The previous section defined the derivative of a function and gave examples of how to compute it using its definition (i.e., using limits). The section also started with a brief motivation for this definition, that is, finding the instantaneous velocity of a falling object given its position function. The next section will give us more accessible tools for computing the derivative, tools that are easier to use than repeated use of limits.
This section falls in between the “What is the definition of the derivative?” and “How do I compute the derivative?” sections. Here we are concerned with “What does the derivative mean?”, or perhaps, when read with the right emphasis, “What is the derivative?” We offer two interconnected interpretations of the derivative, hopefully explaining why we care about it and why it is worthy of study.
The previous section started with an example of using the position of an object (in this case, a falling amusement-park rider) to find the object’s velocity. This type of example is often used when introducing the derivative because we tend to readily recognize that velocity is the instantaneous rate of change of position. In general, if is a function of , then measures the instantaneous rate of change of with respect to . Put another way, the derivative answers “When changes, at what rate does change?” Thinking back to the amusement-park ride, we asked “When time changed, at what rate did the height change?” and found the answer to be “By feet per second.”
Now imagine driving a car and looking at the speedometer, which reads “60 mph.” Five minutes later, you wonder how far you have traveled. Certainly, lots of things could have happened in those 5 minutes; you could have intentionally sped up significantly, you might have come to a complete stop, you might have slowed to 20 mph as you passed through construction. But suppose that you know, as the driver, none of these things happened. You know you maintained a fairly consistent speed over those 5 minutes. What is a good approximation of the distance traveled?
One could argue the only good approximation, given the information provided, would be based on “distance = rate time.” In this case, we assume a constant rate of 60 mph with a time of hours. Hence we would approximate the distance traveled as 5 miles.
Referring back to the falling amusement-park ride, knowing that at the velocity was ft/s, we could reasonably assume that 1 second later the riders’ height would have dropped by about 64 feet. Knowing that the riders were accelerating as they fell would inform us that this is an under-approximation. If all we knew was that and , we’d know that we’d have to stop the riders quickly otherwise they would hit the ground!
It is useful to recognize the units of the derivative function. If is a function of , i.e., for some function , and is measured in feet and in seconds, then the units of are “feet per second,” commonly written as “ft/s.” In general, if is measured in units and is measured in units , then will be measured in units “ per ”, or “.” Here we see the fraction-like behavior of the derivative in the notation:
the units of are .
Let represent the world population minutes after 12:00 a.m., January 1, 2012. It is fairly accurate to say that (www.prb.org). It is also fairly accurate to state that ; that is, at midnight on January 1, 2012, the population of the world was growing by about 156 people per minute (note the units). Twenty days later (or, 28,800 minutes later) we could reasonably assume the population grew by about people.
The term widget is an economic term for a generic unit of manufacturing output. Suppose a company produces widgets and knows that the market supports a price of $10 per widget. Let give the profit, in dollars, earned by manufacturing and selling widgets. The company likely cannot make a (positive) profit making just one widget; the start-up costs will likely exceed $10. Mathematically, we would write this as .
What do and mean? Approximate .
SolutionThe equation means that selling 1,000 widgets returns a profit of $500. We interpret as meaning that when producing 1000 widgets, the profit is increasing at rate of $0.25 per widget (the units are “dollars per widget.”) Since we have no other information to use, our best approximation for is:
We approximate that selling 1,100 widgets returns a profit of $525.
The previous examples made use of an important approximation tool that we first used in our previous “driving a car at 60 mph” example at the beginning of this section. Five minutes after looking at the speedometer, our best approximation for distance traveled assumed the rate of change was constant. In Examples 2.2.1 and 2.2.2 we made similar approximations. We were given rate of change information which we used to approximate total change. Notationally, we would say that
This approximation is best when is “small.” “Small” is a relative term; when dealing with the world population, 22 days = 28,800 minutes is small in comparison to years. When manufacturing widgets, 100 widgets is small when one plans to manufacture thousands.
One of the most fundamental applications of the derivative is the study of motion. Let be a position function, where is time and is distance. For instance, could measure the height of a projectile or the distance an object has traveled.
Let’s let measure the distance traveled, in feet, of an object after seconds of travel. Then has units “feet per second,” and measures the instantaneous rate of distance change — it measures velocity.
Now consider , a velocity function. That is, at time , gives the velocity of an object. The derivative of , , gives the instantaneous rate of velocity change — acceleration. (We often think of acceleration in terms of cars: a car may “go from 0 to 60 in 4.8 seconds.” This is an average acceleration, a measurement of how quickly the velocity changed.) If velocity is measured in feet per second, and time is measured in seconds, then the units of acceleration (i.e., the units of ) are “feet per second per second,” or ft/s/s. We often shorten this to “feet per second squared,” or ft/s, but this tends to obscure the meaning of the units.
Perhaps the most well known acceleration is that of gravity. In this text, we use ft/s or m/s. What do these numbers mean?
