A 50 kg ice skater spins about a vertical axis through her body with her arms horizontally outstretched, making 2.5 turns each second. The distance from one hand to the other is 1.50 m. Biometric measurements indicate that each hand typically makes up about 1.25 % of body weight.
What horizontal force must her wrist exert on her hand? Express the force in part (a) as a multiple of the weight of her hand.
A 50 kg ice skater spins about a vertical axis through her body with her arms...
1. An ice skater spins on the ice with her arms positioned tight against her body. In this position, she has a moment of inertia of 1.3 kg m2 and an angular speed of 15 rad/s. If the ice skater then stretches out her arms, and her angular speed slows to 6.0 rad/s, what is her moment of inertia with her arms outstretched? 3.64 kg m2 4.91 kg m2 3.25 kg.m2 4.39 kg m2 6.11 kg m2 А В С...
The 160 lb ice skater with arms extended horizontally spins about a vertical axis with a rotational speed of 1 rev/sec. Estimate his rotational speed if he fully retracts his arms, bringing his hands very close to the centerline of his body. As a reasonable approximation, model the extended arms as uniform slender rods, each of which is 27 in. long and weighs 13 lb. Model the torso as a solid 134-lb cylinder 13 in. in diameter. Treat the man...
An ice skater spins, with her arms and one leg outstretched, and achieves an angular velocity of 2 rad/s. when she pulls in her arms, her moment of inertia decreases to 65% its original value. what is her new angular velocity?
1. An ice skater is spinning about a vertical axis with her arms fully extended. If her arms are pulled in closer to her body, in which of the following ways are the angular momentum and kinetic energy of the skater affected? Angular Momentum- Kinetic Energy A) Increases-Increases B) Increases-Remains constant C) Remains constant- Increases D) Remains constant-Remains constant
A skater is spinning about a fixed symmetrical vertical axis. When she lifts her arms above her head, her moment of inertia about this axis of rotation drops from 12.0 kg m2 to 8.00 kg m2. What is the ratio of her final rotational energy and her initial rotational energy?
A dancer is spinning at 72 rpm about an axis through her center with her arms outstretched, as shown in the following figure. From biomedical measurements, the typical distribution of mass in a human body is as follows: Head: 7.0% Arms: 13%(for both) Trunk and legs: 80.0% Suppose the mass of the dancer is 56.0 kg , the diameter of her head is 16 cm, the width of her body is 24 cm, and the length of her arms is...
A skater extends her arms horizontally, holding a 5-kg mass in each hand. She is rotating about a vertical axis with an angular velocity of one revolution per second. If she drops her hands to her sides, what will the final angular velocity (in rev/s) be if her moment of inertia remains approximately constant at 5 kgxm2, and the distance of the masses from the axis changes from 1 m to 0.1 m? O 3 04 07 06
A uniform rod rotates in a horizontal plane about a vertical axis through one end. The rod is 12.00 m long, weighs 20.00 N, and rotates at 350 rev/min clockwise when seen from above. Calculate its rotational inertia about the axis of rotation. Tries 0/5 Calculate the angular momentum of the rod about that axis. A man stands at the center of a platform that rotates without friction with an angular speed of 1.2 rev/s. His arms are outstretched, and...
please do as many as you can please thanks alot VU22475 Apply Scientific Principles to Engineering Problems Calculate the maximum deceleration of a car that is heading down a 8 slope (one that makes an angle of 8 with the horizontal). You may assume that the weight of the car is evenly distributed on all four tires and that the coefficient of static friction is involved - that is, the tires are not allowed to slip during the deceleration. The...
A115/A140: Study Packet for The Story of the Human Body.Part .by Daniel Leiberman Sp 19 of the Human Body, Ch. 1-Introduction: What are Humans Adapted For? READ Introduction and, as a study project, trace the evolutionary history and adaptive significance of each of the following foundational adaptations, adaptive patterns that we modern humans have inherited from our n Hearing System (focus on the evolution of the mammalian hearing system Human Vision System (stereoscopic, trichromatic color vision) The Modern Human Brain...