the back of monique's property is a creek. Monique would like to enclose a rectangular area,...

A javalina rancher wants to enclose a rectangular area and then divide it into 6 pens...

A javalina rancher wants to enclose a rectangular area and then divide it into 6 pens with fencing parallel to one side of the rectangle. There are 660 feet of fencing available to complete the job. What is the largest possible total area of the 6 pens?

A rancher with 1000 feet of fencing wants to enclose a rectangular area and then divide...

A rancher with 1000 feet of fencing wants to enclose a rectangular area and then divide it into three pens with fencing parallel to one side of the rectangle as indicated below. If x represents the length of the common fence, find a function that models the total area of the three pens in terms of x. (Your answer will be a function or expression.)

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

A farmer is building a fence to enclose a rectangular area against an existing wall, shown in the figure below. A rectangle labeled, Fenced in Region, is adjacent to a rectangle representing a wall. Three of the sides will require fencing and the fourth wall already exists. If the farmer has 184 feet of fencing, what is the largest area the farmer can enclose?

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 270 square feet. The...

A fence is to be built to enclose a rectangular area of 270 square feet. The fence along three sides is to be made of material that costs 6 dollars per foot, and the material for the fourth side costs 13 dollars per foot. Find the dimensions of the enclosure that is most economical to construct.

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 fence is to be built to enclose cows in a rectangular area of 200 square...

A fence is to be built to enclose cows in a rectangular area of 200 square feet. The fence along three sides is to be made of material that costs $5 per foot, and the material for the fourth side costs $16 dollars per foot. Find the dimensions of the enclosure that minimize cost, and give the minimum cost to build the fence

A fence is to be built to enclose a rectangular area of 280 square feet. The...

A fence is to be built to enclose a rectangular area of 280 square feet. The fence along three sides is to be made of material that costs 5 dollars per foot, and the material for the fourth side costs 14 dollars per foot. Find the length LL and width WW (with W≤LW≤L) of the enclosure that is most economical to construct.

(1 point) A fence is to be built to enclose a rectangular area of 210 square...

(1 point) A fence is to be built to enclose a rectangular area of 210 square feet. The fence along three sides is to be made of material that costs 5 dollars per foot, and the material for the fourth side costs 13 dollars per foot. Find the dimensions of the enclosure that is most economical to construct. Dimensions: 19.45 x 10.80 <= I had this for answer and got it wrong is the answer different?

(1 point) A fence is to be built to enclose a rectangular area of 310 square...

(1 point) A fence is to be built to enclose a rectangular area of 310 square feet. The fence along three sides is to be made of material that costs 6 dollars per foot, and the material for the fourth side costs 14 dollars per foot. Find the length L and width W (with W≤L ) of the enclosure that is most economical to construct.