91Ó°ÊÓ

Based on the given set $$\{(r, \theta, z): 2 r \leq z \leq 4\}$$ in cylindrical coordinates, describe the shape of the set and sketch it. Solution: The given set of inequalities can be broken down into two separate inequalities: 1. $$z \geq 2r$$ 2. $$z \leq 4$$ Since no specific lower limit is given for r, we assume r to be non-negative, and θ can take any value between 0 and 2π. The relationship between r and z indicates that as r increases, the minimum value of z also increases. The set is a region bounded between two surfaces: one is a flat plane at z = 4, and the other is a slanting plane described by z = 2r. Based on this information, the shape of the given set is a frustum (a portion of a cone sliced by two parallel planes) capped with a flat plane at the top. To sketch the set, draw a flat plane representing z = 4, a slanting plane below the flat plane with the equation z = 2r, and represent the enclosing circular region for θ ranging from 0 to 2π. Lastly, indicate the region bounded by both planes (above and below) and the circular region.