A boy throw a ball upwards with velocity v0 = 20 m/s . The wind imparts a horizontal acceleration of 4 m/s2 to the left.
The angle θ at which the ball must be thrown so that the ball returns to the boy's hand is ( g = 10m/s2 )
(d) vy=v0cosθ=20cosθ
vx=v0sinθ=20sinθ
Time of flight of the ball is :
T = 2vyg=2×20cosθ10=4cos θ ............... (1)
In this time displacement of ball in horizontals Directions should also be zero.
i.e. 0 = vxT−12axT2 ; this gives
T = 2vxax=2(20 sin θ)4 = 10 sin θ ............. (2)
Equating (1) and (2) we get , 4 cos θ = 10 sin θ or tan θ = 25 ; or θ = tan−1 (0.4)