A bead of mass m slides on a frictionless wire under the influence of gravity. The wire has a parabolic shape and rotates with a constant angular velocity w. Set up Hamilton's equations of motion.
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- A bicycle wheel of mass M (all at the edges) and radius r is fixed about an axis through its center and is initially at rest. You wrap the wheel with a cord and attach a hanging weight of mass m to the cord. You release the weight and allow it to fall a distance d. The weight falls smoothly, and the cord does not slip over the wheel as it unwinds. a. (Write an expression for the angular acceleration α of the wheel in terms of the tension T of the cord.b. Write an expression for the linear acceleration a of the weight in terms of the tension T of the cord.c. (Using parts (a) and (b) find the linear acceleration in terms of M, m, and g.d. Write an expression for the linear speed v of the weight after it falls a distance d.e. For M = 7.5 kg, r = 33 cm, m = 250 g, and d = 1.5 m, what is the rotational kinetic energy of the wheel afterthe weight has fallen?Consider the system shown below where four point masses are connected to each other by massless rods. Two of the masses are m = 3 kg and the other two have the masses of M = 2 kg. If a = 1.4 m, b = 1.3 m and the system rotates about x-axis, determine the moment of inertia of the system. Express your answer in units of kg. m² using one decimal place. Answer: M a m m b b a M-xCase 1: A DJ starts up her phonograph player. The turntable accelerates uniformly from rest, and takes t1 = 11.6 seconds to get up to its full speed of f1 = 78 revolutions per minute.Case 2: The DJ then changes the speed of the turntable from f1 = 78 to f2 = 120 revolutions per minute. She notices that the turntable rotates exactly n2= 13 times while accelerating uniformly. a. Calculate the angular speed described in Case 1, given as f1 = 78 revolutions per minute, in units of radians/second. b. How many revolutions does the turntable make while accelerating in Case 1? c. Calculate the magnitude of the angular acceleration of the turntable in Case 1, in radians/s^2. d. Calculate the magnitude of the angular acceleration of the turntable (in radians/s^2) while increasing to 120 RPM (Case 2). e. How long (in seconds) does it take for the turntable to go from f1 = 78 to f2 = 120 RPM?
- 10. A particle of mass m moves along a straight line with con- QIC stant velocity v, in the x direction, a distance b from the x s axis (Fig. P13.10). (a) Does the particle possess any angular momentum about the origin? (b) Explain why the amount of its angular momentum should change or should stay constant. (c) Show that Kepler's second law is satisfied by showing that the two shaded triangles in the figure have the same area when te - le = ta - la (B) Figure P13.10A thin hoop of radius 2.00 cm and mass 0.0300 kg rolls down a frictionless ramp of length 4.00 m that makes an angle of 10.0° with the horizontal. The hoop starts from rest from the top of the ramp.a. Find the angular speed of the hoop at the bottom of the ramp.b. After the hoop rolls off the ramp, it is traveling along a horizontal surface with friction that causes a frictional torque of magnitude 0.400 N·m on the hoop. How much time will it take for the hoop to come to rest?Asap
- n A golfers clubs' linear tangential velocity at contact with the ball on the tee was recorded as 42.4 m/s. Given the distance from the club head to the golfers centre of rotation as 1.58 m calculate the angular velocity (radians/s) of rotation at the point of contact to 2 decimal places. s page Answer: e here to search 18 W 8 N g P Finish attempt... ASXXCTD +1.33%A uniform thin rod of mass m = 3.2 kg and length L = 1.5 m can rotate about an axle through its center. Four forces are acting on it as shown in the figure. Their magnitudes are F1 = 6.5 N, F2 = 2.5 N, F3 = 15 N and F4 = 15 N. F2 acts a distance d = 0.14 m from the center of mass. a. Calculate the magnitude τ4 of the torque due to force F4 in newton meters. b. Calculate the angular acceleration α of the thin rod about its center of mass in radians per square second. Let the counter-clockwise direction be positive.can you do (c) and (d)?
- Consider a spacecraft in an elliptical orbit around the earth. At the low point, or perigee, of its orbit, it is 300 km above the earth's surface; at the high point, or apogee, it is 5000 km above the earth's surface. What is the period of the spacecraft's orbit? Express your answer in seconds. ? T = S Submit Request Answer Part B Using conservation of angular momentum, find the ratio of the spacecraft's speed at perigee to its speed at apogee. VO AE Vperigee Vapogee Submit Request Answer Part C Using conservation of energy, find the speed at perigee and the speed at apogee. Enter your answers in meters per second separated by a comma.While sunbathing on the balcony of your 3rd floor apartment, you notice a gorilla drop a m = 38.2 kg crate from rest from the roof of the 5-story building across the street. Since you just completed a course on surveying, you know that the two identical buildings are d = 29 m apart, and have floors that are h = 5.1 m tall. The first floor is at ground level, as shown.a. Determine the magnitude of the angular momentum of the crate, in kilogram meters squared per second, as observed by you as it passes the floor of the 4th floor balcony of the other building. Lb =b. Determine the magnitude of the angular momentum of the crate, in kilogram meters squared per second, as observed by you as it passes the floor of the 3rd floor balcony of the other building, directly across from you. Lc =c. Determine the magnitude of the angular momentum of the crate, in kilogram meters squared per second, as observed by you as it passes the floor of the 2nd floor balcony of the other building. Ld =d.…= For a particle on a sphere having l 3, work out the magnitude of the angular momentum (L) and of its possible projections (L₂ = 1₂) onto the z-axis in units of ħ. Give the angle from the z-axis for the possible values of the projections and sketch a diagram. Comment on our knowledge of the possible projections of the angular momentum onto the x- or y-axis.