A campground owner has 1400 m of fencing. He wants to enclose a rectangular field bordering a river, with no fencing alo

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A Campground Owner Has 1400 M Of Fencing He Wants To Enclose A Rectangular Field Bordering A River With No Fencing Alo 1 (42.89 KiB) Viewed 28 times

A campground owner has 1400 m of fencing. He wants to enclose a rectangular field bordering a river, with no fencing along the river. (See the sketch.) Let x represent the width of the field (a) Write an expression for the length of the field as a function of x. (b) Find the area of the field (area = length x width) as a function of x. (c) Find the value of x leading to the maximum area. (d) Find the maximum area. (b) A(x) = (c) First write the expression for the derivative used to find the x value that maximizes area. dA dx The x-value leading to the maximum area is (d) The maximum area of the rectangular plot is M River