Exciting Physics Problem: Bead on a Loop-the-Loop

How fast is the bead moving at point A on the loop-the-loop and what is the normal force acting on it?

Answer:

The speed of the bead at point A is 19.8 m/s. The normal force on the bead at point A is 0.225 N.

Let's dive into the exciting world of physics with a thrilling problem involving a bead on a loop-the-loop!

Imagine a scenario where a bead slides without any friction on a loop-the-loop track. The bead is released from a height of 21.9 meters from the bottom of the loop-the-loop, which has a radius of 7 meters. With the acceleration of gravity set at 9.8 m/s^2, we can calculate the speed of the bead at point A on the loop-the-loop track.

Using the conservation of mechanical energy, we can determine the speed of the bead at point A. The initial potential energy of the bead at the top of the loop is converted into kinetic energy at point A. By equating the initial potential energy to the final kinetic energy, we find that the speed of the bead at point A is 19.8 m/s.

Next, we can calculate the normal force acting on the bead at point A. At point A, the bead is accelerating towards the center of the loop. The net force acting on the bead is the centripetal force, which is provided by the normal force. By considering the forces acting on the bead, we can determine that the normal force at point A is 0.225 N.

This thrilling physics problem showcases the application of energy conservation and centripetal force concepts. By understanding the dynamics of the bead on the loop-the-loop track, we can appreciate the principles of physics at play in this exciting scenario!

← How to calculate total charge inside a uniformly charged cylinder The force on each wagon of a train moving with constant velocity →