An Exciting Physics Problem: Angular Speed and Conservation of Angular Momentum

What is the new angular speed of the student when he moves closer to the axis of rotation?

The new angular speed of the student, when he moves closer to the axis of rotation in a system where the angular momentum is conserved, is 0.375 rad/s.

What principle governs the conservation of angular momentum in this scenario?

The subject of this question deals with angular speed and the conservation of angular momentum. The angular momentum of the student and the stool is conserved, assuming no external torques.

Answer:

The new angular speed of the student is 0.375 rad/s after he moves closer to the axis of rotation.

Angular speed and the conservation of angular momentum are fascinating concepts in physics. In this scenario, the student's angular speed changes as he alters his distance from the axis of rotation. When the student moves closer to the axis, the moment of inertia of the system changes, resulting in a new angular speed.

To determine the new angular speed, we need to consider the initial moment of inertia (I1) and angular speed (ω1) of the system. When the student moves closer to the axis, the moment of inertia doubles, leading to a new moment of inertia (I2 = 2I1). Utilizing the principle of conservation of angular momentum, we can calculate the new angular speed.

By applying the equation I1ω1 = I2ω2, where I1 = 3 kgm^2 and ω1 = 0.75 rad/s, we find that the new angular speed (ω2) is 0.375 rad/s. This demonstrates the relationship between angular speed, moment of inertia, and the conservation of angular momentum in dynamic systems.

Understanding such concepts not only enhances our knowledge of physics but also highlights the intricate mechanics behind rotational motion. By exploring topics like angular speed and angular momentum, we delve into the fundamental principles that govern the behavior of objects in motion.

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