Two balls are thrown, one from a cliff and one from below. How long will they take to collide (t)? What will
be the height of collision(h)?
a. t=8 sec, h=80 m
b. t=6 sec, h=80 m
d. t=8 sec, h=40 m
c. t=8 sec, h=0 m
Answers
Answer:
hi
Explanation:
Let us assume that the two balls meet at a height 'h' after time 't' above the ground.
For the ball dropped from the top of the tower:
Distance covered by the ball is (200 - h) m
Here u = 0 ; s = (200 - h) m and g = 9.8 ms-2
→ s = ut + 1/2 at2
or, 200 - h = 0 × t + 1/2 at2
or, 200 - h = 4.9t2 ............(Equation 1)
For the ball thrown vertically upwards:
u = 40ms-1 ; s = h and g = -9.8ms-2 (-ve value of g since thrown upwards)
s = ut + 1/2 at2
h = 40 × t + 1/2(-9.8)t2
or, h = 40t - 4.9t2 ............(Equation 2)
Adding equations (1) and (2), we get
200 - h + h = 4.9t2 + 40t - 4.9t2
On solving we get
t = 5 s
Substituting t = 5 seconds in equation 1, we get
200 - h = 4.9 × (5)2
or, h = 200 - 4.9 × 25
= 200 - 122.5
= 77.5 m
Thus, the two balls meet at a height 77.5 m from the ground after 5 s . answer by Y.NaGa Lokesh