264,761 views
21 votes
21 votes
What is the largest total area that can be enclosed

What is the largest total area that can be enclosed-example-1
User Yao Li
by
2.5k points

1 Answer

25 votes
25 votes

Let W = the three sides to make the width of the two corrals

Let L = the one side parallel to the river.

Area

A = L * W

Replace L with (300-3W)

A = (300-3W) * W

A = -3W^2 + 300W

A quadratic equation, the axis of symmetry will be the value for max area

Find that using x = -b/(2a)

In this equations: x = W; a = -3; b = 300


W=(-300)/(2*-3)=(-100)/(2)=50

W = +50 yd is the width for max area.

Find the max area, substitute 50 for W in the area equation:

A = -3(50^2) + 300(50)

A = -3(2500) + 15000

A = -7500 + 15000

A = 7500 sq/yds is max area

Hence the largest total area that can be enclosed is 7500 sq. yd.

User Therealstubot
by
3.0k points
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.