Answer:
[tex]1.48 m/s^2[/tex], upward
Explanation:
The passenger on the wheel experiences a centripetal acceleration, which is the one that keeps him in a circular motion.
The direction of this acceleration is always towards the centre of the circular trajectory: so when the passenger is at the lowest point of the ride, the acceleration is upward.
Concerning the magnitude, it is given by
[tex]a=\omega^2 r[/tex]
where
[tex]\omega[/tex] is the angular velocity
r = 15 m is the radius
We need to find the angular velocity; we know that the wheel completes 3 revolutions in one minute. Each revolution corresponds to an angle of [tex]2\pi[/tex] rad, so the total angular displacement is
[tex]\theta = 3 \cdot 2\pi = 6\pi[/tex] rad
And the time is
[tex]t = 1 min = 60 s[/tex]
So the angular velocity is
[tex]\omega = \frac{6\pi}{60 s}=0.314 rad/s[/tex]
And substituting into the equation of the acceleration,
[tex]a=(0.314)^2(15)=1.48 m/s^2[/tex]
