For an object thrown at `45^(@)` to the horizontal, the maximum height H and horizontal range R are related as

An object is projected at an angle of 45^(@) with the horizontal. The horizontal range and the maximum height reached will be in the ratio.

A stone projected with a velocity u at an angle (theta )with the horizontal reaches maximum heights H_(1) . When it is projected with velocity u at an angle (pi/2-theta) with the horizontal, it reaches maximum height H_(2) . The relations between the horizontal range R of the projectile, H_(1) and H_(2) , is

An object is thrown along a direction inclined at an angle of 45^(@) with the horizontal direction. The horizontal range of the object is equal to

An object is thrown along a direction inclined at an angle of 45^(@) with the horizontal direction. The horizontal range of the particle is equal to

A body is projected with velocity 'u' so that the maximum height is thrice the horizontal range. Then find the maximum height .

A body is projected with velocity 'u' so that the maximum height is thrice the horizontal range. Then the maximum height is

If a body 'A' of mass M is thrown with velocity V at an angle of 30^(@) to the horizontal and another body B of the same mass is thrown with the same speed at an angle of 60^(@) to the horizontal, the ratio of horizontal ranges of A to B will be

A ball is thrown at a speed of 40 m/s at an angle of 60^0 with the horizontal. Find a. the maximum height reached and b. the range of te ball. Take g=10 m/s^2 .

The maximum height attained by a projectile when thrown at an angle theta with the horizontal is found to be half the horizontal range. Then theta is equal to

A stone is thrown at an angle theta to the horizontal reaches a maximum height H. Then the time of flight of stone will be: