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Moments of Inertia about inclined axis

In structural and mechanical design, it is sometimes necessary to calculate the moment of inertia with respect to a set of inclined u, v, axes when the values of q , Ix, Iy, Ixy are known.

To do this we will use transformation equations which relates the x, y, and x’, y’ coordinates.

From Figure, these equations are:

Note:

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Moments of Inertia about inclined axis,, continue

Given

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

we wish to determine moments and product of inertia with respect to new axes x’ and y’.

  • The change of axes yields

 

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

 

  • By adding the equations for Ix’ and Ix’ we can show that the polar moment of inertia about z axis passing through point O is independent of the orientation of x’ and y;

 

Jo = Ix’ + Iy’ = Ix + Iy

 

  • These equations show that Ix’ , Iy’ and Ix’y’ depend on the angle of the inclination, θ, of the x’, y’ axes.

Principal Axes and Principal Moments of Inertia 

We will now determine the orientation of these axes about which Ix’ , Iy’ are maximum and minimum. This particular axes are called principal axes By differentiating the first of Eqs. 10-9 with respect to q and setting the result to zero. Thus;

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Therefore, at θ = θp ;

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

By substituting for θ in Ix’ , Iy’ and Ix’y’ equations and simplifying, we obtain;

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Summary

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering

The document Moment of Inertia and area about Inclined Axis | Additional Study Material for Mechanical Engineering is a part of the Mechanical Engineering Course Additional Study Material for Mechanical Engineering.
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FAQs on Moment of Inertia and area about Inclined Axis - Additional Study Material for Mechanical Engineering

1. What is the moment of inertia?
Ans. The moment of inertia is a measure of an object's resistance to changes in its rotational motion. It quantifies how the mass of an object is distributed around an axis of rotation.
2. How is the moment of inertia calculated?
Ans. The moment of inertia of an object can be calculated using the formula: I = ∫r²dm, where r represents the perpendicular distance from the axis of rotation to each infinitesimal mass element dm.
3. What is the significance of moment of inertia in mechanical engineering?
Ans. Moment of inertia is crucial in mechanical engineering as it helps determine an object's rotational behavior. It is used in designing and analyzing various mechanical systems such as rotating machinery, flywheels, and structures subjected to torsional loads.
4. How does the moment of inertia change with respect to an inclined axis?
Ans. When considering an inclined axis, the moment of inertia can be calculated using the parallel axis theorem. The moment of inertia about the inclined axis is equal to the sum of the moment of inertia about an axis parallel to the inclined axis through the object's center of mass and the product of the object's mass and the square of the perpendicular distance between the two axes.
5. What is the relationship between the moment of inertia and the area about an inclined axis?
Ans. The moment of inertia and the area about an inclined axis are related through the parallel axis theorem. The moment of inertia about an inclined axis can be calculated by multiplying the area about that axis by the square of the perpendicular distance between the two axes.
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