The path followed by a body projected along y axis is given by `y=sqrt(3)x-(1//2)x^(2)` . If `g=10ms^(2)`, then the initial velocity of projectile will be – (x and y are in m)

The trajectory of a projectile in a vertical plane is y=sqrt(3)x-2x^(2) . [g=10 m//s^(2)] Time of flight of the projectile is :-

A body is projected in a vertical direction. The altitude y is given by y=10t^(2)-9t+5 Calculate the initial velocity of the body.

The trajectory of a projectile in a vertical plane is y=sqrt(3)x-2x^(2) . [g=10 m//s^(2)] Range OA is :-

The trajectory of a projectile in a vertical plane is y=sqrt(3)x-2x^(2) . [g=10 m//s^(2)] Angle of projection theta is :-

The trajectory of a projectile in a vertical plane is y=sqrt(3)x-2x^(2) . [g=10 m//s^(2)] Maximum height H is :-

For ground to ground projectile motion equation of path is y=12x-3//4x^(2) . Given that g=10ms^(-2) . What is the range of the projectile ?

The trajectory of a projectile in a vertical plane is y=sqrt(3)x-2x^(2) . [g=10 m//s^(2)] Radius of curvature of the path of the projectile at the topmost point P is :-

The height and horizontal distances covered by a projectile in a time t are given by y=(4t-5t^(2)) m and x=3t m the velocity of projection is (A) 4ms^(-1) (B) 3ms^(-1) (C) 5ms^(-1) (D) 10ms^(-1)

The equation of trajectory of a projectile thrown from a point on the ground is y=(x-x^(2)/40) m. If g=10ms^(-2) The maximum height reached is

The equation of trajectory of an oblique projectile y = sqrt(3) x - (g x^(2))/(2) . The angle of projection is