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# 6.3: Work Done by a Variable Force

## Work Done by a Variable Force

Integration is used to calculate the work done by a variable force.

learning objectives

• Describe approaches used to calculate work done by a variable force

## Using Integration to Calculate the Work Done by Variable Forces

A force is said to do work when it acts on a body so that there is a displacement of the point of application in the direction of the force. Thus, a force does work when it results in movement.

The work done by a constant force of magnitude F on a point that moves a displacement $$\mathrm{Δx}$$ in the direction of the force is simply the product

$\mathrm{W=F⋅Δx}$

In the case of a variable force, integration is necessary to calculate the work done. For example, let’s consider work done by a spring. According to the Hooke’s law the restoring force (or spring force) of a perfectly elastic spring is proportional to its extension (or compression), but opposite to the direction of extension (or compression). So the spring force acting upon an object attached to a horizontal spring is given by:

$\mathrm{Fs=−kx}$

that is proportional to its displacement (extension or compression) in the x direction from the spring’s equilibrium position, but its direction is opposite to the x direction. For a variable force, one must add all the infinitesimally small contributions to the work done during infinitesimally small time intervals dt (or equivalently, in infinitely small length intervals dx=vxdt). In other words, an integral must be evaluated:

$\mathrm{W_s=\int_0^tFs⋅vdt=\int_0^t−kxv_xdt=\int_{x_o}^x−kxdx=−\dfrac{1}{2}kΔx^2}$

This is the work done by a spring exerting a variable force on a mass moving from position xo to x (from time 0 to time t). The work done is positive if the applied force is in the same direction as the direction of motion; so the work done by the object on spring from time 0 to time t, is:

$\mathrm{W_a=\int_0^tFa⋅vdt=\int_0^t−F_s⋅vdt=\dfrac{1}{2}kΔx^2}$

in this relation $$\mathrm{F_a}$$ is the force acted upon spring by the object. $$\mathrm{F_a}$$ and $$\mathrm{F_s}$$ are in fact action- reaction pairs; and $$\mathrm{W_a}$$ is equal to the elastic potential energy stored in spring.

### Using Integration to Calculate the Work Done by Constant Forces

The same integration approach can be also applied to the work done by a constant force. This suggests that integrating the product of force and distance is the general way of determining the work done by a force on a moving body.

Consider the situation of a gas sealed in a piston, the study of which is important in Thermodynamics. In this case, the Pressure (Pressure =Force/Area) is constant and can be taken out of the integral:

$\mathrm{W=\int_a^bPdV=P \int_a^bdV=PΔV}$

Another example is the work done by gravity (a constant force) on a free-falling object (we assign the y-axis to vertical motion, in this case):

$\mathrm{W=\int_{t_1}^{t_2} F⋅vdt=\int_{t_1}^{t_2} mgv_ydt=mg \int_{y_1}^{y_2} dy=mgΔy}$

Notice that the result is the same as we would have obtained by simply evaluating the product of force and distance.

### Units Used for Work

The SI unit of work is the joule (J), which is defined as the work done by a force of one newton moving an object through a distance of one meter.

Non-SI units of work include the erg, the foot-pound, the foot-pound, the kilowatt hour, the liter-atmosphere, and the horsepower-hour.

## Key Points

• The work done by a constant force of magnitude F on a point that moves a displacement d in the direction of the force is the product: $$\mathrm{W = Fd}$$.
• Integration approach can be used both to calculate work done by a variable force and work done by a constant force.
• The SI unit of work is the joule; non- SI units of work include the erg, the foot-pound, the foot-poundal, the kilowatt hour, the litre-atmosphere, and the horsepower-hour.

## Key Terms

• work: A measure of energy expended in moving an object; most commonly, force times displacement. No work is done if the object does not move.
• force: A physical quantity that denotes ability to push, pull, twist or accelerate a body, which is measured in a unit dimensioned in mass × distance/time² (ML/T²): SI: newton (N); CGS: dyne (dyn)