Double Integrals by Fubini

Please keep the intro as it was. No need to make it as an outro

Thank you so much. You teach math incredibly! I am from Iran and I love mathematics. God bless you master.🌹🌷🌺🙏

Great job sir! Could you please solve more double or even triple integrals on this channel?

What a brilliant explanation.

Sir when we derivatives a function then we determine the slope of the function in any point.
And when we integrate a function then we determine the area of the function in any interval.
So, if integration is inverse of derivative. Then can I say tangent is the inverse of area???

What are the conditions for Fubini to hold true (when does it fail)? Is it being finite the only condition?
Great video as always :)

good stuff, subscribed. got an exam in a couple hours, think i should start sleeping now..6am…wish me luck.

Hey, do you do physics too?

I cant wait for you to do triple integrals next!!!

Hello, when you have got time, could you prepare some videos about Feynman technique of integration? Thanks

Excellent video! Thank you!

Awesome video. Thank you so much!

Thanks for an other video master

Brother can you please solve this question:
If last three digits of x⁴ are (x-58)² then the last digit of x is

At least this was easy for me after the struggles with the floor function equation problem.

GOAT

Great !!🤖!!

Nice 🤠

that be is looks like ط in arabic 5:14

Nice

thanksssss

Nice :)

I got the answer wrong because when you have R = [0,2]x[0,3] I thought the [0,2] was for y and [0,3] was for x. Don't ask me why. But strangely enough, my answer was very similar. It was (1/3)(5+e^(-6))

Professor, show an example where Fubini fails