1)A ball is thrown vertically upwards with a speed of 14ms-1. 2 seconds later a second ball is dropped from the same point .find where the two balls meet.
okay let the ball thrown with speed 14 m/s be ball A and the other ball B--->
let us start with time t=0 at the time when ball B is about to be projected i.e. 2 seconds after the projection of ball A-->
the time taken for A to reach its maximum height is-->
v=u+gt
0=14-10t
t=1.4 sec
the maximum height above the initial position wud be-->
s=14t-5t^2
s=9.8m
therefore there is still 0.6 sec left until ball B is projected downwards i.e. at t=0, now the displacement of A in these 0.6 sec wud be, s=0.5*10*(0.6^2), s=1.8 m, i.e. the distance from the initial projection point is 8m
the velocity of A at t=0, wud be-->
v=u+gt
v=0+(0.6*10)
v=6 m/s
therefore the displacement of A at t=0 wud be-->
s=6t+(0.5*10*t^2)-8
for B it wud be--> s=5t^2
now equate the distances-->
6t+5t^2-8=5t^2
t=4/3 sec
therefore after 4/3 sec the balls collide
s=5(t^2)
therefore s=5*16/9 m=8.89 m below the point of projection
