Final answer:
After doubling the radius of a cylinder and keeping the curved surface area unchanged, the ratio of the original height to the new height is 2:1, corresponding to option (b).
Step-by-step explanation:
If the radius of a cylinder is doubled and its curved surface area remains unchanged, we need to find the ratio of the height in two cases.
The formula for the curved surface area of a cylinder is 2πrh, where r is the radius and h is the height of the cylinder. For the initial cylinder, let the curved surface area be A = 2πr₁h₁.
After doubling the radius, the new radius is r₂ = 2r₁, and we want the curved surface area to remain A, so we have A = 2πr₂h₂ = 2π(2r₁)h₂. To keep A the same, we need 2πr₁h₁ = 4πr₁h₂, which simplifies to h₁ = 2h₂.
Thus, the ratio of the height in the two cases is 2:1, which corresponds to option (b).