Category: Centroid And Moment Of Inertia

Theorem of perpendicular axis states that if IXX and IYY be the moment of inertia of a plane section about two mutually perpendicular axes X−X and Y−Y in the plane of the section (as shown in Figure 11.15), then the moment of inertia of the section IZZ about the axis Z−Z, perpendicular to the plane and passing through the intersection of axes X−X and Y−Y is given by, Figure 11.15 Perpendicular Axis… Continue reading Theorem of Perpendicular Axis

Radius of gyration of a body about an axis is a distance such that its square multiplied by the area gives moment of inertia of the area about the given axis.

Second moment of area is also known as area moment of inertia. Consider a small lamina of area A as shown in Figure 11.14. The second moment of area about x-axis and y-axis can be found by integrating the second moment of area of small element of area dA of the lamina, i.e., ∫ x2 dA and ∫ y2 dA, respectively. The product of the area and square of… Continue reading SECOND MOMENT OF AREA

Consider a triangle ABC of base b and height h as shown in Figure 11.13. Let us locate the centroid of the triangle from its base. Let b1 be the width of an elemental strip of thickness dy at a distance y from the base. Since ΔAEF and ΔABC are similar triangles, therefore, Figure 11.13 Centroid of a Triangle Thus, the centroid of a triangle is at a distance h/3 from the base… Continue reading Centroid of a Triangle

Considering a parabolic section of height h and base b as shown in Figure 11.12. Now to find the centroid of this section consider a small element of width dx at a distance of x from the origin O. Figure 11.12 Centroid of a Parabolic Section

Consider a sector of a circular disc of angle 2α as shown in Figure 11.11. Due to symmetry, centroid ‘G’ lies on x-axis. To find its distance from the centre O, consider an elemental area as shown in Figure 11.11. Figure 11.11 Centroid of a Sector of a Circular Disc Now,

Considering a semicircle of radius R as shown in Figure 11.10. Due to symmetry centroid must lie on y-axis. Let its distance from the x-axis be . To find , consider an element at a distance r from the centre O of the semicircle, radial width dr, and bound by radii at θ and θ + dθ. Figure 11.10 Centroid of Circular Section of a Disc Area of the element = rdθ dr. Its… Continue reading Centroid of Semicircular-Section of a Disc

Centroid of an arc of a circle, as shown in Figure 11.9, has length L = R·2α. Let us consider an element of the arc of length dL = Rdθ. Figure 11.9 Centroid of Circular Arc

The T-section, shown in Figure 11.8, can be divided into two parts: lower and upper parts of area A1 and middle part of area A2. The lengths and widths of all the parts of L-section are shown in Figure 11.8. Let the X and Y coordinates pass through origin O. Figure 11.8 C-section The coordinates for centroid can be calculated using the following formula:

The T-section, shown in Figure 11.7, can be divided into two parts: lower part of area A1 and upper part of area A2. The lengths and widths of all the parts of L-section are shown in Figure 11.7. Let the X and Y coordinates pass through origin O. Figure 11.7 T-section The coordinates for centroid can be calculated using the following formula: