A spaceman in training is rotated in a seat at the end of a horizontal arm of length 5 m. If he can with stand acceleration upto 9 g, then what is the maximum number of revolution per second permissible? (Take, g =`10ms^(-2)`)

If a speed man is rotated at the end of a long beam of length 5m and the acceleration of 9g, then the number of revolution performed will be ( g=10 m//s^(2))

An astronaout is rotating in a rotor of radius 4m. If he can withstand upto acc. Of 10g, then what is the maximum number of permissible revolutions? (g=10m//s^(2))

A bucket containing water is tied to one end of a rope 2 m long and rotated in a circle about the other end in a vertical plane. Find the minimum number of rotations per minute in order that water may not spill. (g = 9.8 ms^(-2)) .

A person of mass 50 kg stands on a weighing scale on a lift . If the lift is descending with a downward acceleration of 9ms^(-2) what would be the reading of the weighing scale? (g =10ms^(-2)) .

A gun fire bullets each of mass 1 g with velocity of 10 ms ^(-1) by exerting a constant force of 5 g weight. Then , the number of bullets fired per second is (take 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 ball is thrown at an angle theta with the horizontal. Its time of flight is 2 s. Its horizontal range is 100 m. What is the horizontal component of velocity of projection ? Take g =10 ms^(-2) .

A human body can safely with stand with an acceleration of 10 g m//s^(2) . What will be the number of revolution that a space traveller can perform on a rotating platform of radius 10 m ?

The coefficient of static friction between the box and the train's floor is 0.2. The maximum acceleration of the train in which a box lying on its floor will remain stationary is ("Take g"=10ms^(-2))