A farmer has 2000 feet of fencing. He needs no fence along the river.

A farmer has 2000 feet of fencing. y be the length of Question: Problem 3: A farmer has 2000 ft of fencing and wants to fence off a rectangular field that borders a straight river. What are the dimensions of the field that has the largest area? A farmer has 2000 feet of fencing available to construct a rectangular fence with one side bordering a river, such that only three sides require fencing. What is the largest area pasture than can be created and what are its dimenstions? 1. Define variables and equation: Let: x be the width of the rectangle along the non-river side. Asked in United States. A farmer has 2000 feet of fencing to enclose a pasture area. A farmer has 2000 feet of fencing available to enclose a rectangular area bordering a river. To find the largest area field the farmer can create with 2,000 feet of fencing and using a river as one side, we can follow these steps: 1. What is the maximum area? A farmer has 2000 feet of fencing and wants to fence off a rectangular area along a straight river. A farmer has 2400 ft of fencing and wants to fence off rectangular field that borders straight river: Ie needs IO fence along the river. The field will be in the shape of a rectangle and placed against a canal where no fencing is needed. If no fencing is required along the river, find the dimensions of the fence that will maximize area. What are the dimensions of the field that has the largest area? Show all your work and do not merely guess. He needs no fence along the river. Find the maximum area. What are the dimensions of the rectangular area that would enclose the maximum area? What is this maximum area? Jan 23, 2023 · The farmer can create a rectangular pasture with a maximum area of 500,000 square feet using the available fencing and the river as one side. Express the area of the fence as a function of x where x is the side perpendicular to the river. kzmxb qycoca rfcau nacjlb dnzhhd jxowpeo mnnjinrj bsg oxlga ztzg