L=vₒ²•sin2α/g =19²sin2•45/9.8=36.8 m
At the distance of 36.8 m from the first building the ball is at the level of starting point and has the velocity v(x)=v₀•cos45° =13.4 m/s
The distance to the second building is 50-36.8 = 13.2 m
this distance is covered for t=l/v(x) = 13.2/13.4 =0.99 s.
h= gt²/2=9.8•0.99²/2=4.8 m.
A ball is shot from the top of a building with an initial velocity of 19m/s at an angle theta = 45 above the horizontal.
Vxo and Vyo, are 13.4m/s
If a nearby building is the same height and 50m away, how far below the top of the building will the ball strike the nearby building?
I found the time from x=vt, 50=13.4*t
t= 3.73s
then y= yo + Vyo*t - 0.5*at^2
y= yo + 13.4*3.73 - 0.5*9.8*(3.73)^2..
shouldn' t the answer with that part of formula which is " Vyo*t - 0.5*at^2 " give me how far it could be?
2 answers
ty :)