Mechanical Engineering Exam > Mechanical Engineering Notes > Mohr's Circle for Moments of Inertia
Mohr's Circle for Moments of Inertia - Mechanical Engineering PDF Download
Principal Axes and Principal Moments of Inertia
Squaring Eqs. 10-9a and 10-9c and adding, it is found that;
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where:
- At the points A and B, Ix’y’ = 0 and Ix’ is a maximum and minimum, respectively.
- The equation for qm defines two angles, 90o apart which correspond to the principal axes of the area about O.
- Imax and Imin are the principal moments of inertia of the area about O.
Mohr’s Circle for Moments and Products of Inertia
- The moments and product of inertia for an area are plotted as shown and used to construct Mohr’s circle,
- Mohr’s circle may be used to graphically or analytically determine the moments and product of inertia for any other rectangular axes including the principal axes and principal moments and products of inertia.
Sample Problem
For the section shown, the moments of inertia with respect to the xand yaxes are Ix= 10.38 in4and Iy= 6.97 in4.
Determine (a) the orientation of the principal axes of the section about O,and (b) the values of the principal moments of inertia about O.
Solution:
•Compute the product of inertia with respect to the xyaxes by dividing the section into three rectangles and applying the parallel axis theorem to each.
•Determine the orientation of the principal axes (Eq. 9.25) and the principal moments of inertia (Eq. 9. 27).
Sample Problem
Solution:
- Compute the product of inertia with respect to the xy axes by dividing the section into three rectangles.
Apply the parallel axis theorem to each rectangle
Note that the product of inertia with respect to centroidal axes parallel to the xy axes is zero for each rectangle
Sample Problem
• Determine the orientation of the principal axes (Eq. 9.25) and the principal moments of inertia (Eq. 9. 27).
Sample Problem 10.8
The moments and product of inertia with respect to the x and y axes are Ix = 7.24x106 mm4 , Iy = 2.61x106 mm4 , and Ixy = -2.54x106 mm4.
Using Mohr’s circle, determine (a) the principal axes about O, (b) the values of the principal moments about O, and (c) the values of the moments and product of inertia about the x’ and y’ axes
Solution:
- Plot the points (Ix , Ixy ) and (Iy ,-Ixy ). Construct Mohr’s circle based on the circle diameter between the points.
- Based on the circle, determine the orientation of the principal axes and the principal moments of inertia.
- Based on the circle, evaluate the moments and product of inertia with respect to the x’y’ axes.
Sample Problem 10.8
Solution:
- Plot the points (Ix , Ixy ) and (Iy ,-Ixy ). Construct Mohr’s circle based on the circle diameter between the points.
- Based on the circle, determine the orientation of the principal axes and the principal moments of inertia.
Sample Problem 10.8
- Based on the circle, evaluate the moments and product of inertia with respect to the x’y’ axes
The points X’ and Y’ corresponding to the x’ and y’ axes are obtained by rotating CX and CY counterclockwise through an angle Q = 2(60o ) = 120o . The angle that CX’ forms with the x’ axes is φ = 120o - 47.6o = 72.4o .
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FAQs on Mohr's Circle for Moments of Inertia - Mechanical Engineering
| 1. What is Mohr's Circle for Moments of Inertia? |  |
Ans. Mohr's Circle for Moments of Inertia is a graphical method used to determine the principal moments of inertia and the orientation of principal axes for a given object. It is commonly used in structural engineering and mechanics to analyze the behavior of beams, columns, and other structural elements.
| 2. How is Mohr's Circle constructed for Moments of Inertia? | |
Ans. To construct Mohr's Circle for Moments of Inertia, we need to plot the moments of inertia along the horizontal and vertical axes. The plot consists of a circle with the horizontal axis representing the maximum moment of inertia and the vertical axis representing the minimum moment of inertia. The radius of the circle is equal to the difference between the maximum and minimum moments of inertia divided by 2.
| 3. What information can be obtained from Mohr's Circle for Moments of Inertia? | |
Ans. Mohr's Circle for Moments of Inertia provides several useful pieces of information. It helps determine the principal moments of inertia, which are the maximum and minimum moments experienced by an object. It also provides the orientation of the principal axes, indicating the directions in which the object is most and least resistant to bending.
| 4. How is Mohr's Circle for Moments of Inertia applied in practice? | |
Ans. Mohr's Circle for Moments of Inertia is applied in practice by engineers and designers to analyze the behavior of structural elements. By determining the principal moments of inertia and the orientation of principal axes, it helps in designing structures that can withstand different loading conditions. This information aids in selecting appropriate materials and dimensions to ensure structural integrity and safety.
| 5. Can Mohr's Circle for Moments of Inertia be used for irregular shapes? | |
Ans. Yes, Mohr's Circle for Moments of Inertia can be used for irregular shapes. It is applicable to any shape for which the moments of inertia can be calculated. By calculating the moments of inertia about different axes, the circle can be constructed to determine the principal moments of inertia and the orientation of principal axes, regardless of the shape's irregularity.
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