Question 30 ( 6 points) A motorcycle stunt driver accelerates horizontally off the edge of a 50.0 -meter-high cliff. To land on level ground 90.0 meters away from the base of the cliff, what minimum speed must the motorcycle have when it leaves the cliff? Ignore air resistance.

To determine the minimum speed required for the motorcycle to land 90.0 meters away from the base of the cliff, we first need to calculate the time it takes to fall 50.0 meters. Using the equation for free fall, we can find that: \[ h = \frac{1}{2}gt^2 \] where \( h = 50.0 \) meters and \( g = 9.81 \, \text{m/s}^2 \). Solving for \( t \) yields approximately \( t \approx 3.19 \) seconds. To cover 90.0 meters horizontally in that time, the required horizontal speed is: \[ v = \frac{d}{t} \] where \( d = 90.0 \) meters. Thus, \( v \approx \frac{90.0}{3.19} \approx 28.24 \, \text{m/s} \). So, the motorcycle must leave the cliff at a minimum speed of about 28.24 m/s to successfully land on level ground 90.0 meters away from the base of the cliff.