Answer:
The circumference of the circle when A is a minimum is 31.21 cm.
Step-by-step explanation:
If we construct a square of side "a" and a circle of diameter "D", we divide the length of the wire in the sum of both perimeters.
The perimeter of the square is
[tex]P_s=4\cdot a[/tex]
The perimeter of the circle is
[tex]P_c=\pi D[/tex]
The length of the wire is
[tex]L=4a+\pi D=71[/tex]
Then we can express a in function of D:
[tex]4a+\pi D=71\\\\a=\frac{71}{4}-\frac{\pi}{4}D[/tex]
The area A is the sum of the area of the circle and the square. We can then replace a by D as the independent variable:
[tex]A=A_c+A_s=\frac{\pi D^2}{4}+a^2= \frac{\pi D^2}{4}+(\frac{71-\pi D}{4})^2\\\\ A= \frac{\pi D^2}{4} +\frac{71^2-2*71*\pi D+(\pi D)^2}{16}[/tex]
To optimize the area we derive and equal to 0:
[tex]\frac{dA}{dD} =\frac{2\pi}{4} D+\frac{-142\pi+2\pi^2 D}{16}=0\\\\\frac{8\pi D-142\pi+2\pi^2 D}{16} =0\\\\\frac{\pi}{16} (8D-142+2\pi D)=0\\\\(8+2\pi)D=142\\\\D=142/(8+2\pi)=142/14.28=9.94[/tex]
The area is mimimum when the D=9.94.
Then, the circunference for this diameter is:
[tex]P_c=\pi D=3.14*9.94=31.21[/tex]
