Power (physics)

Power
Common symbols
P
SI unitwatt (W)
In SI base unitskgm2s−3
Derivations from
other quantities
Dimension${\mathsf }^{\mathsf }^{-3}$ In physics, power is the rate of doing work or of transferring heat, i.e. the amount of energy transferred or converted per unit time. Having no direction, it is a scalar quantity. In the International System of Units, the unit of power is the joule per second (J/s), known as the watt (W) in honour of James Watt, the eighteenth-century developer of the condenser steam engine. Another common and traditional measure is horsepower (comparing to the power of a horse); 1 horsepower equals about 745.7 watts. Being the rate of work, the equation for power can be written as:

${\text}={\frac {\text}{\text}}$ As a physical concept, power requires both a change in the physical system and a specified time in which the change occurs. This is distinct from the concept of work, which is measured only in terms of a net change in the state of the physical system. The same amount of work is done when carrying a load up a flight of stairs whether the person carrying it walks or runs, but more power is needed for running because the work is done in a shorter amount of time.

The output power of an electric motor is the product of the torque that the motor generates and the angular velocity of its output shaft. The power involved in moving a ground vehicle is the product of the traction force on the wheels and the velocity of the vehicle. The power of a jet-propelled vehicle is the product of the engine thrust and the velocity of the vehicle. The rate at which a light bulb converts electrical energy into light and heat is measured in watts—the higher the wattage, the more power, or equivalently the more electrical energy is used per unit time.

Units

The dimension of power is energy divided by time. The SI unit of power is the watt (W), which is equal to one joule per second. Other units of power include ergs per second (erg/s), horsepower (hp), metric horsepower (Pferdestärke (PS) or cheval vapeur (CV)), and foot-pounds per minute. One horsepower is equivalent to 33,000 foot-pounds per minute, or the power required to lift 550 pounds by one foot in one second, and is equivalent to about 746 watts. Other units include dBm, a logarithmic measure relative to a reference of 1 milliwatt; food calories per hour (often referred to as kilocalories per hour); BTU per hour (BTU/h); and tons of refrigeration (12,000 BTU/h).

Equations for power

Power, as a function of time, is the rate (i.e. derivative) at which work is done, so can be expressed by this equation:

$P={\frac }$ where P is power, W is work, and t is time. Because work is a force F applied over a distance x,

$W=\mathbf \cdot \mathbf$ for a constant force, power can be rewritten as:

$P={\frac }={\frac }\left(\mathbf \cdot \mathbf \right)=\mathbf \cdot {\frac }}=\mathbf \cdot \mathbf$ In fact, this is valid for any force, as a consequence of applying the fundamental theorem of calculus.

Average power

As a simple example, burning one kilogram of coal releases much more energy than does detonating a kilogram of TNT, but because the TNT reaction releases energy much more quickly, it delivers far more power than the coal. If ΔW is the amount of work performed during a period of time of duration Δt, the average power Pavg over that period is given by the formula

$P_{\mathrm }={\frac {\Delta W}{\Delta t}}\,.$ It is the average amount of work done or energy converted per unit of time. The average power is often simply called "power" when the context makes it clear.

The instantaneous power is then the limiting value of the average power as the time interval Δt approaches zero.

$P=\lim _{\Delta t\rightarrow 0}P_{\mathrm }=\lim _{\Delta t\rightarrow 0}{\frac {\Delta W}{\Delta t}}={\frac {\mathrm W}{\mathrm t}}\,.$ In the case of constant power P, the amount of work performed during a period of duration t is given by:

$W=Pt\,.$ In the context of energy conversion, it is more customary to use the symbol E rather than W.

Mechanical power

Power in mechanical systems is the combination of forces and movement. In particular, power is the product of a force on an object and the object's velocity, or the product of a torque on a shaft and the shaft's angular velocity.

Mechanical power is also described as the time derivative of work. In mechanics, the work done by a force F on an object that travels along a curve C is given by the line integral:

$W_=\int _\mathbf \cdot \mathbf \,\mathrm t=\int _\mathbf \cdot \mathrm \mathbf ,$ where x defines the path C and v is the velocity along this path.

If the force F is derivable from a potential (conservative), then applying the gradient theorem (and remembering that force is the negative of the gradient of the potential energy) yields:

$W_=U(B)-U(A),$ where A and B are the beginning and end of the path along which the work was done.

The power at any point along the curve C is the time derivative

$P(t)={\frac {\mathrm W}{\mathrm t}}=\mathbf \cdot \mathbf =-{\frac {\mathrm U}{\mathrm t}}.$ In one dimension, this can be simplified to:

$P(t)=F\cdot v.$ In rotational systems, power is the product of the torque τ and angular velocity ω,

$P(t)={\boldsymbol {\tau }}\cdot {\boldsymbol {\omega }},\,$ where ω measured in radians per second. The $\cdot$ represents scalar product.

In fluid power systems such as hydraulic actuators, power is given by

$P(t)=pQ,\!$ where p is pressure in pascals, or N/m2 and Q is volumetric flow rate in m3/s in SI units.

If a mechanical system has no losses, then the input power must equal the output power. This provides a simple formula for the mechanical advantage of the system.

Let the input power to a device be a force FA acting on a point that moves with velocity vA and the output power be a force FB acts on a point that moves with velocity vB. If there are no losses in the system, then

$P=F_v_=F_v_,\!$ and the mechanical advantage of the system (output force per input force) is given by

$\mathrm ={\frac }}}={\frac }}}.$ The similar relationship is obtained for rotating systems, where TA and ωA are the torque and angular velocity of the input and TB and ωB are the torque and angular velocity of the output. If there are no losses in the system, then

$P=T_\omega _=T_\omega _,\!$ which yields the mechanical advantage

$\mathrm ={\frac }}}={\frac {\omega _}{\omega _}}.$ These relations are important because they define the maximum performance of a device in terms of velocity ratios determined by its physical dimensions. See for example gear ratios.

Electrical power

The instantaneous electrical power P delivered to a component is given by

$P(t)=I(t)\cdot V(t)\,$ where

P(t) is the instantaneous power, measured in watts (joules per second)
V(t) is the potential difference (or voltage drop) across the component, measured in volts
I(t) is the current through it, measured in amperes

If the component is a resistor with time-invariant voltage to current ratio, then:

$P=I\cdot V=I^\cdot R={\frac }}\,$ where

$R={\frac }\,$ is the resistance, measured in ohms.

Peak power and duty cycle In a train of identical pulses, the instantaneous power is a periodic function of time. The ratio of the pulse duration to the period is equal to the ratio of the average power to the peak power. It is also called the duty cycle (see text for definitions).

In the case of a periodic signal $s(t)$ of period $T$ , like a train of identical pulses, the instantaneous power $p(t)=|s(t)|^$ is also a periodic function of period $T$ . The peak power is simply defined by:

$P_=\max[p(t)]$ .

The peak power is not always readily measurable, however, and the measurement of the average power $P_{\mathrm }$ is more commonly performed by an instrument. If one defines the energy per pulse as:

$\epsilon _{\mathrm }=\int _^p(t)\mathrm t\,$ then the average power is:

$P_{\mathrm }={\frac }\int _^p(t)\mathrm t={\frac {\epsilon _{\mathrm }}}\,$ .

One may define the pulse length $\tau$ such that $P_\tau =\epsilon _{\mathrm }$ so that the ratios

${\frac }}}}={\frac {\tau }}\,$ are equal. These ratios are called the duty cycle of the pulse train.

Power is related to intensity at a radius $r$ ; the power emitted by a source can be written as:[citation needed]
$P(r)=I(4\pi r^)$ 