See the graph at the right or this zoom in on the point (0,0).  The function f(x) = xsin(1/x) has a removable discontinuity at x = 0.  Click on the picture to see an animation in which the scale on the y-axis remains fixed but the interval on the x-axis centered at zero becomes smaller and smaller.  Quicktime version

The animation at the right is intended to illustrate graphically the satisfaction of the epsilon/delta

definition of limit for this example.  Large Animation

Click here to look at another animation relating to Example 8, page 54 in the text and visually demonstrating the Epsilon-Delta definition of limit.  Here is a Quicktime version of the example 8 animation and a Quicktime zoom version of the animation.

In each of the graphs linked to below the y-interval is [15.999,16.001], i.e., 16 - epsilon to 16 + epsilon where epsilon equals 0.001.  In some of the graphs the values labeled on the x-axis have been rounded off.  This has led to, for example, the x value being labeled as 2 at more than one place on the horizontal axis.  For the delta value being used in each picture to satisfy the definition of limit for the given epsilon value (0.001) the graph must not "go off the screen" at the top or bottom over the interval being pictured.  On your exam you will be required to find a value for delta that satisfies the definition of limit and does not produce a graph of the function that looks almost horizontal over the delta-interval.

In graph 1 the x-interval is [1.999,2.001], i.e., 2 - delta to 2 + delta where delta equals 0.001.

In graph 2 the x-interval is [1.9999,2.0001], i.e., 2 - delta to 2 + delta where delta equals 0.0001.

In graph 3 the x-interval is [1.99999,2.00001], i.e., 2 - delta to 2 + delta where delta equals 0.00001.

In graph 4 the x-interval is [1.99998,2.00002], i.e., 2 - delta to 2 + delta where delta equals 0.00002.

Graph 5 is an animation with delta starting at 0.001 as in graph 1 and approaching 0.

Quicktime version of the graph 5 animation

We can observe that a delta value of 0.00002 is close to being as large as delta can be.  We could place a bound on how large delta could be if epsilon equals 0.001 by solving the equation given below.

In graph 6 delta equals 0.00002069.          Here is a Maple Worksheet investigation.

Here is a video demonstrating satisfying the epsilon-delta definition of limit for the example above using a TI-84 graphing calculator and epsilon values of 0.01 and 0.001.

Click on the picture at the right to see an animation.

Quicktime Animation

The goal is to find the values for a and b that will cause the function defined at the right to be continuous everywhere.  Due to the nature to the function "pieces", f must be continuous everywhere except possibly at x = -2 and x = 3.  To be continuous at x = -2 and at x = 3 the "pieces must connect" at x = -2 and at x = 3.  This means that x + 6 must equal ax² + b at x = -2 and 6 - x must equal ax² + b at x = 3.  To find a and b such that these two pieces will "connect" we must solve a linear system of equations as shown on the right.  The graph of f with a = -1/5 and b = 24/5 is shown below with each piece of this piecewise defined function shown in a different color.

Another way of putting this is that we must find a and b such that