Chapter 2.3, Problem 55E

Coughing When a foreign object that is lodged in the trachea (windpipe) forces a person to cough, the diaphragm thrusts upward, causing an increase in pressure in the lungs. At the same time, the trachea contracts, causing the expelled air to move faster and increasing the pressure on the foreign object. According to a mathematical model of coughing, the velocity v (in cm/s) of the airstream through an average-sized person’s trachea is related to the radius r of the trachea (in cm) by the function

$v(r)=\text{3}.\text{2(1 }-r\text{)}{r}^{\text{2}}\frac{1}{2} \le r\le \text{ 1}$

Determine the value of r for which v is a maximum.

To determine

The value of r for which v is maximum.

Answer to Problem 55E

The value of r is 0.6667 for which the value of v is maximum.

Explanation of Solution

A function of velocity v of the airstream through trachea of radius r is given by

$v\left(r\right)=3.2\left(1-r\right)r^2$ and the value of r is $\frac{1}{2}\le r\le 1$.

Use graph calculator to draw thee graph of the function $v\left(r\right)=3.2\left(1-r\right)r^2$ as shown below.

Figure (1)

Locate the point of local maximum in the above graph to find the value of r for which v is maximum.

The value $v\left(a\right)$ is local maximum value if $v\left(a\right)\ge v\left(x\right)$ when a is near x.

From Figure (1), it is noticed that there is a local maximum between $x=0.5$ and $x=1$.

Point $\left(0.6667,0.474\right)$ is the highest point on the graph. This point is the point of local maximum.

The value 0.474 is the local maximum value at $x=0.6667$.

Therefore, the value of r is 0.6667 for which the value of v is maximum.