Two equal rectangular lots are enclosed by fencing the perimeter of a rectangular lot and then...

A rectangular field is to be enclosed on four sides with a fence. Fencing costs $4...

A rectangular field is to be enclosed on four sides with a fence. Fencing costs $4 per foot for two opposite sides, and $8 per foot for the other two sides. Find the dimensions of the field of area 880 ft 2 that would be the cheapest to enclose.

A rectangular field is to be enclosed on four sides with a fence. Fencing costs $8...

A rectangular field is to be enclosed on four sides with a fence. Fencing costs $8 per foot for two opposite sides, and $3 per foot for the other two sides. Find the dimensions of the field of area 870 ft2 that would be the cheapest to enclose. A) 11.1 ft @ $8 by 78.7 ft @ $3 B) 18.1 ft @ $8 by 48.2 ft @ $3 C) 78.7 ft @ $8 by 11.1 ft @ $3 D) 48.2...

A homeowner wants to create an enclosed rectangular patio area behind their home. They have 168...

A homeowner wants to create an enclosed rectangular patio area behind their home. They have 168 feet of fencing to use, and the side touching the home does not need fence. What should the dimensions of the patio be to enclose the largest area possible?

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?

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 rectangular recreational field needs to be built outside of a gymnasium. Three walls of fencing...

A rectangular recreational field needs to be built outside of a gymnasium. Three walls of fencing are needed and the fourth wall is to be a wall of the gymnasium itself. The ideal area for such a field is exactly 810000ft2. In order to minimize costs, it is necessary to construct the fencing using the least amount of material possible. Assuming that the material used in the fencing costs $45/ft, what is the least amount of money needed to build...

A farmer has 420 feet of fencing to enclose 2 adjacent rectangular pig pens sharing a...

A farmer has 420 feet of fencing to enclose 2 adjacent rectangular pig pens sharing a common side. What dimensions should be used for each pig pen so that the enclosed area will be a maximum? The two adjacent pens have the same dimensions. Find the absolute maximum value of f(x)= x4−2x

A rectangular field with one side along a river is to be fenced. Suppose that no...

A rectangular field with one side along a river is to be fenced. Suppose that no fence is needed along the river, the fence on the side opposite the river costs $40 per foot, and the fence on the other sides costs $10 per foot. If the field must contain 72,200 square feet, what dimensions will minimize costs? side parallel to the river     ft each of the other sides     ft

A farmer plans to fence a rectangular pasture with two pens adjacent to a river. No...

A farmer plans to fence a rectangular pasture with two pens adjacent to a river. No fencing is needed along the river. Both pens have access to the river. If a total pasture of 19,200 sq ft is desired, what dimensions will require the least amount of fencing?

Ben wants to build a rectangular enclosure for his animals. One side of the pen will...

Ben wants to build a rectangular enclosure for his animals. One side of the pen will be against the barn, so he needs no fence on that side. The other three sides will be enclosed with wire fencing. If Ben has 450 feet of fencing, you can find the dimensions that maximize the area of the enclosure. A(W)=A(W)=     b) What width WW would maximize the area? WW =  ft Round to nearest half foot c) What is the maximum area? AA...