A thin rod of length L and mass M is ben...

A thin rod of length `L` and mass `M` is bent at its midpoint into two halves so that the angle between them is `90^@`. The moment of inertia of the bent rod about an axis passing through the bending point and perpendicular to the plane defined by the two halves of the rod is.

`(ML^(2))/(6)`

`(sqrt2ML^(2))/(24)`

`(ML^(2))/(24)`

`(ML^(2))/(12)`

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The correct Answer is:

Length of each part `=(L)/(2)` and mass of each part `=(M)/(2)`
The M.I. of a rod about an axis passing through its end and perpendicular to its plane is `(1)/(3)ML^(2)`
`therefore" For each part, I"=(1)/(3)(M)/(2)((1)/(2))^(2)=(1)/(24)ML^(2)`
`therefore" The net M.I. of the bent rod about an axis passing through B is "2xx(1)/(24)ML^(2)=(1)/(12)ML^(2)`

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