Answer:
x should be cut at 2221.5 to minimize the total combined area, and at 5050 to maximize it.
Step-by-step explanation:
Let x be the length of wire that is cut to form a circle within the 5050 wire, so 5050 - x would be the length to form a square.
A circle with perimeter of x would have a radius of x/(2π), and its area would be
[tex] A_c = \pir^2 = \pi (\frac{x}{2pi})^2 = \frac{x^2}{4\pi}[/tex]
A square with perimeter of 5050 - x would have side length of (5050 - x)/4, and its area would be
[tex]A_s = (\frac{5050 - x}{4})^2 = \frac{(5050 - x)^2}{16}[/tex]
The total combined area of the square and circles is
[tex]\sum A = A_c + A_s = \frac{x^2}{4\pi} + \frac{(5050 - x)^2}{16}[/tex]
To find the maximum and minimum of this, we just take the 1st derivative, and set it to 0
[tex]A' = \frac{2x}{4\pi} + \frac{-2(5050-x)}{16} = 0[/tex]
[tex]\frac{x}{2\pi} - \frac{5050 - x}{8} = 0[/tex]
Multiple both sides by 8π and we have
[tex]4x - 5050\pi + x\pi = 0[/tex]
[tex]x(4 + \pi) = 5050\pi[/tex]
[tex]x = \frac{5050\pi}{4 + \pi} = 2221.5 [/tex]
At x = 2221.5:
[tex]A = \frac{x^2}{4\pi} + \frac{(5050 - x)^2}{16}[/tex] = 392720 + 500026 = 892746 [/tex]
At x = 0, [tex]A = 5050^2/16 = 1593906[/tex]
At x = 5050, [tex]A = \frac{5050^2}{4\pi} = 2029424[/tex]
As 892746 < 1593906 < 2029424, x should be cut at 2221.5 to minimize the total combined area, and at 5050 to maximize it.
