From a balloon rising vertically upwards as `5 ms ^(-1) ` stone is thrown up at `10 ms ^(-1) ` relative to the balloon. Its velocity with respect to ground after 2 s is

From a ballon rising vertically upwards at 5 m/s, a stone is thrown up at 10 m/s relative to the balloon. Its velocity with respect to ground after 2 sec is - (assume g = 10 m//s^(2) )

A man in a balloon, rising vertically with an acceleration of 5 m//s^(2) , releases a ball 10 s after the balloon is let go from the ground. The greatest height above the ground reached by the ball is

A balloon moves up vertically such that if a stone is thrown from it with a horizontal velocity v_(0) relative to it the stone always hits the ground at a fixed point 2v_(0)^(2)//g horizontally away from it. Find the height of the balloon as a function of time.

Two stones are thrown from the same point with velocity of 5 ms^(-1) one vertically upwards and the other vertically downwards. When the first stone is at the highest point the relative velocity of the second stone with respect to the first stone is,

If a stone is thrown up with a velocity of 9.8 ms^(-1) , then how much time will it take to come back ?

A body P is thrown vertically up with velocity 30 ms^(-1) and another body Q is thrown up along the same vertically line with the same velocity but 1 second later from the ground. When they meet (g = 10 ms-2)

A ball is thrown vertically upwards from the top of a tower with an initial velocity of 19.6 "m s"^(-1) . The ball reaches the ground after 5 s. Calculate the velocity of the ball on reaching the ground.Take g= 9.8 "ms"^(-2) ?

A ball is thrown vertically upwards from the top of a tower with an initial velocity of 19.6 "m s"^(-1) . The ball reaches the ground after 5 s. Calculate the height of the tower . Take g= 9.8 "ms"^(-2) ?

A balloon is rising vertically upwards. An an instant, an observation on the ground, whose distance from the balloon is 100 meters, sees the balloon at an angle of elevation of 30^(@) . If the balloon rises further vertically to a point where the angle of elevation as seen by the observer is 45^(@) , then its height (in meters) from the ground is ("Take "sqrt3=1.73)

A man in a balloon rising vertically with an accelration fo 4.9 ms^(-2) released a ball 2 seconds after the balloon is let fo from the fround. The greatst height above the ground reached by the ball is .