A person in lift which ascents up with acceleration `10 ms^(-2)` drops a stone from a height 10 m. The time of decent is `[g=10ms^(-2)]`

A person in a lift which descends down with an acceleration of 1.8 m//s^2 drops a stone from a height of 2 m. The time of decent is

A body falls from 80 m. Its time of descent is [g = 10 ms^(-2)]

In a given figure the acceleration of M is (g=10ms^(-2))

The normal reaction on a body placed in a lift moving up with constant acceleration 2ms^(-1) is 120 N. Mass of the body is (Take g = 10ms^(-2) )

A person in an elevator accelerating upwards with an acceleration of 2ms^(-2) , tosses a coin vertically upwards with a speed of 20 ms^(-1) . After how much time will the coin fall back into his hand ? (g = 10 ms^(-2) )

A person in an elevator accelerating upwards with an acceleration of 2ms^(-2) , tosses a coin vertically upwards with a speed of 20 ms^(-1) . After how much time will the coin fall back into his hand ? (g = 10 ms^(-2) )

A person in an elevator accelerating upwards with an acceleration of 2ms^(-2) , tosses a coin vertically upwards with a speed of 20 ms^(-1) . After how much time will the coin fall back into his hand ? (g = 10 ms^(-2) )

The person o( mass 50 kg slands on a weighing scale on a lift. If the lift is ascending upwards with a uniform acceleration of 9ms^(-2) , what would be the reading of the weighting scale? ("Take g"=10ms^(-2))

A man of 60kg mass is in a lift. Find the apparent weight of the man when the lift is moving (a) up with uniform acceleration 4ms^(-2) (b) down with uniform acceleration of 2ms^(-2) ( g=10ms^(-2))

Starting from rest, A lift moves up with an acceleration of 2 ms^(-2) . In this lift , a ball is dropped from a height of 1.5m (with respect to floor of lift). The time taken by the ball to reach the floor of the lift is ( g=10 ms^(-2) )