If the temperature of a uniform rod is slighrly incerased by `Deltat`, its moment of ineratia I about a line parallel to itself will ubcreade by

If the temperature of a unifrom rod is slightly increased by Deltat , its moment of inertia I about a line parallel to itself will increase by

If the pemperature of a uniform fod is slifhely increased by Deltat its mement of inertia I about o pqrpendicular bisector imcreases by

[" 17.The temperature of a thin uniform rod increases by "Delta" .If moment of inertia I "],[" about an axis perpendicular to its length,then its moment of increases by "],[[" 1) "0," 2) "alpha" I "Delta t," 3) "2 alpha l Delta t," 4) "alpha^(2)I Delta t]]

The moment of ineratia of a uniform thin rod about its perpendicular bisector is I . If the temperature of the rod is increased by Deltat , the moment of inertia about perpendicular bisector increases by (coefficient of linear expansion of material of the rod is alpha ).

The moment of inertia of a rod about its perpendicular bisector is I . When the temperature of the rod is increased by Delta T , the increase in the moment of inertia of the rod about the same axis is (Here , alpha is the coefficient of linear expansion of the rod )

The moment of inertia of a rod about its perpendicular bisector is l, when temperature of rod is increased by Delta T, the increase in the moment of inertia of the rod about same axis ( gamma = temperature coefficient of volume expansion)

The moment of inertia of a ring about one of its diameters is I.What willbe its moment of inertia about a tangent parallel to the diameter ?

Consider a uniform rod of mas M and length L. It is bent into a semicircle. Its moment of inertia about a line perpendicular to the plane wire passing through the centre is

For a uniform circular disc the moment of inertia about its diameter is 150gcm^(2) . Calculate its moment of inertia about (i) its tangent parallel to diameter. (ii) an axis perpendicular to its plane and passing through centre.