What is the Solution to this Rotational Motion Problem?

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coldblood
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Hi friends,
Please help me in solving this problem, I'll appreciate the help.

The problem is as:

https://fbcdn-sphotos-f-a.akamaihd.net/hphotos-ak-ash3/q71/s720x720/1503966_1461727630721009_1993563313_n.jpg

Attempt -

https://fbcdn-sphotos-c-a.akamaihd.net/hphotos-ak-prn2/q71/s720x720/1514999_1461727717387667_205197017_n.jpg
https://fbcdn-sphotos-g-a.akamaihd.net/hphotos-ak-prn1/q71/s720x720/1497775_1461727790720993_14768769_n.jpg

Thank you all in advance.
 
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Your first method happens to work because the two displacements (from the centre of the rod to the end of the rod, then from the end of the rod to O) are at right angles. Adding the squares of those therefore gives the square of the distance from the centre of the rod to O.
Your second one failed because you had the right angle in the wrong place, so subtracted the squares instead of adding.
 
Your first method happens to work because the two displacements (from the centre of the rod to the end of the rod, then from the end of the rod to O) are at right angles. Adding the squares of those therefore gives the square of the distance from the centre of the rod to O.
Your second one failed because you had the right angle in the wrong place, so subtracted the squares instead of adding.
 
haruspex said:
Your first method happens to work because the two displacements (from the centre of the rod to the end of the rod, then from the end of the rod to O) are at right angles. Adding the squares of those therefore gives the square of the distance from the centre of the rod to O.
Your second one failed because you had the right angle in the wrong place, so subtracted the squares instead of adding.

Sorry haruspex I don't get it.
 
haruspex said:
Label the left-hand end of the object A and the next corner B. So AC=CB and CBO is a right angle. But you drew the picture more as though BCO was a right angle, and this led you to the wrong equation for the distance CO.

I got it, but what about this -
https://fbcdn-sphotos-e-a.akamaihd.net/hphotos-ak-prn1/q71/s720x720/1525140_1462156974011408_1387363187_n.jpg
 
coldblood said:
I got it, but what about this -
https://fbcdn-sphotos-e-a.akamaihd.net/hphotos-ak-prn1/q71/s720x720/1525140_1462156974011408_1387363187_n.jpg
I'm not sure I understand your remaining difficulty.
The MoI about C is mL2/12.
By parallel axis theorem, MoI about B is mL2/12 + mL2/4 = mL2/3.
Likewise, by parallel axis theorem, MoI about O is mL2/12 + m(CO2) = mL2/12 + m(CB2+BO2) (Pythagoras) = mL2/12 + mL2/4 + mL2 = 4mL2/3.
It is not in general valid to apply the theorem to find the MoI about one point that's not the mass centre, then add the square of the displacement to a third point, but it works here because the two displacements, from C to B then from B to O, happen to be at right angles.
 
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The problem has been cleared.