The product of two times of flight from a point P to another point Q with a given velocity of projection is

An object is taken from a point P to another point Q in a gravitational field:

A particle is projected from a point on the level ground and its height is h when at horizontal distances a and 2 a from its point of projection. Find the velocity of projection.

A ball is projected horizontally. After 3s from projection its velocity becomes 1.25 times of the velocity of projection. Its velocity of projection is

If T be the total time of flight and H be the maximum height attained by a stone from the point of projection, then H//T will be ( u=projection velocity and theta =projection angle )

A particle starts from point A moves along a straight line path with an acceleration given by a = p - qx where p, q are connected and x is distance from point A . The particle stops at point B. The maximum velocity of the particle is

A particle is projected vertically upward with velocity u from a point A , when it returns to the point of projection .

A ball is thrown form a point on a ground at some angle of projection. At the same time a bird starts form a point directly above this point of projection at a height h horizontally with speed u . Given that in its flight ball just touches the bird at one point. Find the distance on ground where ball strikes

Two particles of charges +Q and -Q are projected from the same point with a velocity v in a region of unifrom magnetic filed B such that the velocity vector makes an angle 0 with the magnetic filed Their masses are M and 2M respectively Then, they will meet again for the first time at a point whose distane from the point of projection is .

Two particles P and Q are projected simultaneously away from each other from a point A as shown in figure. The velocity of P relative to Q in ms^(-1) at the instant when the motion of P is horizontal is