Double integrals and Polar integrals: Explained with 3D visualizations

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That is what we need in math education, animation!

This channel is absolutely a scientific treasure!
Très Bien

Truly one of the best intuitive examples iv ever seen

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Again, a very elegant visualization of a fundamental concept in mathematics. These videos should most definitely be used in junior high! A picture is worth a thousand words and an animation like this is worth a thousand pictures.

magnificent. that's gonna make it easier for multivariable calculus students to understand.

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Thanks.

I wish i had this video back when I was studying this topic! Excellent video and excellent quality! The rock music at the end was super cool

13:22 *physics intensifies*

The greatest minds find elegant ways like your own where science meets the arts. A company like Pixar or Dream Works should create a division of animation with you in charge.

What a satisfying explanation of double integrals! It has opened the door to a brand-new world of calculus that I can't wait to explore further. 😁 (The classical music was also a nice touch!)

What a way of teaching! beautiful, clear, and simple. The animations are so lovely, they make me happy just looking at the colors. You also carefully break down the crucial processes slowly, allowing people to take their time to understand what is going on.

I'm subscribed to all the major educational channels (i'm sure you know of whom i speak) and i can honestly say that they can ALL learn something from you. You deliver absolute quality videos from the top down. Your work is AMAZING! It's only a matter of time before you hit the 1M sub mark (and above), just keep doing what you're doing. - Loyal Subscriber

I wish I had found this before, it's very clear.

you know what, a person makes clear and understandable videos like this should definitely understand the subject matter he explains, therefore our school teachers never understood the practical reflection but only have they known how to calculate.

This was very helpful for someone that is very visually oriented. THANK YOU!

Thanks, you make me approach mathematics without fear.

13:22 That Naruto music. Hahaha.
Great video as always, I really wish I had these when I was back in college taking Calc classes. I'm a visual learner and seeing things makes them 'click' in my head.

Extremely clear explanation and videos! Thanks too for keeping the commentary pace slow, with pauses so you can actually THINK about what's being said!

SO MUCH CLARITY!! I love your style of teaching, it should be the new norm. Thank you so much for the knowledge. I think i speak for everyone that watches this when i say: It is much appreciated!

Great classical example -in both calculus and music :)
Great job E.K. !

This is apsolutely brilliant, thank you for sharing these videos for free! Keep up the good work!

An absolutely beautiful amalgamation of maths&music...with insane animations making the topic much simpler to understand!!!...

Amazing!!!! One of the best videos explaining double integrals and the coordinates systems

I was just listening to Mozart and when it was done I closed spotify and clicked on this video and then there were more Mozart!

Best Channel to learn about in-depth calculus. It helped me visualize the calculus.

Another amazingly intuitive explanation, Eugene. Thank you!

Best Multivariable Calculus Video ever!!! 🇺🇸🤘🏼👊🏼🎤🖖🏼

Really interesting as usual
I love these kind of videos

Mozart: Serenade in G, K.525 in case anyone wonders. Excellent choice of music!

One of the most beauty product for mankind. Big love, big thanks

I see that you too are a visual person, and these videos are so much fun to watch... I wish, I had these when I was learning. I do not mean just this video in particular ..but all of your videos. Good work! please keep it up.

Best channel acc to a electronics engg. In india.. ! From india with love pls upload more videos with deep information.

Stunningly beautiful! Used to think physics and math are driest, now they appear prettiest! In less 15 minutes, I learned to calculate the size/area/volume of anything in the world! without any stress!It is Awesome!!!

Now I only understand integral and derivatives because of this channel. Congratulations

Awesome explanation. I never understood the concepts better before seeing these videos

I cannot explain how much I love your videos

This is the best video on integration I have ever seen! Just found your channel and have already subscribed! Excellent work!

You just earned yourself another subscriber for making double integral so feasible. Keep it up ☺️

the music was sooo dramatic. But anyhow, outstanding explanation. I just understood what exactly the polar coordinates mean. Thank you sooo much. I have never been told about the polar coordinates so well before this. Thank you very much.

great explanation....background music is soothing for the soul...nice

I never comment, but i must say; this is high quality education for free and I love it!

Wow, never seen such a beautiful explanation of integrals. Very good work, thank you.

Great work as always, Eugene. You need more recognition.

what software do u use to make these? looks great, and very smooth

great service to the humanity. god bless you and your team

Thank you so much for making such videos. The time you give between explaining two statement is really very helpfull.

I remember from the Calculus classes that in the Polar integration the "R" multiplier was called the "Jacobian", so to differentiate from the Rectangular integration explained before. Amazing video!

Now I can calculate the volume of my entire rocky cake 🎂🍰😍👍🏽

7:45 help me please..🖇️🐥
Diagram shows Z is not same for all parts (height). But how can it possible to take Z for every height...🙄
Is Z is a constant or variable...!!!!?🙏

Please...surface integrals and differential equations.... Super explanations and graphics - thanks!

