Final answer:
The point at the top of the rim of the tire will be moving at a speed of approximately 0.56 m/s after 2.25 seconds of acceleration from rest at a rate of 1.00 m/s².
Step-by-step explanation:
To calculate the speed of the point at the top of the rim of the tire, we need to find the angular velocity at that point first. The cyclist accelerates at a rate of 1.00 m/s², which corresponds to angular acceleration. Using the formula α = a/r, where α is the angular acceleration, a is the linear acceleration, and r is the radius of the tire, we can calculate the angular acceleration as 1.00 m/s² divided by half the diameter of the tire (0.34 m). This gives us an angular acceleration of approximately 1.47 rad/s².
To find the angular velocity at the top of the rim, we can use the formula ω = αt, where ω is the angular velocity and t is the time. Plugging in the values, 1.47 rad/s² and 2.25 s, we can find that the angular velocity is approximately 3.31 rad/s.
Finally, to convert the angular velocity to linear velocity, we can use the formula v = ωr, where v is the linear velocity and r is the radius of the tire. Plugging in the values, 3.31 rad/s and 0.17 m (half the diameter of the tire), we can find that the point at the top of the rim of the tire will be moving at a speed of approximately 0.56 m/s².