A constant acceleration of 32ft/s/s means that the velocity changes by 32ft/s each second. For instance, let measures the velocity of a ball thrown straight up into the air, where has units ft/s and is measured in seconds. The ball will have a positive velocity while traveling upwards and a negative velocity while falling down. The acceleration is thus ft/s. If ft/s, then when , the velocity will have decreased by 32ft/s; that is, ft/s. We can continue: ft/s, and we can also figure that ft/s.
These ideas are so important we write them out as a Key Idea.
Let be the position function of an object. Then is the velocity function of the object.
Let be the velocity function of an object. Then is the acceleration function of the object.
We now consider the second interpretation of the derivative given in this section. This interpretation is not independent from the first by any means; many of the same concepts will be stressed, just from a slightly different perspective.
Given a function , the difference quotient gives a change in values divided by a change in values; i.e., it is a measure of the “rise over run,” or “slope,” of the line that goes through two points on the graph of : and . As shrinks to 0, these two points come close together; in the limit we find , the slope of a special line called the tangent line.
Lines have a constant rate of change, their slope. Nonlinear functions do not have a constant rate of change, but we can measure their instantaneous rate of change at a given value by computing . We can get an idea of how is behaving by looking at the slopes of its tangent lines. We explore this idea in the following example.
Consider as shown in Figure 2.2.1 with tangent lines at and . It is clear that at the function is growing faster than at , as it is steeper at . How much faster is it growing?
SolutionWe can answer this directly after the following section, where we learn to quickly compute derivatives. For now, we will answer graphically, by considering the slopes of the respective tangent lines.
With practice, one can fairly effectively sketch tangent lines to a curve at a particular point. In Figure 2.2.1, we have sketched the tangent lines to at and , along with a grid to help us measure the slopes of these lines. At , the slope is 2; at , the slope is 6. Thus we can say not only is growing faster at than at , it is growing three times as fast.
Consider the graph of and its derivative, , in Figure 2.2.2. Use these graphs to find the slopes of the tangent lines to the graph of at , , and .
SolutionTo find the appropriate slopes of tangent lines to the graph of , we need to look at the corresponding values of .
The slope of the tangent line to at is ; this looks to be about .
The slope of the tangent line to at is ; this looks to be about .
The slope of the tangent line to at is ; this looks to be about .
Using these slopes, the tangent lines to are sketched in Figure 2.2.2 as well. Included on the graph of in this figure are filled circles where , and to help better visualize the value of at those points.
Consider again the graph of and its derivative in Example 2.2.4. ††margin: Use the tangent line to at to approximate the value of .
SolutionFigure 2.2.3 shows the graph of along with its tangent line, zoomed in at . Notice that near , the tangent line makes an excellent approximation of . Since lines are easy to deal with, often it works well to approximate a function with its tangent line. (This is especially true when you don’t actually know much about the function at hand, as we don’t in this example.)
While the tangent line to was drawn in Example 2.2.4, it was not explicitly computed. Recall that the tangent line to at is . While is not explicitly given, by the graph it looks like . Recalling that , we can compute the tangent line to be approximately It is often useful to leave the tangent line in point-slope form.
To use the tangent line to approximate , we simply evaluate at instead of .
We approximate
To demonstrate the accuracy of the tangent line approximation, we now state that in Example 2.2.5, . We can evaluate . Had we known all along, certainly we could have just made this computation. In reality, we often only know two things:
What is, for some value of , and
what is.
For instance, we can easily observe the location of an object and its instantaneous velocity at a particular point in time. We do not have a “function ” for the location, just an observation. This is enough to create an approximating function for .
This last example has a direct connection to our approximation method explained above after Example 2.2.2. We stated there that
If we know and for some value , then computing the tangent line at is easy: . In Example 2.2.5, we used the tangent line to approximate a value of . Let’s use the tangent line at to approximate a value of near ; i.e., compute to approximate , assuming again that is “small.” Note:
This is the exact same approximation method used above! Not only does it make intuitive sense, as explained above, it makes analytical sense, as this approximation method is simply using a tangent line to approximate a function’s value.
The importance of understanding the derivative cannot be understated. When is a function of , measures the instantaneous rate of change of with respect to and gives the slope of the tangent line to at .
What is the instantaneous rate of change of position called?
Given a function , in your own words describe how to find the units of .
What functions have a constant rate of change?
Given and , approximate .
Given and , approximate .
Given and , approximate .
Knowing and and the methods described in this section, which approximation is likely to be most accurate: , , or ? Explain your reasoning.
Given and , approximate .
Given and , approximate .
Let measure the volume, in decibels, measured inside a restaurant with customers. What are the units of ?
Let measure the velocity, in ft/s, of a car moving in a straight line seconds after starting. What are the units of ?
The height , in feet, of a river is recorded hours after midnight, April 1. What are the units of ?
In Exercises 15–18, graphs of functions and are given. Identify which function is the derivative of the other.
If the tangent line to at passes through the point , find and .
Sketch the graph of a function for which , , , and .
Sketch the graph of a function for which , , , and .
At which points does the tangent line to pass through the origin?
In Exercises 23–24, use the definition to compute the derivatives of the following functions.
In Exercises 25–26, numerically approximate the value of at the indicated value.
at .
at .