A right circular cylinder with a height of 10 cm and a surface area of S cm² has a radius given by​​ r(S)=1/2(√100+2S/π −10).
Find lim S→0^+ r(S) and interpret your result.

In calculus, a limit describes the behavior of a function as its input approaches a certain value. It is essential for understanding continuity, derivatives, and integrals. In this context, we are interested in the limit of the radius function r(S) as S approaches 0 from the positive side, which helps us determine the behavior of the radius when the surface area is minimal.

The surface area of a right circular cylinder is calculated using the formula S = 2πr(h + r), where r is the radius and h is the height. This concept is crucial for understanding how the radius r(S) is derived from the surface area S, and it provides context for the relationship between the dimensions of the cylinder and its surface area.

Interpreting the result of a limit involves understanding what the limit signifies in the context of the problem. In this case, finding lim S→0^+ r(S) will reveal the radius of the cylinder as the surface area approaches zero, which can provide insights into the geometric implications of a cylinder with minimal surface area, such as its shape and dimensions.