2.1 A preview of calculus  (Page 3/13)

As t is chosen closer to a , the average velocity becomes closer to the instantaneous velocity. Note that finding the average velocity of a position function over a time interval is essentially the same as finding the slope of a secant line to a function. Furthermore, to find the slope of a tangent line at a point a , we let the x -values approach a in the slope of the secant line. Similarly, to find the instantaneous velocity at time a , we let the t -values approach a in the average velocity. This process of letting x or t approach a in an expression is called taking a limit    . Thus, we may define the instantaneous velocity    as follows.

[link] illustrates this concept of limits and average velocity.

The area problem and integral calculus

We now turn our attention to a classic question from calculus. Many quantities in physics—for example, quantities of work—may be interpreted as the area under a curve. This leads us to ask the question: How can we find the area between the graph of a function and the x -axis over an interval ( [link] )?

As in the answer to our previous questions on velocity, we first try to approximate the solution. We approximate the area by dividing up the interval $\left[a,b\right]$ into smaller intervals in the shape of rectangles. The approximation of the area comes from adding up the areas of these rectangles ( [link] ).

As the widths of the rectangles become smaller (approach zero), the sums of the areas of the rectangles approach the area between the graph of $f\left(x\right)$ and the x -axis over the interval $\left[a,b\right].$ Once again, we find ourselves taking a limit. Limits of this type serve as a basis for the definition of the definite integral. Integral calculus is the study of integrals and their applications.