Manufacturing to Specifications. A manufacturing firm wants to package its product in a cylindrical container 3 ft high with surface area 8π ft2. What should the radius of the circular top and bottom of the container be? (Hint: The surface area consists of the circular top and bottom and a rectangle that represents the side cut open vertically and unrolled.)

The surface area of a cylinder is calculated using the formula A = 2πr² + 2πrh, where r is the radius and h is the height. This formula accounts for the areas of the two circular bases (top and bottom) and the rectangular side that wraps around the cylinder. Understanding this formula is crucial for determining the dimensions of the container based on the given surface area.

To find the radius of the circular top and bottom of the cylinder, one must rearrange the surface area formula to isolate r. This involves substituting the known height and surface area into the equation and solving for r. Mastery of algebraic manipulation is essential for accurately determining the radius from the given parameters.

Geometric interpretation involves visualizing the physical structure of the cylinder and understanding how its dimensions relate to its surface area. Recognizing that the surface area includes both the circular bases and the lateral surface helps in conceptualizing the problem. This understanding aids in applying the correct formulas and ensuring that all components of the surface area are accounted for.