3rd Edition

ISBN: 9781133947202

Author: Ron Larson

Publisher: Cengage Learning

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Question

Chapter 7.5, Problem 68E

To determine

To calculate: the optimal profit.

Expert Solution & Answer

Answer to Problem 68E

For crop A optimal number of acres is 60

For crop B optimal number of acres is 90

Optimal profit is $33150

Explanation of Solution

Given information:

Two crops A and B are grown. Sum of land of crop A and crop B is at most 150 acres. Total time for trimming crop A and 2 times of crop B is at most 240 hours. Time for picking 30% of crop A and 10% of crop B is at most 30 hours. The profit is $185 per acre for crop A and $245 per acre for crop B.

Calculation:

Let x be the number of acres for crop A and y be the number of acres for crop B.

Total land is at most 150 acres, so

x+y≤150

Total time for trimming crop A and 2 times for crop B is at most 240 hours, so

x+2y≤240

Total time for picking 30% of crop A and 10% of crop B is at most 30 hours, so

0.3x+0.1y≤30

From above equations we can plot the graph

For x+y≤150 take x+y=150 make a table

x0150100y150050

Plot the points and join them.

Precalculus with Limits, Chapter 7.5, Problem 68E , additional homework tip 1

The region for x+y≤150 will be the region below the line x+y=150 because the point (0,0) is included in the region

For x+2y≤240 take x+2y=240 make a table

x0240100y120070

Plot the points and join them.

Precalculus with Limits, Chapter 7.5, Problem 68E , additional homework tip 2

The region for x+2y≤240 will be the region below the line x+2y=240 because the point (0,0) is included in the region

For 0.3x+0.1y≤30 take 0.3x+0.1y=30 make a table

x010010y3000270

Plot the points and join them.

Precalculus with Limits, Chapter 7.5, Problem 68E , additional homework tip 3

The region for 0.3x+0.1y≤30 will be the region below the line 0.3x+0.1y=30 because the point (0,0) is included in the region

Precalculus with Limits, Chapter 7.5, Problem 68E , additional homework tip 4

Profit function (Objective function)

P=185x+245y

Now from graph we have set of 5 points:

(0,0),(0,120),(60,90),(75,75)) and (100,0)

Now put above set of points in profit function to find optimal profit

Put all the points in P=185x+245y and find the optimal value

For (0,0), P=185(0)+245(0)⇒P=0

For (0,120), P=185(0)+245(120)⇒P=29400

For (60.90), P=185(60)+245(90)⇒P=33150

For (75,75), P=185(75)+245(75)⇒P=32250

For (100,0), P=185(100)+245(0)⇒P=18500

Conclusion:

For crop A optimal number of acres is 60

For crop B optimal number of acres is 90

Optimal profit is $33150

Chapter 7.5, Problem 67E

Chapter 7.5, Problem 69E

Chapter 7 Solutions

Precalculus with Limits

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