Exciting Energy Calculations for a Falling Rock

What are the kinetic energy, gravitational potential energy, and total mechanical energy of a 2 kg rock released from a height of 29m when it reaches different heights along its fall?

When a 2 kg rock is released from rest at a height of 29m, ignoring air resistance, we can calculate the kinetic energy, gravitational potential energy, and total mechanical energy at various heights during its fall. Let's break it down:

Calculations:

Total Energy at Height 29m:

Total energy of rock = mgh

Substitute the values: 2 x 9.8 x 29 = 568.4 J

1. At 20m:

Potential energy = 2 x 20 x 9.8 = 392 J

Kinetic energy = 568.4 - 392 = 176.4 J

2. At 15m:

Potential energy = 2 x 15 x 9.8 = 294 J

Kinetic energy = 568.4 - 294 = 274.4 J

3. At 5m:

Potential energy = 2 x 5 x 9.8 = 98 J

Kinetic energy = 568.4 - 98 = 470.4 J

4. At 9m:

Potential energy = 2 x 9 x 9.8 = 176.4 J

Kinetic energy = 568.4 - 176.4 = 392 J

As the rock falls and loses its potential energy, this energy loss is converted into kinetic energy at each height. The calculation shows how the kinetic and potential energies change as the rock descends from its initial height of 29m.

It’s fascinating to see the transformation of energy forms during the rock's fall, showcasing the principles of conservation of energy. The calculations provide a numerical representation of the energy at play as the rock moves through different heights. This exercise highlights the interplay between potential and kinetic energies in the context of gravitational forces acting on the rock.

By understanding the distribution of energy at different points of the fall, we gain insights into the dynamics of a simple yet impactful physical phenomenon. The calculations offer a glimpse into the intricate relationship between potential and kinetic energy in a gravitational field, illustrating the fundamental concepts of energy transfer and transformation.

Through these energetic calculations, we unravel the secrets hidden within the fall of a rock, shedding light on the fundamental laws of physics governing the behavior of objects in motion under the influence of gravity.

← How to determine the rider s speed as the bike rolls down the hill Horizontal motion of a fired bullet →