Chapter 1.2, Problem 11E

(a)

To determine

To find: The slope of the graph c and interpret it.

Answer to Problem 11E

The slope of the function c is 8.34 mg, which represents the rate of change of dosage.

Explanation of Solution

Rewrite the given equation as $c=0.0417aD+0.0417$ (1)

In the equation, $c=0.0417aD+0.0417$, the slope is 0.0417D and the c-intercept is 0.0.417.

Given that the dosage of the adult (D) is 200 mg.

Substitute $D=200$ in the equation (1) and obtain the appropriate dosage of a child as follows.

$\begin{array}{c}c=0.0417a\left(200\right)+0.0417\\ =8.34a+8.34\end{array}$

Thus, $c=8.34a+8.34$ (2)

Therefore, the slope is 8.341, which represents the average rate of change of the dosage in mg. The dosage is calculated for a one year old child.

The graph of c is shown below in Figure 1.

From Figure 1, it is observed that the graph of c is a straight line as the function is linear.

(b)

To determine

To find: The dosage for a newborn.

Answer to Problem 11E

The dosage for a newborn is 8.34 mg.

Explanation of Solution

Since age (a) of a newborn child is 0, substitute $a=0$ in equation (2) and obtain the dosage as follows.

$\begin{array}{c}c=8.34a+8.34\\ =8.34\left(0\right)+8.34\\ =8.34\end{array}$

Therefore, for a newborn child the advisable appropriate dosage is 8.34 mg.