Trajectory is the path a projectile follows
Parabola is the shape of this path
A trajectory could also be described as an arc.
circular, smooth,
What is the difference between tan number and swift bic ?
different between twist and turn
1
A parabola has eccentricity 1, a hyperbola has eccentricity greater than 1.
Ignoring air resistance, it would be a parabola.
A cubic line is in a cube shape line. and Parabola is a straight line
The .30-06 is 12mm longer, and has a flatter trajectory.
Three objects that represent a parabola include a satellite dish, which is designed in the shape of a parabola to focus signals at a single point; a water fountain, where the trajectory of the water jets follows a parabolic path; and a basketball shot, where the arc of the ball's flight creates a parabolic trajectory toward the hoop. Each of these objects illustrates the mathematical properties of parabolas in practical applications.
It is the apex of the parabola.
An "ideal" projectile trajectory ... without the influence of wind or air resistance ... is a section of a parabola. That's the figure you get when the horizontal position changes at constant speed and the vertical position changes at a speed that is itself changing at a constant rate.
The path of a projectile is a parabola because the force of gravity acts perpendicular to the initial velocity, causing the projectile to follow a curved trajectory. This curved path results from both horizontal and vertical motion, creating a parabolic shape.
It is the vertex of the parabola.
A parabolic arc trajectory is the curved path that an object follows when thrown or launched into the air, under the influence of gravity. This type of trajectory is characterized by a symmetric shape resembling a parabola, with the object reaching its highest point midway through its flight path. Projectile motion, such as that of a thrown ball or a launched rocket, often follows a parabolic arc trajectory.
An "ideal" projectile trajectory ... without the influence of wind or air resistance ... is a section of a parabola. That's the figure you get when the horizontal position changes at constant speed and the vertical position changes at a speed that is itself changing at a constant rate.
If you were on the earth you would not be able to perform this feat. The only non-practical method of doing this is to be in space and shoot horizontally. Your trajectory is always a parabola unless you reach escape velocity.