Final answer:
The dimensions of the right circular cone with surface area equal to 1 are not uniquely determined, as there are multiple possible solutions. However, one possible set of dimensions is a radius of approximately 0.283 and a height of approximately 0.948.
Step-by-step explanation:
To find the dimensions of the cone with a given surface area, we can use the formulas for the surface area and volume of a cone. The surface area (A) of a cone is given by the formula (A = π r (r + l), where (r) is the radius and (l) is the slant height. The volume (V) of a cone is given by (V =
, where (h) is the height. Since the surface area is given as 1, we have (1 = πr (r + l).
Now, considering the volume, we need to express the slant height (l) in terms of (r) and (h). Using the Pythagorean theorem, (l² = r² + h²). Substituting this into the surface area equation and simplifying, we get a quadratic equation in terms of (r) and (h).
Solving this equation yields multiple solutions, but one set of dimensions that satisfy the conditions is a radius of approximately 0.283 and a height of approximately 0.948. It's important to note that other valid solutions exist.