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categoryرياضيات
schoolبكالوريوس
event_available2026-07-13
السؤال
Transcribed Image Text:
a. A rectangular pen is built with one side against a barn. If 600 m of fencing are used for the other three sides of the pen, what dimensions maximize the area
of the pen?
b. A rancher plans to make four identical and adjacent rectangular pens against a barn, each with an area of 400 m² (see
figure). What are the dimensions of each pen that minimize the amount of fence that must be used?
Barn
400 400 400 400
a. Let A be the area of the rectangular pen and let x be the length of the sides perpendicular to the barn. Write the objective function in a form that does not
include the length of the side parallel to the barn.
A = 600x -2x²
(Type an expression.)
The interval of interest of the objective function is [0,300]
(Simplify your answer. Type your answer in interval notation. Do not use commas in the individual endpoints.)
To maximize the area of the pen, the sides perpendicular to the barn should be 150 m long and the side parallel to the barn should be 300 m long.
(Type exact answers, using radicals as needed.)
b. Let x be the length of the sides perpendicular to the barn and let L be the total length of fence needed. Write the objective function.
L=5x+
1600
(Type an expression.)
The interval of interest of the objective function is (0,00).
(Simplify your answer. Type your answer in interval notation. Do not use commas in the individual endpoints.)
To minimize the amount of fence that must be used, each of the sides perpendicular to the barn should be ? m long and each of the sides parallel to the barn
should be ?m long.
(Type exact answers, using radicals as needed.)
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