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

Consider the following problem: A farmer with 650 ft of fencing wants to enclose a rectangular...

Consider the following problem: A farmer with 650 ft of fencing wants to enclose a rectangular area and then divide it into four pens with fencing parallel to one side of the rectangle. What is the largest possible total area of the four pens? (a) Draw a diagram illustrating the general situation. Let x denote the length of each of two sides and three dividers. Let y denote the length of the other two sides. (b) Write an expression for...

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 rancher wants to fence in an area of 2000000 square feet in a rectangular field...

A rancher wants to fence in an area of 2000000 square feet in a rectangular field and then divide it in half with a fence down the middle parallel to one side. Suppose that that the fence for the outer part of the rectangle costs $7 per foot, while the cost of the “dividing” fence down the middle costs $4 per foot. What is the least amount of money the rancher can spend on the fence, and what dimensions for...

(1 point) A rancher wants to fence in an area of 1000000 square feet in a...

(1 point) A rancher wants to fence in an area of 1000000 square feet in a rectangular field and then divide it in half with a fence down the middle, parallel to one side. What is the shortest length of fence that the rancher can use? Length of fence = feet.

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

the back of monique's property is a creek. Monique would like to enclose a rectangular area, using the creek as one side fencing for the other three sides to create a corral. If there is 620 feet of fencing available, what is the maximum possible area of the corral? answer in square feet

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 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 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

paul has 400 yards of fencing to enclose a rectangular area. find the dimensions of the...

paul has 400 yards of fencing to enclose a rectangular area. find the dimensions of the rectangle that maximize that enclosed area. what is the maximum area?