The ceiling of hall is 40 m high. For maximum horizontal distance, the angle at which the ball may be thrown with a speed of 56 m `s^(-1)` without hitting the ceiling of the ball is

The ceiling of a hall is 40m high. For maximum horizontal distance, the angle at which the ball may be thrown with a speed of 56ms^(-1) without hitting the ceiling of the hall is

The ceiling of a long hall is 25 m high. What is the maximum horizontal distance if a ball thrown with a speed of 40 ms^(-1) can go without hitting the ceiling of the hall ?

The ceiling of a tunnel is 5 m high. What is the maximum horizontal distance that a ball thrown with a speed of 20 ms^(-1) can go without hitting the ceiling of the tunnel (g= 10ms^(-2))

The ceiling of a long hall is 20 m high. What is the maximum horizontal distance that a ball thrown with a speed of 40 m can go without hitting the ceiling of hall (g=10 ms^(-2)) ?

A ball is thrown downwards with a speed of 20 m s^(-1) , from the top of a building 150 m high and simultaneously another ball is thrown vertically upwards with a speed of 30 m s^(-1) from the foot to the building . Find the time after which both the balls will meet. (g=10 m s^(-2)) .

A cricketer can throw a ball to a maximum horizontal distance of 150 m. With the same speed how high above the ground can the cricketer throw the ball?

A ball is dropped from the top of a building 100 m high. At the same instant another ball is thrown upwards with a velocity of 40ms^(-1) from the bottom of the building. The two balls will meet after.

A ball is dropped from the top of a building 100 m high. At the same instant another ball is thrown upwards with a velocity of 40ms^(-1) from the bottom of the building. The two balls will meet after.

A ball is thrown up at a speed of 4.0 m/s. Find the maximum height reached by the ball. Take g=10 m//s^2 .