Two stones are thrown up simultaneously from the edge of a cliff with initial speed `v and 2 v`. The relative position of the second stone with respect to first varies with time till both the stones strike the ground as.

Two stones are thrown up simultaneously from the edge of a cliff 240 m high with initial speed of 10 m//s and 40 m//s respectively . Which of the following graph best represents the time variation of relative position of the speed stone with respect to the first ? ( Assume stones do not rebound after hitting the groumd and neglect air resistance , take g = 10 m//s^(2)) ( The figure are schematic and not drawn to scale )

Two stones are through up simultaneously from the edge of a cliff 240 m high with initial speed of 10 m/s and 40 m/s respectively. Which of the following graphs best represents the time variation of relative position of the second stone with respect to the first? Assume stones do not rebound after hitting the ground and neglect air resistance, take . g= 10 m//s^(2) (The figures are schematic and not drawn to scale)

Two stones are thrown up simultaneously from the edge of a cliff 200 m high with initial speeds of 15 ms?^(-1) and 30^(-1) . Verify that the graph shown in Fig. 2 ( NCT). 13 , correctly represents the time variation of the relativ e position of the second stone with respect to the first. Neglect the air resistance and assume that the stones do not rebound after hitting the ground. Taje g= 10 ms^(-2) .Give equations for the linear and curved parts of the plot. .

Two stones are thrown vertically upwards simultaneously from the same point on the ground with initial speed u_(1) = 30 m//sec and u_(2) = 50 m//sec . Which of the curve represent correct variation (for the time interval in which both reach the ground) of (x_(2) - x_(1)) = the relative position of second stone with respect to first with time (t) (v_(2) - v_(1)) = the relative velocity of second stone with respect to first with time (t). Assuming that stones do not rebound after hitting.

Two stones are thrown up simultaneously with initial speeds of u_(1) and u_(2)(u_(2)gt_(1) u_(1)) . They hit the ground after 6 s and 10 s respectively. Which graph in fig. correctly represents the time variation of Deltax=(x_(2)-x_(1)) the relative position of the second stone with respect to the first upto t=10 s? Assume that the stones do not rebound after hitting the ground.

Two stones are thrown from the top of a tower, one straight down with an initial speed u and the second straight up with the same speed u. When the two stones hit the ground they will have speeds in the ratio.

A stone is thrown upwards from the top of a tower with some initial speed and it reaches the ground in 16 seconds. Now it is thrown with the same initial speed downward and it reaches the ground in 9 sec . In how much time will it reach the ground if the stone is allowed to fall freely under gravity from the same place ?

One stone is dropped from a tower from rest and simultaneously another stone is projected vertically upwards from the tower with some initial velocity. The graph of distance (s) between the two stones varies with time (t) as (before either stone hits the ground).