A body is projected upwards with a velocity `u`. It passes through a certain point above the ground after `t_(1)`, Find the time after which the body passes through the same point during the journey.

A body is projected upwards with a velocity u . It passes through a certain point above the grond after t_(1) , Find the time after which the body posses thoruth the same point during the journey.

A body is projected vertically upwards with some velocity u . It at the same point at t = 6 s as was at t = 4 s . Find the value of u .

A body projected vertically upwards with a velocity u returns to the starting point in 4 seconds. If g = 10m//sec , the value of u is

A body is projected up with a velocity u.It reaches a point 'p' its path at times t_(1) and t_(2) seconds from the time of projection.Then (t_(1)+t_(2))

A body is projected vertically upwards with a velocity u it crosses a point in its journey at a height h twice just after 1 and 7 seconds. The value of u in ms^(-1) is (g=10ms^(-2))

A ball 4 s after the instant it was thrown from the ground passes through a point P, and strikes the ground after 5 s from the instant it passes through the point P. Assuming acceleration due to gravity to be 9.8 m//s^(2) find height of the point P above the ground.

A ray of light passing through the point (1,2) reflects on the xaxis at point A and the reflected ray passes through the point (5,3) . Find the coordinates of A.

A body A is projected upwards with a velocity of 90m//s . The second body B is projected upwards with the same initial velocity but after 4 sec. Both the bodies will meet after

A body is projected up with a speed v_0 along the line of greatest slope of an inclined plane of angle of inclination beta . If the body collides elastically perpendicular to the inclined plane, find the time after which the body passes through its point of projection.