For angle of prijection of projectile at angle`(45^(@)-theta)` and `(45^(@)+theta)`, the horizontal range described by the projectile are in the ratio of

For angles of projection of a projectile at angle (45^(@) - theta) and (45^(@)+ theta) , the horizontal ranges described by the projectile are in the ratio of :

For angles of projection of a projectile at angle (45^(@) - theta) and (45^(@)+ theta) , the horizontal ranges described by the projectile are in the ratio of :

Galileo writes that for angles of projection of a projectile at angles (45 + theta) and (45 - theta) , the horizontal ranges described by the projectile are in the ratio of (if theta le 45 )

For angles of projection of a projectile at angles (45^(@) – θ) and (45^(@) + θ) , the horizontal ranges described by the projectile are in the ratio of:

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.

Two projectiles A and B are projected with angle of projection 15^0 for the projectile A and 45^0 for the projectile B. If R_A and R_B be the horizontal range for the two projectile then.

Find the ratio of horizontal range and the height attained by the projectile. i.e. for theta = 45^(@)

Two projectiles are projected angle ((pi)/(4) + theta) and ((pi)/(4) - theta) with the horizontal , where theta lt (pi)/(4) , with same speed. The ratio of horizontal ranges described by them is

The range of a projectile, when launched at an angle of 15^(@) with the horizontal is 1.5 km. what is the range of the projectile, when launched at an angle of 45^(@) to the horizontal with the same speed ?

A projectile is projected with speed u at an angle theta with the horizontal . The average velocity of the projectile between the instants it crosses the same level is