Answer:
Speed at which the ball leaves the launcher = 6.34 m/s
Explanation:
The readings of height above the floor reached by the ball = 2.32, 2.26 and 2.37
Mean value [tex]=\frac{2.32+2.26+2.37}{3} =2.317 m[/tex]
Initial height of launcher = 27 cm = 0.27 cm
So maximum height of projection = 2.317-0.27 = 2.047 meter
We have equation of motion, [tex]v^2=u^2+2as[/tex], where u is the initial velocity, v is the final velocity, s is the displacement and a is the acceleration.
In this case we need to consider only vertical factors.
Vertical displacement = 2.047 m, acceleration = acceleration due to gravity = [tex]-9.81m/s^2[/tex], final velocity = 0 m/s, we need to calculate initial velocity.
[tex]0^2=u^2-2*9.81*2.047\\ \\ u=\sqrt{2*9.81*2.047} \\ \\ u=6.34 m/s[/tex]
So, speed at which the ball leaves the launcher = 6.34 m/s
