Calculate the rotational inertia of a meter stick, with mass 0.567 kg, about an axis perpendicular...
Calculate the rotational inertia of a meter stick, with mass 0.342 kg, about an axis perpendicular to the stick and located at the 22.7 cm mark. (Treat the stick as a thin rod.)
Calculate the rotational inertia of a meter stick, with mass 0.391 kg, about an axis perpendicular to the stick and located at the 43.4 cm mark. (Treat the stick as a thin rod.)
Calculate the rotational inertia of a meter stick, with mass 0.74 kg, about an axis perpendicular to the stick and located at the 34 cm mark. (Treat the stick as a thin rod.) kg·m2
A uniform meter stick, mass is 0.2 kg, is able to rotate about an axis of rotation that passes through the 25 cm mark of the stick. The axis of rotation is parallel to the ground and perpendicular to the stick. There are also two small masses, each 0.5 kg, attached to the meter stick at the 0 cm mark and the 100 cm mark. 0 25 50 75 100 cm The stick is released from rest in the horizontal...
A particle of mass 0.500 kg is attached to the 100-cm mark of a meter stick of mass 0.200 kg. The meter stick rotates on a frictionless, horizontal table with an angular speed of 2.00 rad/s. (a) Calculate the angular momentum of the system when the stick is pivoted about an axis perpendicular to the table through the 50.0-cm mark. (b) Calculate the angular momentum of the system when the stick is pivoted about an axis perpendicular to the table...
A thin uniform rod (mass= 4.0 kg, length= 120.cm) rotates about an axis that is perpendicular to the rod; the axis intersects the rod at 1/3 of the rod's length. The rod rotates about the axis at the rate of 8 full revolutions per second. a. Compute the rotational Inertia of the rod based on the given axis of rotation. b. Compute the magnitude of the angular velocity in radians per second c. Compute the tangential speed of the end...
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
A uniform wooden meter stick has a mass of m = 799 g. A clamp can be attached to the measuring stick at any point Palong the stick so that the stuck can rotate freely about point P, which is at a distance d from the zero-end of the stick as shown. Part (a) Calculate the moment of inertia in kg-m of the meter stick if the pivot point P is at the 50-cm mark. Part (b) Calculate the moment of inertia...
A mass of 1 kg is located at the O-cm end of the meter stick. If the meter stick is suspended at center, what mass must be placed at the 75-cm mark to balance the stick?
A) Find the moment of inertia of a 2 meter long stick with a mass of 14 kg, if it is spun about the center of the stick B) Find the rotational kinetic energy of a spinning (not rolling) bowling ball that has a mass of 7 kg and a radius of 0.10 m moving at 7 m/s. HINT: v = rω C) An ice skater with a moment of inertia of 10 kg m2 spinning at 19 rad/s extends...