Chapter 2, Problem 21P

a.

To determine

The table whose perimeter is 2400 and area of each configuration is maximum.

Answer to Problem 21P

The possible pairs whose perimeter is 2400 and area is maximum is length =1200 and breadth=600.

Explanation of Solution

Given information:

  $2400ft$ of fencing, that should be fenced off a rectangular field.

Concept Used:

Let x is the breadth of rectangular field and y is the length of rectangular field.

Then $2x+y=2400\text{ (by fencing three sides)}$

y is the side parallel to river and x is the other side.

Calculation:

X	Y	Product
100	2200	210000
200	2000	40000
300	1800	540000
400	1600	640000
500	1400	700000
600	1200	720000
700	1000	700000

Conclusion:

Only these values are possible after that area start decreasing. So answer for maximum area 600 is breadth and 1200 is length.

b.

To determine

To determine the area in terms of one side.

Answer to Problem 21P

The area is $2400-2x^2$

Explanation of Solution

Given information :

Perimeter is $2400ft$ and area is maximum.

Concept Used:

Perimeter is $2400ft$ and area is maximum.

Let length of rectangular field be y and breadth be x.

Calculation:

Fencing along three sides of river.

  $\begin{array}{l}\therefore 2x+y=2400ft\\ xy=area\to 1\\ 2x+y=2400\\ y=2400-2x\to 2\end{array}$

Put equation 2 in 1,

  $\begin{array}{l}area=x(2400-2x)\\ area=2400-2x^2\end{array}$

Conclusion:

The required area in terms of one side is $2400-2x^2$

c.

To determine

To compare the answer with subpart a .

Answer to Problem 21P

The answer is same as subpart a .

Explanation of Solution

Given information :

Perimeter is $2400ft$ and area is maximum

Concept used:

Maximise the area by using differentiation.

First differentiation is equal to zero for maximization.

Calculation:

  $\begin{array}{l}area=2400-2x^2\\ A(x)=2400x-2x^2\end{array}$

Differentiate with respect to x ,

  $A\text{'}(x)=2400-4x$

Put $A\text{'}(x)=0$ for maximum value

  $\begin{array}{l}2400-4x=0\\ x=600\\ \text{Then y}=1200\text{ (Using equation 1)}\end{array}$

Conclusion:

The answer is same as subpart a . So model of function is correct.