The equation of trajectory of a projectile is `y=10x-(5/9)x^(2)`. If we assume `g=10ms^(-2)` the range of projectile (in meters) is

The equation of trajectory ofa projectile is y = 10x-5/9x^2 If we assume g = 10 ms^(-2) , the range of projectile (in metre) is

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

The equation of a projectile is y = ax - bx^(2) . Its horizontal range 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 equation of projectile is y=16x-(x^(2))/(4) the horizontal range is:-

Equation of trajector of ground to ground projectile is y=2x-9x^(2) . Then the angle of projection with horizontal and speed of projection is : (g=10m//s^(2))

Equation of trajector of ground to ground projectile is y=2x-9x^(2) . Then the angle of projection with horizontal and speed of projection is : (g=10m//s^(2))

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 :-

The equation of projectile is y = 16 x - (5 x^2)/(4) . Find the horizontal range.

If the equation of motion of a projectile is y=3x -1/8 x^(2) the range and maximum height are respectively (y and x are in metres)