my Analysis 1 and Analysis 2 classes, ahhh so nostalgic 😌, it only missed some double integrals here

yeah, of course