Final answer:
The angular velocity required to produce an artificial gravity of 9.80 m/s² at the rim of a 200 m diameter space station is 0.99 rad/s, though this answer does not match the provided options.
Step-by-step explanation:
To calculate the angular velocity that would generate an artificial gravity of 9.80 m/s² at the rim of a space station with a diameter of 200 meters, we use the formula for centripetal acceleration:
a = ω²r, where ω is the angular velocity and r is the radius of the station.
Since the diameter is 200 m, the radius r is half of that, which is 100 m.
Plugging in the known variables, we get 9.80 m/s² = ω²(100 m).
Solving for ω, we have ω = √(9.80 m/s² / 100 m) = 0.99 rad/s.
However, none of the provided answer options match this calculation, indicating a potential error in the question or the answer options.