At 4:20 the function in the integration should have been "3z-y" instead of "3x-y". It is a writing mistake, although it will not affect the final answer. The answer will remain unchanged after calculation.
Cylinder problem will be almost same as that of the cone. The difference will be that, in the integration limits, the value of z will be that of the radius of the circular section of the cylinder.
At 4:20 the function in the integration should have been "3z-y" instead of "3x-y". It is a writing mistake, although it will not affect the final answer. The answer will remain unchanged after calculation.
Mad respect from Bangladesh Sir..
Keep it up
I am happy that you found the video helpful!
Very nice explanation I have cleared all my doubts thank you sir...
Thank you 😀
you are doing great things sir👌, keep doing ❤️
Thank you!
Thank You Sir.
Nicely Explained 👍
Welcome
Very nicely explained sir! Thank u so much😊❤️ Can you also explain for cylinder Shape plz
Welcome
Cylinder problem will be almost same as that of the cone. The difference will be that, in the integration limits, the value of z will be that of the radius of the circular section of the cylinder.
@@rbmathsOh yes sir got it.
Sir could you make a video on stokes theorem?
@@rbmaths Divergence part is easy but unit normal part across the cylinder i.e. dS3 difficult 🥴
efforts appreciated , sir 🔥
✌️✌️
❤❤❤ no words
if i take polar coordinates r, θ, z , what will be the limit ? (x= rsinθ,y=rcos θ,z= z )
Your question is answered in this video.
czcams.com/video/QY691zwG6AY/video.html
Thankyou sir 😊
Welcome
Sir is uh hv explained the verification of the last cone q in some other video?
The question was to Evaluate and not Verify.
Sir can you explain rectangular Parallelopiped