Answer:
A
Step-by-step explanation:
This question can be modeled by using kinematic equation of motion in vertical direction:
y = y (0) + y'(0)*t + 0.5*a*t^2
Given:
y(0) = 0 for both cases
y'(0) = 0 ... both cases objects were dropped
t taken for first ball to travel distance y_1
t_2 taken for the second ball to travel distance y_2
t -1 = t_2 ..... Eq 1
a = 9.81 m/s^2
Plugging in the respective condition is the above equation of motion:
y_1 = 0.5*a*(t)^2
y_2 = 0.5*a*(t_2)^2
Substituting t_2 = t + 1, we get
y_2 = 0.5*a*(t - 1)^2
Find the difference between position of two objects:
y_1 - y_2 = 0.5*a*(t^2 - (t-1)^2)
dy = 0.5*9.81*( 2*t - 1 )
dy = 9.81*t - 4.905
We can see from above derived expression which shows the separation between the two objects which is a function of time t. The function is an increasing function such that as t increases dy also increases, hence their separation increases with time.