$I_H$ -> Moment of Inertia of Hollow sphere about the axis through its centerĤ. The moment of inertia I I of a material point is the product of its mass m m and the square of the distance r r from the axis of rotation. $I_S$ -> Moment of Inertia of Solid sphere about the axis through its center Moment of Inertia for a solid and hollow sphere about the axis through its center is given by $I_e$ -> Moment of Inertia around perpendicular axis through one endģ. $I_p$ -> Moment of Inertia around perpendicular bisector This time we split the sphere into an infinite number of point masses. Moment of Inertia for a thin rectangular rod around perpendicular bisector and perpendicular axis through one end is given by moment of inertia of sphere Moment of inertia of a sphere about a diameter: second method There is nearly always more than one way of doing a calculation. Moment of Inertia calculator for a mass m at distance d from axis of Rotation is given byĢ. SI unit of Moment of inertia is $Kg m^2$ġ.The general form of the moment of inertia involves an integral. The moment of inertia of any extended object is built up from that basic definition.
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