Business Calculus with Excel

For this example $x_0=1\text{.}$ If $\mathrm{\Delta }x=1\text{,}$ we can see that the function and the secant line are clearly distinct.

The worksheet is designed to make it easy to change the value of $\mathrm{\Delta }x\text{.}$

As we can see, if we let $\mathrm{\Delta }x=1\text{,}$ the slope is 3, but we have not zoomed in far enough for the graph of $f(x)$ to look like a straight line. Letting $\mathrm{\Delta }x=0.01\text{,}$ the slope is 2.01, and the graphs of the function and secant line seem to be the same.

With some experimentation, taking both positive and negative values of $\mathrm{\Delta }x\text{,}$ we get the following table of values:

It is clear that as $\mathrm{\Delta }x$ gets very small, the slope of the secant line gets closer and closer to 2. Thus $f^{\prime }(1)=2\text{.}$

The method of the first solution takes too much work and requires us to reset a worksheet and keep track of the slope as we try a number of values for $\mathrm{\Delta }x\text{.}$ We would like to create a worksheet that simply shows the values of the slope of the secant line for values of $\mathrm{\Delta }x$ and takes the value that this approaches. We can set up a worksheet where each line takes $\mathrm{\Delta }x$ from the previous line and divides by 10.

We get the same value whether we start $\mathrm{\Delta }x$ at 1 or -1. Once again, we find $f^{\prime }(1)=2\text{.}$

This method of finding the derivative still has a number of difficulties. In the example above, the exact answer we want (in this case 2) did not show up in any of our computations. We also find that if we make $\mathrm{\Delta }x$ too small, we run into a problem called round off error. If the next chapter we will look at methods that compute derivatives symbolically, but for this chapter we want an easy method of approximation. We will use the approximation technique that is used by most graphing calculators when they compute the derivative. They use a “balanced difference quotient” where we find the slope of the secant line between points $\mathrm{\Delta }x$ before and after the point we are interested in. As the picture below shows, compared to either the right secant or the left secant, for most functions the balanced secant is closer to being parallel to the tangent line.

We will use the default on calculators, that is we will use $\mathrm{\Delta }x=0.001\text{.}$

For our example this gives our familiar result that $f^{\prime }(1)=2\text{.}$

Since this problem will serve as a template for a question we will look at many times, it is worthwhile to look at it in detail. We start by setting up a workbook that will have the structure we need to compute a chart of values for $f(x)$ and $f^{\prime }(x)\text{.}$

The picture above gives the minimal amount we need to type in. The rest will be done with quick filling. The entry of cell B1 gives the formula for the function. In cell D5 we evaluate the function using the first value of $x$ from cell A5. We have two values of $x$ in cells A5 and A6 so that we can quick fill to get a list of $x$ values. We use absolute references for $\mathrm{\Delta }x\text{,}$ so it will not change on quick fills. We then fill cells E5 and F5 from cell D5, then fill row 6 from row 5, then fill the rest of the chart from rows 5 and 6.

It is then a straightforward task to plot the two curves. We notice that the graph of the function is a parabola. If the derivative is negative, the graph of $f(x)$ is decreasing. If the derivative is positive, the graph of the function $f(x)$ is increasing. The graph of $f(x)$ reaches its minimum at the vertex, which is also where $f^{\prime }(x)=0\text{.}$ We also notice that the derivative of this parabola seems to be a straight line.

The setup for this example is very similar to the last problem.

Since the values of $f(x)$ range between -500 and 1500, we note that $f(x)$ is the blue graph and uses the axis in the center of the graph. Similarly the values of $f^{\prime }(x)$ range between -500 and 2500, we note that $f^{\prime }(x)$ is the red graph and uses the axis on the side of the graph.

This time we notice three places where the derivative seems to be zero, when $x$ is near $-5\text{,}$ $0\text{,}$ and $5\text{.}$ We use goal seek on the derivative and find that the derivative is zero when $x=-4.648\text{,}$ 0, or 4.648. Looking at the graph of f(x) at those points, we see that $f(x)$ has a maximum when $x=-4.648\text{,}$ and a minimum when $x=-4.648\text{.}$ When $x=0\text{,}$ $f(x)$ is neither a maximum nor a minimum.

The setup for this example is very similar to the last problem. We simply change the function. This involves changing the formulas in cells B1 and D5, then using quick copy to change the formulas for the cells in columns D through F.

Once we have points for the derivative, we add a trendline using a linear model. We set the options to show both the formula for the trendline and the value of $R^2\text{.}$ The fact that $R^2=1\text{,}$ indicates the trendline we found exactly fits the data. In the workbook connected to this section there is a page for Example 6B. It uses parameters for the coefficients on a quadratic formula, so that you can explore the derivative of a general quadratic function.