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A space station in the form of a large wheel, 222 m in diameter, rotates to provide an "artificial gravity" of 9.9 m/s 2 for people located on the outer rim. Find the rotational frequency of the wheel that will produce this effect. Answer in units of rpm.

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  1. 30 May, 15:00
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    0.0078 rpm

    Step-by-step explanation:

    Diameter of the wheel = 222m

    Radius of the wheel = 222/2

    = 111m

    Artificial gravity = 9.9m/s^2

    a = V^2/r (V = velocity)

    V^2 = a*r

    V = √a*r

    V = √ 9.9*111

    V = √1098.9

    V = 33.15m/s

    T = πd/V

    T = (π * 222) / 33.15

    = 21.04

    Frequency (f) = 1/T

    f = 1/21.04

    f = 0.046

    Rotational frequency (w) = 2πf

    = 2π * 0.046

    = 0.2986 rad/s

    1 rev = 2π radians

    0.2986 rad/s = 0.2986/2π rev/s

    = 0.4690 rev/s

    Recall that 60 secs = 1 minute

    = 0.4690/60

    = 0.0078rev/min

    = 0.0078rpm
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