Originally posted by Thallium
Striking thought really. Maybe we have created the idea that there is an energy. - a contrived philosophy that we fail to understand because we said something we actually are not capable of understanding - we made it all up. (..?)
Energy is certainly an abstract concept. In the context of science, however, we understand what energy is simply because it has been arbitrarily defined. Any discussion outside of the scientific meaning of energy is philosophy.
Classically, energy is defined as the capacity to perform work. Work is the conversion of energy from one form to another. Work and energy are mathematically equivalent and are measured using the same units.
The most widely used example of work is the conversion of gravitational potential energy to kinetic energy. Consider an object of mass m suspended above the surface of the earth.
Gravitational potential energy is represented by the equation:
E_p = m a d
m is mass in Kg
a is acceleration in m/s^2. in this case a=g which is 9.81 m/s^2
d is the distance; the height above the surface of the Earth in m.
Usually you will see w in place of Ep, w symbolizing work, but if the mass in question is being suspended, no work is being done at this time so I will use Ep to represent the potential energy.
The moment that the object is dropped, the potential energy decreases as the kinetic energy increases. This is work. The conversion of Egp to Ek. Kinetic energy can be calculated using:
E_k = \frac{m v^2}{2}
Neglecting air resistance, the kinetic energy of the object when it hits the surface will equal the original potential energy of the mass when it was suspended above the surface. Of what use is this? Well, if we know what the Ek is supposed to be when the object hits the Earth, we can calculate the velocity that mass will have at that time:
V = \sqrt{\frac{ 2 E_k}{m}}
This is just the equation for Ek arranged to solve for V. We could have used a simpler formula to calculate the velocity. Knowing the acceleration of gravity, the mass of the object(Edit: mass is not relevant here. Don't know why i mentioned it. ), and the distance between the object and the surface:
v = \sqrt{2 g d}
This would have given the same result, but it useful to examine the energy. In this problem, we have neglected the air resistance. In reality, the kinetic energy would not equal the potential energy. The velocity of the object will be lower than our original calculation and, consequently, the Ek will be lower as well. If the conservation of energy holds true, this tells us that not all the potential energy was converted to kinetic energy. We obviously did not take everything into account and we should try to examine what was missed. In this case, some of the original energy was converted into heat due to friction (drag) as the object fell through the atmosphere.
Energy, in physics, is a useful book keeping tool which allows us to keep track of certain facts about a system and also show us when our data is incomplete.
What energy really is outside of this definition does not fall within the realm of science.
I was a bit hasty in my answer.
