Horizontal Position in Ballistic Flight: This compute the horizontal position (x) at a given time within ballistic flight.Vertical Position in Ballistic Flight: This compute the vertical position (y) at a given time within ballistic flight. Ballistic Horizontal Velocity: This is horizontal velocity or ground speed.Ballistic Vertical Velocity: This is the vertical velocity at a given time.Ballistic Position: This computes the X,Y position at a given time.Ballistic Flight Time: This is the time duration of free flight.Ballistic Maximum Range: This is the maximum horizontal range.Ballistic Maximum Altitude: This is the maximum altitude achieved in free ballistic flight.Ballistic Flight Equations and Calculators CLICK HERE for the acceleration due to gravity for the other planets in the solar system. For example, since the Earth is not a perfect sphere, and more closely represented as an oblate spheroid, acceleration due to Earth gravity as Sea Level is more accurately calculated based on latitude: click here -> The international gravity formula provide an acceleration due to gravity based on latitude. the Earth 9.8 m/s 2 verses the moon1.6 m/s 2) and the distance from the center of mass. Acceleration due to gravity changes based on the mass of the object (e.g. the Earth or Moon), the difference in masses result in a negligible acceleration of the large object toward the small and small object accelerating toward the center of mass of the large object. you, an arrow or the Space Shuttle) verses planetary objects (e.g. The force of gravity pulls masses towards each other. A default is provided for the acceleration due to gravity of 9.80665 m/s 2 which is mean acceleration (at all latitudes) for sea level on Earth. This formula does not take into account other factors such as the force of drag. It only takes into account the initial velocity and launch angle (also knows as the loft) and the effects of gravity through an acceleration towards the ground. The Ballistic Range equation calculates the horizontal displacement (distance) of an object in free flight. This formula calculates the range (horizontal distance) traveled by an object based on the height (h) above the horizon of the launch point, initial velocity (V) of the object, and angle of launch (theta), and the vertical acceleration (g). This formula algebraically equivalent in the following form: h is the initial height or elevation above the plane. miles or kilometers) via the pull-down menu. However, this can be automatically converted to other distance units (e.g. Max Range (x): The calculator returns the maximum distance down range ( x) in meters.
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