Answer:
Explanation:
1. Find the vertical and horizontal components of the initial velocity
a) Horizontal component:
[tex]v_{0,x}=v_0\times cos(20\º)=135ft/s\times cos(20\º)=126.86ft/s[/tex]
b) Vertical component:
[tex]v_{0,y}=v_0\times sin(20\º)=135ft/s\times sin(20\º)=46.17ft/s[/tex]
2. Find the time when the ball runs 380 feet horizontally:
[tex]x=v_{0,x}\times t\\\\380ft=126.86ft/s\times t[/tex]
[tex]t= (380ft)/(126.86ft/s)=2.995s\approx 3.0s[/tex]
3. Find the height of the ball when the time is 3.0s
[tex]y=y_0+v_{0,y}\times t-gt^2/2[/tex]
[tex]y=3ft+46.17ft/s\times 3.0s-32.174ft/s^2\times (3.0s)^2/2[/tex]
[tex]y=-3.3ft[/tex]
This result means that the ball does not reach the wall because it has fallen to the ground (when y = 0) before 3.0s.
