A farmer is building a fence to enclose a rectangular area against an existing wall, shown...

(Optimization Problem) You're building a fence in a rectangular area for a garden outside of your...

(Optimization Problem) You're building a fence in a rectangular area for a garden outside of your house. One side of the garden is up against the wall of your house and doesn't need fencing. You have 100 feet of fencing material. What are the dimensions of the largest area you can enclose? Show all work.

A farmer wants to fence in a rectangular plot of land adjacent to the north wall...

A farmer wants to fence in a rectangular plot of land adjacent to the north wall of his barn. No fencing is needed along the barn, and fencing along the west side of the plot is shared with a neighbor who will split the cost of that portion of the fence. Fencing costs $20 per linear foot. The farmer is not willing to spend more than $5000. Find the dimension for the plot that would enclose the most area.

A farmer wants to fence in a rectangular plot of land adjacent to the north wall...

A farmer wants to fence in a rectangular plot of land adjacent to the north wall of his barn. No fencing is needed along the barn, and the fencing along the west side of the plot is shared with a neighbor who will split the cost of that portion of the fence. If the fencing costs $24 per linear foot to install and the farmer is not willing to spend more than $6000, find the dimensions for the plot that...

A farmer wants to fence in a rectangular plot of land adjacent to the north wall...

A farmer wants to fence in a rectangular plot of land adjacent to the north wall of his barn. No fencing is needed along the barn, and the fencing along the west side of the plot is shared with a neighbor who will split the cost of that portion of the fence. If the fencing costs $16 per linear foot to install and the farmer is not willing to spend more than $8000, find the dimensions for the plot that...

A fence is to be built to enclose a rectangular area of 800 square feet. The...

A fence is to be built to enclose a rectangular area of 800 square feet. The fence along three sides is to be made of material that costs $6 per foot. The material for the fourth side costs $18 per foot. Find the dimensions of the rectangle that will allow for the most economical fence to be built?

A fence is to be built to enclose a rectangular area of 18001800 square feet. The...

A fence is to be built to enclose a rectangular area of 18001800 square feet. The fence along three sides is to be made of material that costs ​$44 per foot. The material for the fourth side costs ​$1212 per foot. Find the dimensions of the rectangle that will allow for the most economical fence to be built.

A farmer wants to enclose a rectangular field by a fence and divide it into 2...

A farmer wants to enclose a rectangular field by a fence and divide it into 2 smaller but equal rectangular fields by constructing another fence parallel to one side. He has 6,000 yards of fencing.(a) draw picture (b) Find the dimensions of the field so that the total area is a maximum. (c)  Find the dimensions of the rectangular field the farmer can make the will contain the largest area.

A farmer wants to fence in and area of 1.5 million square feet in a rectangular...

A farmer wants to fence in and area of 1.5 million square feet in a rectangular field. He then divides the area in half by putting another line of fencing parallel to one of the sides of the rectangle in the interior of the area. What is the dimensions of the rectanglular area that minimizes the amount of fencing used. Let x denote the length of fencing (in million of ft) along the direction where 3 pieces of fencing is...

A farmer wants to fence in a rectangular plot of land adjacent to his barn. No...

A farmer wants to fence in a rectangular plot of land adjacent to his barn. No fence is needed along the barn. If the fencing cost $20 per foot and he wants to enclose 800 square feet, then what dimensions will minimize cost?

(Optimization Problem) You need to fence in a rectangular area for a garden outside of your...

(Optimization Problem) You need to fence in a rectangular area for a garden outside of your house. One side of the garden is against the wall and does not need a fence. You have 144 feet of fencing material. What are the dimensions of the largest area you can enclose? Draw and label the problem, identify the objective equation, list the constraints, and show all work.