Determine the products of inertia about the coordinate axes for the thin plate of mass m = 5.8 kg which has the shape of a circular sector of radius a = 585 mm and angle β = 67° as shown.
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Determine the products of inertia about the coordinate axes for the thin plate of mass m...
Determine the mass moment of inertia of the thin plate about the axis perpendicular to the page and passing through point O assuming the material has a mass per unit area of 20 kg/m2.
2) The pendulum consists of 1 kg slender rod and 2 kg thin plate welded together. The rectangular thin plate is then replaced by a circular thin plate of same area (so the plate mass does not change, only its shape changes), as shown by the dotted line. Should the mass moment of inertia about an axis passing through point and perpendicular to the plane of the paper for the pendulum with the circular plate be greater than, less than...
10. (This topic is not covered on exam 3) moments about the axes and the center of mass. Mass, kg Location, m. (S,1) (-3.2) (1-1) a. A system of point masses (kg, meters) is distributed in the xy-plane as follows. Find the (1,0) (4,-2) b. Find the centroid of the triangular region with vertices (0,0), (3,0), and (5,0). c. Find the center of mass of a thin homogeneous plate forming a sector of a circle of radius r and angle...
A pendulum in the form of a thin square plate (1 mx 1 m) is released from rest at the position shown, with its center of mass at a 45° angle from vertical. The pendulum has a mass of m = 2 kg, and a Moment of Inertia about its center of gravity G of 16 mba, where b is the width of the plate. Find: (a) The moment of inertia about point A (using the parallel axis theorem). (b)...
Determine the mass moment of inertia IG in kg-m about the axis perpendicular to the screen and through the mass center G of the same pendulum as in the previous question (i.e., a thin rod AB of 2 kg and a thin disk of 2 kg). Assume x = 340 mm. 400 mm O G в с r= 80 mm
dynamics Problem 1. A pendulum in the form of a thin square plate (1 m x 1 m) is released from rest at the position shown, with its center of mass at a 45° angle from vertical. The pendulum has a mass of m = 2 kg, and a Moment of Inertia about its center of gravity G of 1g = m bể, where b is the width of the plate. Find: (a) The moment of inertia about point A...
Determine the moment of inertia of the half-ring of mass m about its diametral axis a-a and about axis b-b through the midpoint of the arc normal to the plane of the ring. The radius of the circular cross section is small compared with r. Use the values m = 7.0 kg and r = 300 mm. m Answers: laa kg.m2 Ibb = kg.m2
Statics problem Determine the mass moments of inertia and the radii of gyration of the steel machine element shown with respect to the x and y axes. The density of steel is 7850 kg/m3. 44 120 70 *120 70 44 40 20 20 Dimensions in mm The mass moment of inertia of the component with respect to x axis is The mass moment of inertia of the component with respect to y axis is The radius of gyration of the...
1. Finding the Moment of Inertia of a Uniform Thin Rod with mass M and length L rotating about its center (a thin rod is a ID object; in the figure the rod has a thickness for clarity): For this problem, use a coordinate axis with its origin at the rod's center and let the rod extend along the x axis as shown here (in other problems, you will need to generate the diagram): dx dm Now, we select a...
3. The uniform rod of length 4b = 0.8 m and mass m = 2 kg is bent into the shape shown. The diameter of the rod is small compared with its length. Determine the moments of inertia of the rod about the three coordinate axes. (For a slender rod of mass m and length L, I = ml?)