At which position is the potential energy the greatest
6m
4m
2m
0m
The potential energy is the greatest at a height of 6m.
The potential energy of an object depends on its position relative to a reference point. In this case, we need to determine at which position the potential energy is the greatest out of the given options.
The potential energy of an object at a certain height is given by the equation: PE = mgh, where PE is the potential energy, m is the mass of the object, g is the acceleration due to gravity, and h is the height.
Since the mass and acceleration due to gravity are constant, the potential energy depends solely on the height of the object. The higher the object is, the greater its potential energy.
In the given options, the highest position is 6m, so the potential energy is the greatest at 6m.
To determine at which position the potential energy is the greatest, we need to consider the concept of potential energy in relation to height or elevation.
The potential energy of an object is given by the formula: Potential energy = mass * gravitational acceleration * height.
In this case, we are assuming that the mass and gravitational acceleration of the object are constant. Therefore, the potential energy is directly proportional to the height.
So, the position with the greatest potential energy will be the one with the highest height.
Based on the given positions: 6m, 4m, 2m, and 0m, we can determine that the potential energy is greatest at the position with the greatest height.
Therefore, the position with the greatest potential energy is at 6m.