Problem: In the image given there is a smaller circle inscribed inside of a regular hexagon. The hexagon is inscribed inside of a larger circle. And finally the larger circle is inscribed inside of a regular pentagon. Given the radius of the smaller circle, calculate the following: 1. Area of the small circle. 2. Area and side length of the hexagon. 3. Area of the large circle. 4. Area and side length of the pentagon. Accept input and display ALL output exactly as seen in the example executions that follow. Example Execution #1: Enter the radius of the small circle -> 10 Area of small circle: Hexagon side length: Area of hexagon: Area of large circle: Pentagon side length: Area of pentagon: 314.16 11.55 346.41 418.88 16.78 484.36