"The only really valuable thing is intuition" [Albert Einstein]. You not only understood this yourself, it seems like it's your signature. You are WAAAAAY ahead of most text books and almost all university lectures in terms of understandability. Because you actually present it in ways the developers thought about it in their minds. Truely remarkable mindsdont just start with the abstract definitions out of nothing, because nobody can truely think abstractly without having examples to abstract from. So you really do it the way the geniuses invented it but by also filtering out the most understandable parts.
Hope you are now confident that you are a true treasure to most students out there.

instant like!. I'm glad to see your subscriber base is growing.

madam u done great job.. i am in strggling to get understand about voltage and current for the past 10years.. atlast u make it easy ... thanks alot

Very clear and understandable ever, even in grade school

You are doing Gods work! Could you please start a computer science series?

Well done explanation and visualization with beautiful music at first.

Great ! My all concepts are now cleared . Thanks .

This channel is underrated.

This makes it so easy to understand

The best channel on yt!

One of the best videos I've ever seen... (I recommend use vel 1.25 or 1.5)

I have the greatest respect for you. Thank you very very very very much. I really love your videos.

No words that can express my feeling infact no words able to explain the goodness of this vidio i mean i dont know what should i hv to day legend thnkx for your work its soooooooo helpfulll

OMG, i felt really exhited when I finally understood where the equation for the area of a circle is coming from

this is terrific stuff. I'm an aerospace engineering student and your videos about curl and divergence has really helped.
Can i ask for a little help? concepts of CIRCULATION and VORTICITY is really confusing and probably you're the only teacher who can explain what they really mean. please do a video on above topics. thank you so much for all these amazing videos. :-)

Beautiful.........now its stuck in my brain....love it

Song title is morning mood by Edvard Grieg in case you were curious

What u find is actually double integration of dxdydz . It won't be double integration of zdxdy. But this channel helps me to visualize so many things. Thanks to your team.

Outstanding teaching 🥇🥇🥇🥇.Thank you mam

Thank you so much, now it all makes sense where in class i just kept staring.

At 5:47 I expected a third way: slicing horizontally in steps Dz. You then need to 'collect' the sets in the xy-plane corresponding to a particular slice. This gives the Lebesgue integral. It would have been so nice to see Lebesgue integration as an intuitive extension of the Riemann integration in x and y, instead of the usual 'arcane and formal' introduction at a much later stage.

This is so intuitive. I wish I had this some years ago.

You are my biggest crush Eugene.

This was AMAZING and the music that came on at the end wow just wow

You are doing a great job sir by making these videos👌🏻🙏🏻

I really love your videos. It's make me understand math.

This channel is amazing.

I've learnt so much from this video. Thank you!

This channel is the best

Sir Its the best thing on You tube.
Thanks

nice dude
right before my midterms

The best video I have ever seen!!! Thank you a lot!

Another method to find out the area of circle is take those slices, separate into two groups and attach them in such way as to form a rectangle. the height of that rectangle would be the radius (R) and the length would be half the circumference of the circle. Circumference of a circle of is 2πr so half of it would be πr.
Now applying the formula for area of a rectangle i.e. height*length we get r * πr = πr².

Thank you. You are doing an amazing job in helping people like me who were always curious how we arrive at these weird formulas. Now I get it. Incredible amount of work you have put in. Thanks again. By the way, do you dream mathematics in your REM sleep ? Your videos are like dreams of revelations, like God or an angel taking me to the deepest knowledge libraries of this universe and showing to me, by holding my hand and explaining. Later I find I woke up with more wisdom, than I have gone to sleep with.

Thanks for great video!
Can i ask what kind of graphic tool do you use for making the animation in video?
Those visualized animations are so cool.

thi is great, just one note: at the end you end up with the area equation of the circle but you started to calculate the volume of a disk. in fact you calculated the volume of the unit height cilynder. could be confusing to someone.

Voice of the narrator 👍👏

Thank you so much,now I understand integration.

I just love your videos.

very good explanation, a video of the triple integrals explanation, please

Awesome videos, Eugene. Thanks a lot for sharing.

Great animations! I don't like the voice thing as much, but that's a pretty minor complaint. Overall this is some excellent content!

Could you to explain integrating complex functions?

Volume=sum of arclength*height= sum of height*r*d theta*dr
I never thought of it that way! I only thought of it because of area = integral 1/2*r^2 d theta and the Jacobian

Respected Eugene, each rectangle has a different height along the z-axis. While you have considered that constant, what did I observe during the video that was without change in z values? Should it not have been calculated as a different value? While, at the end, it resulted in another integral, a whole volume would become a triple integral.
Nonetheless, your videos are my motivation and encourage my confidence in physics.

So this is how physics used to run in minds of Einstein and others.

i love this video.. thanks a lot god bless you.. please do more videos and try to make every abstract concepts easy like that

Wonderful work And beautiful mind