It is possible to project a particle with a given speed in two possible ways so that it has the same horizontal range 'R'. The product of time taken by it in the two possible ways is

It is possible to project a particle with a given velocity in two possible ways so as to make it pass through a point at a distance r from the point of projection. The product of times taken to reach this point in the two possible ways is then proportional to

An object projected with same speed at two different angles covers the same horizontal range R. If the two times of flight be t_(1) and t_(2) . The range is 1/alpha "gt"_(1) t_(2), the value of alpha is

If a die is cast two times, then find the number of all possible outcomes .

two particles are projected upwards with the same initial velocity v_(0) in two different angles of projection such that their horizontal ranges are the same. The ratio of the heights of their horizontal ranges are the same. The ratio of the heights of their highest point will be

For an object projected from ground with speed u horizontal range is two times the maximum height attained by it. The horizontal range of object is

Two particles are projected with same velocity but at angles of projection 35° and 55°. Then their horizontal ranges are in the ratio of

Two particles are projected simultaneously with same speed V_0 in same vertical plane at angle 30^@ and 60^@ With the horizontal .The time at which their velocities becomes parallel is

Write all possible outcomes, when: a die is thrown two times

A particle is projected from a point O with an initial speed of 30 ms^(-1) to pass through a point which is 40 m from O horizontally and 10 m above O. There are two angles of projection for which this is possible. These angles are alpha and beta . The value of |tan (alpha+beta)| is

A projectile is thrwon into space so as to have the maximum possible horizontal range equal to 400m. Taking the point of projection as the origin, the coordinates of the point where the velocity of the projectile is minimum are:-