Hello Sir. If we consider a square with X and Y axis along its diagonals, the Ix will be a^4/12, and if we rotate by 45 degrees, we still have Ix' equal to a^4/12. How to explain this on the Mohr's circle?
So do we define product moment of inertia about one axis or do we define it about a pair of axes that are mutually perpendicular to each other. I am confused. Also if we have one axis of symmetry then we can have multiple pairs of principal axes(i.e one being axis of symmetry and the other being any axis perpendicular to axis of symmetry).
I've FINALLY found someone who can actually explain WHAT Ixy represents and visually demonstrate it! Thank you! I'm subscribed now :)
This was really helpful for me. It did clear my concept of the principal axes calculation. Thank you so much for this video! 😊👍
Really helpful... I was looking for it for a couple of months!
Awesome video. I can't thank you enough.
Simple. Clear and bulls 👁.
Thank you Jordan Peterson, great video
Hello Sir. If we consider a square with X and Y axis along its diagonals, the Ix will be a^4/12, and if we rotate by 45 degrees, we still have Ix' equal to a^4/12. How to explain this on the Mohr's circle?
Does that mean a I-Beam with the same density all around as axis at the center has 0 product of inertia?
what is the diff between lxy and lyx?
So do we define product moment of inertia about one axis or do we define it about a pair of axes that are mutually perpendicular to each other. I am confused.
Also if we have one axis of symmetry then we can have multiple pairs of principal axes(i.e one being axis of symmetry and the other being any axis perpendicular to axis of symmetry).
is there any physical significants for ixy
When all product of inertia be minimum?
great video, thanks!!!!
Really great explanation.
great video indeed
Finally found the correct video
thnx
it's very helpful .. with my kind regards to you....thanks
Thankyou so much sir you are really made my day sir
nicely illustrated!! thanks!
nice explanation
nice video sir
thank you
Thank you!
Thanks
Thank you❤️❤️
👏 👍
REALLY HELPULL
Product moment of inertia
Super sir
Tnx alot
Thanks