Answer:
350 ft long facing the barn and 175 ft wide
Step-by-step explanation:
Let a and b be the length and width of his rectangular fence. Since he has 700 feet of fencing and one side does not need fencing. We have the following constraint equation:
a + 2b = 700
a = 700 - 2b
We want to maximize the following area formula
A = ab
We can substitute a = 700 - 2b
[tex]A = (700 - 2b)b = 700b - 2b^2[/tex]
To find the maximum value of this, simply take the 1st derivative, and set it to 0
A' = 700 - 4b = 0
b = 700 / 4 = 175 ft
a = 700 - 2b = 700 - 350 = 350 ft
