For first stone :
initial velocity , `u_|=15` m/s
Aceleration , a=-g =`- 10m//s^2` ltbrrgt Using the realation,
`x_1=x_0+u_1t+1/2at^2`
Where height of the cliff, `x_0=200 m`
`x_1=200+15t-5t^2` ….(i)
When this stone hits the ground , `x_1=0`
`therefore -5t^2+15t+200=0`
`t^2-3t-40=0`
`t^2-8t+5t-40=0`
t(t-8)+5(t-8)=0
t=8 s or t = -5s
Since the stone was projected at time t = 0, the negative sign before time is meaningless.
`therefore t=8s`
For second stone :
Initial velocity ,`u_(||)=`30 m/s
Acceleration , a=-g=`-10 m//s^2`
Using the relation ,
`x_2=x_0+u_(||)t+1/2at^2`
`=200+30t-5t^2` ...(ii)
At the moment when this stone hits the ground, `x_2` = 0
`– 5t_2` + 30 t + 200 = 0
`t^2-6t-40=0`
`t^2 – 10t + 4t + 40 = 0`
t (t – 10) + 4 (t – 10) = 0
t (t – 10) (t + 4) = 0
t = 10 s or t = – 4 s
Here again, the negative sign is meaningless.
`therefore`t=10 s
Subtracting equations (i) and (ii), we get
`x_2-x_1=(200+30t-5t^2)-(200+15t-5t^2)`
`x_2-x_1=15t` ....(iii)
Equation (iii) represents the linear path of both stones. Due to this linear relation between `(x_2 – x_1)` and t, the path remains a straight line till 8 s.
Maximum separation between the two stones is at t = 8 s.
`(x_2 – x_1)`max = 15x 8 = 120 m
This is in accordance with the given graph.
After 8 s, only second stone is in motion whose variation with time is given by the quadratic equation:
`x_2 – x_1 = 200 + 30t – 5t^2`
Hence, the equation of linear and curved path is given by
`x_2 – x_1 = 15t` (Linear path)
`x_2 - x_1 = 200 + 30t – 5t^2` (Curved path)
