Answer:
[tex]r^2(\pi -2)\ge 9(\pi -2)\\ \\r\ge 3\ units[/tex]
Step-by-step explanation:
Find the area of the shaded region in terms of r.
1. The area of the circle with radius r is
[tex]A_1=\pi r^2\ un^2.[/tex]
2. The area of the square with diagonal 2r is
[tex]A_2=\dfrac{1}{2}\cdot (2r)\cdot (2r)=2r^2\ un^2.[/tex]
3. The area of the shaded region is the difference
[tex]A_{shaded}=A_1-A_2=\pi r^2-2r^2=(\pi -2)r^2\ un^2.[/tex]
Since the area of the shaded region must be greater or equal to [tex]9(\pi -2)\ un^2.,[/tex] then
[tex]r^2(\pi -2)\ge 9(\pi -2)\\ \\r^2\ge 9\\ \\r\ge 3\ units[/tex]
This inequality is solved only in positive numbers, because r cannot be negative.
