Work, Power, and Energy

Work, Power and Energy is a very important concept in physics. Work done by all the forces is equal to the change in kinetic energy.

Work
In physics, work is related to the amount of energy transferred in or from a system by a force. It is a scalar-valued quantity with SI units of Joule.

Work can be represented in a number of ways. For the case where a body is moving in a steady direction, the work done by a constant force $$F$$ acting parallel to the displacement $$\Delta x$$ is defined as
 * the dot product of force and displacement is known as work.
 * $$W_F = F ~ \cdot\Delta x \,\!.$$

When the force is not acting parallel to the body's direction of movement, the work done is defined as a dot product of the force and the displacement,


 * $$W_F = \vec{F} \cdot \Delta\vec{x} = ||\vec{F}|| \cdot ||\Delta\vec{x}|| \cdot \cos\phi \,\!.$$

A few other ways of finding work can be either with the change of $$K$$ for kinetic energy or the change of $$P$$ for potential energy which can be resembled as:


 * $$W = \Delta{K}$$


 * $$W = \Delta{P}$$

In order to define the work done when the force acting upon the body is not constant, we must use differentials to show the infinitesimal work done by the force over an infinitesimal displacement.(Comment: should x be used below rather than s ?)


 * $$\mathrm{d}W_F = \vec{F} \cdot \mathrm{d}\vec{s} \,\!$$

Example
A wagon displaces by a distance of 2 m while under the influence of an 80 N force directed parallel to the motion. How much work is performed by the force exerted on the wagon?

$$W_F = F \Delta x = 80~{\rm N} \cdot 2~{\rm m} = 160~{\rm N \cdot m} = 160~{\rm Joules} \,\!.$$

Example
Suppose the same displacement of 2 m for the wagon while under the influence of an 80 N force 60o to the axis of the motion. How much work is performed by the force exerted on the wagon in this case?

$$W_F = F \Delta x \cos(60^{\circ}) = 80~{\rm N} \cdot 2~{\rm m} \cdot 0.5 = 80~{\rm N \cdot m} = 80~{\rm Joules} \,\!.$$ and dimensions of work is equal to the energy

Power
Power is defined to be the rate at which work is performed, or the derivative of work over time. The SI unit for power is the watt. OR: Rate of doing work with respect to time is called power


 * $$ P=\frac{\mathrm{d}E}{\mathrm{d}t}=\frac{\mathrm{d}W}{\mathrm{d}t} $$

Average power is the average amount of work done per unit of time. Thus instantaneous power is the limiting power of the average power as Δt approaches zero.


 * $$ P=\lim_{\Delta t\rightarrow 0} \frac{\Delta W}{\Delta t} = \lim_{\Delta t\rightarrow 0} P_\mathrm{avg} $$

When the work is done steadily (constant power), just use P = W/t. That is, the power is the work done divided by the time taken to do it.

Example: A garage hoist steadily lifts a car up 2 meters in 15 seconds. Calculate the power delivered to the car. Use 1000 kg for the mass of the car.

First we need the work done, which requires the force necessary to lift the car against gravity:

F = mg = 1000 x 9.81 = 9810 N.

W = Fd = 9810N x 2m = 19620 Nm = 19620 J.

The power is P = W/t = 19620J / 15s = 1308 J/s = 1308 W. P=f.v

Energy
'''Energy is stored work. It has the same units as work, the Joule (J).'''

There are many forms of energy:

Spring energy: Work has been done on a spring to compress or stretch it; the spring has the ability to push or pull on another object and do work on it. The force required to stretch a spring is proportional to the distance it is stretched: F = kx where x is the stretch distance and k is a constant characteristic of the spring (big heavy springs have larger k values). The work done in stretching a spring from 0 to x is the integral of dW = Fdx. Since the force function is linear, we can just take the average force of kx/2 and avoid using calculus: W = average F x distance = (kx/2)(x) = ½kx²

Assuming 100% efficiency, the energy stored in a stretched spring is the same as the work done in stretching it, so Spring E = ½kx²

Example: How much energy is stored in a spring with k = 2000 N/m that has been stretched 1 cm away from its equilibrium length?

E = ½kx² = ½(2000)(0.01)² = 0.1 J

Gravitational potential energy: a mass has been lifted to a height; when released it will be pulled down by gravity and can do work on another object as it falls.

Example: Find the energy stored in a tonne of water at the top of a 20 m high hydroelectric dam.

The long way is to use F = mg and then W = Fd to find the work needed to lift the water up.

The short way is to combine the formulas, replacing F with mg and using h (height) in place of d:

Gravitational energy = W = Fd = mgh

Egravity = mgh = (1000 kg)(9.81 m/s²)(20 m) = 196200 kg m²/s² = 1.96 x 105 J

Kinetic energy: A mass is moving and can do work when it hits another object. Ekinetic = ½mΔV2 = ½m(Vf2-Vi2)

Example: A 8kg ball is moving at 5m/s. EK = ½(8 kg)(5 m/s)2 = 100 J.

Electrical energy: Electrons can flow out of a battery or capacitor and do work on another electrical component such as a light bulb.

Photon energy: Although massless, a photon does have energy; in the amount hf where f is the photon's frequency and h is Planck's constant. This is the energy that warms your face in the morning sun and burns your unguarded nose at the beach.

Example: Red, at 400Thz has energy

Ered = hf = ($6.626$ J⋅s)($400$ hz) = 2.5e-19 J

Not much from each photon, but photons come from the sun in vast numbers; one estimate is 1017 photons per second per square centimeter.

Chemical energy: When some kinds of molecules are combined with others, energy can be released, usually as heat, light, or motion. When coal is burned it releases photon energy stored by plants millions of years before. When hydrogen combines with oxygen to form water, heat is released as well. A fire is oxygen combining with other substances; this also produces heat. Mixing mentos and coke produces foam whose mechanical properties can be exploited as in a MythBuster's Christmas machine.

Example: One stick of dynamite produces about a Megajoule.

Nuclear energy: When an atom fissions it releases various particles and a little bit of heat. This energy was stored when the atom was created in the depths of a nova, an exploding star. Although the heat from each fission is miniscule, when the released particles trigger a cascade of fissioning atoms, the total energy can be enormous; as evidenced by the destruction wrought by an atomic weapon.

Example: The heat from splitting one Uranium atom is 6.9e-13 J.