Answer:
V=14.9 m/s
Explanation:
In order to solve this problem, we are going to use the formulas of parabolic motion.
The velocity X-component of the ball is given by:
[tex]Vx=V*cos(\alpha)\\Vx=15.7*cos(31^o)=13.5m/s[/tex]
The motion on the X axis is a constant velocity motion so:
[tex]t=\frac{d}{Vx}\\t=\frac{20.0}{13.5}=1.48s[/tex]
The whole trajectory of the ball takes 1.48 seconds
We know that:
[tex]Vy=Voy+(a)*t\\Vy=15.7*sin(31^o)+(-9.8)*(1.48)=-6.42m/s[/tex]
Knowing the X and Y components of the velocity, we can calculate its magnitude by:
[tex]V=\sqrt{Vx^2+Vy^2} \\V=\sqrt{(13.5)^2+(-6.42)^2}=14.9m/s[/tex]
