Calculus 3: Tensors (14 of 45) Angular Momentum & the Inertia Tensor: Diagonal Elements

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In this video I will develop the diagonal component notation of the inertia tensor by relating that the angular momentum is equal to the moment of inertia times the angular velocity (L=Iw).

Next video in the series can be seen at:
  1. Michel van Biezen
  2. ilectureonline
  3. ilectureonline.com
  4. Mike
  5. Mike van Biezen
  6. van Biezen
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Комментарии
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Great explanation on a confusing topic! Thanks.

gordongee
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Thank you sir for your invaluable and interesting lecture.

AbdellaMahmud
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Is it possible for you to at least show the metric tensor? I know it might not be possible to dig deep into it, but It would be very interesting to finally understand it!

crehenge
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Congratulations for your good job!! God bless you sir

mendezdamasoangel
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at 0:55 where you said we manipulate the equation a little bit. I try figure that out but I can't, do you have other video on that or know where I can look for the step-by-step instruction?

minhtri
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you are amazing my prof.
thank you so much

RESC_Eng
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Is r the offset of the particle from the axis of rotation, or from the origin?

memethiccboy
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Thank you so much sir for this lecture..

shivangisoni
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L = m [r^2w - ] Where is the minus coming from?

jeanpierredaviau