![Win Olympic Gold with SimMechanics: Modeling Figure Skating and Angular Momentum » Guy on Simulink - MATLAB & Simulink Win Olympic Gold with SimMechanics: Modeling Figure Skating and Angular Momentum » Guy on Simulink - MATLAB & Simulink](https://blogs.mathworks.com/images/seth/2014Q1/Figure_11_05_03a.jpg)
Win Olympic Gold with SimMechanics: Modeling Figure Skating and Angular Momentum » Guy on Simulink - MATLAB & Simulink
![Why ice skaters tuck their arms in - an intuitive explanation of angular momentum #veritasiumcontest - YouTube Why ice skaters tuck their arms in - an intuitive explanation of angular momentum #veritasiumcontest - YouTube](https://i.ytimg.com/vi/XWjxYdhmMQ4/maxresdefault.jpg)
Why ice skaters tuck their arms in - an intuitive explanation of angular momentum #veritasiumcontest - YouTube
![SOLVED: 1) Moment of inertia of a figure skater. By examining the pictures below determine which position of the figure skater has more rotational inertia and which has more angular velocity. Explain SOLVED: 1) Moment of inertia of a figure skater. By examining the pictures below determine which position of the figure skater has more rotational inertia and which has more angular velocity. Explain](https://cdn.numerade.com/ask_images/5427c715f2974ac0a010e7a583902472.jpg)
SOLVED: 1) Moment of inertia of a figure skater. By examining the pictures below determine which position of the figure skater has more rotational inertia and which has more angular velocity. Explain
![SOLVED: An ice skater spins at 7.00 revs (revolutions) (counterclockwise) and has a moment of inertia of 0.650 kg*m^2. REV 21 rad (a) Calculate her angular momentum in kg*m^2/s. Keep decimal places. SOLVED: An ice skater spins at 7.00 revs (revolutions) (counterclockwise) and has a moment of inertia of 0.650 kg*m^2. REV 21 rad (a) Calculate her angular momentum in kg*m^2/s. Keep decimal places.](https://cdn.numerade.com/ask_images/4923796a0bce4c50a94767b63c5218f6.jpg)
SOLVED: An ice skater spins at 7.00 revs (revolutions) (counterclockwise) and has a moment of inertia of 0.650 kg*m^2. REV 21 rad (a) Calculate her angular momentum in kg*m^2/s. Keep decimal places.
![SOLVED: Suppose an ice skater, such as the one shown in the diagram, is spinning at 0.800 rev/s with her arms extended. She has a moment of inertia of 2.3 kg.m² with SOLVED: Suppose an ice skater, such as the one shown in the diagram, is spinning at 0.800 rev/s with her arms extended. She has a moment of inertia of 2.3 kg.m² with](https://cdn.numerade.com/ask_images/10293452e2bf417ba2bc765f441d07ce.jpg)
SOLVED: Suppose an ice skater, such as the one shown in the diagram, is spinning at 0.800 rev/s with her arms extended. She has a moment of inertia of 2.3 kg.m² with
![A skater with her arms stretched out is rotating about a vertical axis with an angular velocity, w= 6 rad/s. She pulls her arms towards the axis to decrease her rotational inertia A skater with her arms stretched out is rotating about a vertical axis with an angular velocity, w= 6 rad/s. She pulls her arms towards the axis to decrease her rotational inertia](https://homework.study.com/cimages/multimages/16/5515817_-_a8615868438936007332.png)